Compilation of Mathematicians and Their Contributions

I. Greek Mathematicians Thales of Miletus Birthdate: 624 B. C. Died: 547-546 B. C. Nationality: Greek Title: Regarded as â€Å"Father of Science† Contributions: * He is credited with the first use of deductive reasoning applied to geometry. * Discovery that a circle is  bisected  by its diameter, that the base angles of an isosceles triangle are equal and that  vertical angles  are equal. * Accredited with foundation of the Ionian school of Mathematics that was a centre of learning and research. * Thales theorems used in Geometry: . The pairs of opposite angles formed by two intersecting lines are equal. 2. The base angles of an isosceles triangle are equal. 3. The sum of the angles in a triangle is 180 °. 4. An angle inscribed in a semicircle is a right angle. Pythagoras Birthdate: 569 B. C. Died: 475 B. C. Nationality: Greek Contributions: * Pythagorean Theorem. In a right angled triangle the square of the hypotenuse is equal to the sum of the squares on the other two sides. Note: A right triangle is a triangle that contains one right (90 °) angle.The longest side of a right triangle, called the hypotenuse, is the side opposite the right angle. The Pythagorean Theorem is important in mathematics, physics, and astronomy and has practical applications in surveying. * Developed a sophisticated numerology in which odd numbers denoted male and even female: 1 is the generator of numbers and is the number of reason 2 is the number of opinion 3 is the number of harmony 4 is the number of justice and retribution (opinion squared) 5 is the number of marriage (union of the ? rst male and the ? st female numbers) 6 is the number of creation 10 is the holiest of all, and was the number of the universe, because 1+2+3+4 = 10. * Discovery of incommensurate ratios, what we would call today irrational numbers. * Made the ? rst inroads into the branch of mathematics which would today be called Number Theory. * Setting up a secret mystical society, known as th e Pythagoreans that taught Mathematics and Physics. Anaxagoras Birthdate: 500 B. C. Died: 428 B. C. Nationality: Greek Contributions: * He was the first to explain that the moon shines due to reflected light from the sun. Theory of minute constituents of things and his emphasis on mechanical processes in the formation of order that paved the way for the atomic theory. * Advocated that matter is composed of infinite elements. * Introduced the notion of nous (Greek, â€Å"mind† or â€Å"reason†) into the philosophy of origins. The concept of nous (â€Å"mind†), an infinite and unchanging substance that enters into and controls every living object. He regarded material substance as an infinite multitude of imperishable primary elements, referring all generation and disappearance to mixture and separation, respectively.Euclid Birthdate: c. 335 B. C. E. Died: c. 270 B. C. E. Nationality: Greek Title: â€Å"Father of Geometry† Contributions: * Published a book called the â€Å"Elements† serving as the main textbook for teaching  mathematics  (especially  geometry) from the time of its publication until the late 19th or early 20th century. The Elements. One of the oldest surviving fragments of Euclid's  Elements, found at  Oxyrhynchus and dated to circa AD 100. * Wrote works on perspective,  conic sections,  spherical geometry,  number theory  and  rigor. In addition to the  Elements, at least five works of Euclid have survived to the present day. They follow the same logical structure as  Elements, with definitions and proved propositions. Those are the following: 1. Data  deals with the nature and implications of â€Å"given† information in geometrical problems; the subject matter is closely related to the first four books of the  Elements. 2. On Divisions of Figures, which survives only partially in  Arabic  translation, concerns the division of geometrical figures into two or more equal par ts or into parts in given  ratios.It is similar to a third century AD work by  Heron of Alexandria. 3. Catoptrics, which concerns the mathematical theory of mirrors, particularly the images formed in plane and spherical concave mirrors. The attribution is held to be anachronistic however by J J O'Connor and E F Robertson who name  Theon of Alexandria  as a more likely author. 4. Phaenomena, a treatise on  spherical astronomy, survives in Greek; it is quite similar to  On the Moving Sphere  by  Autolycus of Pitane, who flourished around 310 BC. * Famous five postulates of Euclid as mentioned in his book Elements . Point is that which has no part. 2. Line is a breadthless length. 3. The extremities of lines are points. 4. A straight line lies equally with respect to the points on itself. 5. One can draw a straight line from any point to any point. * The  Elements  also include the following five â€Å"common notions†: 1. Things that are equal to the same thi ng are also equal to one another (Transitive property of equality). 2. If equals are added to equals, then the wholes are equal. 3. If equals are subtracted from equals, then the remainders are equal. 4.Things that coincide with one another equal one another (Reflexive Property). 5. The whole is greater than the part. Plato Birthdate: 424/423 B. C. Died: 348/347 B. C. Nationality: Greek Contributions: * He helped to distinguish between  pure  and  applied mathematics  by widening the gap between â€Å"arithmetic†, now called  number theory  and â€Å"logistic†, now called  arithmetic. * Founder of the  Academy  in  Athens, the first institution of higher learning in the  Western world. It provided a comprehensive curriculum, including such subjects as astronomy, biology, mathematics, political theory, and philosophy. Helped to lay the foundations of  Western philosophy  and  science. * Platonic solids Platonic solid is a regular, convex poly hedron. The faces are congruent, regular polygons, with the same number of faces meeting at each vertex. There are exactly five solids which meet those criteria; each is named according to its number of faces. * Polyhedron Vertices Edges FacesVertex configuration 1. tetrahedron4643. 3. 3 2. cube / hexahedron81264. 4. 4 3. octahedron61283. 3. 3. 3 4. dodecahedron2030125. 5. 5 5. icosahedron1230203. 3. 3. 3. 3 AristotleBirthdate: 384 B. C. Died: 322 BC (aged 61 or 62) Nationality: Greek Contributions: * Founded the Lyceum * His biggest contribution to the field of mathematics was his development of the study of logic, which he termed â€Å"analytics†, as the basis for mathematical study. He wrote extensively on this concept in his work Prior Analytics, which was published from Lyceum lecture notes several hundreds of years after his death. * Aristotle's Physics, which contains a discussion of the infinite that he believed existed in theory only, sparked much debate in later cen turies.It is believed that Aristotle may have been the first philosopher to draw the distinction between actual and potential infinity. When considering both actual and potential infinity, Aristotle states this:  Ã‚  Ã‚  Ã‚  Ã‚  Ã‚   1. A body is defined as that which is bounded by a surface, therefore there cannot be an infinite body. 2. A Number, Numbers, by definition, is countable, so there is no number called ‘infinity’. 3. Perceptible bodies exist somewhere, they have a place, so there cannot be an infinite body. But Aristotle says that we cannot say that the infinite does not exist for these reasons: 1.If no infinite, magnitudes will not be divisible into magnitudes, but magnitudes can be divisible into magnitudes (potentially infinitely), therefore an infinite in some sense exists. 2. If no infinite, number would not be infinite, but number is infinite (potentially), therefore infinity does exist in some sense. * He was the founder of  formal logic, pioneere d the study of  zoology, and left every future scientist and philosopher in his debt through his contributions to the scientific method. Erasthosthenes Birthdate: 276 B. C. Died: 194 B. C. Nationality: Greek Contributions: * Sieve of Eratosthenes Worked on  prime numbers.He is remembered for his prime number sieve, the ‘Sieve of Eratosthenes' which, in modified form, is still an important tool in  number theory  research. Sieve of Eratosthenes- It does so by iteratively marking as composite (i. e. not prime) the multiples of each prime, starting with the multiples of 2. The multiples of a given prime are generated starting from that prime, as a sequence of numbers with the same difference, equal to that prime, between consecutive numbers. This is the Sieve's key distinction from using trial division to sequentially test each candidate number for divisibility by each prime. Made a surprisingly accurate measurement of the circumference of the Earth * He was the first per son to use the word â€Å"geography† in Greek and he invented the discipline of geography as we understand it. * He invented a system of  latitude  and  longitude. * He was the first to calculate the  tilt of the Earth's axis  (also with remarkable accuracy). * He may also have accurately calculated the  distance from the earth to the sun  and invented the  leap day. * He also created the first  map of the world  incorporating parallels and meridians within his cartographic depictions based on the available geographical knowledge of the era. Founder of scientific  chronology. Favourite Mathematician Euclid paves the way for what we known today as â€Å"Euclidian Geometry† that is considered as an indispensable for everyone and should be studied not only by students but by everyone because of its vast applications and relevance to everyone’s daily life. It is Euclid who is gifted with knowledge and therefore became the pillar of todayâ€℠¢s success in the field of geometry and mathematics as a whole. There were great mathematicians as there were numerous great mathematical knowledge that God wants us to know.In consideration however, there were several sagacious Greek mathematicians that had imparted their great contributions and therefore they deserve to be appreciated. But since my task is to declare my favourite mathematician, Euclid deserves most of my kudos for laying down the foundation of geometry. II. Mathematicians in the Medieval Ages Leonardo of Pisa Birthdate: 1170 Died: 1250 Nationality: Italian Contributions: * Best known to the modern world for the spreading of the Hindu–Arabic numeral system in Europe, primarily through the publication in 1202 of his Liber Abaci (Book of Calculation). Fibonacci introduces the so-called Modus Indorum (method of the Indians), today known as Arabic numerals. The book advocated numeration with the digits 0–9 and place value. The book showed the practical im portance of the new numeral system, using lattice multiplication and Egyptian fractions, by applying it to commercial bookkeeping, conversion of weights and measures, the calculation of interest, money-changing, and other applications. * He introduced us to the bar we use in fractions, previous to this, the numerator has quotations around it. * The square root notation is also a Fibonacci method. He wrote following books that deals Mathematics teachings: 1. Liber Abbaci (The Book of Calculation), 1202 (1228) 2. Practica Geometriae (The Practice of Geometry), 1220 3. Liber Quadratorum (The Book of Square Numbers), 1225 * Fibonacci sequence of numbers in which each number is the sum of the previous two numbers, starting with 0 and 1. This sequence begins 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987†¦ The higher up in the sequence, the closer two consecutive â€Å"Fibonacci numbers† of the sequence divided by each other will approach the golden ratio (ap proximately 1: 1. 18 or 0. 618: 1). Roger Bacon Birthdate: 1214 Died: 1294 Nationality: English Contributions: * Opus Majus contains treatments of mathematics and optics, alchemy, and the positions and sizes of the celestial bodies. * Advocated the experimental method as the true foundation of scientific knowledge and who also did some work in astronomy, chemistry, optics, and machine design. Nicole Oresme Birthdate: 1323 Died: July 11, 1382 Nationality: French Contributions: * He also developed a language of ratios, to relate speed to force and resistance, and applied it to physical and cosmological questions. He made a careful study of musicology and used his findings to develop the use of irrational exponents. * First to theorise that sound and light are a transfer of energy that does not displace matter. * His most important contributions to mathematics are contained in Tractatus de configuratione qualitatum et motuum. * Developed the first use of powers with fractional exponent s, calculation with irrational proportions. * He proved the divergence of the harmonic series, using the standard method still taught in calculus classes today. Omar Khayyam Birhtdate: 18 May 1048Died: 4 December 1131 Nationality: Arabian Contibutions: * He derived solutions to cubic equations using the intersection of conic sections with circles. * He is the author of one of the most important treatises on algebra written before modern times, the Treatise on Demonstration of Problems of Algebra, which includes a geometric method for solving cubic equations by intersecting a hyperbola with a circle. * He contributed to a calendar reform. * Created important works on geometry, specifically on the theory of proportions. Omar Khayyam's geometric solution to cubic equations. Binomial theorem and extraction of roots. * He may have been first to develop Pascal's Triangle, along with the essential Binomial Theorem which is sometimes called Al-Khayyam's Formula: (x+y)n = n! ? xkyn-k / k! (n -k)!. * Wrote a book entitled â€Å"Explanations of the difficulties in the postulates in Euclid's Elements† The treatise of Khayyam can be considered as the first treatment of parallels axiom which is not based on petitio principii but on more intuitive postulate. Khayyam refutes the previous attempts by other Greek and Persian mathematicians to prove the proposition.In a sense he made the first attempt at formulating a non-Euclidean postulate as an alternative to the parallel postulate. Favorite Mathematician As far as medieval times is concerned, people in this era were challenged with chaos, social turmoil, economic issues, and many other disputes. Part of this era is tinted with so called â€Å"Dark Ages† that marked the history with unfavourable events. Therefore, mathematicians during this era-after they undergone the untold toils-were deserving individuals for gratitude and praises for they had supplemented the following generations with mathematical ideas that is very useful and applicable.Leonardo Pisano or Leonardo Fibonacci caught my attention therefore he is my favourite mathematician in the medieval times. His desire to spread out the Hindu-Arabic numerals in other countries thus signifies that he is a person of generosity, with his noble will, he deserves to be†¦ III. Mathematicians in the Renaissance Period Johann Muller Regiomontanus Birthdate: 6 June 1436 Died: 6 July 1476 Nationality: German Contributions: * He completed De Triangulis omnimodus. De Triangulis (On Triangles) was one of the first textbooks presenting the current state of trigonometry. His work on arithmetic and algebra, Algorithmus Demonstratus, was among the first containing symbolic algebra. * De triangulis is in five books, the first of which gives the basic definitions: quantity, ratio, equality, circles, arcs, chords, and the sine function. * The crater Regiomontanus on the Moon is named after him. Scipione del Ferro Birthdate: 6 February 1465 Died: 5 N ovember 1526 Nationality: Italian Contributions: * Was the first to solve the cubic equation. * Contributions to the rationalization of fractions with denominators containing sums of cube roots. Investigated geometry problems with a compass set at a fixed angle. Niccolo Fontana Tartaglia Birthdate: 1499/1500 Died: 13 December 1557 Nationality: Italian Contributions: †¢He published many books, including the first Italian translations of Archimedes and Euclid, and an acclaimed compilation of mathematics. †¢Tartaglia was the first to apply mathematics to the investigation of the paths of cannonballs; his work was later validated by Galileo's studies on falling bodies. †¢He also published a treatise on retrieving sunken ships. †¢Ã¢â‚¬ Cardano-Tartaglia Formula†. †¢He makes solutions to cubic equations. Formula for solving all types of cubic equations, involving first real use of complex numbers (combinations of real and imaginary numbers). †¢Tartagli a’s Triangle (earlier version of Pascal’s Triangle) A triangular pattern of numbers in which each number is equal to the sum of the two numbers immediately above it. †¢He gives an expression for the volume of a tetrahedron: Girolamo Cardano Birthdate: 24 September 1501 Died: 21 September 1576 Nationality: Italian Contributions: * He wrote more than 200 works on medicine, mathematics, physics, philosophy, religion, and music. Was the first mathematician to make systematic use of numbers less than zero. * He published the solutions to the cubic and quartic equations in his 1545 book Ars Magna. * Opus novum de proportionibus he introduced the binomial coefficients and the binomial theorem. * His book about games of chance, Liber de ludo aleae (â€Å"Book on Games of Chance†), written in 1526, but not published until 1663, contains the first systematic treatment of probability. * He studied hypocycloids, published in de proportionibus 1570. The generating circl es of these hypocycloids were later named Cardano circles or cardanic ircles and were used for the construction of the first high-speed printing presses. * His book, Liber de ludo aleae (â€Å"Book on Games of Chance†), contains the first systematic treatment of probability. * Cardano's Ring Puzzle also known as Chinese Rings, still manufactured today and related to the Tower of Hanoi puzzle. * He introduced binomial coefficients and the binomial theorem, and introduced and solved the geometric hypocyloid problem, as well as other geometric theorems (e. g. the theorem underlying the 2:1 spur wheel which converts circular to reciprocal rectilinear motion).Binomial theorem-formula for multiplying two-part expression: a mathematical formula used to calculate the value of a two-part mathematical expression that is squared, cubed, or raised to another power or exponent, e. g. (x+y)n, without explicitly multiplying the parts themselves. Lodovico Ferrari Birthdate: February 2, 1522 Died: October 5, 1565 Nationality: Italian Contributions: * Was mainly responsible for the solution of quartic equations. * Ferrari aided Cardano on his solutions for quadratic equations and cubic equations, and was mainly responsible for the solution of quartic equations that Cardano published.As a result, mathematicians for the next several centuries tried to find a formula for the roots of equations of degree five and higher. Favorite Mathematician Indeed, this period is supplemented with great mathematician as it moved on from the Dark Ages and undergone a rebirth. Enumerated mathematician were all astounding with their performances and contributions. But for me, Niccolo Fontana Tartaglia is my favourite mathematician not only because of his undisputed contributions but on the way he keep himself calm despite of conflicts between him and other mathematicians in this period. IV. Mathematicians in the 16th CenturyFrancois Viete Birthdate: 1540 Died: 23 February 1603 Nationality: F rench Contributions: * He developed the first infinite-product formula for ?. * Vieta is most famous for his systematic use of decimal notation and variable letters, for which he is sometimes called the Father of Modern Algebra. (Used A,E,I,O,U for unknowns and consonants for parameters. ) * Worked on geometry and trigonometry, and in number theory. * Introduced the polar triangle into spherical trigonometry, and stated the multiple-angle formulas for sin (nq) and cos (nq) in terms of the powers of sin(q) and cos(q). * Published Francisci Viet? universalium inspectionum ad canonem mathematicum liber singularis; a book of trigonometry, in abbreviated Canonen mathematicum, where there are many formulas on the sine and cosine. It is unusual in using decimal numbers. * In 1600, numbers potestatum ad exegesim resolutioner, a work that provided the means for extracting roots and solutions of equations of degree at most 6. John Napier Birthdate: 1550 Birthplace: Merchiston Tower, Edinburgh Death: 4 April 1617 Contributions: * Responsible for advancing the notion of the decimal fraction by introducing the use of the decimal point. His suggestion that a simple point could be used to eparate whole number and fractional parts of a number soon became accepted practice throughout Great Britain. * Invention of the Napier’s Bone, a crude hand calculator which could be used for division and root extraction, as well as multiplication. * Written Works: 1. A Plain Discovery of the Whole Revelation of St. John. (1593) 2. A Description of the Wonderful Canon of Logarithms. (1614) Johannes Kepler Born: December 27, 1571 Died: November 15, 1630 (aged 58) Nationality: German Title: â€Å"Founder of Modern Optics† Contributions: * He generalized Alhazen's Billiard Problem, developing the notion of curvature. He was first to notice that the set of Platonic regular solids was incomplete if concave solids are admitted, and first to prove that there were only 13 â€Å"Archi medean solids. † * He proved theorems of solid geometry later discovered on the famous palimpsest of Archimedes. * He rediscovered the Fibonacci series, applied it to botany, and noted that the ratio of Fibonacci numbers converges to the Golden Mean. * He was a key early pioneer in calculus, and embraced the concept of continuity (which others avoided due to Zeno's paradoxes); his work was a direct inspiration for Cavalieri and others. He developed mensuration methods and anticipated Fermat's theorem (df(x)/dx = 0 at function extrema). * Kepler's Wine Barrel Problem, he used his rudimentary calculus to deduce which barrel shape would be the best bargain. * Kepler’s Conjecture- is a mathematical conjecture about sphere packing in three-dimensional Euclidean space. It says that no arrangement of equally sized spheres filling space has a greater average density than that of the cubic close packing (face-centered cubic) and hexagonal close packing arrangements.Marin Mersenn e Birthdate: 8 September 1588 Died: 1 September 1648 Nationality: French Contributions: * Mersenne primes. * Introduced several innovating concepts that can be considered as the basis of modern reflecting telescopes: 1. Instead of using an eyepiece, Mersenne introduced the revolutionary idea of a second mirror that would reflect the light coming from the first mirror. This allows one to focus the image behind the primary mirror in which a hole is drilled at the centre to unblock the rays. 2.Mersenne invented the afocal telescope and the beam compressor that is useful in many multiple-mirrors telescope designs. 3. Mersenne recognized also that he could correct the spherical aberration of the telescope by using nonspherical mirrors and that in the particular case of the afocal arrangement he could do this correction by using two parabolic mirrors. * He also performed extensive experiments to determine the acceleration of falling objects by comparing them with the swing of pendulums, r eported in his Cogitata Physico-Mathematica in 1644.He was the first to measure the length of the seconds pendulum, that is a pendulum whose swing takes one second, and the first to observe that a pendulum's swings are not isochronous as Galileo thought, but that large swings take longer than small swings. Gerard Desargues Birthdate: February 21, 1591 Died: September 1661 Nationality: French Contributions: * Founder of the theory of conic sections. Desargues offered a unified approach to the several types of conics through projection and section. * Perspective Theorem – that when two triangles are in perspective the meets of corresponding sides are collinear. * Founder of projective geometry. Desargues’s theorem The theorem states that if two triangles ABC and A? B? C? , situated in three-dimensional space, are related to each other in such a way that they can be seen perspectively from one point (i. e. , the lines AA? , BB? , and CC? all intersect in one point), then the points of intersection of corresponding sides all lie on one line provided that no two corresponding sides are†¦ * Desargues introduced the notions of the opposite ends of a straight line being regarded as coincident, parallel lines meeting at a point of infinity and regarding a straight line as circle whose center is at infinity. Desargues’ most important work Brouillon projet d’une atteinte aux evenemens des rencontres d? une cone avec un plan (Proposed Draft for an essay on the results of taking plane sections of a cone) was printed in 1639. In it Desargues presented innovations in projective geometry applied to the theory of conic sections. Favorite Mathematician Mathematicians in this period has its own distinct, and unique knowledge in the field of mathematics.They tackled the more complex world of mathematics, this complex world of Mathematics had at times stirred their lives, ignited some conflicts between them, unfolded their flaws and weaknesses but at the end, they build harmonious world through the unity of their formulas and much has benefited from it, they indeed reflected the beauty of Mathematics. They were all excellent mathematicians, and no doubt in it. But I admire John Napier for giving birth to Logarithms in the world of Mathematics. V. Mathematicians in the 17th Century Rene Descartes Birthdate: 31 March 1596 Died: 11 February 1650Nationality: French Contributions: * Accredited with the invention of co-ordinate geometry, the standard x,y co-ordinate system as the Cartesian plane. He developed the coordinate system as a â€Å"device to locate points on a plane†. The coordinate system includes two perpendicular lines. These lines are called axes. The vertical axis is designated as y axis while the horizontal axis is designated as the x axis. The intersection point of the two axes is called the origin or point zero. The position of any point on the plane can be located by locating how far perpendicularly from e ach axis the point lays.The position of the point in the coordinate system is specified by its two coordinates x and y. This is written as (x,y). * He is credited as the father of analytical geometry, the bridge between algebra and geometry, crucial to the discovery of infinitesimal calculus and analysis. * Descartes was also one of the key figures in the Scientific Revolution and has been described as an example of genius. * He also â€Å"pioneered the standard notation† that uses superscripts to show the powers or exponents; for example, the 4 used in x4 to indicate squaring of squaring. He â€Å"invented the convention of representing unknowns in equations by x, y, and z, and knowns by a, b, and c†. * He was first to assign a fundamental place for algebra in our system of knowledge, and believed that algebra was a method to automate or mechanize reasoning, particularly about abstract, unknown quantities. * Rene Descartes created analytic geometry, and discovered an early form of the law of conservation of momentum (the term momentum refers to the momentum of a force). * He developed a rule for determining the number of positive and negative roots in an equation.The Rule of Descartes as it is known states â€Å"An equation can have as many true [positive] roots as it contains changes of sign, from + to – or from – to +; and as many false [negative] roots as the number of times two + signs or two – signs are found in succession. † Bonaventura Francesco Cavalieri Birthdate: 1598 Died: November 30, 1647 Nationality: Italian Contributions: * He is known for his work on the problems of optics and motion. * Work on the precursors of infinitesimal calculus. * Introduction of logarithms to Italy. First book was Lo Specchio Ustorio, overo, Trattato delle settioni coniche, or The Burning Mirror, or a Treatise on Conic Sections. In this book he developed the theory of mirrors shaped into parabolas, hyperbolas, and ellipses, and various combinations of these mirrors. * Cavalieri developed a geometrical approach to calculus and published a treatise on the topic, Geometria indivisibilibus continuorum nova quadam ratione promota (Geometry, developed by a new method through the indivisibles of the continua, 1635).In this work, an area is considered as constituted by an indefinite number of parallel segments and a volume as constituted by an indefinite number of parallel planar areas. * Cavalieri's principle, which states that the volumes of two objects are equal if the areas of their corresponding cross-sections are in all cases equal. Two cross-sections correspond if they are intersections of the body with planes equidistant from a chosen base plane. * Published tables of logarithms, emphasizing their practical use in the fields of astronomy and geography.Pierre de Fermat Birthdate: 1601 or 1607/8 Died: 1665 Jan 12 Nationality: French Contributions: * Early developments that led to infinitesimal calculus, inc luding his technique of adequality. * He is recognized for his discovery of an original method of finding the greatest and the smallest ordinates of curved lines, which is analogous to that of the differential calculus, then unknown, and his research into number theory. * He made notable contributions to analytic geometry, probability, and optics. * He is best known for Fermat's Last Theorem. Fermat was the first person known to have evaluated the integral of general power functions. Using an ingenious trick, he was able to reduce this evaluation to the sum of geometric series. * He invented a factorization method—Fermat's factorization method—as well as the proof technique of infinite descent, which he used to prove Fermat's Last Theorem for the case n = 4. * Fermat developed the two-square theorem, and the polygonal number theorem, which states that each number is a sum of three triangular numbers, four square numbers, five pentagonal numbers, and so on. With his gif t for number relations and his ability to find proofs for many of his theorems, Fermat essentially created the modern theory of numbers. Blaise Pascal Birthdate: 19 June 1623 Died: 19 August 1662 Nationality: French Contributions: * Pascal's Wager * Famous contribution of Pascal was his â€Å"Traite du triangle arithmetique† (Treatise on the Arithmetical Triangle), commonly known today as Pascal's triangle, which demonstrates many mathematical properties like binomial coefficients. Pascal’s Triangle At the age of 16, he formulated a basic theorem of projective geometry, known today as Pascal's theorem. * Pascal's law (a hydrostatics principle). * He invented the mechanical calculator. He built 20 of these machines (called Pascal’s calculator and later Pascaline) in the following ten years. * Corresponded with Pierre de Fermat on probability theory, strongly influencing the development of modern economics and social science. * Pascal's theorem. It states that if a hexagon is inscribed in a circle (or conic) then the three intersection points of opposite sides lie on a line (called the Pascal line).Christiaan Huygens Birthdate: April 14, 1629 Died: July 8, 1695 Nationality: Dutch Contributions: * His work included early telescopic studies elucidating the nature of the rings of Saturn and the discovery of its moon Titan. * The invention of the pendulum clock. Spring driven pendulum clock, designed by Huygens. * Discovery of the centrifugal force, the laws for collision of bodies, for his role in the development of modern calculus and his original observations on sound perception. Wrote the first book on probability theory, De ratiociniis in ludo aleae (â€Å"On Reasoning in Games of Chance†). * He also designed more accurate clocks than were available at the time, suitable for sea navigation. * In 1673 he published his mathematical analysis of pendulums, Horologium Oscillatorium sive de motu pendulorum, his greatest work on horology. I saac Newton Birthdate: 4 Jan 1643 Died: 31 March 1727 Nationality: English Contributions: * He laid the foundations for differential and integral calculus.Calculus-branch of mathematics concerned with the study of such concepts as the rate of change of one variable quantity with respect to another, the slope of a curve at a prescribed point, the computation of the maximum and minimum values of functions, and the calculation of the area bounded by curves. Evolved from algebra, arithmetic, and geometry, it is the basis of that part of mathematics called analysis. * Produced simple analytical methods that unified many separate techniques previously developed to solve apparently unrelated problems such as finding areas, tangents, the lengths of curves and the maxima and minima of functions. Investigated the theory of light, explained gravity and hence the motion of the planets. * He is also famed for inventing `Newtonian Mechanics' and explicating his famous three laws of motion. * The first to use fractional indices and to employ coordinate geometry to derive solutions to Diophantine equations * He discovered Newton's identities, Newton's method, classified cubic plane curves (polynomials of degree three in two variables) Newton's identities, also known as the Newton–Girard formulae, give relations between two types of symmetric polynomials, namely between power sums and elementary symmetric polynomials.Evaluated at the roots of a monic polynomial P in one variable, they allow expressing the sums of the k-th powers of all roots of P (counted with their multiplicity) in terms of the coefficients of P, without actually finding those roots * Newton's method (also known as the Newton–Raphson method), named after Isaac Newton and Joseph Raphson, is a method for finding successively better approximations to the roots (or zeroes) of a real-valued function. Gottfried Wilhelm Von Leibniz Birthdate: July 1, 1646 Died: November 14, 1716 Nationality: GermanCont ributions: * Leibniz invented a mechanical calculating machine which would multiply as well as add, the mechanics of which were still being used as late as 1940. * Developed the infinitesimal calculus. * He became one of the most prolific inventors in the field of mechanical calculators. * He was the first to describe a pinwheel calculator in 1685[6] and invented the Leibniz wheel, used in the arithmometer, the first mass-produced mechanical calculator. * He also refined the binary number system, which is at the foundation of virtually all digital computers. Leibniz was the first, in 1692 and 1694, to employ it explicitly, to denote any of several geometric concepts derived from a curve, such as abscissa, ordinate, tangent, chord, and the perpendicular. * Leibniz was the first to see that the coefficients of a system of linear equations could be arranged into an array, now called a matrix, which can be manipulated to find the solution of the system. * He introduced several notations used to this day, for instance the integral sign ? representing an elongated S, from the Latin word summa and the d used for differentials, from the Latin word differentia.This cleverly suggestive notation for the calculus is probably his most enduring mathematical legacy. * He was the ? rst to use the notation f(x). * The notation used today in Calculus df/dx and ? f x dx are Leibniz notation. * He also did work in discrete mathematics and the foundations of logic. Favorite Mathematician Selecting favourite mathematician from these adept persons in mathematics is a hard task, but as I read the contributions of these Mathematicians, I found Sir Isaac Newton to be the greatest mathematician of this period.He invented the useful but difficult subject in mathematics- the calculus. I found him cooperative with different mathematician to derive useful formulas despite the fact that he is bright enough. Open-mindedness towards others opinion is what I discerned in him. VI. Mathematicians in the 18th Century Jacob Bernoulli Birthdate: 6 January 1655 Died: 16 August 1705 Nationality: Swiss Contributions: * Founded a school for mathematics and the sciences. * Best known for the work Ars Conjectandi (The Art of Conjecture), published eight years after his death in 1713 by his nephew Nicholas. Jacob Bernoulli's first important contributions were a pamphlet on the parallels of logic and algebra published in 1685, work on probability in 1685 and geometry in 1687. * Introduction of the theorem known as the law of large numbers. * By 1689 he had published important work on infinite series and published his law of large numbers in probability theory. * Published five treatises on infinite series between 1682 and 1704. * Bernoulli equation, y' = p(x)y + q(x)yn. * Jacob Bernoulli's paper of 1690 is important for the history of calculus, since the term integral appears for the first time with its integration meaning. Discovered a general method to determine evolutes of a curve as the envelope of its circles of curvature. He also investigated caustic curves and in particular he studied these associated curves of the parabola, the logarithmic spiral and epicycloids around 1692. * Theory of permutations and combinations; the so-called Bernoulli numbers, by which he derived the exponential series. * He was the first to think about the convergence of an infinite series and proved that the series   is convergent. * He was also the first to propose continuously compounded interest, which led him to investigate: Johan Bernoulli Birthdate: 27 July 1667Died: 1 January 1748 Nationality: Swiss Contributions: * He was a brilliant mathematician who made important discoveries in the field of calculus. * He is known for his contributions to infinitesimal calculus and educated Leonhard Euler in his youth. * Discovered fundamental principles of mechanics, and the laws of optics. * He discovered the Bernoulli series and made advances in theory of navigation and ship saili ng. * Johann Bernoulli proposed the brachistochrone problem, which asks what shape a wire must be for a bead to slide from one end to the other in the shortest possible time, as a challenge to other mathematicians in June 1696.For this, he is regarded as one of the founders of the calculus of variations. Daniel Bernoulli Birthdate: 8 February 1700 Died: 17 March 1782 Nationality: Swiss Contributions: * He is particularly remembered for his applications of mathematics to mechanics. * His pioneering work in probability and statistics. Nicolaus Bernoulli Birthdate: February 6, 1695 Died: July 31, 1726 Nationality: Swiss Contributions: †¢Worked mostly on curves, differential equations, and probability. †¢He also contributed to fluid dynamics. Abraham de Moivre Birthdate: 26 May 1667 Died: 27 November 1754 Nationality: French Contributions: Produced the second textbook on probability theory, The Doctrine of Chances: a method of calculating the probabilities of events in play. * Pioneered the development of analytic geometry and the theory of probability. * Gives the first statement of the formula for the normal distribution curve, the first method of finding the probability of the occurrence of an error of a given size when that error is expressed in terms of the variability of the distribution as a unit, and the first identification of the probable error calculation. Additionally, he applied these theories to gambling problems and actuarial tables. In 1733 he proposed the formula for estimating a factorial as n! = cnn+1/2e? n. * Published an article called Annuities upon Lives, in which he revealed the normal distribution of the mortality rate over a person’s age. * De Moivre’s formula: which he was able to prove for all positive integral values of n. * In 1722 he suggested it in the more well-known form of de Moivre's Formula: Colin Maclaurin Birthdate: February, 1698 Died: 14 June 1746 Nationality: Scottish Contributions: * Maclaurin used Taylor series to characterize maxima, minima, and points of inflection for infinitely differentiable functions in his Treatise of Fluxions. Made significant contributions to the gravitation attraction of ellipsoids. * Maclaurin discovered the Euler–Maclaurin formula. He used it to sum powers of arithmetic progressions, derive Stirling's formula, and to derive the Newton-Cotes numerical integration formulas which includes Simpson's rule as a special case. * Maclaurin contributed to the study of elliptic integrals, reducing many intractable integrals to problems of finding arcs for hyperbolas. * Maclaurin proved a rule for solving square linear systems in the cases of 2 and 3 unknowns, and discussed the case of 4 unknowns. Some of his important works are: Geometria Organica – 1720 * De Linearum Geometricarum Proprietatibus – 1720 * Treatise on Fluxions – 1742 (763 pages in two volumes. The first systematic exposition of Newton's methods. ) * Treatise on Al gebra – 1748 (two years after his death. ) * Account of Newton's Discoveries – Incomplete upon his death and published in 1750 or 1748 (sources disagree) * Colin Maclaurin was the name used for the new Mathematics and Actuarial Mathematics and Statistics Building at Heriot-Watt University, Edinburgh. Lenard Euler Birthdate: 15 April 1707 Died: 18 September 1783 Nationality: Swiss Contributions: He made important discoveries in fields as diverse as infinitesimal calculus and graph theory. * He also introduced much of the modern mathematical terminology and notation, particularly for mathematical analysis, such as the notion of a mathematical function. * He is also renowned for his work in mechanics, fluid dynamics, optics, and astronomy. * Euler introduced and popularized several notational conventions through his numerous and widely circulated textbooks. Most notably, he introduced the concept of a function [2] and was the first to write f(x) to denote the function f a pplied to the argument x. He also introduced the modern notation for the trigonometric functions, the letter e for the base of the natural logarithm (now also known as Euler's number), the Greek letter ? for summations and the letter i to denote the imaginary unit. * The use of the Greek letter ? to denote the ratio of a circle's circumference to its diameter was also popularized by Euler. * Well known in analysis for his frequent use and development of power series, the expression of functions as sums of infinitely many terms, such as * Euler introduced the use of the exponential function and logarithms in analytic proofs. He discovered ways to express various logarithmic functions using power series, and he successfully defined logarithms for negative and complex numbers, thus greatly expanding the scope of mathematical applications of logarithms. * He also defined the exponential function for complex numbers, and discovered its relation to the trigonometric functions. * Elaborate d the theory of higher transcendental functions by introducing the gamma function and introduced a new method for solving quartic equations. He also found a way to calculate integrals with complex limits, foreshadowing the development of modern complex analysis.He also invented the calculus of variations including its best-known result, the Euler–Lagrange equation. * Pioneered the use of analytic methods to solve number theory problems. * Euler created the theory of hypergeometric series, q-series, hyperbolic trigonometric functions and the analytic theory of continued fractions. For example, he proved the infinitude of primes using the divergence of the harmonic series, and he used analytic methods to gain some understanding of the way prime numbers are distributed. Euler's work in this area led to the development of the prime number theorem. He proved that the sum of the reciprocals of the primes diverges. In doing so, he discovered the connection between the Riemann zeta f unction and the prime numbers; this is known as the Euler product formula for the Riemann zeta function. * He also invented the totient function ? (n) which is the number of positive integers less than or equal to the integer n that are coprime to n. * Euler also conjectured the law of quadratic reciprocity. The concept is regarded as a fundamental theorem of number theory, and his ideas paved the way for the work of Carl Friedrich Gauss. * Discovered the formula V ?E + F = 2 relating the number of vertices, edges, and faces of a convex polyhedron. * He made great strides in improving the numerical approximation of integrals, inventing what are now known as the Euler approximations. Jean Le Rond De Alembert Birthdate: 16 November 1717 Died: 29 October 1783 Nationality: French Contributions: * D'Alembert's formula for obtaining solutions to the wave equation is named after him. * In 1743 he published his most famous work, Traite de dynamique, in which he developed his own laws of mot ion. * He created his ratio test, a test to see if a series converges. The D'Alembert operator, which first arose in D'Alembert's analysis of vibrating strings, plays an important role in modern theoretical physics. * He made several contributions to mathematics, including a suggestion for a theory of limits. * He was one of the first to appreciate the importance of functions, and defined the derivative of a function as the limit of a quotient of increments. Joseph Louise Lagrange Birthdate: 25 January 1736 Died: 10 April 1813 Nationality: Italian French Contributions: * Published the ‘Mecanique Analytique' which is considered to be his monumental work in the pure maths. His most prominent influence was his contribution to the the metric system and his addition of a decimal base. * Some refer to Lagrange as the founder of the Metric System. * He was responsible for developing the groundwork for an alternate method of writing Newton's Equations of Motion. This is referred to as ‘Lagrangian Mechanics'. * In 1772, he described the Langrangian points, the points in the plane of two objects in orbit around their common center of gravity at which the combined gravitational forces are zero, and where a third particle of negligible mass can remain at rest. He made significant contributions to all fields of analysis, number theory, and classical and celestial mechanics. * Was one of the creators of the calculus of variations, deriving the Euler–Lagrange equations for extrema of functionals. * He also extended the method to take into account possible constraints, arriving at the method of Lagrange multipliers. * Lagrange invented the method of solving differential equations known as variation of parameters, applied differential calculus to the theory of probabilities and attained notable work on the solution of equations. * He proved that every natural number is a sum of four squares. Several of his early papers also deal with questions of number theo ry. 1. Lagrange (1766–1769) was the first to prove that Pell's equation has a nontrivial solution in the integers for any non-square natural number n. [7] 2. He proved the theorem, stated by Bachet without justification, that every positive integer is the sum of four squares, 1770. 3. He proved Wilson's theorem that n is a prime if and only if (n ? 1)! + 1 is always a multiple of n, 1771. 4. His papers of 1773, 1775, and 1777 gave demonstrations of several results enunciated by Fermat, and not previously proved. 5.His Recherches d'Arithmetique of 1775 developed a general theory of binary quadratic forms to handle the general problem of when an integer is representable by the form. Gaspard Monge Birthdate: May 9, 1746 Died: July 28, 1818 Nationality: French Contributions: * Inventor of descriptive geometry, the mathematical basis on which technical drawing is based. * Published the following books in mathematics: 1. The Art of Manufacturing Cannon (1793)[3] 2. Geometrie descri ptive. Lecons donnees aux ecoles normales (Descriptive Geometry): a transcription of Monge's lectures. (1799) Pierre Simon Laplace Birthdate: 23 March 1749Died: 5 March 1827 Nationality: French Contributions: * Formulated Laplace's equation, and pioneered the Laplace transform which appears in many branches of mathematical physics. * Laplacian differential operator, widely used in mathematics, is also named after him. * He restated and developed the nebular hypothesis of the origin of the solar system * Was one of the first scientists to postulate the existence of black holes and the notion of gravitational collapse. * Laplace made the non-trivial extension of the result to three dimensions to yield a more general set of functions, the spherical harmonics or Laplace coefficients. Issued his Theorie analytique des probabilites in which he laid down many fundamental results in statistics. * Laplace’s most important work was his Celestial Mechanics published in 5 volumes between 1798-1827. In it he sought to give a complete mathematical description of the solar system. * In Inductive probability, Laplace set out a mathematical system of inductive reasoning based on probability, which we would today recognise as Bayesian. He begins the text with a series of principles of probability, the first six being: 1.Probability is the ratio of the â€Å"favored events† to the total possible events. 2. The first principle assumes equal probabilities for all events. When this is not true, we must first determine the probabilities of each event. Then, the probability is the sum of the probabilities of all possible favored events. 3. For independent events, the probability of the occurrence of all is the probability of each multiplied together. 4. For events not independent, the probability of event B following event A (or event A causing B) is the probability of A multiplied by the probability that A and B both occur. 5.The probability that A will occur, given th at B has occurred, is the probability of A and B occurring divided by the probability of B. 6. Three corollaries are given for the sixth principle, which amount to Bayesian probability. Where event Ai ? {A1, A2, †¦ An} exhausts the list of possible causes for event B, Pr(B) = Pr(A1, A2, †¦ An). Then: * Amongst the other discoveries of Laplace in pure and applied mathematics are: 1. Discussion, contemporaneously with Alexandre-Theophile Vandermonde, of the general theory of determinants, (1772); 2. Proof that every equation of an even degree must have at least one real quadratic factor; 3.Solution of the linear partial differential equation of the second order; 4. He was the first to consider the difficult problems involved in equations of mixed differences, and to prove that the solution of an equation in finite differences of the first degree and the second order might always be obtained in the form of a continued fraction; and 5. In his theory of probabilities: 6. Evalua tion of several common definite integrals; and 7. General proof of the Lagrange reversion theorem. Adrian Marie Legendere Birthdate: 18 September 1752 Died: 10 January 1833 Nationality: French Contributions: Well-known and important concepts such as the Legendre polynomials. * He developed the least squares method, which has broad application in linear regression, signal processing, statistics, and curve fitting; this was published in 1806. * He made substantial contributions to statistics, number theory, abstract algebra, and mathematical analysis. * In number theory, he conjectured the quadratic reciprocity law, subsequently proved by Gauss; in connection to this, the Legendre symbol is named after him. * He also did pioneering work on the distribution of primes, and on the application of analysis to number theory. Best known as the author of Elements de geometrie, which was published in 1794 and was the leading elementary text on the topic for around 100 years. * He introduced wh at are now known as Legendre functions, solutions to Legendre’s differential equation, used to determine, via power series, the attraction of an ellipsoid at any exterior point. * Published books: 1. Elements de geometrie, textbook 1794 2. Essai sur la Theorie des Nombres 1798 3. Nouvelles Methodes pour la Determination des Orbites des Cometes, 1806 4. Exercices de Calcul Integral, book in three volumes 1811, 1817, and 1819 5.Traite des Fonctions Elliptiques, book in three volumes 1825, 1826, and 1830 Simon Dennis Poison Birthdate: 21 June 1781 Died: 25 April 1840 Nationality: French Contributions: * He published two memoirs, one on Etienne Bezout's method of elimination, the other on the number of integrals of a finite difference equation. * Poisson's well-known correction of Laplace's second order partial differential equation for potential: today named after him Poisson's equation or the potential theory equation, was first published in the Bulletin de la societe philomati que (1813). Poisson's equation for the divergence of the gradient of a scalar field, ? in 3-dimensional space: Charles Babbage Birthdate: 26 December 1791 Death: 18 October 1871 Nationality: English Contributions: * Mechanical engineer who originated the concept of a programmable computer. * Credited with inventing the first mechanical computer that eventually led to more complex designs. * He invented the Difference Engine that could compute simple calculations, like multiplication or addition, but its most important trait was its ability create tables of the results of up to seven-degree polynomial functions. Invented the Analytical Engine, and it was the first machine ever designed with the idea of programming: a computer that could understand commands and could be programmed much like a modern-day computer. * He produced a Table of logarithms of the natural numbers from 1 to 108000 which was a standard reference from 1827 through the end of the century. Favorite Mathematician No ticeably, Leonard Euler made a mark in the field of Mathematics as he contributed several concepts and formulas that encompasses many areas of Mathematics-Geometry, Calculus, Trigonometry and etc.He deserves to be praised for doing such great things in Mathematics, indeed, his work laid foundation to make the lives of the following generation sublime, ergo, He is my favourite mathematician. VII. Mathematicians in the 19th Century Carl Friedrich Gauss Birthdate: 30 April 1777 Died: 23 February 1855 Nationality: German Contributions: * He became the first to prove the quadratic reciprocity law. * Gauss also made important contributions to number theory with his 1801 book Disquisitiones Arithmeticae (Latin, Arithmetical Investigations), which, among things, introduced the symbol ? or congruence and used it in a clean presentation of modular arithmetic, contained the first two proofs of the law of quadratic reciprocity, developed the theories of binary and ternary quadratic forms, state d the class number problem for them, and showed that a regular heptadecagon (17-sided polygon) can be constructed with straightedge and compass. * He developed a method of measuring the horizontal intensity of the magnetic field which was in use well into the second half of the 20th century, and worked out the mathematical theory for separating the inner and outer (magnetospheric) sources of Earth's magnetic field.Agustin Cauchy Birthdate: 21 August 1789 Died: 23 May 1857 Nationality: French Contributions: * His most notable research was in the theory of residues, the question of convergence, differential equations, theory of functions, the legitimate use of imaginary numbers, operations with determinants, the theory of equations, the theory of probability, and the applications of mathematics to physics. * His writings introduced new standards of rigor in calculus from which grew the modern field of analysis.In Cours d’analyse de l’Ecole Polytechnique (1821), by develo ping the concepts of limits and continuity, he provided the foundation for calculus essentially as it is today. * He introduced the â€Å"epsilon-delta definition for limits (epsilon for â€Å"error† and delta for â€Å"difference’). * He transformed the theory of complex functions by discovering integral theorems and introducing the calculus of residues. * Cauchy founded the modern theory of elasticity by applying the notion of pressure on a plane, and assuming that this pressure was no longer perpendicular to the plane upon which it acts in an elastic body.In this way, he introduced the concept of stress into the theory of elasticity. * He also examined the possible deformations of an elastic body and introduced the notion of strain. * One of the most prolific mathematicians of all time, he produced 789 mathematics papers, including 500 after the age of fifty. * He had sixteen concepts and theorems named for him, including the Cauchy integral theorem, the Cauchy-Sc hwartz inequality, Cauchy sequence and Cauchy-Riemann equations. He defined continuity in terms of infinitesimals and gave several important theorems in complex analysis and initiated the study of permutation groups in abstract algebra. * He started the project of formulating and proving the theorems of infinitesimal calculus in a rigorous manner. * He was the first to define complex numbers as pairs of real numbers. * Most famous for his single-handed development of complex function theory.The first pivotal theorem proved by Cauchy, now known as Cauchy's integral theorem, was the following: where f(z) is a complex-valued function holomorphic on and within the non-self-intersecting closed curve C (contour) lying in the complex plane. * He was the first to prove Taylor's theorem rigorously. * His greatest contributions to mathematical science are enveloped in the rigorous methods which he introduced; these are mainly embodied in his three great treatises: 1. Cours d'analyse de l'Ecol e royale polytechnique (1821) 2. Le Calcul infinitesimal (1823) 3.Lecons sur les applications de calcul infinitesimal; La geometrie (1826–1828) Nicolai Ivanovich Lobachevsky Birthdate: December 1, 1792 Died: February 24, 1856 Nationality: Russian Contributions: * Lobachevsky's great contribution to the development of modern mathematics begins with the fifth postulate (sometimes referred to as axiom XI) in Euclid's Elements. A modern version of this postulate reads: Through a point lying outside a given line only one line can be drawn parallel to the given line. * Lobachevsky's geometry found application in the theory of complex numbers, the theory of vectors, and the theory of relativity. Lobachevskii's deductions produced a geometry, which he called â€Å"imaginary,† that was internally consistent and harmonious yet different from the traditional one of Euclid. In 1826, he presented the paper â€Å"Brief Exposition of the Principles of Geometry with Vigorous Proofs o f the Theorem of Parallels. † He refined his imaginary geometry in subsequent works, dating from 1835 to 1855, the last being Pangeometry. * He was well respected in the work he developed with the theory of infinite series especially trigonometric series, integral calculus, and probability. In 1834 he found a method for approximating the roots of an algebraic equation. * Lobachevsky also gave the definition of a function as a correspondence between two sets of real numbers. Johann Peter Gustav Le Jeune Dirichlet Birthdate: 13 February 1805 Died: 5 May 1859 Nationality: German Contributions: * German mathematician with deep contributions to number theory (including creating the field of analytic number theory) and to the theory of Fourier series and other topics in mathematical analysis. * He is credited with being one of the first mathematicians to give the modern formal definition of a function. Published important contributions to the biquadratic reciprocity law. * In 1837 h e published Dirichlet's theorem on arithmetic progressions, using mathematical analysis concepts to tackle an algebraic problem and thus creating the branch of analytic number theory. * He introduced the Dirichlet characters and L-functions. * In a couple of papers in 1838 and 1839 he proved the first class number formula, for quadratic forms. * Based on his research of the structure of the unit group of quadratic fields, he proved the Dirichlet unit theorem, a fundamental result in algebraic number theory. He first used the pigeonhole principle, a basic counting argument, in the proof of a theorem in diophantine approximation, later named after him Dirichlet's approximation theorem. * In 1826, Dirichlet proved that in any arithmetic progression with first term coprime to the difference there are infinitely many primes. * Developed significant theorems in the areas of elliptic functions and applied analytic techniques to mathematical theory that resulted in the fundamental developme nt of number theory. * His lectures on the equilibrium of systems and potential theory led to what is known as the Dirichlet problem.It involves finding solutions to differential equations for a given set of values of the boundary points of the region on which the equations are defined. The problem is also known as the first boundary-value problem of potential theorem. Evariste Galois Birthdate: 25 October 1811 Death: 31 May 1832 Nationality: French Contributions: * His work laid the foundations for Galois Theory and group theory, two major branches of abstract algebra, and the subfield of Galois connections. * He was the first to use the word â€Å"group† (French: groupe) as a technical term in mathematics to represent a group of permutations. Galois published three papers, one of which laid the foundations for Galois Theory. The second one was about the numerical resolution of equations (root finding in modern terminology). The third was an important one in number theory, i n which the concept of a finite field was first articulated. * Galois' mathematical contributions were published in full in 1843 when Liouville reviewed his manuscript and declared it sound. It was finally published in the October–November 1846 issue of the Journal de Mathematiques Pures et Appliquees. 16] The most famous contribution of this manuscript was a novel proof that there is no quintic formula – that is, that fifth and higher degree equations are not generally solvable by radicals. * He also introduced the concept of a finite field (also known as a Galois field in his honor), in essentially the same form as it is understood today. * One of the founders of the branch of algebra known as group theory. He developed the concept that is today known as a normal subgroup. * Galois' most significant contribution to mathematics by far is his development of Galois Theory.He realized that the algebraic solution to a polynomial equation is related to the structure of a g roup of permutations associated with the roots of the polynomial, the Galois group of the polynomial. He found that an equation could be solved in radicals if one can find a series of subgroups of its Galois group, each one normal in its successor with abelian quotient, or its Galois group is solvable. This proved to be a fertile approach, which later mathematicians adapted to many other fields of mathematics besides the theory of equations to which Galois orig

African American Press Essay

?â€Å"We wish to plead our own cause. Too long have others spoken for us. Too long has the public been deceived by misrepresentation of things which concerns us dearly,† written on the front page of the first African-American owned newspaper, Freedom’s Journal. Freedom’s Journal was published on March 16, 1827 by a group of free African-American men in New York City. Freedom’s Journal was published the same year slavery was abolished in New York and was used to counter racist commentary published in the mainstream press. Samuel E. Cornish and John B. Russwurm served, respectively, as its senior and junior editors where they worked together to publish four-page, four-column weekly newspapers. Though The Freedom’s Journal was not the first African-American paper published, it was the first Africa-American owned newspaper. Freedom’s Journal consisted of news on current events, anecdotes, editorials and used to address contemporary issues such as denouncing slavery, advocating for black people’s political rights, the right to vote, and speaking out about lynching. Cornish and Russwurm desire were to give African-Americans the freedom to voice their thoughts, ideas and opinions. They sought to improve conditions for more than 300,000 newly freed men and women living in the North. They fulfilled this desire, by employing 14 to 44 agents each year to collect subscriptions. Each agent was paid $3 a year for their work. To encourage black achievements Freedom’s Journal featured biographies of celebrated black figures and continued to promote better living conditions by printing schools that were open to blacks, job offering and housing listings. Freedom’s Journal, eventually, circulated 11 states, the District of Columbia, Haiti, Europe and Canada before ceasing publications in 1829. During that time, Russwurm became the sole editor of Freedom’s Journal, after Cornish resigned in 1827. Russwurm began to promote the Colonization Movement which was frowned upon by majority of the newspaper’s readers. The Colonization Movement was a movement that was conceived by members of the American Colonization Colony where they began repatriating free African-Americans back to Africa. When the Freedom’s Journal shifted in complete support of colonization, it lost most of its readers and in March 1829 Freedom’s Journal ceased publication. Even though Freedom’s Journal existed for two years, its two years of existence helped spawn other papers. Since then, African American press has evolved and has substantially increased in the population over the years. After Freedom’s Journal, African-Americans had begun establishing and owning newspapers. It began May 1829, when Cornish attempted to revive the Freedom’s Journal under the name The Rights of All, however, the publication was not successful and failed after a year. David Walker, hired as an agent for Freedom’s Journal, became a well known, anti-slavery writer which was inspired by his experience with Freedom’s Journal. In 1830, Walker’s published his most famous publication known as Appeal which called for slaves to rebel against their masters, â€Å"†¦they want us for their slaves, and think nothing of murdering us†¦therefore, if there is an attempt made by us, kill or be killed†¦and believe this, that it is no more harm for you to kill a man who is trying to kill you, than it is for you to take a drink of water when thirsty,† (Walker). Another attempt at publication, Samuel Cornish, along with, Philip Bell, and Charles Bennett Ray launched The Weekly Advocate, January 1837. Later, the men changed the name to The Colored American March 4, 1837. The Colored American main purpose was to strengthen the moral, social, and political elevation of colored people as well as emancipation of slaves. The Colored American became well-known in the North because of the wide spread support of abolitionists, African-American churches and local abolition societies, and Caucasian allies. The Colored American published 38 articles, becoming an important paper of its time. The last edition of The Colored American was published on Christmas day in 1841. Other early African American newspapers include the Provincial Freeman, published in 1854, which was the first African-American owned newspapers to be published in Chatham, Ontario, Canada. The North Star was an anti-slavery newspaper published in 1847 by Frederick Douglas. He later agreed to merge it with the publication Liberty Party Paper with Gerrit Smith creating the Frederick Douglass’ Paper, in Rochester, New York. The National Era was published in Washington, D. C. in 1847 by the American and Foreign Anti-Slavery Society. The Liberator was probably the best-known publication during the era, published by William Lloyd Garrison in Boston between 1831 and 1865. Other anti-slavery newspapers of note include the Friend of Man, published weekly for the New York State Anti-Slavery Society from 1836 through 1842. The Emancipator, originally known as Genius of Universal Emancipation, was one of the first anti-slavery newspapers published in the United States by Benjamin Lundy in 1819 and National Anti-Slavery Standard established in 1840. All of these newspapers advocated for the abolition of slavery and for the civil rights of all African Americans. By the start of Civil War, more than 40 black-owned and operated papers had been established throughout the United States. After the end of the Civil War, more than 100 newspapers were beginning to publish. Many of the major African-American owned publications include, Baltimore Afro-American, also known as The Afro, was founded by a former slave, John H. Murphy, SR. , in 1892. Today, The Afro is the longest-running African-American, family-owned newspaper in the United States. The Chicago Defender was founded by Robert Sengstacke. Abbott on May 5, 1905. The Chicago Defender included writing pieces from the well-known Langston Hughes, Gwendolyn Brooks and Willard Motley. The Pittsburgh Courier an African-American newspaper published in Pittsburgh, Pennsylvania, in 1910. The Pittsburgh Courier became the most widely circulated newspaper in America for African-Americans. During its peak, the Pittsburgh Courier circulated around 450,000 publications, with more than 400 employees in 14 cities. The Pittsburgh Courier discussed major issues impacting African-American communities. It campaigned against segregation and poverty, and promoted the social advancement of blacks. In the 1930s, the Pittsburgh Courier urged Black voters to vote Democrat, creating a political alliance that still exist to this day. Other publications includes, The Philadelphia Tribune (1912-2001), Atlanta Daily World (1931–2003), Cleveland Call & Post (1934-1991), Los Angeles Sentinel (1934–2005), New York Amsterdam News (1922–1993), and Norfolk Journal and Guide (1921-2003). With African-American newspaper publication on the rise, organizations to help promote the publication began to form to support African-American journalist. In 1940, Robert Sengstacke Abbott, founder of Chicago Defender, along with other African-American publishers, organized the National Negro Publishers Association. The members of the National Negro Publishers Association worked together, â€Å"harmonizing our energies in a common purpose for the benefit of Negro journalism†, (Sengstacke). Today, the National Negro Publishers Associations is composed of more than 200 black newspapers in the United States and the Virgin Islands. In 1975 in Washington D. C. , 44 African-American journalists founded the National Association of Black Journalists. The National Association of Black Journalist’ purpose was to provide quality programs and services to and advocate on behalf of black journalists. These organizations are still going strong today and have contributed greatly to the African American population. Today, there isn’t a firm count of how many African American newspapers circulating the United States, however, according to Allied Media Corporation, an ethnic marketing firm, they have listed 250 newspapers in circulation. The National Newspaper Publishers Association, better known as the Black Press of America, assist in the publication of African-American owned newspapers, counts more than 200 black-owned newspapers as its membership. As you can see, since the Freedom’s Journal, the number of newspaper publications has increased. It began with the main purpose being that Africa-Americans would stick together to fight the constant oppression they were under. Now that we don’t see African-American oppression, as we did then, publications has different focal points. Many of the newspapers provide news and insight on African-American culture, including a variety of perspectives from leaders, celebrities, trendsetters and great minds from the African-American community. The Freedom’s Journal created a new stepping stone for the African-American population. It provided the platform for issues and concerns pursuant to ensuring our rights to life, liberty, and the pursuit of happiness, and to preserve a legacy of black conservatism for generations to come. References 2, M. A. (n. d. ). Early African American and Anti-Slavery Newspapers | Marjory Allen Perez. Genealogy & Family History | Search Family Trees & Vital Records . Retrieved August 1, 2013, from http://www. archives. com/experts/perez-marjory/early-african-american-and-anti-slavery-newspapers. html Black Newspapers Listing | The Network Journal. (n. d. ). Black Business | Black News, Career Ideas for Black Professionals. Retrieved August 1, 2013, from http://www. tnj. com/lists-resources/black-newspapers-listing David Walker, 1785-1830. Walker’s Appeal, in Four Articles; Together with a Preamble, to the Coloured Citizens of the World, but in Particular, and Very Expressly.

Tibbat Bangladesh

Introduction The art of advertising is a tough job. It is not very easy to impress the mind of the target audience and create a good perception of your product. Creating a good perception takes the job to whole new level where advertisers must make the audience learn about the product. This instigates an even harder job, to pursue the audience to make the decision in your favor. The job is even harder when you have to pursue the audience about a product which has failed once in the past. Such is our mission in reestablishing one of our favorite food brands on the past, ‘Nocilla’. Grupo Nutrexpa’ is the mother company of ‘Nocilla’. The company is headquartered in Barcelona, and it was set up in the 1940s with a view to produce food which was â€Å"tasty and highly nutritious†. Nutrexpa offers five kinds of ‘Nocilla’ with different colors and taste which are ‘Nocilla Bokawa(cake)’; ‘Nocilla Postres (a liquid chocol ate which is used on ice-cream,burgers etc)’; ‘Nocilla sticks (flour sticks& chocolate)’; ‘Nocilla Vasos (red, green, light blue, glass jars)’; ‘Nocilla Tarrinas (two chocolate flavor)’. Basically ‘Nocilla Original’ was marketed in Bangladesh.At the beginning of the 1990’s it was available in our local market though a food importing company of Bangladesh called ‘Sajeeb Corporation’. For the sake of our project we are assuming that Nocilla is being re launched in Bangladesh and the hard task of advertising about this forgotten product has been handed to an advertising company managed by us. Advertising Objectives Sales Objective: It is obvious that Nocilla’s sales in Bangladesh have declined drastically over the last few years. So our main and prime objective as the advertising agency is to boost the sales of Nocilla.Since there are very little mearns of communicating Nocilla to the consumers, we ca n use advertising which is a dominant force in the marketing mix for Nocilla. Communication Objective: As we are repositioning Nocilla with the concept of both Taste and Nutrition, we need to communicate this information to the appropriate target consumers. Through our advertising, we have to make sure the kids get the sense of taste and the parent's get the essence of Nutrition. Audience Analysis As per our analysis, our audiences are our target consumers for whom Nocilla would be reestablished.Kids are very fond of chocolate and would very cheerfully grab the oopportunity to change their traditional breakfast with something more chocolaty and tasty. Teenagers always look for different types of taste in their breakfast. They prefer a fast and easily makeable breakfast that would quickly set them free to get busy with their activities. Also they may prefer the taste whenever they would like to have quick snacks. Paren'ts always look to provide the necessary nutrition to their childr en. Nocilla provides hassle free and quick nutritious breakfast for them.This behavior is also applicable for people with a busy life style and always on the go. Segmentation To better attract our target audience our advertising agency has decided to break down our consumers into sub group of consumers that have ssimilar needs, desired product benefits and purchase behavior. We have decided to segment our consumers by dividing them into Demographic, Geographic and Psychographic segments. Demographic Segmentation: Our target consumers would be of the age between 6 to 25 years. They are mainly kids, teenagers and grownups of that specific age category who share a love for a chocolaty breakfast.We can also include the household of parent's who likes a nutritious breakfast for their kids. Geographic Segmentation: As for the quality Nocilla is a premium product with a premium price. So our main target location will be the city areas like Dhaka, Chittagong, Sylhet and other major city cen tered regions. Psychographic Segmentation: Our segmentation also depends on the life style of the consumers who would like a ready and fast breakfast as they lead a very busy life. Nocilla only requires a little amount of time to be spread on bread and to prepare. TargetingWe are targeting our consumers based on differentiated marketing. We are targeting kids, teenagers, and grownups. Again, our target segments include parent's and other persons with busy life styles. Positioning We will position Nocilla as ‘A tasty and nutritious breakfast’. One of the prime causes for the fall of the Nocilla brand was its excessive focus on the taste of the product. As consumers became more concerned over nutrition Nocilla began to lose consumers and thus Nocilla began to lose its brand image in Bangladesh. That’s why we are also focusing on the Nutrition factor as equally as taste.Creative Strategy Art Direction: The artistic attributes of the ad-campaign will mainly focus on the positioning concept- ‘A tasty and nutritious breakfast’. In our campaign, all the advertisements will be directed in such a way so that they represent a creative mixture of both factors- Tasty & Nutritious. Also all the ads will indirectly communicate the quick preparation factor. Production Values: For our advertisement campaign, production values plays a very important role in order to convince completely different type segments.Firstly, to attract the kids we have to use our audio and video options in such a way so that our advertisements provide a childish representation. Again to attract the parent's and grown-ups, our visual representation should be in communicative style. Now, to maintain these objectives, we have developed our advertisements accompanied with a proper mixture of communicative style and childish appearance. To create an appropriate ad-campaign for the re establishment of the brand Nocilla we will need the following components of the copy platf orm: ) The sales of Nocilla have drastically declined due to the excessive attention drawn towards the taste criteria, instead of illustrating it as an ideal breakfast spread. b) Our primary objective would be to include the nutrition and quick prepare ability of a Nocilla breakfast along with the taste criteria. c) Unlike before Nocilla would be packaged in different sizes of glass jars and its coloring will differ with the contents of jar. There will be 4 varieties of Nocilla to be marketed in Bangladesh. Its packaging will also contain the nutrition chart which will be easily readable by the consumers. ) The profile of the target audience will be verified from our studies of the audience analysis and their behaviors. e) After a careful study of the Bangladesh Market we have come to see that there is quite a few numbers of competitors of Nocilla in the market. One of the prime competitors of Nocilla was found to be ‘Nutkao’. Originated from Italy, this product has off ered to competitors’ different shapes and sizes of the product according to the family needs. The vvariety of the jars and the illustrations visualized emphasizes on it being a family food to be eaten during any time of the day.Another competitor ‘Cokokrem’ comes from Turkey. This product doesn’t have any vvariety in the market but did illustrate a great taste appeal of cocoa which is rare compared to the others. ‘Alpella Krem’,’Nutella’ ; ‘New Cream’ are also some of the competitors. The mother companies of these products are yet to be recognized. But the nutrition factors of these products do pose a threat to Nocilla. While we have seen Nocilla being priced at only Tk 120/70 based on available sizes, all the other competitors are priced above Tk 200.This suggests that Nocilla have done a good job in keeping the price at a check compared to its competitors. f) The key consumer benefits of Nocilla are- Its tasty, ità ¢â‚¬â„¢s nutritious, and it’s quick to prepare. g) Support for the consumer benefits: The organization is providing us 4 varieties of the Nocilla products which support our notion of it being tasty. Again we are providing a nutrition chart to support claim of Nocilla being nutritious. The traditional packaging of Nocilla with a plastic cap makes it very easy to use thus further supporting our claim. ) Our recommendation for the organization for the selling strategy will be to use a combination of pull and push strategies. They can provide the retailers with trade promotions to push demand of the product while our advertisement will hopefully create a demand among the retailer to store Nocilla on their shelves. i) As for selling style we will go for the soft selling style that mearns we will create an impression in consumer’s mind which will lead them in taking the decision of purchasing Nocilla.Through our ad campaign we will include various kinds of appeals which are- quality appeal, star appeal and definitely sensory appeal. Media Strategy Determining Geographic Scope: As we are reestablishing Nocilla and don’t want to waste our advertisers resources by transmitting our advertisements in areas where the products had limited or no demand. So we are concentrating our advertising efforts in cities like: Dhaka, Chittagong, and Sylhet. After a few months of operations, we will use BDI and CDI to evaluate our performance.Scheduling the message: As an advertising agency, we plan to determine the timing of our message when the people in the target audience are very much receptive to the medium we are intending to use. We have decided on the continuity of our message by adopting â€Å"pulsing†. As our target audience are more receptive towards our ads during the â€Å"early fringe† i. e. ; 4-7 p. m. and during â€Å"prime time† i. e. ; 8-11 p. m. The size, length and position of our ads will be determined as per the advertisi ng objectives: creative strategy, budget, and reach ; frequency requirement.In case of TV, we picked Channel i and NTV for running our TV commercials. For NTV, we have selected a total of 22 spots for running our ads with duration of 30 seconds. In Channel i, 6 spots have been selected for running the same 30 seconds advertisement. For print media, we have decided to put on a total of 75 insertions, with a combination of full size, 40col-inch, 24col-inch ; 18col-inch ads. Selecting the media: After analyzing the media audiences, media environments and the competitor’s media usages, we have decided that our â€Å"Media Mix† will consist of print media ; electronic media (television).We will also be doing other out-of-home advertisements. Calculating the cost efficiency: The ‘media mix’ will be selected by calculating the Cost per Thousand (CPM) of that particular media according to the data available from the company. Print Strategy We plan to utilize the p rint media by advertising our product in the newspapers only. Magazines are not appropriate according to us for our food product. Thus by advertising in the daily newspapers in our limited budget would be the most cost effective strategy to reestablish Nocilla.We are basically advertising in ‘The Daily Star’ and ‘The Daily Prothom-Alo’. After initial advertisements in these two popular print media we will move on to other newspapers after analyzing the effectiveness of the advertisements. The detailed planned budgeting strategy for utilization is provided in the Appendix section. Headlines, Body copy and Slogan Headlines: We will introduce various types of Headlines to attract our consumers at separate time periods. First, we will use ‘news headlines’ which will describe the new arrival of Nocilla.Again to represent the product quality we will use ‘benefit headlines’. These headlines will be presented to our audience time to time. One example of our headlines is- â€Å"The new taste of breakfast†. Body Copy: A very important characteristic of the advertisements is they all will consist ‘picture and caption copy’. The main purpose of doing this is to visually attract our target segments. Sometimes there will be pictures of Nocilla jars providing product information. And some other times images of kids will be introduced accompanied with concrete messages.Slogan: As we are reestablishing Nocilla, we will introduce a new slogan- â€Å"Wake Up, Boost Up and Break Out†. This new slogan is necessary to create a new brand image. This slogan has been developed in such a way so that it is stylish enough to attract kids and teenagers; and it is encouraging enough for the parent's and grown-ups. Television Advertising As for television advertising we will go only for cable channels- Channel I, NTV. This is mainly because our target market is not the mass market. Infact, we are targeting only t he city centered consumers.So, they can be easily reached using the cable channels. Our advertising type will be both participation and spot announcement. This campaign will involve buying ad spots for some particular programs and also purchasing segments of commercial times from the TV. Our planning for Television advertising will include measuring the TV audience using ‘program rating’; selecting time periods that is early fringe and prime time; understanding TV ad rates using the formula of CPP; placing TV ads based on availability and using special TV services that is provided time to time by the TV channels.

Statistical Process Control whilst primarily a manufacturing quality Essay

Statistical Process Control whilst primarily a manufacturing quality technique can be usefully applied in service industries - Essay Example According to above lines, delivery of service is being compared in context to expectation of customers and divergence of expected service quality from delivered quality creates the gap. Ladhari (2009) stated that four characteristics of service like intangibility, heterogeneity, perishability and inseparability make it different from manufacturing offering. . Markovic (2006) argued that manufacturing sector should not be compared with service sector because customers might act as co-producer in service delivery process while customer involvement is negligent in manufacturing process. In such context, Khan (2003) stated that intangibility and inseparability make it difficult to control service quality while there are statistical procedures available to manage quality of manufacturing process. In such context, Chakrabarty and Tan (2007) found that unlike the manufacturing sector, it took time for service sector to realize the importance of Statistical Process Control (SPC) in managing quality. Sulek (2004) argued that most of the common statistical control mechanism can also be used in service sector to manage quality but little bit recalibration of the statistical model is needed in order to utilize it accurate manner in service environment. Discussion Six Sigma & Control Chart Antony (2006) defined the term Sigma as the deviation from service performance characteristics mean while objective of deploying Six Sigma in service sector is to reduce the scope of variation and subsequently improve quality. In order to control variation in the service performance, specific control limit is being assigned (SLupper). Aim of the service performance would be not to cross the upper control limit or the maximum tolerance zone (Yilmaz and Chatterjee, 2000). In case of Six Sigma, distance between SLupper and service process mean is equal to six standard deviations and in this way term â€Å"Six Sigma† has been arrived. In case of six sigma process, deviation in service performance caused by external uncontrollable influences would not exceed the limit of 3.4 parts per million or 3.4 times the service process will show defect out of 1 million times (Antony, 2006). Antony (2006) and Hoerl (2001) stated that Six Sigma process can be applied to service processes like order entry, invoicing, shipping, baggage handling, payroll processing etc. On the other hand, Yilmaz and Chatterjee (2000) measured that defect rate in service sector is less than 3.5 sigma quality level which means 23,000 times the service process will show defect out of 1 million times. In such context, applying Six Sigma as SPC would improve the service performance level to 99.38 per cent. Hoerl and Snee (2002 and 2003) identified benefits of deploying Six Sigma in service sector as 1- decrease in service defect rate which would automatically increase cost efficiency in the service process, 2- management decision would be guided by data driven statistical analysis which would decrease the scope of assumption bases errors and 3- decrease in service defect would significantly decrease customer complaints. Some practical examples can be cited in order to highlight usefulness of Six Sigma model in service sectors. Table 1: Practical Evidences of Implementation of Six Sigma in Service Organizations Organization Benefits J P Morgan Chase (Global Investment Banking) Applying Six Sigma model has helped the company to reduce flaws in service delivery

Lab DSP Essay Example | Topics and Well Written Essays - 1000 words

Lab DSP - Essay Example Table 1 indicates that expected values are the same with program’s values. Rectangular window function was utilized to design low-pass filters in MATLAB with window length M=2, 45, 65 and ω=0.2 as cut-off frequency. The graphs for impulse response, pole-zero, and magnitude function (linear as well as dB) were drawn. In the first experiment, three LPFs of varying lengths, length M = 25, 45, 65 as well as a 0.2π cut-off frequency were designed. Many observations were made during filter design process. The rectangular function’s main lobe width is 4π/M. The main lobe’s width narrows as M increases, affecting transition width and increasing its gradient. Increasing M reduces a large transition width, which is an unwanted effect. The area below the side lobes remain unchanged with signals retaining the ripples. High side lobe as well as stopband attenuation of -13 db and -21 dB respectively makes the rectangular function undesirable to use. Using a different window function with lower side lobes as well as stop band attenuations is the only way to overcome. Poles-zeros plot significantly affect response frequency when ascertaining the poles/zeros position in the unit circle, thus remain very crucial for the experiment. Unit circle zeros make response to move towards zero, which are components of stopband range. Zeros that are components of passband range produce ripples during passband frequency, thus impact the signal, which consequently affects filter accuracy. Zeros ranging 0-π are crucial because those that are outside do not have impact on the filter response. The poles at zero only have impact on the height of the passband. All window functions, including rectangular, hamming and Blackman, were used in MATLAB to design low-pass filters where length, M was 25 and cut-off frequency was ω=0.2. The graphs for impulse response,

Project Research Essay Example | Topics and Well Written Essays - 2500 words

Project Research - Essay Example Here we will analyze respective ratios like Profitability ratio, asset management ratio, Debt management ratio and Leverage ratio to understand the financial position and performance of the company. Profitability Ratio can be defined as financial a tool which is used to justify a company’s ability to generate revenue. Profitability of Emirates Insurance Company has decreased over the years as the ROE, gross profit margin and net profit margin of the company has declined in 2012 as compared to 2011. Liquidity ratio measures the firm’s ability to fulfill its short term requirements which defines the firm’s capacity to pay off the current liabilities as and when needed. The company does not have enough liquid cash ready in its hand and it needs to improve its liquidity position. Asset management ratio can be defined as the relationship between sales and assets. The company is efficient in managing its assets except its payables turnover ratio. Debt management ratio measures the ability of the company to reduce the risk of financial problems in long run. The financial leverage of the company is higher on 2012. Thus it can be concluded that the company is having average position in the market and it should improve its sales to generate more profitability in future. Introduction Emirates Insurance Company was established in the year 1982 in Abu Dhabi, UAE. It has total assets of more than AED 1.5 billion and its gross written premium for 2012 was AED 650 million. The company operates over 20 locations in UAE. Emirates Insurance Company offers a wide range of insurance related products and services to serve its various customers like corporate, business organization, other financial institution and individuals. The company provides different insurance benefits like Hotel Block Insurance, Jeweler’s Block Insurance, and office comprehensive insurance. Under corporate insurance it provides General Third Party Liability Insurance, Workmenâ€⠄¢s Compensation Insurance, Fidelity Guarantee Insurance and loss of money insurance. The company also has a policy of covering money loss if it occurs during the money is in locker or money loss in the company premises during business hours or in transit between bank and office premises. Oil and Energy team of Emirates insurance Company offers various services to its clients in the world and it focuses on the risk related to oil and gas. It has a wide range of insurance products like Motor Insurance, Marine Hull Insurance, Medical Insurance, Third party general insurance, Aviation insurance, Banker’s Blanket Bond Insurance, Cargo Insurance, fidelity Guarantee Insurance and Life Insurance. Here we will analyze respective ratios like Profitability ratio, asset management ratio, Debt management ratio and Leverage ratio to understand the financial position and performance of the company. Ratio Analysis Ratio analysis states the systematic analysis of the financial statement of a company to understand and interpret its performance and financial positions for a particular period of time. Ratio analysis can be compared

Service value evaluation on the restaurant in London Dissertation

Service value evaluation on the restaurant in London - Dissertation Example Additionally, the researcher will also present a glimpse of the survey questionnaire which will be used to gather primary data. Lastly, limitations to the adopted methodology will also be presented for readers’ understanding. 2. AdoptedMethodology In order to plan and align activities with the research schedule, research methodology plays a vital role in outlining a roadmap. On the other hand, adopted research methodology clarifies the guidelines and principles that should be strictly followed by the researcher to successfully complete the study. Reliability of the primary data is also relied on the selection of appropriate research methodology in order to develop a valid conclusion and set of recommendations by the end of the research work (Kothari, 2004). Keeping this in view, two types of research methodologies are available to researchers. One is qualitative, and the other one is quantitative research methodology. Qualitative researchers are those, which tends on to explai n natural phenomenon pertaining to the area under study. In qualitative researches, researcher observes a natural phenomenon and interprets it according to his personal approach towards the area of study. Qualitative researchers are widely known as multi-method approach which includes interpretive and naturalistic view on the area which is being examined by the researchers (Gillham, 2000). It is important for the researchers that they conduct qualitative researches in natural settings and build logic with the help of theories around the answers presented against the research questions. The data retrieved for completing a qualitative research study is retrieved from sources that provide detailed answers to the research questions. These sources of information can be interviews, focus group discussion, personal observation and etc. Another important aspect that needs to be noticed here is that, qualitative researches are based on inductive approach usually as it requires researchers to explore phenomenon and implicate the findings to the general environment (Crowther & Lancaster, 2012; Gordon & Marian, 2006). Then there is quantitative approach to research work which requires researchers to support the findings of the study with the help of statistical data. Research works based on quantitative approach are considered as more authentic than qualitative approach as it supports the findings of the study scientifically. On the other hand, quantitative research works are based on deductive approach as they rule out the findings which are not reliable and focus only on those findings, which are scientifically proven by statistical figures and justified by the previous work conducted on the same subject. Researches that are based on quantitative approach are generally more reliable as they look for cause and effect to build up a suitable conclusion and recommendation part. Keeping the discussion pertaining to quantitative researches, it can be asserted that quantitativ e researchers are more reliable and authentic as compared to qualitative research methods (Jackson, 2010). Keeping in view the context and aim of the present study, the researcher has adopted quantitative approach to research work, i.e. the researcher will use both quantitative research methodology to ensure the authenticity of the primary research with the help of statistical testing. By doing this, the researcher wi