polygon with 17 sides could be drawn using just a compass and a straight edge. The first theorem he proved was‚ “The Fundamental Theorem of Algebra.” This theorem says that every algebraic equation has at least one root or solution. Later he published a book called‚ “Disquisitions Arithmetic” which he published in 1801. It showed the study of the number theory and also provided proof for‚ “The Fundamental Theorem of Algebra.” Also he calculated the orbit of asteroid Ceres‚ and was able to predict its
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of symmetry‚ the centroid will lie somewhere along the line of symmetry. Perpendicular Axis Theorem • The moment of inertia (MI) of a plane area about an axis normal to the plane is equal to the sum of the moments of inertia about any two mutually perpendicular axes lying in the plane and passing through the given axis. • That means the Moment of Inertia Iz = Ix+Iy Parallel Axis Theorem • The moment of area of an object about any axis parallel to the centroidal axis is the sum of
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205 How could you use Descartes’ rule and the Fundamental Theorem of Algebra to predict the number of complex roots to a polynomial as well as find the number of possible positive and negative real roots to a polynomial? | Descartes rule is really helpful because it eliminates the long list of possible rational roots and you can tell how many positives or negatives roots you will have. Fundamental Theorem of Algebra finds the maximum number of zeros which includes real and complex numbers
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didn’t leave much time for his love of math. Since math was just his hobby‚ he never wanted any of his work to be published. When he did publish his work‚ it was always anonymously. Fermat would state theorems‚ but always neglected the proofs. For example‚ his most famous work‚ ‘Fermat’s Last Theorem‚’ didn’t include a proof until when Andrew J. Wiles provided the first in 1993. He made many contributions in the field of mathematics. For example‚ he is considered as one of the ‘fathers’ of analytic
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CALCULUS Calculus is the study of change which focuses on limits‚ functions‚ derivaties‚ integrals‚ and infinite series. There are two main branches of calculus: differential calculus and integral calculus‚ which are connected by the fundamental theorem of calculus. It was discovered by two different men in the seventeenth century. Gottfried Wilhelm Leibniz – a self taught German mathematician – and Isaac Newton - an English scientist - both developed calculus in the 1680s. Calculus is used in a
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MODIGLIANI-MILLER THEOREM Courtney A. Hopley February‚ 2003 Economics Major Despite the fact that the Tax Reform Act of 1986 was the most sweeping tax reform effort in recent US history‚ critics are concerned that the act could have worsened the distortion of corporate financing decisions by failing to address the unequal treatment of debt and equity finance. Two conflicting theories‚ the traditional theory of corporate finance and the Modigliani-Miller Theorem‚ make different predictions
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Partial Sums of the Riemann Zeta Function Carlos Villeda December 4th‚ 2010 Chapter 1 Introduction 1.1 Riemann Zeta Function In 1859‚ Bernard Riemann published his paper “On The Number of Primes Less Than a Given Magnitude”‚ in which he defined a complex variable function which is now called the Riemann Zeta Function(RZF). The function is defined as: ζ(s) = Σ 1 ns (1.1) Where n ranges over the positive integers from 1 to infinity and where s is a complex number. To get an understanding of
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The Journal of Finance‚ 59(3)‚ 1125-1165. Ang‚ J. S.‚ Ciccone‚ S. J.‚ & Baker‚ H. K. (2009). Dividend irrelevance theory. Dividends and Dividend Policy‚ 95-113. DeAngelo‚ H.‚ & DeAngelo‚ L. (2006). The irrelevance of the MM dividend irrelevance theorem. Journal of Financial Economics‚ 79(2)‚ 293-315. Lease‚ R. C.‚ John‚ K.‚ Kalay‚ A.‚ Loewenstein‚ U.‚ & Sarig‚ O. H. (2008). Dividend Policy:: Its Impact on Firm Value. OUP Catalogue. Bar-Yosef‚ S.‚ & Kolodny‚ R. (1976). Dividend policy and capital
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Chapter 08.02 Euler’s Method for Ordinary Differential Equations After reading this chapter‚ you should be able to: develop Euler’s Method for solving ordinary differential equations‚ determine how the step size affects the accuracy of a solution‚ derive Euler’s formula from Taylor series‚ and use Euler’s method to find approximate values of integrals. 1. 2. 3. 4. What is Euler’s method? Euler’s method is a numerical technique to solve ordinary differential equations of the form
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detectors‚ including the direct-matrix-inversion (DMI) blind linear minimum mean square error (MMSE) detector‚ the subspace blind linear MMSE detector‚ and the form-I and form-II group-blind linear hybrid detectors‚ are analyzed. Asymptotic limit theorems for each of the estimates of these detectors (when the signal sample size is large) are established‚ based on which approximate expressions for the average output signal-to-interderence-plus-noise ratios (SINRs) and bit-error rates (BERs) are given
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