MATH 1120 Midterm: MATH 1120 Cornell WARMUP2018 Exam Winter 5 1 18Solutions

Math 1312 Practice Exam 2 There will be 6 or 7 problems on the actual test. All of them will be similar to the problems shown here. (Note that in the given solutions, all work is not shown) 1) Find a formula for an,n 1. 1-49-1625 2 3'4 5 6 2) Find the exact sum of the series, if possible, 135m Determine if the following series converge or diverge. You need to clearly state which test you are using, and show all of your work. 3) c) 1(2n):(n-1) e) f) Σ-1co.nn) Σ-=ínti (use Divergence Test, lim-loso series diverges) 4) Determine whether the series is absolutely convergent, conditionally convergent, or divergent. 3n 5) Find an expression for the general term of the following series. Give the starting value for the index (x-2)2-2) 2))2)10 2 16 32 6) Use the ratio test to find the radius of convergence of the power series.

(1 point) In this exercise we consider finding the first five coefficients in the series solution of the first order linear initial value problem ly-xy + 2y = 0 subject to the initial condition y(0) = 1, y(0) = 3 Since the equation has an ordinary point at x 0 it has a power series solution in the form n=0 We learned how to easily solve problems like this separation of variables but here we want to consider the power series method (1) Insert the formal power series into the differential equation and derive the recurrence relation 2 Cr-2 for n = 2, 3, Cn The solution to this initial value problem can be written in the form y x = coy, x + cly(x) where co and Cl are determined from the initial conditions. The function y1 (x) is an even function and y2 (r) is an odd function For this example, from the initial conditions, we have co1 The function y2 (x) is an infinite series y2 (x) = x + Σ akX2kti and C1-3 (2) Use the recurrence relation to find the first few coefficients of the infinite series NOTE note that the constant ci has been factored out The function yl (x) is an even degree polynomial y = other words, note that the constant co has been factored out NOTE In the function y1 (r) the first term is 1. In

Problem 3: The Inverse Transformation Method A general method for simulating a RV having a continuous distribution called the inverse transformation method is based on the following result (see also Section 10.2 of the textbook and Quiz 2) Proposition 2.1. The Inverse Transformation Method). L UN U(0,1). For any continuous et distribution function F, X F-1(U) has distribution function F. (F-1(ar) is defined to equal that value y for which F(y) r.) In order to simulate X n Exp(1), for example, generate an U U(0,1) and let X log(1 -U) (see Quiz 2(c)). In fact, X log(U) is also Exp(1), since 1 U (0,1). Since X Exp(A) if X Exp(1) (why?), it follows that log(U)A has an Exp(1) distribution. This can be easily illustrated in Octave xi -log Grand (100,1)); 100 random samples from Exp (1) x2 -log (rand (100, 1))/2; 100 random samples from Exp(2) x3 -log Grand (100, 1))*2; 100 random samples from Exp(0.5) [mean (x1) mean(x2) mean (x3)] check their mean values In addition, Y X Gamma(n, A) if X Xn are i.i.d. Exp(A). Therefore, if Un are i.i.d. U(0, 1), log (Ui) 1 log Ui Gamma(n, A) (1) i-1 i-1 (a) Write an Octave code to generate 100 random samples from Gamma(10, A) by using the inverse transformation method (1). Let A 0.5, 1, 2. Plot histograms for the Gamma random samples. Octave also has a built-in gamma RV generator gamrnd (google it for reference!). Generate 100 random samples of Gamma(10, A) using gamrnd, make histograms, and compare two results. (b) As a function of U U(0, 1), create a new RV W with CDF F(w) 1 e-ti (w 0). (This is Quiz 2 (b).) Write an Octave code to generate 100 random samples of W F using the inverse transformation method (c) Consider a method for generating Weibull(a,B) RVs that have the following CDF F(z) exp(-ar 0 z oo, a Note that W in (b) is in fact Weibull(1,2). Write an Octave function myweibrnd.m that will generate n random samples for given parameters a and B. It should have the following format function CRJ myweibrnd n, alpha, beta) this function receives sample size n and parameters alpha and beta as input arguments and return R Ca vector of n random samples) (put your code here) Using your myweibrnd function, generate 1000 simulated values when (i) (a, B) (1,2) and (ii) (a,B) (2,1), respectively. Plot histograms and estimate their mean and variance