(1) Prove the Abel criterion for uniform convergence: 4. Suppose the series of functions 2 (x converges uniformly in some interval I. Suppose for every x E I, san(x)) forms a monotonic series, and th...
(2) Let {fJ be a sequence of continuous, real-valued functions that converges uniformly on the interval [0,1 (a) Show that there exists M> 0 such that n(x) M for all r E [0,1] and all n N. (b) Does the result in part (a) hold if uniform convergence is replaced by pointwise convergence? Prove or give a counterexample (2) Let {fJ be a sequence of continuous, real-valued functions that converges uniformly on the interval [0,1 (a) Show that there exists...
k=1 Question 4. Suppose that the power series ax (x – 2)* converges at x = 5 and diverges at x = -7. Write four real numbers at which the series converges and two real numbers at which the series diverges. What can you say about the radius of convergence? Explain your answers clearly.
2.) (b): Prove or disprove the following problems. 1. Suppose fn(x) is uniformly convergent to fon D= [a, b]. Let ce [a, b]. Is fr uniformly convergent to f on D1 = (a, and/or D2 = (c, b)? = (a, and D2 = [c, b). Is in 2. Let a <c<b. Suppose fn(x) is uniformly convergent to f on D uniformly convergent to f on D = (a,b). 3. Suppose that fn(a) is uniformly convergent to fon , i=1,2,... Is...
PLEASE ANSWER ALL! SHOWS STEPS 2. (a) Prove by using the definition of convergence only, without using limit theo- (b) Prove by using the definition of continuity, or by using the є_ó property, that 3. Let f be a twice differentiable function defined on the closed interval [0, 1]. Suppose rems, that if (S) is a sequence converging to s, then lim, 10 2 f (x) is a continuous function on R r,s,t e [0,1] are defined so that r...
Solve the taylor series and include every steps. I. (a) Use the root test to find the interval of convergence of Σ(-1)4. (b) Demonstrate that the above is the taylor series of _ by writing a formula for f via taylors theorem at a = 0. That is write /(z) = P(z) + R(z) where P(z) is the nth order taylor polynonial centered at a point α and the remainder term R(r)- sn+(e)(-a)t1 for some e 0 O. Show that...
True of False (g) does the power series from ∞ to n=1 (x−2)^n /n(−3)^n has a radius of convergence of 3. (h) If the terms an approach zero as n increases, then the series an converges? (i) If an diverges and bn diverges, then (an + bn) diverges. (j) A power series always converges at at least one point. (l) The series from ∞ to n=1 2^ (−1)^n converges?
-1-1 arctan n n" n!5* (c) Find the interval of convergence and radius of convergence for )0301 i )e-3r) (d) Use the geometric series to write the power series expansion for i. f(1)- 2-4r, centered at a = 0. i.)4 centered at a-6. (e) Write the first 4 nonzero terms of the Maclaurin expansion for i, f(z) = z2 (e4-1) ii. /(x) = cos(3r)-2 sin(2x). (0) Use the Taylor Series definition to write the expansion for f(a)entered at (8) Use...
Please answer it step by step and Question 2. uniformly converge is defined by *f=0* clear handwritten, please, also, beware that for the x you have 2 conditions , such as x>n and 0<=x<=n 1- For all n > 1 define fn: [0, 1] → R as follows: (i if n!x is an integer 10 otherwise Prove that fn + f pointwise where f:[0,1] → R is defined by ſo if x is irrational f(x) = 3 11 if x...
1) 2) 3) 4) 5) Suppose that X is a uniform random variable on the interval (0, 1) and let Y = 1/X. a. Give the smallest interval in which Y is guaranteed to be. Enter -Inf or Inf for – or o. Interval:( b. Compute the probability density function of Y on this interval. fy(y) = Suppose that X ~ Bin(4, 1/3). Find the probability mass function of Y = (X – 2)2. a. List all possible values that...
2. (a) Suppose we have to find the root xof x); that is, we have to solve )0. Fixed-point methods do this by re-writing the equation in the form x·= g(x*) , and then using the iteration scheme : g(x) Show this converges (x-→x. as n→o) provided that K < 1 , for all x in some interval x"-a < x < x*+a ( a > 0 ) about the rootx 6 points] (b) Newton's method has the form of...