(c) A sequence {2n} satisfying 0 < In < 1/n where E(-1)"In diverges.
Question 6 For 0<x<T, Etrol= sin(2n + 1] = . Then the voluo of the series or E s is 100 2n + 1 며 O 얘 Ob.
HW: Show that the series __, an n=0 converges whenever ſal < 1, and diverges whenever al > 0.
A sequence has the discrete-time Fourier transform 1 - a2 X(e) ae-jw)2(1- aejw) la| < 1 (a) Find the sequence r[n] (b) Calculate X(eju)cos(w)dw/27
Provided N(0, 1) and without using the LSND program, find P( - 2 <3 <0) Provided N(0, 1) and without using the LSND program, find P(Z < 2). Provided N(0, 1) and without using the LSND program, find P(Z <OOR Z > 2). Message instructor about this question Provided N(0, 1) and without using the LSND program, find P(-1<2<3). 0.84 Message instructor about this question
Given that coto - - 2, sec 0 <0 for the angle 0,050<2n, find the exact value of (a) sin (29). (b) cos (20). (c) sin, and (d) cos
(b) Suppose that en is a sequence such that 0 <In < 2011 for all n e N. Does lim an exist? If it exists, prove it. If not, give a counterexample. (c) Suppose that in is a sequence such that 0 < < 21 for all n E N.Does lim exist? If it exists, prove it. If not, give a counterexample. 20
Problem 6) (The Cauchy condensation test] Let {an} be a nonincreasing sequence of positive numbers (an > an+1 for all n) that converges to 0. The Cauchy condensation test states that Dan converges if and only if 2"2n converges. For example, 1/n diverges because 2" (1/2") = 1 diverges. Explain why the test works.
Suppose that a sequence {Zn} satisfies Izn+1-Znl < 2-n for all n e N. Prove that {z.) is Cauchy. Is this result true under the condition Irn +1-Fml < rt Let xi = 1 and xn +1 = (Zn + 1)/3 for all n e N. Find the first five terms in this sequence. Use induction to show that rn > 1/2 for all n and find the limit N. Prove that this sequence is non-increasing, convergent,
Let X N(1,3) and Y~ N(2,4), where X and Y are independent 1. P(X <4)-? P(Y < 1) =? 4、 5, P(Y < 6) =? 7, P(X + Y < 4) =?
Show that a bounded and monotone sequence converges. Here a sequence is called monotone, if it is either monotone increasing, that is for all or monotone decreasing, in which case for all . in Sn=1 An+1 > an neN an+1 < an We were unable to transcribe this image