Question D: i) Write out the first few terms of the series sum 9*0.1^n, n=1 to...

Question B i) Is there an important difference between “sum a_i, i=1 to infinity” and “sum...

Question B i) Is there an important difference between “sum a_i, i=1 to infinity” and “sum a_n, n=1 to infinity” ? Explain. ii) Is there an important difference between “sum a_i, i=1 to infinity” and “sum a_i, n=1 to infinity” ? Explain.

Let Sum from n=1 to infinity (an) be a convergent series with monotonically decreasing positive terms....

Let Sum from n=1 to infinity (an) be a convergent series with monotonically decreasing positive terms. Prove that limn→∞ n(an) = 0.

Given the alternating series: sigma(2 to infinity): (-1)^n / ln n Determine if the series converge...

Given the alternating series: sigma(2 to infinity): (-1)^n / ln n Determine if the series converge absolutely.    (Use the fact that: ln n < n) Determine if the series converge conditionally. (Estimate the sum of the infinite series using the first 4 terms in the series and estimate the error. How many terms should we use to approximate the sum of the infinite series in question, if we want the error to be less than 0.5?

1. The Taylor series for f(x)=x^3 at 1 is ∞∑n=0 cn(x−1)^n. Find the first few coefficients....

1. The Taylor series for f(x)=x^3 at 1 is ∞∑n=0 cn(x−1)^n. Find the first few coefficients. c0=    c1= c2=    c3= c4=   2. Given the series: ∞∑k=0 (−1/6)^k does this series converge or diverge? diverges converges If the series converges, find the sum of the series: ∞∑k=0 (−1/6)^k=

Consider the recurring number 3.333333…….. a) Write this number as the sum of n terms of...

Consider the recurring number 3.333333…….. a) Write this number as the sum of n terms of a certain sequence. b) Define this sequence and then find the limit of this sum when n→∞ c) Write the initial number in the fraction form. d) Does that match with the result in question b?

Write out the first five terms of the sequence with {[(n+8)/n+1)]^n}^inf n=1 and find its limit...

Write out the first five terms of the sequence with {[(n+8)/n+1)]^n}^inf n=1 and find its limit as well as mention if it converges?

Question # 1: Which of the following are continuous random variables? I. The sum of numbers...

Question # 1: Which of the following are continuous random variables? I. The sum of numbers on a pair of two dice II. The possible sets of outcomes from flipping ten coins III. The possible sets of outcomes from flipping (countably) infinite coins IV. The possible values of outside temperature in Texas V. The possible times that a person arrives at a restaurant a. I & II & III b. II & III Only c. III & IV d. IV...

Question 1 Write functions that do the following: i) A function that takes 2 arguments and...

Question 1 Write functions that do the following: i) A function that takes 2 arguments and adds them. The result returned is the sum of the parameters. ii) A function that takes 2 arguments and returns the difference, iii) A function that calls both functions in i) and ii) and prints the product of the values returned by both. Question 2 Write functions: i) One that prompts a user for 2 numbers. ii) Adds the two numbers if they are...

*********I need question 6 answered which is from question 5 which is ********* Question 5 :...

*********I need question 6 answered which is from question 5 which is ********* Question 5 : Program Correctness I (1 point) Use the loop invariant (I) to show that the code below correctly computes n P−1 k=0 2k (this sum represents the sum of the first n even integers where n ≥ 1). Algorithm 1 evenSum(int n) 1: p = 2(n − 1) 2: i = n − 1 3: while i > 0 do 4: //(I) p = nP−1...

Python Question: Write a function which returns the sum of squares of the integers 1 to...

Python Question: Write a function which returns the sum of squares of the integers 1 to n. For example, the sum of the squares from 1 to 4 is 1 + 4 + 9 + 16, or 30. You may choose what should be returned if n == 0 You may not use the built-in Python sum function. The Solution Must be recursive >>> sum_of_squares(1) 1 >>> sum_of_squares(4) 30 >>> sum_of_squares(8) # 64 + 49 + 36 + ... +...