Express the following sum (which is in expanded form) as an infinite summation (using the∑symbol):n1/2+ (2n)1/4+...

Determine if the series converges conditionally, converges absolutely, or diverges. /sum(n=1 to infinity) ((-1)^n(2n^2))/(n^2+4) /sum(n=1 to...

Determine if the series converges conditionally, converges absolutely, or diverges. /sum(n=1 to infinity) ((-1)^n(2n^2))/(n^2+4) /sum(n=1 to infinity) sin(4n)/4^n

find the sum of the following series:[(-1)^n pi^2n+1]/4(16)^n (2n+1)

find the sum of the following series:[(-1)^n pi^2n+1]/4(16)^n (2n+1)

Prove the following using induction: (a) For all natural numbers n>2, 2n>2n+1 (b) For all positive...

Prove the following using induction: (a) For all natural numbers n>2, 2n>2n+1 (b) For all positive integersn, 1^3+3^3+5^3+···+(2^n−1)^3=n^2(2n^2−1) (c) For all positive natural numbers n,5/4·8^n+3^(3n−1) is divisible by 19

1. Test the series below for convergence using the Root Test. ∞∑n=1 (2n^2 / 9n+3)^n The...

1. Test the series below for convergence using the Root Test. ∞∑n=1 (2n^2 / 9n+3)^n The limit of the root test simplifies to limn→∞|f(n)|limn→∞|f(n)| where f(n)= 2. Test the series below for convergence using the Root Test. ∞∑n=1 (4n+4 / 5n+3)^n The limit of the root test simplifies to limn→∞|f(n)| where f(n)=   The limit is:

The Taylor series for the function arcsin(x)arcsin⁡(x) about x=0x=0 is equal to ∑n=0∞(2n)!4n(n!)2(2n+1)x2n+1.∑n=0∞(2n)!4n(n!)2(2n+1)x2n+1. For this question,...

The Taylor series for the function arcsin(x)arcsin⁡(x) about x=0x=0 is equal to ∑n=0∞(2n)!4n(n!)2(2n+1)x2n+1.∑n=0∞(2n)!4n(n!)2(2n+1)x2n+1. For this question, recall that 0!=10!=1. a) (6 points) What is the radius of convergence of this Taylor series? Write your final answer in a box. b) (4 points) Let TT be a constant that is within the radius of convergence you found. Write a series expansion for the following integral, using the Taylor series that is given. ∫T0arcsin(x)dx∫0Tarcsin⁡(x)dx Write your final answer in a box. c)...

Convert the following summations to summation notation, then use Therom 5.1 to simplify and find the...

Convert the following summations to summation notation, then use Therom 5.1 to simplify and find the sum. a.) 2 + 5 + 8 +···+ 23. b.) 4 + 4 + 4 +···+ 4, where there are 103 terms. c.) 1 + 4 + 9 +16+ 25 +···+ 100. What is the pattern here?

Consider the following recursive equation s(2n) = 2s(n) + 3; where n = 1, 2, 4,...

Consider the following recursive equation s(2n) = 2s(n) + 3; where n = 1, 2, 4, 8, 16, ... s(1) = 1 a. Calculate recursively s(8) b. Find an explicit formula for s(n) c. Use the formula of part b to calculate s(1), s(2), s(4), and s(8) d Use the formula of part b to prove the recurrence equation s(2n) = 2s(n) + 3

1. what is the calcareous opening that functions as a pressure-equalizing value in echinoderms? a)ampullae b)madreporite...

1. what is the calcareous opening that functions as a pressure-equalizing value in echinoderms? a)ampullae b)madreporite d)podium e)tube feet 2)which of the following crosses would result in the greatest diversity of genotypes at the A-locus on the offspring population? a)AA xaa b) Aa x Aa c) AA x AA d)aa x aa e) Aa x AA 3)In a novel experiment a botanist manages to fuse the genome of endosperm form a corn kernel with a single sperm form the pollen...

Given the following list of functions, determine the order of growth of each using big-Theta notation...

Given the following list of functions, determine the order of growth of each using big-Theta notation and put all the functions in order from slowest-growing to fastest-growing. Be sure to put functions of equal growth rate on the same level. Unless otherwise noted, you can assume all logarithms are base-2. 6nlog(2n)+8n 4n2log(log(8n))+8n2+n 500 n3+7nlog(n2) + 4n 2n+2n+1 log(4n2)+3n+1 12 8log(24n)+10 8n2log(5n2)+7n+200 4log(n3)+1000 100log(16n)log(n6)+23 8nlog(log(n4))+6n+32 9log(log(8n))

write a Nested loop in C# to print out the following output using windows form. 0...

write a Nested loop in C# to print out the following output using windows form. 0 0 1 0 2 4 0 3 6 9 0 4 8 16 32