Suppose that T(0) = a and T(1) = b and are some constants. Define the running pairwis average as, for n > 0, 1 T(n + 2) = 5[T(n + 1) + T(n)] We are interested in the long-term behavior, i.e., what does T (n) look like as n → 0? 1. Define the function of T as... F(x) = > T(n) x"| n=0 Use the recurrence relation on T to find an equation for F. 2. Solve for F (x) 3. Express F in terms of functions that you know the power series expansion for 4. Give the power series expansion for F

Q. I only need question 4 done (discrete math). The other questions provide background information so you don't need to do them. Thanks!

Transcribed Image Text:

Suppose that T(0) = a and T(1) = b and are some constants. Define the running pairwise average as, for n > 0, T (n + 2) =[T(n + 1) + T(n)] We are interested in the long-term behavior, i.e., what does T (n) look like as n → o? 1. Define the function of T as... F(x) = > T(n) x"| n=0 Use the recurrence relation on T to find an equation for F. 2. Solve for F (x) 3. Express F in terms of functions that you know the power series expansion for 4. Give the power series expansion for F