Our recurrence is linear . The theory of linear recurrences tells us that the general solution of our recurrence has shape a_n=G(n)+P(n), where G(n) is the general solution of the homogeneous ...

NOTE: For this problem, you need two base cases, since the recursive sequence is defined in terms of the previous two terms. I'll leave that part up to you. INDUCTION STEP: Assume that both a_n=3(2^{n-1})+2(-1)^n ...

I don't know if consider this method as "more ad hoc" but: Divide the equality by 2^n, you get that \frac{A_n}{2^n} = 2 \sum_{k=1}^n \frac{A_{n-k}}{2^{n-k}}. Then, you define v_n = \frac{A_n}{2^n} ...

The analytic solution given below involves the Bessel functions. The powers of t are non-integers. So, the formula for x(t) is valid only in case of t\geq 0. x(t) is finite except in ...

Let the initial term be a_0=10. Then, we can express the n^{\text {th}} term as: a_n = a_{n-1}+9\times (0.9)^{n-1} You can easily check it's validity. Using an iterative method and the sum ...

Given a generating function f(x) for a_n, the generating function for \sum_{i=0}^n a_i is \sum_{n\geq 0} (\sum_{i=0}^n a_i)x^n = (\sum_{n\geq 0} x^n)(\sum_{n\geq 0} a_nx^n) = \frac{1}{1-x} f(x) ...