Given is the sequence x 1 </msub> = 0 , <mspace width="thickmathspace"

kunyatia33

kunyatia33

Answered question

2022-05-23

Given is the sequence x 1 = 0 , x n + 1 = 2 + x n . Prove:
lim n 2 n 2 x n = π
Hint:
Use the following formulas:
cos ( x 2 ) = 1 + cos x 2
sin ( x 2 ) = 1 cos x 2
Any idea how to solve this problem?

Answer & Explanation

bluayu0y

bluayu0y

Beginner2022-05-24Added 11 answers

Note that as x 1 2, x n 2 n. This can be shown inductively.
Thus, we may write x n = 2 cos θ n for some θ n [ 0 , π / 2 ], with θ 1 = π / 2
Now, 2 cos θ n + 1 = 2 ( 1 + cos θ n ) = 2 cos θ n 2 θ n + 1 = θ n 2 = θ 1 2 n = π 2 n + 1
This implies that 2 n 2 x n = 2 n + 1 sin π 2 n + 1 . Finish off by using sin x x 1 as x 0
meindwrhc

meindwrhc

Beginner2022-05-25Added 3 answers

By induction and the formula from the hint, we can easily get x n = 2 cos ( π 2 n ). Then
lim n 2 n 2 x n = lim n 2 n 2 1 cos ( π 2 n ) = lim n 2 n + 1 sin ( π 2 n + 1 ) = π

Do you have a similar question?

Recalculate according to your conditions!

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?