How to prove that int_0^1(1+x^n)^(-1-1/n)dx=2^(-1/n)

sbrigynt7b

sbrigynt7b

Answered question

2022-11-20

How to prove that
0 1 ( 1 + x n ) 1 1 / n d x = 2 1 / n

Answer & Explanation

Zackary Hatfield

Zackary Hatfield

Beginner2022-11-21Added 14 answers

The change of variable t = x n yields d t = n x n 1 d x, that is, d x = 1 n t 1 1 / n d t. Thus, the integral is
1 + 1 n d t ( 1 + t ) 1 + 1 / n = [ 1 ( 1 + t ) 1 / n ] 1 + = 1 2 1 / n .
evitagimm9h

evitagimm9h

Beginner2022-11-22Added 5 answers

Let x = ( tan t ) 2 / n . Then the integral becomes
0 1 d x ( 1 + x n ) ( 1 + 1 n ) = 2 n 0 π / 4 d t cot t ( tan t ) 2 / n ( sec t ) 2 / n = 2 n 0 π / 4 d t cot t ( sin t ) 2 / n = 2 n 0 π / 4 d ( sin t ) ( sin t ) 2 / n 1 = [ ( sin t ) 2 / n ] 0 π / 4 = 2 1 / n

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