Question #76899

1 Answer
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Nov 18, 2017

It converges. Compare it with 1/x^3 for x>=1.

Explanation:

I'm going to compare 1/sqrt(x^6+1) to 1/x^3. However, note that 1/x^3 is not defined at x=0. Therefore, I'm going to start the integral at x=1 instead.

int_1^oo 1/sqrt(x^6+1) dx

Since 0 < 1/sqrt(x^6+1) < 1/x^3 for all x>=1, and

int_1^oo 1/x^3 dx = 1/2

The integral

int_1^oo 1/sqrt(x^6+1) dx

must therefore converge too.

The integral

int_0^1 1/sqrt(x^6+1) dx

converges as it is a proper integral. Putting the 2 integrals together

int_0^1 1/sqrt(x^6+1) dx + int_1^oo 1/sqrt(x^6+1) dx = int_0^oo 1/sqrt(x^6+1) dx

The resultant integral converges as well.

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