How to prove the function f has an antiderivative?

Alexandra Richardson

Alexandra Richardson

Answered question

2022-07-17

How to prove the function f has an antiderivative?
There is a question in our analysis book and I have lots of problem with it. It says that:
set f ( x ) = { 0 x 0 sin ( π x ) x > 0
g ( x ) = { 0 x 0 1 x > 0.
prove that f has an antiderivative but g does not.
My first problem is about antiderivative of g. I think it has an antiderivative and it is
G ( x ) = { 0 x 0 x x > 0.
Why we can't say that G is antiderivative of g? My second problem is about finding the antiderivative of f. As you may know antiderivative of sin ( π x ) can not be shown by the elementary functions. So, to prove that f has antiderivative I can't find a function like F which its derivative is f and I need to use another approach to prove it, but I don't have any idea about what should I do?

Answer & Explanation

sviudes7w

sviudes7w

Beginner2022-07-18Added 12 answers

Step 1
For f(x), use the Taylor expansion of sine about zero to express sin ( π x ) as an infinite sum. From there, integrate across the sum to give a function for the antiderivative.
Step 2
As for your expression for G, the problem is that g is not defined at zero. Given that an antiderivative, by definition, has a derivative, we can say that g has no antiderivative.
Livia Cardenas

Livia Cardenas

Beginner2022-07-19Added 5 answers

Explanation:
Consider G ( x ) = x g ( t ) d t .
For x 0, G ( x ) = g ( x ), but G′(0) is not defined.

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