Suppose that f is an even function, g is odd, both are integrable on [-5,5]..

asked Sep 23, 2023 110k views

1 vote

4.7k points

Please log in or register to add a comment.

5 votes

Since f(x) is even, we have:

$\int ^5_(-5)f(x)dx=2\int ^5_0f(x)dx$

And since g(x) is odd, we have:

$\int ^5_(-5)g(x)dx=0$

Now, using those results, we obtain:

$\int ^5_(-5)\lbrack f(x)+g(x)\rbrack dx=\int ^5_(-5)f(x)dx+\int ^5_(-5)g(x)dx=2\int ^5_0f(x)dx+0=2\int ^5_0f(x)dx$

And since

$\int ^5_0f(x)dx=19$

we obtain:

$\int ^5_(-5)\lbrack f(x)+g(x)\rbrack dx=2\cdot19=38$

John Reid answered Sep 29, 2023

5.1k points

Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

5.3m questions

6.9m answers