1 Answer

Deepanker Chaudhary · Answer 1 · 2021-03-23T13:56:28+0000

Answer:

$\int_(1)^(\infty) 6e^(-x) dx= -6 [0 -(1)/(e)] =(6)/(e)$

Because
$\lim_(x\to\infty) (1)/(e^x) = 0$

So then this integral converges and the value obtained is
(6)/(e)

Explanation:

For this case we want to find the following integral:

$\int_(1)^(\infty) 6e^(-x) dx$

We can take the 6 out of the integral like this:

$6 \int_(1)^(\infty) e^(-x)$

And if we solve the integral we got:

$\int_(1)^(\infty) 6e^(-x) dx= -6 e^(-x) \Big|_1^(\infty)$

$\int_(1)^(\infty) 6e^(-x) dx= -6 [\lim_(x\to\infty) (1)/(e^x) - e^(-1)]$

$\int_(1)^(\infty) 6e^(-x) dx= -6 [0 -(1)/(e)]=(6)/(e)$

Because
$\lim_(x\to\infty) (1)/(e^x) = 0$

So then this integral converges and the value obtained is
(6)/(e)

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