Math, asked by StarTbia, 1 year ago

Obtain the given definite integrals as the limit of a sum.

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Answered by babundrachoubay123

Answer:

Value of $\int_{log^2}^{log^5} e^xdx$ =3

Step-by-step explanation:

In this question

We have been given that

$\int_{log^2}^{log^5} e^xdx$

Integration can be used to find areas, volumes, central points and many useful things.

$\int e^xdx$ = $e^x$

So, $[e^x]_{log^5}^{log^2}$

$[e^x]_{log_e^5}^{log_e^2}$

Value of $e^\ (log^e)$ = 1

Then, 5 - 2 = 3

Hence, value of $\int_{log^2}^{log^5} e^xdx$ = 3

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