How do you evaluate the integral ∫ x^2 e^x dx using integration by parts?

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How do you evaluate the integral ∫ x^2 e^x dx using integration by parts?

To evaluate the integral ∫ x^2 e^x dx using integration by parts, we start by setting up the necessary components of the integration by parts formula, which is ∫ u dv = uv - ∫ v du.

For this integral, we typically choose:

u = x^2, which implies that du = 2x dx.
dv = e^x dx, so v = e^x.

Now we can substitute these into the integration by parts formula:

∫ x^2 e^x dx = x^2 e^x - ∫ e^x (2x) dx.

Next, we need to evaluate the integral ∫ e^x (2x) dx. We again apply integration by parts. For this integral:

Let u = 2x, which gives du = 2 dx.
Let dv = e^x dx, so v = e^x.

Using the integration by parts formula again:

∫ 2x e^x dx = 2x e^x - ∫ e^x (2) dx

= 2x e^x - 2 e^x.

Putting this result back into our previous expression gives:

How do you evaluate the integral ∫ x^2 e^x dx using integration by parts?

Master your integration skills for the JEE Main exam. Enhance your preparation with engaging quizzes featuring multiple choice questions, complete with hints and thorough explanations. Get ready to excel in your JEE Main exam!

How do you evaluate the integral ∫ x^2 e^x dx using integration by parts?

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