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Chapter 13: Problem 52

Use a symbolic integration utility to evaluate the double integral. $$ \int_{0}^{3} \int_{0}^{x^{2}} \sqrt{x} \sqrt{1+x} d y d x $$

Short Answer

Expert verified
Upon evaluating, the answer to the double integral is: \( \frac{2}{7}(4^{7/2}-1) \)

Step by step solution

01

Integration with respect to y

As the integrand does not contain the variable \(y\), we first integrate with respect to \(y\). The integral of a constant with respect to a variable simply becomes that constant times the variable. So, we have: \[\int_{0}^{x^{2}} \sqrt{x} \sqrt{1+x} dy = \sqrt{x} \sqrt{1+x} \times \int_{0}^{x^{2}} dy = \sqrt{x} \sqrt{1+x} \times [y]_{0}^{x^{2}} = \sqrt{x} \sqrt{1+x} \times x^{2}\]
02

Simplify the expression

After simplifying the expression, we get: \[ \sqrt{x} \sqrt{1+x} \times x^{2} = x^{2}x^{1/2}(1+x)^{1/2} = x^{5/2}(1+x)^{1/2}\]
03

Integration with respect to x

Now, with the new expression, we integrate with respect to \(x\) from 0 to 3. This would require knowledge of integral techniques, and in this case, the use of substitution method: \[ \int_{0}^{3} x^{5/2} (1+x)^{1/2} dx \] The use of a substitution method to compute this integral would be ideal. A possible substitution is \(u = 1+x\). Calculate \(du/dx\), set dx, substitute these values into the equation, and proceed to find the integral. Thus: \[\int_{0}^{3} x^{5/2} (1+x)^{1/2} dx = \frac{2}{7}(u^{7/2}-1)_{1}^{4}\]

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Most popular questions from this chapter

Sketch the region \(R\) whose area is given by the double integral. Then change the order of integration and show that both orders yield the same area. $$ \int_{-2}^{2} \int_{0}^{4-y^{2}} d x d y $$

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