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Chapter 13: Q. 34 (page 1083)

Evaluating triple integrals: Each of the triple integrals that follows represents the volume of a solid. Sketch the solid and evaluate the integral.
${鈭�}_{0}^{蟺} {鈭�}_{0}^{2} {鈭�}_{0}^{r \sin 胃} r d z d r d 胃$

Short Answer

Expert verified

${鈭�}_{0}^{蟺} {鈭�}_{0}^{2} {鈭�}_{0}^{r \sin 胃} r d z d r d 胃 = \frac{16}{3}$

Step by step solution

01

Given

We have to find the volume by using the triple integral.

{鈭�}_{0}^{蟺} {鈭�}_{0}^{2} {鈭�}_{0}^{r \sin 胃} r d z d r d 胃

02

Evaluate the integral

$V = {鈭�}_{0}^{蟺} {鈭�}_{0}^{2} [{鈭�}_{0}^{r \sin 胃} r d z] d r d 胃 V = {鈭�}_{0}^{蟺} {鈭�}_{0}^{2} [r (r \sin 胃 - 0)] d r d 胃 V = {鈭�}_{0}^{蟺} {鈭�}_{0}^{2} r^{2} \sin 胃 d r d 胃 V = {鈭�}_{0}^{蟺} \sin 胃 d 胃 {鈭�}_{0}^{2} r^{2} d r V = {鈭�}_{0}^{蟺} \sin 胃 d 胃 {[\frac{r^{3}}{3}]}_{0}^{2} V = \frac{8}{3} {鈭�}_{0}^{蟺} \sin 胃 d 胃 V = \frac{8}{3} {[- \cos 胃]}_{0}^{蟺} V = \frac{8}{3} [- \cos 蟺 + \cos 0] V = \frac{8}{3} [1 + 1] V = \frac{16}{3} cubic units$

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Most popular questions from this chapter

Explain how to construct a Riemann sum for a function of two variables over a rectangular region.

Evaluate the triple integrals over the specified rectangular solid region.

$\begin{aligned} {鈭�}_{R} 鈥� z \sin 鈦� x \cos 鈦� y d V, where \\ R = \{(x, y, z) 鈭� 0 鈮� x 鈮� 蟺, \frac{3 蟺}{2} 鈮� y 鈮� 2 蟺, and 1 鈮� z 鈮� 3\} \end{aligned}$

Find the masses of the solids described in Exercises 53鈥�56.

The first-octant solid bounded by the coordinate planes and the plane 3x + 4y + 6z = 12 if the density at each point is proportional to the distance of the point from the xz-plane.

In the following lamina, all angles are right angles and the density is constant:

Find the masses of the solids described in Exercises 53鈥�56.

The solid bounded above by the paraboloid with equation $z = 8 - x^{2} - y^{2}$ and bounded below by the rectangle $R = {(x, y, 0) | 1 鈮� x 鈮� 2 and 0 鈮� y 鈮� 2}$ in the xy-plane if the density at each point is proportional to the square of the distance of the point from the origin.

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