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Evaluate the following integral in cylindrical coordinates

21 JS[ dz r dr d0 -5

21 S[J dz r dr d0 = (Type an exact answer; using T as needed:) -5

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09:02

Evaluate the cylindrical coordinate integrals in Exercises $23-28$$$\int_{0}^{\pi} \int_{0}^{\theta / \pi} \int_{-\sqrt{4-r^{2}}}^{3 \sqrt{4-r^{2}}} z d z r d r d \theta$$

05:59

Evaluate the integral by changing to cylindrical coordinates.

$ \displaystyle \int_{-2}^2 \int_{-\sqrt{4 – y^2}}^{\sqrt{4 – y^2}} \int_{\sqrt{x^2 + y^2}}^2 xz\ dz dx dy $

09:12

Evaluate the cylindrical coordinate integrals in Exercises $23-28$$$\int_{0}^{2 \pi} \int_{0}^{1} \int_{r}^{\sqrt{2-r^{2}}} d z r d r d \theta$$

11:36

Evaluate the cylindrical coordinate integrals.$$\int_{0}^{2 \pi} \int_{0}^{3} \int_{r^{2} / 3}^{\sqrt{18-r^{2}}} r\quad d z\quad d r\quad d \theta$$

Transcript

in this question we are asked to exclude this. Triple integration here. First we solve this integration with respect to Z. Then we solve this integration with respect to y and enlarged. We solve this integration with respect to twitter Means here -5 and five are lower limit and upper limit zero zero and 5 are lower limit and upper limit of our zero and 2 pi our lower limit and upper limit of data. Now after doing the integration with respect to Z The above integration becomes equals two. Zito 502 to buy. And here integration of constant with respect to Z goes to z negative five five RBR did twitter. Now after I would think the value of upper limits and lower limits this integration becomes the coastal zero to Dubai 0 to 5 dan art br the key to next we solve this integration with respect to hard After…

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