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Chapter 13: Q.20 (page 991)

Explain why the location of the centroid relates only to the geometry of the region and not its mass.

Short Answer

Expert verified

$A B C$ A triangle with vertices $(1, 1), (2, 0)$ , and $(2, 3)$
and join them. The point of intersection of medians $A D, B E$ and $C F$ is $G$

Step by step solution

01

given informaiton

The objective of this problem is to explain the location of the centroid relates only to the geometry of the region and not it's mass.

Centroid of a plane figure is defined as the point of intersection of medians.

For an example, take a triangle $A B C$ with vertices $(1, 1), (2, 0)$ , and $(2, 3)$ and join them. The point of intersection of medians $A D, B E$ and $C F$ is $G$

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Describe the three-dimensional region expressed in each iterated integral in Exercises 35鈥�44.

${鈭�}_{0}^{2} {鈭�}_{0}^{3} {鈭�}_{4 x / 3}^{4} f (x, y, z) d z d x d y$

What is the difference between a triple integral and an iterated triple integral?

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Refer to your answer to Exercise 10 or to Definition 13.3.

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