Chapter 13: Q 54. (page 1039)

Let $S = \{(x, y) | x^{2} + y^{2} \leq 1, x \geq 0\}$
If the density at each point in S is proportional to the point’s distance from the y-axis, find the center of mass of S.

Short Answer

Expert verified

Answer is $(\frac{3 π}{16}, \frac{3}{8})$

Step by step solution

Step 1. Given information

$S = \{(x, y) | x^{2} + y^{2} \leq 1, x \geq 0\}$

Step 2. Explanation

$S = \{(x, y) | x^{2} + y^{2} \leq 1, x \geq 0\}$

$\begin{array}{rcl} \bar{x} & = & \frac{\int_{0}^{1} \int_{- \sqrt{1 - x^{2}}}^{\sqrt{1 - x^{2}}} x k x d y d x}{\int_{0}^{1} \int_{- \sqrt{1 - x^{2}}}^{\sqrt{1 - x^{2}}} k x d y d x} \\ = & \frac{2 \int_{0}^{1} \int_{0}^{\sqrt{1 - x^{2}}} k x^{2} d y d x}{2 \int_{0}^{1} \int_{0}^{\sqrt{1 - x^{2}}} k x d y d x} \end{array}$

Take $x = r \cos θ, y = r \sin θ$

width="336">x¯=∫0π/2∫01kr2cos2θrdrdθ∫0π/2∫01krcosθrdrdθ=∫0π/2∫01r3cos2θdrdθ∫0π/2∫01r2cosθdrdθ=∫0π/2r4401cos2θdθ∫0π/2r3301cosθdθ=∫0π/2r4401cos2θdθ∫0π/2r3301cosθdθ=14∫0π/2cos2θdθ13∫0π/2cosθdθusecos2θ=1+cos2θ2=14∫0π/212(1+cos2θ)dθ13∫0π/2cosθdθ=18θ+12sin2θ0π/213[sinθ]0π/2=π16-sin2π213sinπ2-sin(0)=π16-013(1-0)=3π16

$\begin{array}{rcl} \bar{y} & = & \frac{\iint_{Ω} y ρ (x, y) d A}{\iint_{Ω} ρ (x, y) d A} \\ = & \frac{\int_{0}^{1} \int_{- \sqrt{1 - x^{2}}}^{\sqrt{1 - x^{2}}} y k x d y d x}{\int_{0}^{1} \int_{- \sqrt{1 - x^{2}}}^{\sqrt{1 - x^{2}}} k x d y d x} \\ = & \frac{\int_{0}^{π / 2} \int_{0}^{1} r \sin θ k r \cos θ r d r d θ}{\int_{0}^{π / 2} \int_{0}^{1} k r \cos θ r d r d θ} \\ = & \frac{\int_{0}^{π / 2} \int_{0}^{1} r^{3} \sin θ \cos θ d r d θ}{\int_{0}^{π / 2} \int_{0}^{1} r^{2} \cos θ d r d θ} \\ = & \frac{\frac{1}{2} \int_{0}^{π / 2} {[\frac{r^{4}}{4}]}_{0}^{1} \sin 2 θ d θ}{\int_{0}^{π / 2} {[\frac{r^{3}}{3}]}_{0}^{1} \cos θ d θ} \\ = & \frac{\frac{1}{8} \int_{0}^{π / 2} \sin 2 θ d θ}{\frac{1}{3} \int_{0}^{π / 2} \cos θ d θ} \\ = & \frac{\frac{1}{8} {[- \frac{1}{2} \cos 2 θ]}_{0}^{π / 2}}{\frac{1}{3} [\sin θ]_{0}^{π / 2}} \\ = & \frac{\frac{1}{8} [- \frac{1}{2} \cos 2 (\frac{π}{2}) + \frac{1}{2} \cos (0)}{\frac{1}{3} [\sin (\frac{π}{2}) - \sin (0)]} \\ = & \frac{(\frac{1}{8})}{(\frac{1}{3})} \\ = & \frac{3}{8} \end{array}$

Therefore, the center of mass of the region is $(\bar{x}, \bar{y}) = (\frac{3 π}{16}, \frac{3}{8})$

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Let $S = \{(x, y) | x^{2} + y^{2} \leq 1, x \geq 0\}$
If the density at each point in S is proportional to the point’s distance from the y-axis, find the center of mass of S.

Short Answer

Step by step solution

Step 1. Given information

Step 2. Explanation

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Let S=x,y|x2+y2≤1,x≥0If the density at each point in S is proportional to the point’s distance from the y-axis, find the center of mass of S.

Short Answer

Step by step solution

Step 1. Given information

Step 2. Explanation

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Probability and Statistics

Geometry

Calculus

Theoretical and Mathematical Physics

Decision Maths

Statistics

Study anywhere. Anytime. Across all devices.

Let $S = \{(x, y) | x^{2} + y^{2} \leq 1, x \geq 0\}$
If the density at each point in S is proportional to the point’s distance from the y-axis, find the center of mass of S.