/*! This file is auto-generated */ .wp-block-button__link{color:#fff;background-color:#32373c;border-radius:9999px;box-shadow:none;text-decoration:none;padding:calc(.667em + 2px) calc(1.333em + 2px);font-size:1.125em}.wp-block-file__button{background:#32373c;color:#fff;text-decoration:none} Problem 34 The centroid of a surface \(\sig... [FREE SOLUTION] | 91Ó°ÊÓ

91Ó°ÊÓ

Log out

Learning Materials

Features

Discover

Chapter 15: Problem 34

The centroid of a surface \(\sigma\) is defined by $$ \quad \bar{x}=\frac{\iint_{\sigma} x d S}{\operatorname{arcaof} \sigma}, \quad \bar{y}=\frac{\iint_{\sigma} y d S}{\operatorname{arcaof} \sigma}, \quad \bar{z}=\frac{\iint_{\sigma} z d S}{\operatorname{arcaof} \sigma} $$ Find the centroid of the surface. The portion of the sphere \(x^{2}+y^{2}+z^{2}=4\) above the plane \(z=1\)

Short Answer

Expert verified
The centroid of the surface is at (0, 0, 0.75).

Step by step solution

01

Identify the surface

We are given a sphere with equation \(x^2 + y^2 + z^2 = 4\) and need to find the portion of this sphere above the plane \(z = 1\). This corresponds to a spherical cap.
02

Express the area element

In spherical coordinates, the surface element on a sphere is \(dS = R^2 \sin\theta \, d\theta \, d\phi\), where \(R = 2\) is the radius of the sphere, \(0 \leq \phi < 2\pi\), and \(\theta\) varies from \(0\) to the angle at which \(z = 1\).
03

Find angle limit \(\theta\) for \(z = 1\)

The equation \(z = R \cos\theta = 1\) gives \(\cos\theta = \frac{1}{2}\). Therefore, \(\theta = \frac{\pi}{3}\) is the upper limit for the cap's portion.
04

Calculate the area of the surface \(\sigma\)

Integrate the expression \(R^2 \sin\theta\) over the specified limits: \[\operatorname{area}(\sigma) = \int_{0}^{2\pi}\int_{0}^{\pi/3} 4 \sin\theta \, d\theta \, d\phi = 4 \left(2\pi\right) \left(1 - \cos\left(\frac{\pi}{3}\right)\right) = 4 \left(2\pi\right) \left(1 - \frac{1}{2}\right) = 4\pi\].
05

Calculate \(\bar{x}\) and \(\bar{y}\)

Since the surface is symmetric about the z-axis, the integrals for \(\bar{x}\) and \(\bar{y}\) over the spherical cap will be zero. Thus, \(\bar{x} = 0\) and \(\bar{y} = 0\).
06

Calculate \(\bar{z}\)

Calculate \(\bar{z}\) using the formula:\[\bar{z} = \frac{\iint_{\sigma} z \, dS}{\operatorname{area}(\sigma)} = \frac{\int_{0}^{2\pi}\int_{0}^{\pi/3} 2 \cos\theta \cdot 4 \sin\theta \, d\theta \, d\phi}{4\pi}\].The innermost integral is:\[8 \int_{0}^{\pi/3} \cos\theta \sin\theta \, d\theta = 8 \left[\frac{1}{2} \sin^2\theta\right]_{0}^{\pi/3} = 8 \cdot \frac{1}{2} \left(\left(\frac{\sqrt{3}}{2}\right)^2 - 0\right) = 2 \cdot 3 = 3\].Therefore, \(\bar{z} = \frac{3 \cdot 2 \pi}{4\pi} = \frac{3}{4}\).

Unlock Step-by-Step Solutions & Ace Your Exams!

  • Full Textbook Solutions

    Get detailed explanations and key concepts

  • Unlimited Al creation

    Al flashcards, explanations, exams and more...

  • Ads-free access

    To over 500 millions flashcards

  • Money-back guarantee

    We refund you if you fail your exam.

Over 30 million students worldwide already upgrade their learning with 91Ó°ÊÓ!

Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Spherical Coordinates
Spherical coordinates offer a powerful way to express points in three-dimensional space. Unlike Cartesian coordinates, which use \(x, y, z\) positions, spherical coordinates describe a point using:
  • Radius \(R\): Distance from the origin to the point
  • Polar angle \(\theta\): Angle measured from the positive z-axis
  • Azimuthal angle \(\phi\): Angle measured in the xy-plane from the positive x-axis
For the sphere considered in the exercise, \(R = 2\), which is the sphere's radius. The limits for \(\phi\) and \(\theta\) let us cover the spherical cap, the region above the plane \(z = 1\). This unique way of representing areas makes calculations, such as those for surface integrals, more manageable in problems involving spheres.
Surface Integral
A surface integral extends the concept of an integral, summing values over a surface in space. In spherical coordinates, the surface element \(dS\) is expressed as \(R^2 \sin\theta \, d\theta \, d\phi\). This accounts for variations in both the polar and azimuthal angles.
  • The integration over \(\phi\) typically ranges from \(0\) to \(2\pi\) to handle full rotations around the z-axis.
  • For \(\theta\), limits depend on the problem setup, often defined by intersections with other shapes, like a plane.
In our example, calculating the surface integral over the spherical cap requires integrating \(z \, dS\), where the integrand \(z = 2\cos\theta\) because of the spherical constraint. This process allows us to find relevant geometric properties, such as the centroid of the surface.
Spherical Cap
A spherical cap is a portion of a sphere cut by a plane. In the problem, the spherical cap consists of the part of the sphere \(x^2 + y^2 + z^2 = 4\) above the plane \(z = 1\).
  • The defining characteristic is the angle \(\theta\), calculated from \(\cos\theta = \frac{1}{2}\), giving \(\theta = \frac{\pi}{3}\).
  • The radius of the base of the cap isn't vital for the centroid calculation but knowing its range enables precise integration.
Finding the area of the spherical cap requires integrating the surface element \(dS\) over \(\phi\) from \(0\) to \(2\pi\) and \(\theta\) from \(0\) to \(\frac{\pi}{3}\). This reveals the area essential for centroid calculations.
Symmetry
Symmetry plays a crucial role in simplifying calculations. For our spherical cap, symmetry can reduce computational effort related to centroids.
  • In this problem, symmetry about the z-axis ensures that the x and y components of the centroid equal zero: \(\bar{x} = 0\) and \(\bar{y} = 0\).
  • Only \(\bar{z}\) requires calculation since symmetrical properties indicate the centroid will lie along the z-axis.
Natural symmetries like these mean that instead of separately calculating \(\bar{x}\), \(\bar{y}\), and \(\bar{z}\), we can focus on just one component, hence simplifying the process and saving time. This emphasizes the power of symmetry in mathematical problem-solving.

One App. One Place for Learning.

All the tools & learning materials you need for study success - in one app.

Get started for free

Most popular questions from this chapter

Determine whether the statement is true or false. Explain your answer. $$ \begin{array}{l}{\text { Stokes' Theorem equates a line integral and a surface inte- }} \\ {\text { gral. }}\end{array} $$

Confirm that the force field \(\mathbf{F}\) is conservative in some open connected region containing the points \(P\) and \(Q,\) and then find the work done by the force field on a particle moving along an arbitrary smooth curve in the region from \(P\) to \(Q .\) $$ \mathbf{F}(x, y)=2 x y^{3} \mathbf{i}+3 x^{2} y^{2} \mathbf{j} ; P(-3,0), Q(4,1) $$

Evaluate the surface integral $$ \iint_{\sigma} f(x, y, z) d S $$ \(f(x, y, z)=x+y+z ; \sigma\) is the surface of the cube defined by the inequalities \(0 \leq x \leq 1,0 \leq y \leq 1,0 \leq z \leq 1\) [Hint: Integrate over each face separately.]

Find the flux of the vector field \(\mathbf{F}\) across \(\sigma\) \(\mathbf{F}(x, y, z)=(x+y) \mathbf{i}+(y+z) \mathbf{j}+(z+x) \mathbf{k} ; \sigma\) is the portion of the plane \(x+y+z=1\) in the first octant, oriented by unit normals with positive components.

Determine whether the statement is true or false. Explain your answer. The flux of a vector field is another vector field.
See all solutions

Recommended explanations on Math Textbooks

Theoretical and Mathematical Physics

Read Explanation

Discrete Mathematics

Read Explanation

Pure Maths

Read Explanation

Logic and Functions

Read Explanation

Applied Mathematics

Read Explanation

Mechanics Maths

Read Explanation
View all explanations

What do you think about this solution?

We value your feedback to improve our textbook solutions.

Study anywhere. Anytime. Across all devices.