Identify a generating curve on the xz-plane for the surface of revolution with the given equation. Follow the steps in the given example. Find a generating curve onthe xz-plane for the surfaceof revolution with equationx²+ y²+ z²= e2x The surface S: x² + y² – z² – 4z = 4 is a surface of revolution. Find the equationof a generating curve for S on the yz-plane and the axis in which this curve isrevolved to form S.The equation of S can be written as x2 + y? = z² ++ 4z + 4 , orx² + y? = (z+2)²Let f(z) = z +2. Then, a generating curve for S on the yz-plane isy = z + 2This curve is revolved about the z-axis

Given: Given the surface of revolution with the equation x2+y2+z2=e2x. To find: Generating curve on…

Answered: Find a generating the vz-lane for t

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Find a generating the vz-lane for t

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter11: Topics From Analytic Geometry

Section: Chapter Questions

Problem 18T

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A: Solution

Question

Identify a generating curve on the xz-plane for the surface of revolution with the given equation. Follow the steps in the given example.

Find a generating curve on
the xz-plane for the surface
of revolution with equation
x²+ y²+ z²= e2x

The surface S: x² + y² – z² – 4z = 4 is a surface of revolution. Find the equation
of a generating curve for S on the yz-plane and the axis in which this curve is
revolved to form S.
The equation of S can be written as x2 + y? = z² +
+ 4z + 4 , or
x² + y? = (z+2)²
Let f(z) = z +2. Then, a generating curve for S on the yz-plane is
y = z + 2
This curve is revolved about the z-axis

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