NOTE: PLEASE ANSWER THE LAST THREE SUBPARTS. Activity:ed2.3. C4. Compute the area of the surface formed when f(r) 2+ cosh(z) between 0 and 1 is rotatedaround the x-axis.5. Consider the surface obtained by rotating the graph of f(z) 1/2, z 21, around the z-axis.This surface is called Gabriel's horn or Toricelli's trumpet. In exercise 13 in section 9.7we saw that Gabriel's horn has finite volume. Show that Gabricl's hern has infinite surfacearea,6. Consider the circle (r-2) + y 1. Sket ch the surface obtained by rotat ing this circieabout the g-axis. (The surface is called a torus.) What is the surface area? >

We’ll answer the first question since the exact one wasn’t specified. Please submit a new question…

Answered: AIS. 4. Compute the area of the surface…

AIS. 4. Compute the area of the surface formed when f(r) = 2 + cosh(r) between 0 and i is rotated around the z-axis. > ph of fír) 1/z, z>1, around the z-axis.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.6: The Inverse Trigonometric Functions

Problem 91E

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Question

NOTE: PLEASE ANSWER THE LAST THREE SUBPARTS.

Activity:
ed
2.
3. C
4. Compute the area of the surface formed when f(r) 2+ cosh(z) between 0 and 1 is rotated
around the x-axis.
5. Consider the surface obtained by rotating the graph of f(z) 1/2, z 21, around the z-axis.
This surface is called Gabriel's horn or Toricelli's trumpet. In exercise 13 in section 9.7
we saw that Gabriel's horn has finite volume. Show that Gabricl's hern has infinite surface
area,
6. Consider the circle (r-2) + y 1. Sket ch the surface obtained by rotat ing this circie
about the g-axis. (The surface is called a torus.) What is the surface area? >

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