Question 60 57-60 Set up an integral that represents the area of the surfaceobtained by rotating the given curve about the x-axis. Then useyourcalculator to find the surface area correct to four decimalplaces.57. x= t sin t, y=t cos t, 0

Name: Question 60 57-60 Set up an integral that represents the area of the s
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Description: Question 60 57-60 Set up an integral that represents the area of the surfaceobtained by rotating the given curve about the x-axis. Then useyourcalculator to find the surface area correct to four decimalplaces.57. x= t sin t, y=t cos t, 0

Given the curve x=1+tet, y=t2+1et, 0≤t≤1 Find the surface area obtained by revolving the curve…

Answered: 57-60 Set up an integral that…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question 60

57-60 Set up an integral that represents the area of the surface
obtained by rotating the given curve about the x-axis. Then use
your
calculator to find the surface area correct to four decimal
places.
57. x= t sin t, y=t cos t, 0<t<T/2
||
58. x = sin t, y= sin 2t, 0 <t< T/2
||
59. x t + e',
y = e, 0<t<1
%3D
60. * = 1 + te', y=(t² + 1)e', 0<t<1
1+ te', y= (t² + 1)e',
0<t < 1
%3D

Expert Solution

Step 1

Given the curve

$x = 1 + t e^{t}, y = (t^{2} + 1) e^{t}, 0 \leq t \leq 1$

Find the surface area obtained by revolving the curve about x-axis.

Step 2

The surface area is given by the following integral:

$A = 2 π \int_{a}^{b} y (t) \sqrt{{[x' (t)]}^{2} + {[y' (t)]}^{2}} d t$

where the curve defined by x=x(t), y=y(t), with $a \leq t \leq b$ .

Find the derivatives x'(t) and y'(t).

$x' (t) = t e^{t} + e^{t} = (t + 1) e^{t} y' (t) = (t^{2} + 1) e^{t} + (2 t) e^{t} = {(t + 1)}^{2} e^{t}$

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