Green boxes are all correct answers, I don't know what is the correct answer for (b) f The region W is the cone shown below.The angle at the vertex is π/3, and the top is flat and at a height of 4√/3.Write the limits of integration for Sw dV in the following coordinates (do not reduce the domain of integration by taking advantage of symmetry):(a) Cartesian: The angle at the vertex is π/3, and the top is flat and at a height of 4√/3.Write the limits of integration for Sw dV in the following coordinates (do not reduce the domain of integration by taking advantage of symmetry):(a) Cartesian:With a = -4c = -sqrt(16-x^2)e =sqrt(3(x^2+y^2))Volume = = Så Så Sé 1(b) Cylindrical:With a = 0c = 0e = 0Volume = S S Serb=(c) Spherical:With a = 0C = 0e = 0Volume = SSS rho^2sin(phi)4dsqrt(16-x^2)and f = 4sqrt(3)dzb = 2*pid = 4sqrt(3)and f = -4sqrt3b= 2pidrd pi/6and f= (4 *sqrt3)/cos(phi)d rhodydzd phid xd thetad theta

Given- The region W is the cone shown below. The angle at the vertex is , and the top is flat and at…

Answered: The region W is the cone shown below.…

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The region W is the cone shown below. The angle at the vertex is π/3, and the top is flat and at a height of 4√3.

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter8: Further Techniques And Applications Of Integration

Section8.2: Integration By Parts

Problem 23E

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Question

Green boxes are all correct answers, I don't know what is the correct answer for (b) f

The region W is the cone shown below.
The angle at the vertex is π/3, and the top is flat and at a height of 4√/3.
Write the limits of integration for Sw dV in the following coordinates (do not reduce the domain of integration by taking advantage of symmetry):
(a) Cartesian:

The angle at the vertex is π/3, and the top is flat and at a height of 4√/3.
Write the limits of integration for Sw dV in the following coordinates (do not reduce the domain of integration by taking advantage of symmetry):
(a) Cartesian:
With a = -4
c = -sqrt(16-x^2)
e =
sqrt(3(x^2+y^2))
Volume = = Så Så Sé 1
(b) Cylindrical:
With a = 0
c = 0
e = 0
Volume = S S Ser
b
=
(c) Spherical:
With a = 0
C = 0
e = 0
Volume = SSS rho^2sin(phi)
4
d
sqrt(16-x^2)
and f = 4sqrt(3)
dz
b = 2*pi
d = 4sqrt(3)
and f = -4sqrt3
b= 2pi
dr
d pi/6
and f= (4 *sqrt3)/cos(phi)
d rho
dy
dz
d phi
d x
d theta
d theta

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