Sketch the region bounded by the curves y=e* , y=0, x=-1 and x=1. ... Rotate this region about the line y=-1 to construct a solid of revolution. Set up an integral to determine the volume of this solid of revolution: |(z[Outter radius] - «[Inner radius]´ )dx {use technology to evaluate the integral}
Sketch the region bounded by the curves y=e* , y=0, x=-1 and x=1. ... Rotate this region about the line y=-1 to construct a solid of revolution. Set up an integral to determine the volume of this solid of revolution: |(z[Outter radius] - «[Inner radius]´ )dx {use technology to evaluate the integral}
Sketch the region bounded by the curves y=e* , y=0, x=-1 and x=1. ... Rotate this region about the line y=-1 to construct a solid of revolution. Set up an integral to determine the volume of this solid of revolution: |(z[Outter radius] - «[Inner radius]´ )dx {use technology to evaluate the integral}
Set up an integral to determine the volume of this solid of revolution. Use equations given in questions 1 and 2.
Transcribed Image Text:Sketch the region bounded by the curves ...
y=e*, y=0, x=-1 and x=1.
Rotate this region about the line y=-1 to construct a solid of revolution.
Set up an integral to determine the volume of this solid of revolution:
S(z[Outer radius] – 7[Inner radius] )dx
{use technology to evaluate the integral}
Set up an integral to determine the surface area for this solid of revolution:
|27(radius), 1+
dx
{use technology to evaluate the integral}
dx
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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