Asked by Desperate Student
Let π
be the region bounded by the four straight lines π¦=π₯, π₯+π¦=4, π¦=π₯β2 and π₯+
π¦ = 2. Find the surface area of the surface obtained by rotating the region π about the π₯-axis for 1 complete revolution.
π¦ = 2. Find the surface area of the surface obtained by rotating the region π about the π₯-axis for 1 complete revolution.
Answers
Answered by
Steve
The region is just a square of side β2, with its center at (2,1).
Using the Theorem of Pappus, the surface area is thus the perimeter of the square times the distance traveled by its centroid:
a = 4β2 * 2Ο = 8Οβ2
Doing it using the usual definition,
area swept out by the line y=x for x in [1,2],
a = β«[1,2] 2Οyβ(1+(y')^2) dx
= β«[1,2] 2Οxβ2 dx
= 3Οβ2
the area swept out by the line y=2-x for x in [1,2] is
β«[1,2] 2Ο(2-x)β2 dx = Οβ2
That takes care of the left half of the area. By symmetry, the right half is the same, so the total area is as first calculated: 8Οβ2
Using the Theorem of Pappus, the surface area is thus the perimeter of the square times the distance traveled by its centroid:
a = 4β2 * 2Ο = 8Οβ2
Doing it using the usual definition,
area swept out by the line y=x for x in [1,2],
a = β«[1,2] 2Οyβ(1+(y')^2) dx
= β«[1,2] 2Οxβ2 dx
= 3Οβ2
the area swept out by the line y=2-x for x in [1,2] is
β«[1,2] 2Ο(2-x)β2 dx = Οβ2
That takes care of the left half of the area. By symmetry, the right half is the same, so the total area is as first calculated: 8Οβ2
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