Find the Surface Area cylinder (7)(10)

Math
h=7r=10
The surface area of a cylinder is equal to the sum of the areas of the bases each having an area of π⋅r2, plus the area of the side. The area of the side is equal to the area of a rectangle with length 2πr (the circumference of the base) times the height.
2π⋅(radius)2+2π⋅(radius)⋅(height)
Substitute the values of the radius r=10 and height h=7 into the formula. Pi π is approximately equal to 3.14.
2(π)(10)2+2(π)(10)(7)
Simplify each term.
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Raise 10 to the power of 2.
2π⋅100+2(π)(10)(7)
Multiply 100 by 2.
200π+2(π)(10)(7)
Multiply 10 by 2.
200π+20π⋅7
Multiply 7 by 20.
200π+140π
200π+140π
Add 200π and 140π.
340π
The result can be shown in multiple forms.
Exact Form:
340π
Decimal Form:
1068.14150222…
Find the Surface Area cylinder (7)(10)

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