Area & Volume Review

Area by Integration

Disk Method

Washer Method

Volume by Cross-Sections

100

Find the area under the function y=x³ from x=1 to x=2.

¹⁵/₄

100

Write an integral to represent the volume generated when the area in the first quadrant bounded by y=x² and the line x=4 is rotated about the x-axis.

π∫₀⁴ [x²]²dx

100

Write an integral to represent the volume of the solid generated when the area between y=x and y=x² is rotated about the x=axis.

π∫₀¹ [(x)²-(x2)²]dx

100

The region R in the first quadrant between y=∛x and x=2 is the base of a solid. For this solid, the cross sections perpendicular to the x-axis are rectangles whose height is six times the length of the base. Write an integral to represent the volume of the solid.

6∫₀²(∛x)²dx

200

Find the area of the region bounded by y=x and y=x²

¹/₆

200

What is the volume of the solid generated when the area in the first quadrant bounded by y=x and the line x=3 is rotated about the x-axis?

9π

200

Write an integral to represent the volume of the solid generated when the area between y=√(x) and y=x² is rotated about the line y=-2.

π∫₀¹[(√(x)-(-2))²-(x²-(-2))²]dx or ∫01[(√(x)+2)²-(x²+2)²]dx

200

The region R between y=4 and y=x² is the base of a solid. For this solid, the cross sections perpendicular to the x-axis are squares. Write an integral to represent the volume of the solid.

∫_-2²(4 - x²)²dx

300

Find the area of the region bounded by y=√x and y=^x/₄

³²/₃

300

Write an integral to represent the volume generated when the area in the first quadrant bounded by y=x² and the line y=4 is rotated about the y-axis.

π∫₀⁴ [√y]²dy

300

Write an integral to represent the volume of the solid generated when the area between y=√(x) and y=x² is rotated about the line y=5.

π∫₀¹[(5 - x²)²- (5 - √(x))²]dx

300

The region R between y=2x and y=x² is the base of a solid. For this solid, the cross sections perpendicular to the y-axis are semicircles. Write an integral to represent the volume of the solid.

^π/₈∫₀⁴(√y - ^y/₂)²dy

400

Find the area bounded by the functions y=x²-3 and y=2x.

³²/₃

400

Determine the volume of the solid generated when the area bounded by y=√x and y=2 is rotated about the y-axis.

^32π/₅

400

Write an integral to represent the volume of the solid generated when the area between y=√x and y=x/3 is rotated about the y-axis.

π∫₀³ [(3y)²-(y²)²]dy

400

The region R between y=x² and y=x is the base of a solid. For this solid, the cross sections perpendicular to the x-axis are squares. Find the volume of the solid.

∫₀¹(x - x²)²dx

∫₀¹(x² - 2x³ + x⁴)dx

Volume:¹/₃₀