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AP Calculus AB/BC
Unit 8 – Applications of Integration
Topic 8.7
The base of a solid with square cross sections is bounded by y = \sqrt{x-1}, x = 3, y = 0. Which integral can be used to find the volume of this solid when cross-sections are taken perpendicular to the x-axis?
V = \int_0^3 \sqrt{x-1} -3 dx.
V = \int_0^3 (x-1) dx.
V = \int_1^3 (x-1) dx
V = \int_1^3 (x-1)^2 dx.
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AP Calculus AB/BC - 8.7 Volumes with Cross Sections: Squares and Rectangles
Key terms
Integral
Volume
Solid with Square Cross Sections
x = 3
y = 0
y = \sqrt{x-1}
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