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Volumes Question (1 Viewer)

echelon4

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I can't seem to get the right answer for this question:

The base of a certain solid is the region bounded by the curve y=x^2 and the line y=x. Cross sections of this solid by planes perpendicular to the x-axis are squares. Find the volume of the solid.

I keep getting the answer as 2/5, but the correct answer seems to be 1/30. Can neone get the right answer? Can you post your working out?

Thanks in advanced
 

_ShiFTy_

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The sides of the square is y<sub>2</sub> - y<sub>1</sub>
*y<sub>2</sub> refers to the parabola
*y<sub>1</sub> refers to the line

ΔV = (y<sub>1</sub> - y<sub>2</sub>)(y<sub>1</sub> - y<sub>2</sub>)Δx
= (x - x<sup>2</sup>)(x - x<sup>2</sup>)dx

V = <sub>0</sub>∫<sup>1</sup> (x<sup>4</sup> - 2x<sup>3</sup> + x<sup>2</sup>)dx

etc..you will get 1/30
 
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_ShiFTy_

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Just sketch the parabola and the line. Draw a strip perpendicular to the x axis (parallel to y axis). The length of this strip is one of the sides of the square. You can see that its the y value of the line minus the y value of the parabola. The area of the square will then be (y<sub>1</sub> - y<sub>2</sub>)(y<sub>1</sub> - y<sub>2</sub>)
The thickness of the strip is Δx...so the volume will be (y<sub>1</sub> - y<sub>2</sub>)(y<sub>1</sub> - y<sub>2</sub>)Δx<sub></sub><sub></sub>

Just imagine thin rectangular prisms coming out of the page
 

jarrypan

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oh.damn... the diagram is too complicated for me...I can think about it!
 

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