Volume of solid x=1+y^2 using shell method

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SUMMARY

The discussion focuses on calculating the volume of a solid rotated about the x-axis defined by the equation x=1+y^2, bounded by y=0 and y=2, using the shell method. The initial integral setup was ∫2π(y)(1+y^2)dy from 1 to 2, which was later corrected to the appropriate bounds. The correct volume, evaluated using both the shell and disc methods, is confirmed to be 21π/2, while the incorrect evaluations led to discrepancies in results, highlighting the importance of accurate computation in integral calculus.

PREREQUISITES
  • Understanding of integral calculus, specifically volume calculations using the shell method.
  • Familiarity with the disc method for volume calculations.
  • Knowledge of the equations of curves and their graphical representations.
  • Proficiency in using computational tools like Wolfram Alpha for verification of results.
NEXT STEPS
  • Review the shell method for calculating volumes of solids of revolution.
  • Practice evaluating integrals with varying bounds to ensure accuracy.
  • Learn how to derive and apply the disc method for volume calculations.
  • Explore common pitfalls in integral calculus to avoid computational errors.
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Students studying calculus, particularly those focused on volume calculations, educators teaching integral methods, and anyone seeking to improve their computational accuracy in mathematics.

Painguy
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Homework Statement



Volume of solid rotated about x-axis x=1+y^2, y=1, y=0, x=0 using shell method

Homework Equations





The Attempt at a Solution



c5ZPhnN.png


so i set up the integral with

∫2pi(y)(1+y^2)dy from 1 to 2

which is apparently wrong, but i don't know why.
 
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You wrote y=0 as a bound, but I guess you meant y=2.
The formula looks right. What did you get? Do you know what the 'right' answer is?
 
Oh right. My bad I did mean y=2. Well here is my professors solution. If evaluate his answer I get 14. If I evaluate mine I get around 32.

Here is his solution. He seems to be using the washer method.

6tyys6j.png
 
Painguy said:

Homework Statement



Volume of solid rotated about x-axis x=1+y^2, y=1, y=0, x=0 using shell method

Homework Equations


The Attempt at a Solution



c5ZPhnN.png


so i set up the integral with

∫2pi(y)(1+y^2)dy from 1 to 2

which is apparently wrong, but i don't know why.

Your work via the shell method is correct. The result computes to the same value using the disc method that your professor used and the shell method you used.. But it's easier to do it using shells because you only have to deal with 1 integral. Go back and check your computation. You should be getting the same result via both methods. Neither of the final results you got seem to be correct despite the fact that the integrals are correct.
 
Last edited:
I tried again. This time my professor's answer came out to be around 80.11. My answer however remained at 32, and wolfram alpha and my calculator give the same answer. here is my work.

ZI41O49.jpg
 
80 is obviously too much. The whole solid fits inside a rectangular block 4x4x5. I agree with approx 32 (21 pi/2).
 
haruspex said:
80 is obviously too much. The whole solid fits inside a rectangular block 4x4x5. I agree with approx 32 (21 pi/2).
Did I evaluate my professors integral incorrectly?
 
Painguy said:
Did I evaluate my professors integral incorrectly?
Your Prof wrote √(1-x), but it should have been √(x-1).
 
I get the result

\frac{21 \pi}{2}

via both shell (cylinder) and disc methods)

As I said, the integral you wrote down is correct but somewhere you must have messed up your computation.
 

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