Software to graph a volume (solid) of revolution?

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SUMMARY

The discussion centers on the challenges of graphing volumes of revolution, specifically using Gnuplot. The user attempted to graph the volume defined by the equation z = π∫₀¹(x²)² dx, but realized that this expression evaluates to a constant, leading to confusion. A suggestion was made to graph the paraboloid z = x² + y² bounded by z = 0 and z = 1 instead. Ultimately, the user decided to forgo graphical representations of volumes of revolution in their paper.

PREREQUISITES
  • Understanding of volumes of revolution in calculus
  • Familiarity with Gnuplot version 5.4 or later
  • Knowledge of graphing 3D surfaces and equations
  • Basic integration techniques in calculus
NEXT STEPS
  • Learn how to graph 3D surfaces using Gnuplot
  • Explore the mathematical principles behind volumes of revolution
  • Investigate alternative graphing software for 3D visualizations, such as MATLAB or GeoGebra
  • Study the properties of paraboloids and their applications in calculus
USEFUL FOR

Students and researchers in mathematics, particularly those focusing on calculus and graphical representations of mathematical concepts, will benefit from this discussion.

zdenton
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Homework Statement


I am writing a paper on volumes of revolution. Unfortunately I haven't been able to find any suitable programs to represent them graphically. (I apologize if I am posting in the wrong forum.)


Homework Equations


Graphing the volume of revolution of, say, \pi\int_{0}^{1}\left(x^{2}\right)^{2}\, dx


The Attempt at a Solution


I tried using Gnuplot, but wasn't able to graph a volume of revolution.
 
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You didn't say what you entered in Gnuplot as the equation to be graphed. For your problem, you want to graph the portion of the paraboloid z = x2 + y2 that is bounded by the planes z = 0 and z = 1.
 
Thanks for the response. I had tried to literally graph z=\pi\int_{0}^{1}\left(x^{2}\right)^{2}\, dx ... but I hadn't realized that that is a constant. (doh!)

Anyway, after seeing the output from Gnuplot, I think I'll just eschew the use of graphs of volumes of revolution in my paper.
 
Last edited:

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