Transforming Derivative Operator in Spherical Coordinates with Substitution

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SUMMARY

The discussion focuses on transforming the derivative operator in spherical coordinates using the substitution \(\mu = \cos \theta\). The original operator, defined as \(\frac{\partial^2}{\partial \theta^2}+\cot \theta \frac{\partial}{\partial \theta}\), is successfully transformed into \((1-\mu^2)\frac{d^2}{d \mu^2}-2 \mu \frac{d}{d \mu}\). The transformation process involves applying the chain rule, specifically \(\frac{\partial}{\partial \theta} = \frac{\partial \mu}{\partial \theta} \frac{\partial }{\partial \mu}\), to derive the new expression.

PREREQUISITES
  • Understanding of spherical coordinates and their mathematical representation.
  • Familiarity with differential operators and their transformations.
  • Knowledge of the chain rule in calculus.
  • Basic understanding of substitution methods in mathematical analysis.
NEXT STEPS
  • Study the derivation of differential operators in spherical coordinates.
  • Learn about the implications of variable substitution in calculus.
  • Explore advanced topics in partial differential equations (PDEs).
  • Investigate applications of spherical coordinates in physics and engineering.
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Mathematicians, physicists, and engineering students who are working with spherical coordinates and differential operators will benefit from this discussion.

elquin
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In spherical coordinates, the operator is defined as

[tex]\frac{\partial^2}{\partial \theta^2}+\cot \theta \frac{\partial}{\partial \theta}[/tex]

Then, substitute

[tex]\mu = \cos \theta[/tex]

and the above is changed to

[tex](1-\mu^2)\frac{d^2}{d \mu^2}-2 \mu \frac{d}{d \mu}[/tex]

I don't know how the last expression is obtained.
Please, help me...
 
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as mu is only a function of theta, could you start with
[tex] \frac{\partial}{\partial \theta} = \frac{\partial \mu}{\partial \theta} \frac{\partial }{\partial \mu}[/tex]
 

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