Chapter 13: Q. 52 (page 1080)

The formulas for converting from spherical coordinates to rectangular coordinates are $x = p \sin ϕ \cos θ, y = p \sin ϕ \sin θ, z = p \cos ϕ$ . Prove that the Jacobianrole="math" $\frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ$ .

Short Answer

Expert verified

It is proven that $\frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ$ .

Step by step solution

Given information

The transformation equations are,

$x = p \sin ϕ \cos θ, y = p \sin ϕ \sin θ, z = p \cos ϕ$

Proof

The definition of Jacobian of a transformation using partial derivatives is given as

L . H . S = \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = |\begin{matrix} \frac{\partial x}{\partial p} & \frac{\partial y}{\partial p} & \frac{\partial z}{\partial p} \\ \frac{\partial x}{\partial θ} & \frac{\partial y}{\partial θ} & \frac{\partial z}{\partial θ} \\ \frac{\partial x}{\partial ϕ} & \frac{\partial y}{\partial ϕ} & \frac{\partial z}{\partial ϕ} \end{matrix}| \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = |\begin{matrix} \sin ϕ \cos θ & \sin ϕ \sin θ & \cos ϕ \\ - p \sin ϕ \sin θ & p \sin ϕ \cos θ & 0 \\ p \cos ϕ \cos θ & p \cos ϕ \sin θ & - p \sin ϕ \end{matrix}| \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin^{3} ϕ - p^{2} \sin ϕ \cos^{2} ϕ \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ (\sin^{2} ϕ + \cos^{2} ϕ) \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ (1) \frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ = R . H . S

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The formulas for converting from spherical coordinates to rectangular coordinates are $x = p \sin ϕ \cos θ, y = p \sin ϕ \sin θ, z = p \cos ϕ$ . Prove that the Jacobianrole="math" $\frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ$ .

Short Answer

Step by step solution

Given information

Proof

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The formulas for converting from spherical coordinates to rectangular coordinates are x=psinϕcosθ,y=psinϕsinθ,z=pcosϕ. Prove that the Jacobianrole="math" ∂(x,y,z)∂(p,θ,ϕ)=-p2sinϕ.

Short Answer

Step by step solution

Given information

Proof

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Most popular questions from this chapter

Recommended explanations on Math Textbooks

Discrete Mathematics

Theoretical and Mathematical Physics

Logic and Functions

Decision Maths

Applied Mathematics

Pure Maths

Study anywhere. Anytime. Across all devices.

The formulas for converting from spherical coordinates to rectangular coordinates are $x = p \sin ϕ \cos θ, y = p \sin ϕ \sin θ, z = p \cos ϕ$ . Prove that the Jacobianrole="math" $\frac{\partial (x, y, z)}{\partial (p, θ, ϕ)} = - p^{2} \sin ϕ$ .