Answer to Question #199501 in Differential Geometry | Topology for Mahnoor

Question #199501

A plane curve is given by γ(θ)=(rcosθ,rsinθ)

γ(θ)=(rcos⁡θ,rsin⁡θ), where r is a smooth function of θ

θ (so that (r,θ)

(r,θ) are the polar coordinates of γ(θ)

γ(θ)). Under what conditions is γ

γ regular? Find all functions r(θ)

r(θ) for which γ

γ is unit-speed. Show that, if γ

γ is unit-speed, the image of γ

γ is a circle; what is its radius?

Expert's answer

Curve is regular if "\\gamma' (\\theta)\\ne0" everywhere.

"\\gamma' (\\theta)=(-rsin\\theta,rcos\\theta)"

"||\\gamma' (\\theta)||=r"

So curve is regular if "r\\ne 0"

"s(\\theta)=\\int^{\\theta}_0rd\\alpha=r\\theta\\implies \\theta=s\/r"

Unit speed curve:

"\\gamma(s)=(rcos(s\/r),rsin(s\/r))"

Image of "\\gamma(s)" :

"||\\gamma(s)||=r"

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