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Denisse Valdez

Denisse Valdez

Answered question

2022-05-27

System of equations:
x ˙ = x y x ( x 2 + y 2 ) + x y x 2 + y 2 y ˙ = x + y y ( x 2 + y 2 ) x 2 x 2 + y 2
How can I get this in polar coordinates? I know that r 2 = x 2 + y 2 , but how can I find r ˙ or θ ˙ ?

Answer & Explanation

szilincsifs

szilincsifs

Beginner2022-05-28Added 15 answers

Setting
x = r cos θ ,   y = r sin θ ,
we have
r ˙ cos θ r θ ˙ sin θ = x ˙ = r ( cos θ sin θ ) r 3 cos θ + r cos θ sin θ , r ˙ sin θ + r θ ˙ cos θ = y ˙ = r ( cos θ + sin θ ) r 3 sin θ r cos 2 θ .
It follows that
r ˙ = r r 3 , θ ˙ = 1 cos θ .
sag2y8s

sag2y8s

Beginner2022-05-29Added 10 answers

When we use polar co-ordinates, we let x = r cos θ and y = r sin θ. We can differentiate each of these equations to find x ˙ and y ˙ (and this will help you solve your question). If you want to find r ˙ or θ ˙ , just differentiate the equations tan θ = y / x and r 2 = x 2 + y 2 implicitly.
For example,
x ˙ = d d t ( r cos θ ) = d r d t cos θ r sin θ d θ d t = r ˙ cos θ r θ ˙ sin θ

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