Question

Find the polar form of the equation y=xtanα​

Answer 1

Answer:

(r,θ)=(r,α)

Step-by-step explanation:

General form of polar co-ordinates (r,θ)

where r= x 2+y 2

θ=tan −1( xy )

Now in the given question

y=xtan(α)

⇒xy=tan(α)

⇒tan −1 ( xy )=θ=α

⇒(r,θ)=(r,α)