Question

How do you convert `(x-3)^2+(y+1)^2=10` to polar form?

Answer 1

`r=6` cos `\theta - 2` sin `\theta`

Explanation:

First use the binomial theorem to express the squared terms as polynomials. Recall that `(a+b)^2=a^2+2ab+b^2`. So

`(x-3)^2=x^2-6x+9`
`(y+1)^2=y^2+2y+1`

Now write the left side ss the sum of these polynomials. You should put `x^2+y^2` together because we know that in polar form that is `r^2`.

`(x^2+y^2)-6x+2y+10=10`

Now put in the coordinate conversions

`x=r` cos `\theta`
`y=r` sin `\theta`
`x^2+y^2=r^2`

Then

`r^2-6r` cos `\theta+2r` sin `\theta=0`

This can be factored so we have two possibilities:

`r=0`

`r-6` cos `\theta+2` sin `\theta=0`

The first equation is just the origin and the second equation already has a point at the origin. So we just use the second equation.