Question

How do you find the rectangular equation for `r=-6sintheta`?

Answer 1

Please see the explanation for steps leading to the equation of a circle:

`(x - 0)^2 + (y - -3)^2 = 3^2`

Explanation:

Multiply both sides of the equation by r:

`r^2 = -6rsin(theta)`

Substitute `x^2 + y^2` for `r^2` and y for `rsin(theta)`:

`x^2 + y^2 = - 6y`

Add `6y + k^2` to both sides:

`x^2 + y^2 + 6y + k^2 = k^2`

Use the right side of the pattern `(y - k)^2 = y^2 - 2ky + k^2`, to complete the square for the y terms:

`y^2 - 2ky + k^2 = y^2 + 6y + k^2`

`-2ky = 6y`

`k = -3` and `k^2 = 9 = 3^2`

Replace the y terms with the left side of the pattern but with `k = -3`:

`x^2 + (y - -3)^2 = k^2`

To put this into the standard form for a circle, substute `3^2` for `k^2` (not 9) )and insert a `-0` in the x term:

`(x - 0)^2 + (y - -3)^2 = 3^2`

This is a circle with its center at `(0, -3)` and a radius of 3.