Question

How do you find the rectangular form of `(4, -pi/2)`?

Answer 1

`(0, -4)`

Explanation:

Polar coordinates are represented as:

`(r, theta)`

Since we're given:

`(4, -pi/2)`

`4` is `r` and `-pi/2` is `theta`

Use the formula:

`(rcostheta, rsintheta)`

The rest is plugging and solving:

`rcostheta`
`4cos(-pi/2)`
`4(0)` `color(blue)(" The "cos " value of "-pi/2" is 0")`
`0`
`x=0`

`rsintheta`
`4sin(-pi/2)`
`4(-1)` `color(blue)(" The "sin " value of "-pi/2" is -1")`
`-4`
`y=-4`

`color(red)((0, -4)`