Question

What is the distance between the following polar coordinates?: `(4,(-7pi)/12), (2,(pi)/8)`

Answer 1

`D~~5.4535`

Explanation:

The distance formula for polar coordinates can be derived from the distance formula for rectangular coordinates

`D=sqrt((x_2-x_1)^2+(y_2-y_1)^2)`

Instead of using `x` and `y` values, though, we would just plug in their polar equivalents

`x=rcos(theta)`

`y=rsin(theta)`

Plugging those and using a couple of trigonometric identities, you get the following in purely polar coordinates

`D=sqrt(r_1^2+r_2^2-2r_1r_2cos(theta_1-theta_2))`

Plugging in the polar coordinates you have been given, we get

`D=sqrt((4)^2+(2)^2-2(4)(2)cos(-(7pi)/12-pi/8))`

`D=sqrt(16+4-16cos(-(17pi)/24))`

`D~~sqrt(20-16(-0.60876))`

`D~~5.4535`