Question

How do you change (0,3,-3) from rectangular to spherical coordinates?

Answer 1

The answer is: `(3sqrt2,pi/2,3/4pi)`.

To change the coordinates from rectangular to spherical we have to use these formulae:

`rho=sqrt(x^2+y^2+z^2)`;
`phi=arctan(y/x)`;
`theta=arccos(z/sqrt(x^2+y^2+z^2))`.

So:

`rho=sqrt(0^2+3^2+3^2)=sqrt18=3sqrt2`;

`phi=arctan(3/0)=arctan(oo)=pi/2`;

`theta=arccos((-3)/sqrt(0^2+3^2+3^2))=arccos(-3/(3sqrt2))=arccos(-1/sqrt2*sqrt2/sqrt2)=arccos(-sqrt2/2)=3/4pi`.

So the point becomes: `(3sqrt2,pi/2,3/4pi)`.