# Maple: How to convert Cylindrical coordinates to Cartesian coordinates?

We get some expression in Cylindrical coordinates (r, ϕ, z ) like : `expr := r*z^2*sin((1/3)*`ϕ`)` we need to convert it into Cartesian coordinates and than back to Cylindrical coordinates. How to do such thing?

So I found something like this : `eval(expr, {r = sqrt(x^2+y^2), z = z,`ϕ`= arctan(y, x)})` but it seems incorrect, how to correct it and how make eval to convert backwords from Cartesian to Cylindrical?

`&varphi;` == ϕ

So I try:

``````R := 1;

H := h;

sigma[0] := sig0;

sigma := sigma[0]*z^2*sin((1/3)*`&varphi;`);

toCar := eval(sigma, {r = sqrt(x^2+y^2), z = z, `&varphi;` = arctan(y, x)});

toCyl := collect(eval(toCar, {x = r*cos(`&varphi;`), y = r*sin(`&varphi;`), z = z}), `&varphi;`)
``````

It looks close to true but look:

why `arctan(r*sin(`ϕ`), r*cos(`ϕ`))` is not shown as ϕ?

Actually it is only begining of fun time for me because I also need to calculate

``````Q := int(int(int(toCar, x = 0 .. r), y = 0 .. 2*Pi), z = 0 .. H)
``````

and to get it back into Cylindrical coordinates...

-

``````simplify(toCyl) assuming r>=0, `&varphi;`<=Pi, `&varphi;`>-Pi;
``````

Notice,

``````arctan(sin(Pi/4),cos(Pi/4));
1
- Pi
4

arctan(sin(Pi/4 + 10*Pi),cos(Pi/4 + 10*Pi));
1
- Pi
4

arctan(sin(-7*Pi/4),cos(-7*Pi/4));
1
- Pi
4

arctan(sin(-15*Pi/4),cos(-15*Pi/4));
1
- Pi
4

arctan(sin(-Pi),cos(-Pi));
Pi

K:=arctan(r*sin(Pi/4),r*cos(Pi/4));
arctan(r, r)

simplify(K) assuming r<0;
3
- - Pi
4

simplify(K) assuming r>0;
1
- Pi
4
``````

Once you've converted from cylindrical to rectangular, any information about how many times the original angle" might have wrapped around (past -Pi) is lost.

So you won't recover the original `&varphi;` unless it was in (-Pi,Pi]. If you tell Maple that is the case (along with r>-0 so that it knows which half-plane), using assumptions, then it can simplify to what you're expecting.

-
so... top line still gives me `arctan(sin(`&varphi;`), cos(`&varphi;`))` please see post update. –  Rella May 18 '11 at 17:21
It works for me, provided that the mentioned assumption is supplied. –  acer Jun 3 '11 at 13:41