# Mathematica: Show Complex Numbers in Polar Form

I want to display complex numbers in trig form. For example:

``````z = (-4)^(1/4);
``````

I'm not sure what the command for that is, and its silly to write:

I thought, that the command was `ExpToTrig`, but solution can't possibly be just `1+i` (Or can it, and I'm misusing it?). How do display complex number in trig form.

### Edit:

Command is `ExpToTrig`, it just does not give all the solutions (or i have failed to find out how). Finally solved my problem with writing a pure function `NrootZpolar[n][z]`:

``````NrootZpolar :=
Function[x,
Function[y,
( Abs[y] ^ (1/x) *
( Cos[((Arg[y] + 360° * Range[0, x - 1]) / x)] +
I*Sin[((Arg[y] + 360° * Range[0, x - 1]) / x)]))
]
]
``````

And use:

``````In[689]:= FullSimplify[NrootZpolar1[4][-4]]
Out[689]= {1 + I, -1 + I, -1 - I, 1 - I}
``````

To visualize:

``````ComplexListPlot[list_] := ListPlot[Transpose[{Re[list], Im[list]}], AxesLabel -> {Re, Im}, PlotLabel -> list, PlotMarkers -> Automatic]
Manipulate[ComplexListPlot[FullSimplify[NrootZpolar1[n][z]]], {z, -10, 10}, {n, 1, 20}]
``````

-
The reason your final bit of code does not give you the answer you expect is because the `/4` is in the wrong place. It should not be hitting the `Arg[x]` terms. Move the closing brackets `)` to characters to the right and it all works. –  Simon Oct 14 '10 at 1:41
The same mistake is made in the image you supply. btw to write out nice looking formulas you should not use a normal `Input` cell. Instead, right-click on the notebook and select `Insert New Cell > DisplayFormula` –  Simon Oct 14 '10 at 1:46

If you only need to do it occasionally, then you could just define a function like

``````In[1]:= ComplexToPolar[z_] /; z \[Element] Complexes := Abs[z] Exp[I Arg[z]]
``````

so that

``````In[2]:= z = (-4)^(1/4);
In[3]:= ComplexToPolar[z]
Out[3]= Sqrt[2] E^((I \[Pi])/4)

In[4]:= ComplexToPolar[z] == z // FullSimplify
Out[4]= True
``````

For expanding out functions (not that this was part of your question) you use

``````In[5]:= ComplexExpand[, TargetFunctions -> {Abs, Arg}]
``````

Finally, if you always want complex numbers written in polar form then something like

``````In[6]:= Unprotect[Complex];
In[7]:= Complex /: MakeBoxes[Complex[a_, b_], StandardForm] :=
With[{abs = Abs[Complex[a, b]], arg = Arg[Complex[a, b]]},
RowBox[{MakeBoxes[abs, StandardForm],
SuperscriptBox["\[ExponentialE]",
RowBox[{"\[ImaginaryI]", MakeBoxes[arg, StandardForm]}]]}]]
``````

will make the conversion automatic

``````In[8]:= 1 + I
Out[8]= Sqrt[2]*E^(I*(Pi/4))
``````

Note that this will only work on explicitly complex numbers -- ie those with the `FullForm` of `Complex[a,b]`. It will fail on the `z` defined above unless you use something like `Simpify` on it.

-
–  Simon Sep 6 '11 at 12:23

You can express a complex number z in polar form r(cos theta + i sin theta) where r = Abs[z] and theta = Arg[z]. So the only Mathematica commands you need are Abs[] and Arg[].

-

Mathematically speaking, (-1)^(1/4) is an abuse on notation. There is no such a number.

What you are expressing using that abomination ( :) ) are the roots of an equation:

``````z^4 == 1
``````

In Mathematica (as in math in general) is more convenient to use radians than degrees. Expressed in radians, you may define for example

`````` f[z1_,n_] := Abs[z] (Cos[Arg[z]] + I Sin[Arg[z]]) /.Solve[z^n+z1 == 0, z,Complex]
``````

or

``````g[z1_,n_] := Abs[z] (Exp [I Arg[z]]) /.Solve[z^n+z1 == 0, z,Complex]
``````

depending on your notation preference (trig or exponential ... but the last is preferred).

To get your desired expression for `(-4)^(1/5)` just type

``````g[4,5] or f[4,5]
``````
-
Yours is the only answer which addressed the probable underlying question that the OP had. i.e. the n different roots of w=z^n –  Simon Oct 14 '10 at 1:22
@Simon I guess the problem there is not with Mathematica itself, but with understanding the "radix" operator as a multivalued inverse of the exponentiation. I tried to address that ... –  belisarius Oct 14 '10 at 2:09