# Mathematica doesn't know Cos[2] or even Sin[12 Degree]!

I tried with some common angles like pi/2, pi/3 or pi/6 but and it works but when you use uncommon angles like 2 rad or 12 degree mathematica doesn't return any value! Please don't tell me mathematica uses a 20 entry table or something like that for cosine and sine!

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Since the sin/cos of those angles have no exact representation (like, say `Cos[45 Degree]` which is 1/sqrt(2)), you'll need to do `N[Cos[2]]` and `N[Sin[12 Degree]]` (i.e. `N[...]`).

In[1]:= Cos[2]
Out[1]:= Cos[2]

In[2]:= N[Cos[2]]
Out[2]:= -0.416147

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You may also write `Cos[2] // N`. –  Noon Silk Sep 10 '12 at 3:15
`Cos[2.]` gives the same output. Note the dot after the number. –  Andy Rk Sep 10 '12 at 9:00

Mathematica tries to preserve the precision of a calculation. Integers are considered infinity precise, so to get an approximate decimal answer you must have at least one approximate number in the input or use the N function.

``````Sin[2.0]
Sin[2.0`50]
N[Sin[2],50]
``````

For investigating rational multiples of pi there are several options. (In version 9.0)

Some are expanded automatically, for example:

``````Sin[Pi/12]
``````

``````Sin[12 Degree] // FunctionExpand
``````

gives:

``````-(1/8) Sqrt[3] (-1 + Sqrt[5]) + 1/4 Sqrt[1/2 (5 + Sqrt[5])]
``````

Using Degree seems to indicate to Mathematica that the user is probably at a lower math level and doesn't want to see complex numbers or algebraic number objects so instead of

``````Sin[x Degree]
``````

use

``````Sin[x Pi/180]
``````

sin of 1 degree:

``````Sin[Pi/180] // RootReduce
``````

Sometimes results may be disappointing:

``````Sin[Pi/77]
``````

``````-(1/2) (-1)^(75/154) (-1 + (-1)^(2/77))
``````

or

``````1/2 Sqrt[root of some huge polynomial]
``````

This is due to limitations of mathematical language, not Mathematica. See Galois theory. Examples of what Mathematica can write without complex numbers or Root objects:

``````Table[{(\[Pi] k)/180, If[FreeQ[#, (-1)^x_], #, Style[Sin[(\[Pi] k)/180], Red]] &@
ToRadicals[Sin[(\[Pi] k)/180]]}, {k, 45}] // TableForm
``````
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