Which angle can't be trisected?

Author:Ku, Yin Bon (Albert)

To show that an angle

cannot be trisected, it suffices to show that

is not a constructible angle. Let's consider

. Then

. Now we use the following trigonometric identity:

Let

, we have

It can be shown that

is irreducible over

. Therefore, the degree of

over

is

and hence by the Main Theorem,

is not a constructible number. In other words,

is not a constructible angle, which in turn implies that

cannot be trisected.

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