evaluate cos 12*pi
In radian measure that last pair of equations read as
sin ( theta + 2 k pi ) = sin ( theta )
In this case:
2 k pi = 12 pi Divide both sides with 2 pi
k = 6
sin ( theta + 2 k pi ) = sin ( 0 + 12 pi )
This mean theta = 0
sin ( 0 + 12 pi ) =
sin ( 0 ) = 0
Starting from zero, this means rotating through pi or180º 12 times counter-clockwise which ends at zero.
So:
sin ( 12pi ) = 0