Let 75°=(150°)/(2): cos 75°=cos (150°)/(2) Use the half-angle identity for sine sin (u)/(2)=pm sqrt((1+cos u)/(2)) where u = 150°. Since 75° is in Ql, then we take the positive identity: =sqrt((1+cos 150°)/(2)) By special angles, cos 150°=-(sqrt(3))/(2) =sqrt((1+(-(sqrt(3))/(2)))/(2)) =sqrt(((2)/(2)-(sqrt(3))/(2))/(2)) =sqrt(((2-sqrt(3))/(2))/(2)) =sqrt((2-sqrt(3))/(4)) =(sqrt(2-sqrt(3)))/(2) Result: (sqrt(2-sqrt(3)))/(2)