let a be Real; sin (3 * a) = ((4 * (sin a)) * (sin ((PI / 3) + a))) * (sin ((PI / 3) - a))
A1: ((sqrt 3) / 2) ^2 =
((sqrt 3) / 2) * ((sqrt 3) / 2)
by SQUARE_1:def 1
.=
(((sqrt 3) * (sqrt 3)) / 2) / 2
.=
((sqrt (3 * 3)) / 2) / 2
by SQUARE_1:29
.=
((sqrt (3 ^2)) / 2) / 2
by SQUARE_1:def 1
.=
(3 / 2) / 2
by SQUARE_1:22
.=
3 / 4
;
sin (3 * a) =
(- (4 * ((sin a) |^ 3))) + (3 * (sin a))
by SIN_COS5:16
.=
(((4 * (sin a)) * 3) / 4) - (4 * ((sin a) |^ (2 + 1)))
.=
(((4 * (sin a)) * 3) / 4) - (4 * (((sin a) |^ 2) * (sin a)))
by NEWTON:6
.=
(4 * (sin a)) * ((((sqrt 3) / 2) ^2) - ((sin a) |^ 2))
by A1
.=
(4 * (sin a)) * (((sin (PI / 3)) ^2) - ((sin a) ^2))
by Thm9, NEWTON:81
.=
(4 * (sin a)) * (((sin (PI / 3)) - (sin a)) * ((sin (PI / 3)) + (sin a)))
by SQUARE_1:8
.=
((4 * (sin a)) * ((sin (PI / 3)) + (sin a))) * ((sin (PI / 3)) - (sin a))
.=
((4 * (sin a)) * (2 * ((cos (((PI / 3) - a) / 2)) * (sin (((PI / 3) + a) / 2))))) * ((sin (PI / 3)) - (sin a))
by SIN_COS4:15
.=
((4 * (sin a)) * (2 * ((cos (((PI / 3) - a) / 2)) * (sin (((PI / 3) + a) / 2))))) * (2 * ((cos (((PI / 3) + a) / 2)) * (sin (((PI / 3) - a) / 2))))
by SIN_COS4:16
.=
((4 * (sin a)) * ((2 * (sin (((PI / 3) - a) / 2))) * (cos (((PI / 3) - a) / 2)))) * ((2 * (sin (((PI / 3) + a) / 2))) * (cos (((PI / 3) + a) / 2)))
.=
((4 * (sin a)) * (sin (2 * (((PI / 3) - a) / 2)))) * ((2 * (sin (((PI / 3) + a) / 2))) * (cos (((PI / 3) + a) / 2)))
by SIN_COS5:5
.=
((4 * (sin a)) * (sin (2 * (((PI / 3) - a) / 2)))) * (sin (2 * (((PI / 3) + a) / 2)))
by SIN_COS5:5
.=
((4 * (sin a)) * (sin ((PI / 3) - a))) * (sin ((PI / 3) + a))
;
hence
sin (3 * a) = ((4 * (sin a)) * (sin ((PI / 3) + a))) * (sin ((PI / 3) - a))
; verum