Решение
sinx*cosx + 2sin²x = cos²x
sinx*cosx + sin²x - (cos²x - sin²x) = 0
sinx*cosx + sin²x - (1 - 2sin²x) = 0
sinx*cosx + 3sin²x - 1 = 0
sinx*cosx + 3sin²x - sin²x - cos²x = 0
2sin²x + sinx*cosx - cos²x = 0 делим на cos²x ≠ 0
2tg²x + tgx - 1 = 0
tgx = t
2t² + t - 1 = 0
D = 1 + 4*2*1 = 9
t₁ = (-1 - 3)/4
t₁ = - 1
t₂ = (-1 + 3)/4
t₂ = 1/2
1) tgx = - 1
x₁ = - π/4 + πk, k ∈ Z
2) tgx = 1/2
x₂ = arctg(1/2) + πn, n ∈ Z
3^(2sinx)=a
a²+a-12=0
a1+a2=-1 U a1*a2=-12
a1=-4⇒3^(2sinx)=-4 нет решения
a2=3⇒3^(2sinx)=3⇒2sinx=1⇒sinx=1/2⇒x=(-1)^n*π/6+πn,n∈z
Cos(П/6-a)=cosП/6cosa+sinasinП/6
1-cos^2a=1-144/169=25/169
sina=5/13
(√3/2)*(12/13)+(5/13)(1/2)=(12√3+5)/26