7cos2x + 3sin^2(2x) = 3
7cos2x + 3sin^2(2x) - 3 = 0
7 cos(2x) - 3cos^(2x) = 0
cos(2x) * (3cos(2x-7)) = 0
1) cos2x = 0
2x = π/2 + πn, n∈Z
x= π/4 + (πn)/2, n∈Z
2) 3cos(2x) 7
cos(2x) = 7/3
2x = c0s^(-1)(7/3) + πk, k∈Z
x2 = 1/2cos^(-1) (7/3) + πk, k∈Z
2x = 2πm - cos^(-1)(7/3) + πm, m∈Z
x3 = πm - (1/2)*cos^(-1)(7/3), m∈Z
(3/7)^(3x+1)=(3/7)^(3-5x)
3x+1=3-5x
3x+5x=3-1
8x=2
x=1/4
8cos⁴x-8cos²x-cosx+1=
cosx=t
8t⁴-8t²-t+1=0
8t²(t²-1)-(t-1)=0
8t²(t-1)(t+1)-(t-1)=0
(t-1)(8t²(t+1-1))=0
t-1=0
t₁=1
8t³=0
t₂=0
cosx=1
x₁=2πn, n ∈ Z
cosx=0
x₂=π/2+πn, n ∈ Z
coszcos2zcos4zcos8z=1/16
16sinzcoszcos2zcos4zcos8z/2sinx=1
8sin2zcos2zcos4zcos8z=1
4sin4zcos4zcos8z=1
2sin8zcos8z=1
sin16z=1
16z=π/2+2πn
z=π/32+πn/8