Cos2x = 1/2
2x = ± arccos(1/2) + 2pik
2x = ± pi/3 + 2pik
x = ± pi/6 + pik, k ∈ Z
Sin2x + sin4x = 0
sin2x + 2*sin2x*cos2x = 0
sin2x *( 1 + 2*cos2x ) = 0
sin2x = 0
2x = pik
x = pik/2, k ∈ Z
1 + 2*cos2x = 0
2*cos2x = - 1
cos2x = - 1/2
2x = ± 2pi/3 + 2pik // : 2
x = ± pi/3 + pik, k ∈ Z
ОТВЕТ:
x = pik/2, k ∈ Z
x = ± pi/3 + pik, k ∈ Z
<span>Sin^2x+√3Sinx Cosx=o
Sin</span>²<span>x+</span>√3SinxCosx =0
Sinx(Sinx +√3Cosx) = 0
Sinx = 0 или Sinx +√3Cosx = 0 | : Cosx
x = πn , n ∈Z tgx +√3 = 0
tgx = -√3
x = -π/3 + πk , k ∈Z