Question

Решите уравнения, преобразовав их к однородным относительно синуса и косинуса:
$6 sin^{2} ( frac{x}{2} - frac{pi}{6} ) + 0.5sin( x - frac{pi}{3} ) = 2 + cos^{2} ( frac{pi}{6} - frac{x}{2} ) \ \ 8 { sin( frac{pi}{8} - 2x) }^{2} - { cos(2x - frac{pi}{8} ) }^{2} = 0.5 sin(4x - frac{pi}{4} ) + 3$

Answer 1

1
6sin²(x/2-π/6)+sin(x/2-π/6)*cos(x/2-π/6)-2sin²(x/2-π/6)-2cos²(x/2-π/6)-cos²(x/2-π/6)=0
4sin²(x/2-π/6)+sin(x/2-π/6)*cos(x/2-π/6)-3cos²(x/2-π/6)=0  /cos²(x/2-π/6)
4tg²(x/2-π/6)+tg(x/2-π/6)-3=0
tg(x/2-π/6)=a
4a²+a-3=0
D=1+48=49
a1=(-1-7)/8=-1⇒tg(x/2-π/6)=-1⇒x/2-π/6=-π/4+πk⇒x/2=-π/12+πk⇒
x=-π/6+2πk,k∈z
a2=(-1+7)/8=3/4⇒tg(x/2-π/6)=3/4⇒x/2-π/6=arctg3/4+πk⇒
x/2=π/6+arctg3/4+πk⇒x=π/3+2arctg3/4+2πk,k∈z
2
8sin²(2x-π/8)-cos²(2x-π/8)-sin(2x-π/8)*cos(2x-π/8)-3sin²(2x-π/8)-3cos²(2x-π/8)=0
5sin²(2x-π/8)-sin(2x-π/8)*cos(2x-π/8)-4cos²(2x-π/8)=0 /cos²(2x-π/8)
5tg²(2x-π/8)-tg(2x-π/8)-4=0
tg(2x-π/8)=a
5a²-a-4=0
D=1+80=81
a1=(1-9)/10=-0,8⇒tg(2x-π/8)=-0,8⇒2x-π/8=-arctg0,8+πk⇒
2x=π/8-arctg0,8+πk⇒x=π/16-0,5arctg0,8+πk/2,k∈z
a2=(1+9)/10=1⇒tg(2x-π/8)=1⇒2x-π/8=π/4+πk⇒2x=3π/8+πk⇒
x=3π/16+πk/2,k∈z