2sin²x-3sinxcosx+cos²x-sin²x-cos²x=0sin²x-3sinxcosx=0
sinx(sinx-3cosx)=0
sinx=0⇒x=πn,n∈z
sinx-3cosx=0/cosx
tgx-3=0
tgx=3⇒x=arctg3+⇒n,n∈z
B1+b1q²=15⇒b1(1+q²)=15⇒1+q²=15/b1
b1q+b1q³=30=b1q(1+q²)=30⇒b1q*15/b1=30⇒15q=30⇒q=2
b1=15/(1+q²)=15/(1+4)=15/5=3
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
<span>x3 = πm - (1/2)*cos^(-1)(7/3), m∈Z</span>