6Sin x - 18 Cos x = √360
6Sin x - 18 Cos x = 6√10
12Sinx/2Cosx/2 -18(Cos²x/2 - Sin²x/2) = 6√10*1
12Sinx/2Cosx/2 -18Cos²x/2 +18 Sin²x/2 = 6√10*(Sin²x/2 + Сos²x/2)
12Sinx/2Cosx/2 -18Cos²x/2 +18 Sin²x/2 - 6√10*Sin²x/2 -6√10 Сos²x/2 = 0
2Sinx/2Cosx/2 - 3Cos²x/2 +3Sin²x/2-√10*Sin²x/2 -√10 Сos²x/2 = 0|:Сos²x/2
2tgx/2 -3 +3tg²x/2 -√10tg²x/2 -√10 = 0
tgx/2 = t
(3 - √10)t² +2t - (3 +√10) = 0
t = (-1 +-√(1 +9 -10))/(3 -√10) = -1/(3 -√10) = 3 +√10
tgx/2 = 3 +√10
x/2 = arctg(3 +√10) + πk , k ∈Z
x = 2arctg(3 +√10) +2πk , k ∈Z
1) ax - bx - x + ay - by - y = (ax + ay) - (bx + by) - (x + y) =
a(x + y) - b(x + y) - (x + y) = (a - b - 1)(x + y)
2) 2a^(2) - a + 2ab - b - 2ac + c = (2a^(2)) - (b + c) - (2ab + 2ac) =
a(2a - 1) - (b + c) - 2a(b + c) = a(2a - 1) - (1 - 2a)(b + c) =
a(2a - 1) + (2a - 1)(b + c) = (a + b + c)(2a - 1)
3) a^(5) - a^(4)b + a^(3)b^(2) - a^(2)b^(3) +ab^(4) - b^(5) =
(a^(5) - a^(4)b + a^(3)b^(2)) - (a^(2)b^(3) - ab^(4) - b^(5)) =
a^(3)(a^(2) - ab +b^(2)) - b^(3)(a^(2) - ab + b^(2)) = (a^(3)-b^(3))(a^(2) - ab + b^(2))