Найдите значение выражения(x-2)2 * 2y-6/4y+9 * x 2-4 ,если
x=0,5 y=-1,5

1) (ab - ac) + (yb - yc) = a(b - c) + y(b -c) = ( b - c)(a +y)
2) ( 3x + 3y) - bx - by = 3(x + y) - b(x + y) = (x+y)(3 - b)
3) (4n - 4) + ( c - nc) = 4( n - 1) + c( 1 - n) = (4 - c)(n - 1)
4) ( x⁷ + x³) - 4x⁴ - 4 = x³(x⁴ + 1) - 4( x⁴ + 1) = (x⁴+1)( x³ - 4)
5) (6mn - 3m) + ( 2n - 1) = 3m( 2n - 1) + ( 2n - 1)=(2n - 1)(3m + 1)
6) (4a⁴ - 8a) +(10y - 5ya³) = 4a(a³ - 2) + 5y(2 - a³) = (4a - 5y)(a³ - 2)
7) a²b² - a + ab² - 1 = (a²b² + ab²) - (a + 1) = ab²(a + 1) - (a+1)=(a+1)(ab² - 1)
8) (xa - xb²) + (zb² - za) - ya + yb² = x(a-b²)+z(b² -a) - y(a -b²)=(x - z - y)(a - b²)

Решение
1)  2sin x-1=0
sinx = 1/2
x = (-1)^n arcsin(1/2) + πk, k∈Z
x = (-1)^n (π/6) + πk, k∈Z
2)  cos(2x+П/6)+1=0
cos(2x+П/6) = - 1
2x+П/6 = π + 2πn, n∈Z
2x = π - π/6 + 2πn, n∈Z
2x = 5π/6 + 2πn, n∈Z
x = 5π/12 + πn, n∈Z
3)  6sin²x - 5cosx + 5 = 0
6(1 - cos²x) - 5cosx + 5 = 0
6 - 6cos²x - 5cosx + 5 = 0
6cos²x + 5cosx - 11 = 0
cosx = t, ItI ≤ 1
6t² + 5t - 11 = 0
D = 25 + 4*6*11 = 289
t₁ = (- 5 - 17)/12
t₁ = - 22/12
t₁ = -11/6
t₁ = - 1 (5/6) не удовлетворяет условию ItI ≤ 1
t₂ = (- 5 + 11)/12
t₂ = 1/2
cosx = 1/2
x = (+ -)arccos(1/2) + 2πm, m∈Z
 x = (+ -) *(π/3) + 2πm, m∈Z