x=4+y; x=4+y; x=4+y; x=4+y; x=4+y; y=0;
(4+y)+2(4+y)y+y^2=4; 4+y+8y+2y^2+y^2=4; 3y^2+9y=0; 3y(y+3)=0; y=0; x=4;
y=-3; y=-3;
x=1.
task/29729177 Решить уравнение ctg(2x) - ctg(x) = 2ctg(4x)
ОДЗ : { sin2x ≠ 0 ; sinx ≠ 0 ; sin4x ≠0 . x ≠ πk/4 , k ∈ ℤ .
ctg(2x) - ctg(x) = 2ctg(4x) ⇔ ctg(2x) - 2ctg(4x) = ctg(x) ⇔
ctg(2x) -(ctg²(2x)-1) /ctg2x =ctg(x) ⇔1/ctg(2x)=ctg(x)⇔2ctgx / (ctg²x -1) =ctgx⇔
|| ctgx ≠ 0 || 2 / (ctg²x -1) = 1 ⇔ 2 = ctg²x - 1 ⇔ ctg²x = 3 ⇔ || ctgx = ±√3 ||
(1+cos2x) / (1-cos2x) = 3 ⇔ 1+cos2x =3 - 3cos2x ⇔ cos2x = 1/2 ⇔
2x = ± π/3 + 2πk , k ∈ ℤ .
ответ: x =± π/6 + πk , k ∈ ℤ
=> 17 < 3x-1/2y<31
8< у<14 => -7 < -1/2y < -4