1) cos 2x = 1 - 2sin^2 x 3cos 2x + 10sin^2 x - 6 = 3 - 6sin^2 x + 10sin^2 x - 6 = 4sin^2 x - 3 = 0 sin^2 x = 3/4 sin x1 = -√3/2 sin x2 = √3/2 Оба уравнения элементарны.
2) sin 2x = 2sin x*cos x 5sin 2x - 11sin^2 x + 3 = 10sin x*cos x - 11sin^2 x + 3sin^2 x + 3cos^2 x = 0 -8sin^2 x + 10sin x*cos x + 3cos^2 x = 0 Делим все на -cos^2 x 8tg^2 x - 10tg x - 3 = 0 D/4 = 5^2 - 8(-3) = 25 + 24 = 49 = 7^2 tg x1 = (5 - 7)/8 = -1/4 tg x2 = (5 + 7)/8 = 3/2 Оба уравнения элементарны
Применяем основное тригонометрическое тождество:
1 /[sin(5x)*cos(5x)] = 4
1 = 4*[sin(5x)*cos(5x)]
2sin(10x) = 1
sin10x = 1/2
10x = (-1)^(n)*arcsin(1/2) + πn, n∈Z
10x = (-1)^(n)*(π/6) + 2πn, n∈Z
x = (-1)^(n)*(π/60) + πn/5, n∈Z
2) 4cos^2x-12sin(П-x)+3=0
4*(1 - sin²x) - 12sinx + 3 = 0
4 - 4sin²x - 12sinx + 3 = 0
4sin²x + 12sinx - 7 = 0
six = t
4t² + 12t - 7 = 0
D = 144 + 4*4*7 = 256
t₁ = (-12 - 16)/2
t₁ = - 14 не удовлетворяет условию: IsinxI ≤ 1
t₂ = (-12 + 16)/2
t₂ = 2 не удовлетворяет условию: IsinxI ≤ 1
Решений нет
3cos 2x + 10sin^2 x - 6 = 3 - 6sin^2 x + 10sin^2 x - 6 = 4sin^2 x - 3 = 0
sin^2 x = 3/4
sin x1 = -√3/2
sin x2 = √3/2
Оба уравнения элементарны.
2) sin 2x = 2sin x*cos x
5sin 2x - 11sin^2 x + 3 = 10sin x*cos x - 11sin^2 x + 3sin^2 x + 3cos^2 x = 0
-8sin^2 x + 10sin x*cos x + 3cos^2 x = 0
Делим все на -cos^2 x
8tg^2 x - 10tg x - 3 = 0
D/4 = 5^2 - 8(-3) = 25 + 24 = 49 = 7^2
tg x1 = (5 - 7)/8 = -1/4
tg x2 = (5 + 7)/8 = 3/2
Оба уравнения элементарны
3) Переходим к половинным аргументам
3cos^2(x/2) - 3sin^2(x/2) + 19*2sin(x/2)*cos(x/2) - 9sin^2(x/2) - 9cos^2(x/2) = 0
-12sin^2(x/2) + 38sin(x/2)*cos(x/2) - 6cos^2(x/2) = 0
Делим все на -2cos^2 (x/2)
6tg^2(x/2) - 19tg(x/2) + 3 = 0
D = 19^2 - 4*6*3 = 361 - 72 = 289 = 17^2
tg (x1/2) = (19 - 17)/12 = 1/6
tg (x2/2) = (19 + 17)/12 = 3
Оба уравнения элементарны