Sin(x/2) • cos(x/2) + 0,75 = 1 (8sin^4x - 6sin^2x+1)/(tg2x+корень 3) все это равно нулю
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Ответы на вопрос:
Решение sin(x/2) • cos(x/2) + 0,75 = 1 (1/2)* (2*sin(x/2) • cos(x/2) = 1 - 3/4 sinx = 1/2 x = arcsin(1/2) + πk, k∈z x = π/6 + πk, k∈z (8sin^4x - 6sin^2x+1)/(tg2x+√3) = 0 8sin⁴x - 6sin²x + 1 = 0 tg2x+√3 ≠ 0 8sin⁴x - 6sin²x + 1 = 0 пусть sin²x = t 8t² - 6t + 1 = 0 d = 36 - 4*8*1 = 4 t₁ = (6 - 2)/16 = 1/4 t₂ = (6 + 2)/16 = 1/2 1) sin²x = 1/4 sinx = - 1/2 x = (-1)^k*arcsin(-1/2) + πk, k∈z x = (-1)^(k+1)*π/6 + πk, k∈z или sin x = 1/2 x = (-1)^n*arcsin(1/2) + πn,n∈z x = (-1)^n*π/6 + πk, k∈z 2) sin²x = 1/2 sinx = - √2/2 x = (-1)^m*arcsin(-√2/2) + πm, m∈z x = (-1)^(m+1)*π/4 + πm, m∈z sinx = √2/2 x = (-1)^r*arcsin(√2/2) + πr, r∈z x = (-1)^r*π/4 + πr, r∈z
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