Обозначим y = sin x, получим и решим уравнение 6у² - у - 1 = 0.
D = (-1)² - 4 · 6 · (-1) = 25; √25 = 5
x1 = (1 - 5)/(2·6) = -4/12 = -1/3
x2 = (1 +5)/(2·6) = 6/12 = 1/2
sin x = 1/2, x = (-1)^n · π/6 +πn, n ∈ Z
sin x = -1/3, x = (-1)^n · arcsin (-1/3) + πn, n ∈ Z
(2.25+1.7/8):1.2/9-3.5=(2,25*8+1.7/8*8):1.2/9-3.5=(18+1,7):1.2/9-3.5=19.7:1.2/9-3.5=19.7*9:1.2/9*9-3.5=177.3:1.2-3.5=147.75-3.5=144.25
Tg t/(tg t + Ctg t) = ?
a)tg t = Sin t/Cos t
б) tg t + Ctg t = Sin t/Cos t + Cos t /Sin t = (Sin² t + Cos ²t)/Cos t Sin t= 1/Cos tSin t
в) Sin t/Cos t : 1/Cos tSin t = Sin t /Cos t ·Cos t Sin t /1= Sin²t