Запишем
A(ω)<=1.8Α(0)=Α(0)*ω(ρ)^2/mod[ω(ρ)^2-ω^2]
Решим относительно ω
1.8Α(0)=Α(0)*ω(ρ)^2/mod[ω(ρ)^2-ω^2]
1.8Α(0)*ω(ρ)^2-1.8Α(0)*ω^2=Α(0)*ω(ρ)^2
0.8Α(0)*ω(ρ)^2=1.8Α(0)*ω^2
4Α(0)*ω(ρ)^2=9Α(0)*ω^2--->ω=(2/3)*ω(ρ)=2*300/3=200 c^(-1)<ω(ρ)
ω=200 c^(-1)
<span> f (x) = sin2x - x√2
</span>F' (x)=2cos2x-√2
2cos2x-√2=0
cos2x=√2/2
x=+-π/8+πn
x=π/8+πn ;-π/8+πn;17π/8+πn;15π/8+πn
Минус две целых одна третья
Sin x = √(1 - cos²x) = √(1 - 0.36) = √0.64 = 0.8
tg 0.5x = sin x/ (1 + cos x) = 0.8 / 1.6 = 0.5
ctg 0.5x = 1/tg x = 1/0.5 = 2