((5k-5) / (k²-1) - k / (k+1)) : (5-k) / (k+1) = ((5k-5) / (k-1)(k+1) - k / (k+1)) :
(5-k) / (k+1) = ((5k-5) / (k-1)(k+1) - (k²-k) / (k-1)(k+1)) : (5-k) / (k+1) =
(5k-5-k²+k) / (k-1)(k+1) : (5-k) / (k+1) = (6k-k²-5) / (k-1)(k+1) : (5-k) / (k+1) =
(6k-k²-5)(k+1) / (k-1)(k+1)(5-k) = (6k-k²-5) / (k-1)(5-k) = (6k-k²-5) /
(5k-k²-5+k) = (6k-k²-5) / (6k-k²-5) = 1.
Cos^2x = 1/2
cosx = - √2/2
x₁ = ± arccos(-√2/2) + 2πn
x₁ = ± (π - π/4) + 2πn
x₁= ± 3π/4 + 2πn, n∈Z
cosx = √2/2
x₂ = ± arccos(√2/2) + 2πk
x₂ = ± π/4 + 2πk, n∈Z
3√2-4√32+5√18=3√2-4*4√2+5*3√2=3√2-16√2+15√2=2√2