a) (x²-16)(x²-49) = 0 (x-4)(x+4)(x-7)(x+7) = 0 Przyrównujemy każdy czynnik do zera i wyznaczamy pierwiastki. x-4=0 ∨ x+4=0 ∨ x-7=0 ∨ x+7=0 x=4 x=-4 x=7 x=-7 b) -2x² -9x +18 = 0 Δ=(-9)²-4·(-2)·18 = 81+144=225, √Δ=15 x₁=(9+15)/(-4) =24/(-4)= -6, x₂= (9-15)/(-4) =-6/(-4) = 3/2=1½ c) x³+2x²-3x =0 x(x²+2x-3) =0 x₁=0 ∨ x²+2x-3=0 Δ=4-4·(-3)=4+12=16, √Δ=4 x₂=(-2-4)/2=-6/2= -3 , x₃= (-2+4)/2= 2/2= 1 d) x³+2x²-4x-8 =0 Stosujemy met. grupowania wyrazów. x²(x+2)-4(x+2) =0 (x+2)(x²-4) =0 (x+2)(x+2)(x-2) =0 (x+2)²(x-2) = 0 x+2=0 ∨ x-2=0 x=-2 x=2 e) (x²-1)(x²+x-10) = (x²-1)(x-5) (x-1)(x+1)(x²+x-10) - (x-1)(x+1)(x-5) = 0 (x-1)(x+1) [x²+x-10-(x-5)] =0 (x-1)(x+1)(x²+x-10-x+5) = 0 (x-1)(x+1)(x²-5) =0 (x-1)(x+1)(x-√5)(x+√5) = 0 x-1=0 ∨ x+1=0 ∨ x-√5=0 ∨ x+√5=0 x₁=1 x₂=-1 x₃=√5 x₄=-√5
