A = x.[x^2.(x^2-7)^2-36]
= x.[(x^3-7x)^2-6^2]
= x.(x^3-7x-6).(x^3-7x+6)
= x.[(x^3+1)-(7x+7)].[(x^3-x)-(6x-6)]
= x.(x+1).(x^2-x-7).(x-1).(x^2+x-6)
= x.(x+1).(x-1).(x-2).(x+3).(x^2-x-7)
Tk mk nha
x3(x2−7)2−36x=x3(x4−14x2+49)−36xx3(x2−7)2−36x=x3(x4−14x2+49)−36x
=x7−14x5+49x3−36xx7−14x5+49x3−36x
=x7−x6+x6−x5−13x5+13x4−13x4+13x3+36x3−36xx7−x6+x6−x5−13x5+13x4−13x4+13x3+36x3−36x
=x6(x−1)+x5(x−1)−13x4(x−1)−13x3(x−1)+36x(x2−1)x6(x−1)+x5(x−1)−13x4(x−1)−13x3(x−1)+36x(x2−1)
=x(x−1)(x5+x4−13x3−13x2+36x+36)x(x−1)(x5+x4−13x3−13x2+36x+36)
=x(x−1)[x4(x+1)−13x2(x+1)+36(x+1)]x(x−1)[x4(x+1)−13x2(x+1)+36(x+1)]
=x(x−1)(x+1)(x4−13x2+36)x(x−1)(x+1)(x4−13x2+36)
đặt x^2 =a (a>=0) thì xét đa thức x4−13x2+36=a2−13a+36x4−13x2+36=a2−13a+36
xét Δ=b2−4ac=169−4.36=25Δ=b2−4ac=169−4.36=25
Δ>0Δ>0→phương trình có 2 nghiệm riêng biệt là ⎡⎣a1=−b+Δ√2a=13+52=9a2=−b−Δ√2a=13−52=4[a1=−b+Δ2a=13+52=9a2=−b−Δ2a=13−52=4(t/m a>=0)
vậy bt ban đầu :x(x−1)(x+1)(x2−4)(x2−9)x(x−1)(x+1)(x2−4)(x2−9)
=(x−3)(x−2)(x−1)x(x+1)(x+2)(x+3)
A = x.[x^2.(x^2-7)^2-36]
= x.[(x^3-7x)^2-6^2]
= x.(x^3-7x-6).(x^3-7x+6)
= x.[(x^3+1)-(7x+7)].[(x^3-x)-(6x-6)]
= x.(x+1).(x^2-x-7).(x-1).(x^2+x-6)
= x.(x+1).(x-1).(x-2).(x+3).(x^2-x-7)
