Given ∣x2−3−6−3x2x−1x−3x+2∣=0
On expansion, we get x−3x(x+2)−2x(x−3)+62(x+2)+3(x−3)−1(4x−9x)=0
⇒x−3x2−6x−2x2+6x+62x+4+3x−9−1(−5x)=0
⇒−5x3+30x−30+5x=0
⇒5x3−35x+30=0
⇒x3−7x+6=0
⇒(x−1)(x−2)(x+3)
⇒x=1 or x=2 or x=−3.
Here all roots 1,2,−3 are real, hence the sum of the real roots is 1+2−3=0.