Given, x is a real number
Quantity A:
$$(x-2)(x-4)(x+5)$$
Quantity B:
$$(x-5)(x^2+5x+5)+68$$
The first thing I did was to expand Quantity B and after combining like terms I get
$$x^3-20x+43$$
Since $43$ is prime I can't (I don't think) factor that so I decide to subtract that from Quantity A, but first I expand quantity A and, after combining like terms, I get
$$x^3-x^2-22x+40$$
so after subtracting quantity B from quantity A I get
$$x^3-x^2-22x+40-x^3+20x-43$$ $$-x^2-2x-3$$
Immediately I can see that the discriminate of that is less than zero so the roots will be imaginary which violates the real number constraint that was given so I select "can not be determined". However, the answer key acknowledges the negative discriminate but then says that because the roots are imaginary that quantity B is bigger. Could someone help me understand how they came up with that?