Integral Root Theorem

Rational Root Theorem

If x^(2) - px + q = 0 has equal integral roots, then

If x^(2)-p x+q=0 has equal integral roots, then

If x^(2) - px + q = 0 has equal integral roots, then

If {.} represents fractional part function and {x}+{-x}=x^(2)+x-6, then integral roots are -2 and 3 number of non-integral roots is 2 number of solutions is 4 equation has exactly two integral roots

Integral value(s) of a such that the quadratic equation x^(2)+ax+a+1=0 has integral roots is/are

If {.} represents fractional part function and {x}+{-x}=x^2+x-6 , then (a) integral roots are -2 and 3 (b) number of non-integral roots is 2 (c) number of solutions is 4 (d) equation has exactly two integral roots

If {.} represents fractional part function and {x}+{-x}=x^2+x-6 , then (a) integral roots are -2 and 3 (b) number of non-integral roots is 2 (c) number of solutions is 4 (d) equation has exactly two integral roots

Sum of integral roots of the equation |x^2-x-6|=x+2 is