If `a ,b ,a n dc` are odd integers, then prove that roots of `a x^2+b x+c=0` cannot be rational.

If a, b, c are odd integers, then the roots of ax^(2)+bx+c=0 , if real, cannot be

If a,b,c are odd integere then about that ax^(2)+bx+c=0, does not have rational roots

If b and c are odd integers,then the equation x^(2)+bx+c=0 has-

If f(x)=x^(3)+bx^(2)+cx+d and f(0),f(-1) are odd integers,prove that f(x)=0 cannot have all integral roots.

If a,b,c in Q, then roots of ax^(2)+2(a+b)x-(3a+2b)=0 are rational.

If a and b are the odd integers,then the roots of the equation,2ax^(2)+(2a+b)x+b=0,a!=0, will be

Consider a cubic polynomial p(x)=ax^(3)+bx^(2)+cx+d where a,b,c,d are integers such that ad is odd and bc is even. Prove that not all roots of p(x) can be rational

If a,b,c in R such that a+b+c=0 and a!=c, then prove that the roots of (c+a-b)x+(a+b-c)=0 are real and distinct.

If p and q are odd integers the equation x^(2)+2px+2q=0 cannot have (A) real real roots x^(2)+2px+2q=0 cannot have (A) real roots irrational roots