The roots of the equation `ax + (a + b) x - b * = 0` are

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

The roots of the equation x^2+ax+b=0 are

The roots of the equation x^(2) + ax + b = 0 are "______" .

If the roots of the equation x^(2) - (a-1) x+ ( a+b) = 0 and ax^(2) - 2x + b= 0 are identical, then what are the values of a and b?

If 8 and 2 are the roots of x^(2) + ax + c = 0 and 3,3 are the roots of x^(2) + dx + b = 0, then the roots of the equation x^(2) + ax + b = 0 are

If a and b are odd integers then the roots of the equation 2ax^(2)+(2a+b)x+b=0(ane0) are

If a and b are the roots of the equation x^(2) + ax + b = 0, a ne 0, b ne = 0 , then the values of a and b are respectively

The non-trival values of (a,b) such that roots of the equation x^(2) + ax + b = 0 are equal to a and b are :

If 8, 2 are roots of the equation x^2 + ax + beta and 3, 3 are roots of x^2 + alpha x + b = 0 then roots of the equation x^2+ax+b =0 are

If 8 and 2 are the roots of x^2 + ax + beta = 0 and 3,3 are the roots of x^2 + alpha x + b =0 then the roots of the equation x^2 + ax + b=0 are