If a,b,c are real `x^(3)-3b^(2)x+2c^(3)` is divisible by x-a and x-b, then

If a, b, c are real and x^3-3b^2x+2c^3 is divisible by x -a and x - b, then (a) a =-b=-c (c) a = b = c or a =-2b-_ 2c (b) a = 2b = 2c (d) none of these

S_1: If a, b and care positive real numbers, then ax^3 + bx + c = 0 has exactly one real root S_2: If the derivative of an odd cubic polynomial vanishes at two different values of 'X then coefficient of x and x in the polynomial must be different in sign. S_3 : a, b, care real and x^3 - 3b^3x + 2c^3 is divisible by x-a and x-b if a = 2b = 2c S_4: If roots of a cubic equation are not all real, then imaginary roots must be conjugates of each other

f(x)=2x^(4)-7x^(3)+ax+b is divisible by x-1 and x-2 then (a,b)=

The value of b so that x^(4)-3x^(3)+5x^(2)-33x+b is divisible by x^(2)-5x+6 is

If x, a, b, c are real and (x-a+b)^(2)+(x-b+c)^(2)=0 , then a, b, c are in

If x^(3)-6x^(2)+ax+b is divisible by (x^(2)-3x+2) , then the values of a and b are:

If f(x)=x^(3)+x^(2)-ax+b is divisible by x^(2)-x write the values of a and b

If A = 4x^(3) -8x^(2), B = 7x^(3) -5x + 3 and C = 3x^(3) + x - 11 , then find 2A -3B + 4C