p(x)=3x^(2)+8x+4" and "a=-2

If g(x) = 2x^(2) + 3x - 4 and g (f(x)) = 8x^(2) + 14 x + 1 then f (2) =

If g(x) = 2x^(2) + 3x - 4 and g (f(x)) = 8x^(2) + 14 x + 1 then f (2) =

If p(x)=8x^(3)-6x^(2)-4x+3 and g(x) = (x)/(3)-(1)/(4) then check whether g (x) is a factor of p(x) or not.

Using the remainder theorem , find the remainder , when p (x) is divided by g (x) , where p(x)=3x^(4)-6x^(2)+8x-2,g(x)=x-2 .

What must be subtracted or added to p(x) = 8x^(4) + 14x^(3)-2x^(2) + 8x -12 so that 4x^(2) + 3x - 2 is a factor of p(x)?

The product of uncommon real roots of the p polynomials p(x)=x^(4)+2x^(3)-8x^(2)-6x+15 and q(x)=x^(3)+4x^(2)-x-10 is :

Find the quotient and remainder on dividing p(x) by g(x) p(x)= 4x^(3)+8x^(2)+8x+7, g(x)= 2x^(2)-x+1

Check whether g(x) is a factor of p(x) by dividing the first polynomial by the second polynomial: (i) p(x) = 4x^(3) + 8x + 8x^(2) +7, g(x) =2x^(2) -x+1 , (ii) p(x) =x^(4) - 5x -2, g(x) =2-x^(2) , (iii) p(x) = 13x^(3) -19x^(2) + 12x +14, g(x) =2-2x +x^(2)