p(x)=x^(4)-5x+6;g(x)=2-x^(2)

If f(x) is divided by g(x), then find remainder. When f(x)=x^(4)-5x+6,g(x)=-x^(2)+1

Apply the division algorithm to find the quotient and remainder on dividing f(x)=x^(4)-5x+6 by g(x)=2-x^(2)

Apply the division algorithm to find the quotient and remainder on dividing f(x)=x^4-5x+6 by g(x)=2-x^2

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)

If f(x)=x^(2)+5x+p and g(x)=x^(2)+3x+q have a common factor, then (p-q)^(2)=

In each of the following cases (Q.9-12), find whether g(x) is a factor of p(x) : p(x)=x^(2)-5x+6, " " g(x)-x-2

In each of the following cases (Q.9-12), find whether g(x) is a factor of p(x) : p(x)=x^(2)-5x+6, " " g(x)=x-2

Using factor theorem , show that g (x) is a factor of p(x) , when p(x)=2x^(4)+x^(3)-8x^(2)-x+6,g(x)=2x-3

Divide p(x) by g(x) and find the quotient and remainder : p(x)=x^(3)-3x^(2)+5x-3, g(x)=x^(2)-2

Divide the polynomial p(x) by the polynomial g(x) and find the quotient and remainder in each of the following : p(x)= x^(3)-3x^(2)+5x-3, g(x)= x^(2)-2