Let `p(x) = x^2+bx+c`, where b and c are integers. If p(x) is a factor of both `x^4+6x^2 +25 and 3x^4+4x^2+28x+5`, find the value of p(1).

Let f(x)=x^2+b x+c ,w h e r eb ,c in Rdot If f(x) is a factor of both x^4+6x^2+25 and 3x^4+4x^2+28 x+5 , then the least value of f(x) is: (a.) 2 (b.) 3 (c.) 5//2 (d.) 4

Let P(x)=x^2+b x+cw h e r eba n dc are integer. If P(x) is a factor of both x^4+6x^2+25a n d3x^4+4x^2+28 x+5,t h e n a. P(x)=0 has imaginary roots b. P(x)=0 has roots of opposite c. P(1)=4 d . P(1)=6

Let f(x)=x^2+b x+c ,w h e r eb ,c in Rdot If f(x) is a factor of both x^4+6x^2+25a n d3x^4+4x^4+28 x+5 , then the least value of f(x) is 2 b. 3 c. 5//2 d. 4

If x+1,\ 3x and 4x+2 are in A.P., find the value of x .

If (x+1) and (x-1) are factors of p(x)=ax^3+x^2-2x+b find the values of a & b .

Find the value of a such that (x-4) is a factor of 5x^3-7x^2-a x-28

Find the value of a , if x+2 is a factor of 4x^4+2x^3-3x^2+8x+5a

Let f (x) =ax ^(2) +bx+c, where a,b,c are integers and a gt 1 . If f (x) takes the value p, a prime for two distinct integer values of x, then the number of integer values of x for which f (x) takes the value 2p is :