[" (c) every real number "],[" 12.If "p(x)=x+4" then "p(x)+p(-x)=?],[[" (a) "0," (b) "4," (c) "2x]]

If p(x) = 4, then find p(x) + P(-x).

If p(x) = x + 4, then the value of [p(x) + p(-x)] is

For a polynomial p(x) of degree ge1, p(a)=0 , where a is a real number, then (x-a) is a factor of the polynomial p(x) p(x)=x^(3)-3x^(2)+4x-12 , then p(3) is

p(x) = 12/(x-3), p(3) = ……………….

Let f(x)=-x^(2)+x+p , where p is a real number. If g(x)=[f(x)] and g(x) is discontinuous at x=(1)/(2) , then p - cannot be (where [.] represents the greatest integer function)

Let f(x)=-x^(2)+x+p , where p is a real number. If g(x)=[f(x)] and g(x) is discontinuous at x=(1)/(2) , then p - cannot be (where [.] represents the greatest integer function)

Show that the statement p:"If x is a real number such that x^3+4x=0 then x is 0" is true by Direct method.

Let P(x) be a polynomial of degree 4 such that p(1)=p(5)=p'(7)=0 If the real number x!=1,3,5 is such that p(x)=0 can be expressed as x=(p)/(q) where p and q are relatively prime then (p+q) equals to

Let g (x) be a function such that g (x + 1) + g (x - 1) = g (x) for every real x. Then for what value of p is the relation g (x + p) = -g (x) necessarily true for every real x?

Find the zero of the polynomial in each of the following cases. (i) p (x) = x+5 (ii) p(x) = x - 5 (iii) p (x) = 2x+5 (iv) p(x) = 3x-2 (v) p(x) =3x (vi) p(x) = ax, a ne 0 (vii) p(x) = cx+d,c ne 0 ,c,d are real numbers