If `P(x)` is a polynomial such that
`P(x^(2)+1)={P(x)}^(2)+1` and P(0)=0, then P'(0) is equal to

If p(x) is a polynomial such that p(x^2+1)={p(x)}^2+1 and p(0)=0 then p^1(0) is equal to

If P (x) is a polynomial of 2nd degree and P (2) =-1, P'(2) =0 and p''(2)=2 then P'(1)=

If P(x) is polynomial satisfying P(x^(2))=x^(2)P(x)andP(0)=-2, P'(3//2)=0andP(1)=0. The maximum value of P(x) is

If P(x) is polynomial satisfying P(x^(2))=x^(2)P(x)andP(0)=-2, P'(3//2)=0andP(1)=0. The maximum value of P(x) is

If P(x) is polynomial satisfying P(x^(2))=x^(2)P(x)andP(0)=-2, P'(3//2)=0andP(1)=0. The maximum value of P(x) is

P(x) is a non-zero polynomial such that P(0)=0 and P(x^3)=x^4P(x),P'(1)=7 and int_0^1P(x)=1.5 then int_0^1P(x) P'(x) dx =

If P(x) is a cubic polynomial with P(1)=3,P(0)=2 and P(-1)=4, then underset(-1)overset(1)fP(x)dx is

If P (x) is polynomial of degree 4 such than P (-1)=P (1) =5 and P (-2) =P(0)=P (2) =2 find the maximum vaue of P (x).

If P (x) is polynomial of degree 4 such than P (-1)=P (1) =5 and P (-2) =P(0)=P (2) =2 find the maximum vaue of P (x).