Let `f(x)` be a fourth degree polynomial with coefficient of `x^4` is 1 is such that `f(-1) = 1, f(2)= 4.f(-3) = 9, (4) = 16,` then find `f(1).`

If f(x) is a polynomial of degree three with leading coefficient 1 such that f(1)=1,f(2)= 4,f(3)=9 then

Let f (x) be a polynomial of degree 5 with leading coefficient unity, such that f (1) =5, f (2) =4, f (3) =3, f (4)=2 and f (5)=1, then : Sum of the roots of f (x) is equal to :

Let f (x) be a polynomial of degree 5 with leading coefficient unity, such that f (1) =5, f (2) =4, f (3) =3, f (4)=2 and f (5)=1, then : Sum of the roots of f (x) is equal to :

Let f (x) be a polynomial of degree 5 with leading coefficient unity, such that f (1) =5, f (2) =4, f (3) =3, f (4)=2 and f (5)=1, then : Product of the roots of f(x) is equal to :

Let f(x) polynomial of degree 5 with leading coefficient unity such that f(1)=5, f(2)=4,f(3)=3,f(4)=2,f(5)=1, then f(6) is equal to

Let f(x) polynomial of degree 5 with leading coefficient unity such that f(1)=5 ,f(2)=4,f(3)=3,f(4)=2,f(5)=1, then f(6) is equal to

Let f(x) be a polynomial of degree 6 with leading coefficient 2009. Suppose further that f(1) =1, f(2)=3, f(3)=5, f(4)=7, f(5) =9, f'(2)=2. Then the sum of all the digits of f(6) is

Let f(x) polynomial of degree 5 with leading coefficient unity such that f(1)=5, f(2)=4,f(3)=3,f(4)=2,f(5)=1, then f(6) is equal to (a).0 (b). 24 (c). 120 (d). 720

Let f(x) be cubic polynomial such that f(1)=1,f(2)=2,f(3)=3 and f(4)=16 Find the value of f(5)