A polynomial of degree n has

The maximum number of zeroes that a polynomial of degree 3 can have is :

If f(x) is a polynomial of degree ge 1 and f(alpha) = 0, alpha is called

Satement 1 If the nth termn of a series is 2n^(3)+3n^(2)-4 , then the second order differences must be an AP. Statement 2 If nth term of a series is a polynomial of degree m, then mth order differences of series are constant.

Let f(x) be a polynomial of degree four having extreme values at x = 1 and x = 2. If lim_(x to 0) [1+(f(x))/(x^(2))]=3 , then f(2) is equal to :

Let a!=0 and p(x) be a polynomial of degree greater than 2. If p(x) leaves reminders a and -a when divided respectively, by x+a and x-a , then the remainder when p(x) is divided by x^2-a^2 is

The expression : (1)/(sqrt((3x + 1))) ( { ( (1 + sqrt(3x + 1))/(2) )^(7) - ( (1 - sqrt(3x + 1))/(2))^(7) } ) is a polynomial in x of degree is :

Find the polynomial of least degree that should be subtracted from p(x)=x^3-2x^2+3x+4 so that it is exactly divisible by g(x)=x^2-3x+1

Let S denote the set of all polynomials P(x) of degree lt=2 such that P(1)=1 , P(0)=0 and P^(prime)(x)>0,AA a epsilonR [0,1] , then

Can you tell the number of zeroes of a polynomials of n^(th) degree ?