A polynomial of degree n can have atmost n real roots

A polynomial of degree nge1 can have at most n real zeroes. A quadratic polynomial can have at most two real zeroes . Find the zero of the polynomial q(u)=3u .

A polynomial of degree nge1 can have at most n real zeroes. A quadratic polynomial can have at most two real zeroes . find the zeroes of the polynomial p(x)=3x^(2)+7x+2 .

A polynomial of degree nge1 can have at most n real zeroes. A quadratic polynomial can have at most two real zeroes . Find p(1) , if p(x)=x^(3)-22x^(2)+141x-120 .

How many zeroes can a polynomial of degree n can have?

Show that a polynomial of an odd degree has at least one real root.

a polynomial of an even degree has atleast two real roots if it attains atleast one value opposite in sign to the coefficient of its highest-degree term.

Let f(x) be a polynomial of degree 5 such that f(|x|)=0 has 8 real distinct , Then number of real roots of f(x)=0 is ________.

If int(tan^(9)x)dx=f(x)+log|cosx|, where f(x) is a polynomial of degree n in tan x, then the value of n is

If n is a natural number and we define a polynomial p_(a)(x) of degree n such that cos n theta=p_(n)(cos theta), then The value of p_(n+1)(x)+p_(n-1)(x)=

A polynomial of degree 7 is divided by a polynomial of degree 4. Degree of the quotient is