A polynomial of degree n can have atmost n real roots

A polynomial of degree n has

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 .

In general, given a polynomial p(x) of degree n, the graph of y = p(x) intersects the x-axis atmost n points. Therefore, a polynomial p(x) of degree n has atmost n zeroes:

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

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.

The polynomial of degree 'n' has___zeroes

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.