Question

Fill ups :
1) Odd degree polynomials can have atleast _________roots and upto ________ roots.
2) A polynomial of n degree has ______ roots.
3)Graph of a constant polynomial is a ___________.​

Answer 1

Answer:

(i)A polynomial of nth degree in which n is an odd value must have at least 1 real root  since the function approaches - ∞ at one end and + ∞ at the other. 

A polynomial of nth degree in which n is an odd value can have at most up to n real roots

(ii) A polynomial of degree n can have at most n real zeros. A polynomialof degree n can have atmost n number of zeroes. if n = 2, then the polynomial will have atmost 2 zeroes.

(iii) The graph of a constant polynomial is a horizontal line. A constant polynomial does not have any roots unless it is the polynomial P(x) = 0.

Step-by-step explanation:

I HOPE IT would help you