Question

The quadratic polynomial p X with -24 and 4 as a product and one of the zeroes respectively is ?​

Answer 1

Step-by-step explanation:

Given: Product of zeroes =−81, and one of the zeroes =3

Let the zeroes of the quadratic polynomial be α,β

Let β=3, and given αβ=−81⟹α=

3

−81

=−27

So, the other zero of the polynomial is −27

Also, the sum of the zeroes of the polynomial =−27+3=−24

So the expression of required polynomial p(x) is given by:

x

2

−(sum of the zeroes of the polynomial)x+(product of the zeroes)

⇒p(x)=x

2

−(−24)x+(−81)

⇒p(x)=x

2

+24x−81

Therefore, the quadratic polynomial p(x) is x

2

+24x−81