Question

write a quadratiic polynomial whose sum of zeroes is 2 and product is -8​

Answer 1

Let S and P denotes respectively the sum and product of the zeros of a polynomial are \(2 \sqrt{3}\) and 2. Hence, the quadratic polynomial is \(g(x)=k\left(x^{2}-2 \sqrt{3} x+2\right)\)where k is any non-zero real number.

Answer 2

Answer:

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Step-by-step explanation:

The quadratic polynomial whose sum of zeroes is 3 and product of zeroes is 2 is

Step-by-step explanation:

Let a and ß are the roots of given Quadratic polynomial.

Given:

a+B=3,aß=2

Quadratic polynomial:

X

2

-(a+b)x+(ab)

.: Polynomial is x

2

-3x+2

Option C is correct.