Question

the quadric polynomial,sum and product of whose zeroes are 0 and -√2 are ​

Answer 1

Answer:

x^2 - √2

Step-by-step explanation:

Given,

Sum of zeroes = 0

Product of zeroes = -√2

To find the quadratic polynomial.

We know that,

A quadratic polynomial having sum and product of zeroes, a and b respectively is given by,

= x^2 -ax + b

Here, we have,

• a = 0
• b = -√2

Therefore, substituting the values, we get,

= x^2 - 0(x) + (-√2)

= x^2 - 0 - √2

= x^2 - √2

Hence, the required polynomial is (x^2 - √2).