Question

Find a quadratic polynomial whose sum and product of zeros is 0 and √15
respectively​

Answer 1

Answer:

This is the correct answer for this question

Answer 2

▪Given :-

For a Quadratic Polynomial

   

Sum of Zeros = 0

Product of Zeros = √15

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▪To Find :-

The Quadratic Polynomial.

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▪Key Point :-

If sum and product of zeros of any quadratic polynomial are s and p respectively,

Then,

The quadratic polynomial is given by :-

$\bf  {x}^{2}  - s \: x + p$

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▪Solution :-

Here,

Sum = s = 0

and

Product = p = √15.

So,

Required Polynomial should be

$\bf{x}^{2}  - 0x +  \sqrt{15}$

i.e.

$\bf  {x}^{2}  +  \sqrt{15}$

$\mathfrak{  \text{W}hich \:   \: is  \:  \: the  \:  \: required \:  \:  \text{ A}nswer.}$

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