Find the zeros or x-intercepts (values of r and s) of a quadratic relation y=x^2-5x+6 by factoring using the sum and product method

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asked Mar 3, 2021 13.3k views

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Pavel Chernikov · Answer 1 · 2021-03-08T16:38:02+0000

Answer:

y = x^2 -5x +6

And for this case we want to find the zeros or x interceps r and s so we want to rewrite the function on this way:

y = (x-r) (x-s)

The reason why we have two zeros is because the degree of the polynomial is 2. If we find two numbers that adding we got -5 and multiplied 6 we solve the problem. For this case the solution is r =3, s =2

y=(x -2)) (x-3)

Explanation:

For this problem we have the following polynomial given:

y = x^2 -5x +6

And for this case we want to find the zeros or x interceps r and s so we want to rewrite the function on this way:

y = (x-r) (x-s)

The reason why we have two zeros is because the degree of the polynomial is 2. If we find two numbers that adding we got -5 and multiplied 6 we solve the problem. For this case the solution is r =3, s =2

y=(x -2)) (x-3)

Find the zeros or x-intercepts (values of r and s) of a quadratic relation y=x^2-5x+6 by factoring using the sum and product method

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