How do you find all the zeros of $y=x^2-11x+30$ with its multiplicities?

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How do you find all the zeros of $y=x^2-11x+30$ with its multiplicities?

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Answer 1 · 2016-04-04T00:13:27

$x = 5, 6$

Explanation:

Write out a set of brackets like this

$(x + a)(x + b)$

You should find two constants, $a$ and $b$ , such that

$a + b = -11$
$a * b = 30$

Which you can do by trial and error, so

$a = -5$
$b = -6$

Therefore the fully factorised form of the equation is

$(x - 5)(x - 6) = 0$

Solving for the roots or zeros of this:

For the entire quadratic to equal zero, one or both of the pairs of brackets must equal $0$ , so solve for each individual one and you will end up with two answers.

$x - 5 = 0 -> x = 5$
$x - 6 = 0 -> x = 6$

Therefore,

$x = 5, 6$

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How do you find all the zeros of $y=x^2-11x+30$ with its multiplicities?

1 Answer

Explanation:

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How do you find all the zeros of $y=x^2-11x+30$ with its multiplicities?