How do you factor $4 x^{2} - 5 x + 7$ $4x^2-5x+7$ ?

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How do you factor $4 x^{2} - 5 x + 7$ $4x^2-5x+7$ ?

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Answer 1 · 2016-12-05T23:23:52

It does not factorise

Explanation:

The rule to factorise any quadratic is to find two numbers such that

$product = x^{2} coefficient \times constant coefficient$ $"product" = x^2 " coefficient "xx" constant coefficient"$
$"sum" \ \ \ \ \ \ = x " coefficient"$

So for $4x^2-5x+7$ we seek two numbers such that

$"product" = 4*17 = 28$
$"sum" \ \ \ \ \ \ = -5$

So if we looks at the factors of $28$ and compute their sum we get (as the sum is negative and the product is positive then both factors must be negative);

${: ("factor1", "factor2", "sum"), (-28,-1,-29), (-14,-2,-16), (-7,-4,-11) :}$

So as you can see we cannot find two such factors, and so we conclude the expression cannot be factorised

This approach works for all quadratics (assuming it does factorise) , The middle step in the last section can usually be skipped with practice.

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How do you factor $4 x^{2} - 5 x + 7$ $4x^2-5x+7$ ?

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