Factorising quadratic expressions is comparatively easy. If the
coefficient ofis
one you can often find the factors by inspection. For example, to
factorisefind
2 numbers that add or take away to give 3 and multiply to give 18. By
inspection we obtain 6 and 3. Then we can factorise:
When we try and factorise a cubic we can start by finding common
factors. This may reduce the problem to one of factorising a
quadratic:
The expression inside the brackets now factorises by inspection:
find two numbers that add or take away to give -5 and multiply to
give 6. We obtain -2 and -3. Hence,
If we can't reduce the problem to factorising a quadratic by
inspection, then things get a little more involved. Consider how to
factorise a quadratic where the coefficient ofis
not one. For example,
Multiply the coefficient of2
by the constant term, 5 to get 10. Now look for the two factors of 10
that add to give the coefficient of7.
The two factors are 2 and 5. Now
Example: Factorise the cubic expression
Factorise first with the common factor 3x to give
To factorise the quadratic in the brackets, multiply the
coefficient of2
by the constant term, 7 to get 14, then find the factors of 14 that
add to give 9. The answer is 2 and 7. Hence
hence the cubic factorises as
Example: Factorise the cubic expression
Factorise first with the common factor 2x to give
To factorise the quadratic in the brackets, multiply the
coefficient of2
by the constant term, 9 to get 18, then find the factors of 18 that
add to give 9. The answer is 3 and 6. Hence
hence the cubic factorises as
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