Monday, 16 May 2016
Tuesday, 10 May 2016
Factors - Factorising trinomials
1. Factors
Expressing
a given expression/polynomial as a product of two or more
expressions/polynomials is called factorising the expression.
We
will consider the factorising process of polynomials first.We saw earlier that
the algebraic methods and patterns that apply to polynomials can be applied to
other expressions as well, since these patterns form the basis of our work in
algebra.
1.1. Common factor
When
a factor is contained in every term of an algebraic expression, it is referred
to as a common factor of that expression.
1.1.Factorising trinomials
1.1.1. Trinomial with leading coefficient 1
1.1.1. Trinomial with leading coefficient not 1
We will now develop
methods for factorising expressions in which the leading coefficient is not
one.
For the previous
factors, we only considered the factors of the constant term (c) and the
sum of these factors had to give us the middle term (b). This was
because a = 1. Now if
, then we have to adopt a different approach.
(Remember, try to make a = 1 by searching for a common factor first, and
only if this does not happen, we adopt the following method).
To factorise
, we will have to consider the factors of both “a”
and “c”. Such factors will then become rational factors, which will be
discussed fully when we solve equations later on in our work. We will limit
ourselves to factorising only for now.
In general
Monday, 9 May 2016
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