Difference of two squares EMAJ
We have seen that(ax+b)(ax�b)can be expanded toa^2 x^2 �b^2.
Thereforea^2 x^2 �b^2 can be factorised as(ax+b)(ax�b).
For example,x^2 � 16 can be written asx^2 � 42 which is a difference of two squares. Therefore, the factors of
x^2 � 16 are(x�4)and(x+ 4).
To spot a difference of two squares, look for expressions:
- consisting of two terms;
- with terms that have different signs (one positive, one negative);
- with each term a perfect square.
For example:a^2 � 1 ; 4 x^2 �y^2 ;�49 +p^4.
VISIT:
The following video explains factorising the difference of two squares.
See video:2DJKatwww.everythingmaths.co.zaWorked example 11: The difference of two squaresQUESTION
Factorise: 3 a(a^2 �4)�7(a^2 �4).SOLUTIONStep 1: Take out the common factor(a^2 �4)3 a(a^2 �4)�7(a^2 �4) = (a^2 �4)(3a�7)Step 2: Factorise the difference of two squares(a^2 �4)(a^2 �4)(3a�7) = (a�2)(a+ 2)(3a�7)Exercise 1 – 6:Factorise:1.4(y�3) +k(3�y) 2. a^2 (a�1)�25(a�1) 3. bm(b+ 4)� 6 m(b+ 4)
4.a^2 (a+ 7) + 9(a+ 7) 5. 3 b(b�4)�7(4�b) 6. 3 g(z+ 6) + 2(6 +z)- 4 b(y+ 2) + 5(2 +y) 8. 3 d(r+ 5) + 14(5 +r) 9.(6x+y)^2 � 9
22 1.7. Factorisation