Algebra: Notable Products
The square of a sum or a difference
Notable products are particular cases of the banana method, which are used so regularly that they take a special place.
Square of a sum
For the square of a sum we have: \[(\blue a+\green b)^2=\blue a^2+2\blue a \green b+\green b^2\] |
Example \[\begin{array}{rcl} (\blue{x}+\green{3})^2 &=& \blue{x}^2 + 2 \blue{x}\cdot \green{3} + \green{3}^2 \\ &=& x^2 + 6 x + 9 \end{array}\] |
Square of a difference
For the square of a difference, we have: \[(\blue a-\green b)^2=\blue a^2-2\blue a \green b+\green b^2\] |
Example \[\begin{array}{rcl} (\blue{x}-\green{3})^2 &=& \blue{x}^2 - 2 \blue{x}\cdot \green{3} + \green{3}^2 \\ &=& x^2 - 6 x + 9 \end{array}\] |
#64a^2-32a+4#
#\begin{array}{rclcl}(-8a+2)^2&=&(-8a)^2+2\cdot (-8a)\cdot 2+2^2\\&&\phantom{xxx}\blue{\text{sum formula for squares}}\\&=&64a^2-32a+4\\&&\phantom{xxx}\blue{\text{reduced}}\end {array}#
#\begin{array}{rclcl}(-8a+2)^2&=&(-8a)^2+2\cdot (-8a)\cdot 2+2^2\\&&\phantom{xxx}\blue{\text{sum formula for squares}}\\&=&64a^2-32a+4\\&&\phantom{xxx}\blue{\text{reduced}}\end {array}#
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