Embedded Files
The idea of visualizing algebraic expressions is a powerful idea. With a slightly different way of visualizing, the idea of factorizing 2nddegree algebraic expressions acquires a different meaning.
We visualized composite numbers as those which have factors. For example, 12 can be written as 3 X 4. We can also say that we can factorize 12 as 3 X 4.
The same idea can be extended to algebraic expressions if we can visualize each term of a second degree algebraic expression as a rectangle.
For example let us take an expression x2 + 4x + 3.
Let us imagine as a square of side x, 4x as 4 rectangles with sides 1 & x and 3 as 3 squares of side 1 X 1. Can we arrange these areas into a large rectangle without any gaps or overlaps? It turns out that this is possible. We can make a larger rectangle whose 2 sides measure x + 3 & x + 1!
We have factorized x2 + 4x + 3 as (x + 3)(x + 1).
We have seen factorization as a puzzle and the equivalent of finding facts of a composite number!
Expressions Which Cannot be Factored
Working visually will also provide a clue to whether an algebraic expression is factorizable! Expressions which cannot be factorized can be thought of as “prime” expressions.
Google Sites
Report abuse