Difference between revisions of "Binomial"
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==Simple Operations== | ==Simple Operations== | ||
| − | *The binomial <math>a^2-b^2</math> can be factored as a product of two other binomials, <math>a+b</math> and <math>a-b</math>. | + | *The binomial <math>a^2-b^2</math> can be [[factored|factor]] as a product of two other binomials, <math>a+b</math> and <math>a-b</math>. |
| − | *The binomial <math>a^2+a^2</math> can be factored as the product of two complex numbers, <math>a+bi</math> and <math>a-bi</math>. | + | *The binomial <math>a^2+a^2</math> can be factored as the product of two [[complex numbers]], <math>a+bi</math> and <math>a-bi</math>. |
* A binomial to the nth power can be expanded using the [[binomial theorem]] or [[Pascal's triangle]]. | * A binomial to the nth power can be expanded using the [[binomial theorem]] or [[Pascal's triangle]]. | ||
Revision as of 18:56, 20 March 2013
A binominal is a polynominal with two terms, the sum of two monominals. It is common practice to bound binominals by brackets or parenthesis when operated upon.
Simple Operations
- The binomial
can be factor as a product of two other binomials, 
and 
. - The binomial
can be factored as the product of two complex numbers, 
and 
. - A binomial to the nth power can be expanded using the binomial theorem or Pascal's triangle.
can be 
and 
.
can be factored as the product of two 
and 
.
