| Term | Definition |
|---|
| associative property of multiplication | (ab)c=a(bc) |
| additive inverse | a+(-a)=0 |
| multiplacative property of zero | a*0=0 |
| how to find the zeros, roots, or solutions of a function | substitute 0 in for y or f(x) |
| associative property of addition | (a+b)+c=a+(b+c) |
| distributive property | a(b+c)=ab+ac |
| multiplicative inverse | a(1/a)=1 |
| zero product property | if ab=0 , then a=0 or b=0 or both a and b equal zero |
| additive identity | a+0=a |
| substitution property | if a=b, then a can be replaced by b |
| symmetric property | if a=b, then b=a |
| commutative property of addition | a+b=b+a |
| multiplicative identity | a*1=a |
| reflexive property | a=a |
| transitive | if a=b and b=c, then a=c |
| commutative property of multiplication | ab=ba |
| slope | (y₂-y₁)/(x₂-x₁) |
| range | all the possible y values |
| constant of variation | k in a direct variation equation (slope) |
| point slope form | y-y₁=m(x-x₁) |
| domain | all the possible x values |
| direct variation | y=kx |
| slope-intercept form | y=mx+b |
| standard form | Ax+By=C, where A, B and C are integers. A is positive integer. A, B and C have no GCF other than 1. A and B can't both be zero |
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