Difference between revisions of "Denominator"
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| − | The '''denominator''' of a [[fraction]] is the [[number]] under the horizontal bar, or [[vinculum]]. It represents the amount of parts in an object. The denominator can never be [[zero (constant) | zero]]. An expression such as <math>\frac{2^2}{3-3}</math>, will be undefined, because the denominator equals <math>0</math>. | + | The '''denominator''' of a [[fraction]] is the [[number]] under the horizontal bar, or [[vinculum]]. <cmath>\frac{\text{Numerator}}{\text{Denominator}}</cmath>It represents the amount of parts in an object. The denominator can never be [[zero (constant) | zero]]. An expression such as <math>\frac{2^2}{3-3}</math>, will be undefined, because the denominator equals <math>0</math>. As the denominator of a fraction gets smaller, the value of the fraction will get larger. Conversely, as the denominator of a fraction gets larger, the value of the fraction gets smaller. |
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If the [[absolute value]] of the denominator is greater than the absolute value of the [[numerator]] of a fraction, it is a [[proper fraction]]. If it is the other way around, the fraction is [[improper fraction | improper]]. | If the [[absolute value]] of the denominator is greater than the absolute value of the [[numerator]] of a fraction, it is a [[proper fraction]]. If it is the other way around, the fraction is [[improper fraction | improper]]. | ||
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== See Also == | == See Also == | ||
* [[Mixed number]] | * [[Mixed number]] | ||
| + | * [[Numerator]] | ||
[[Category:Definition]] | [[Category:Definition]] | ||
Latest revision as of 19:48, 2 March 2024
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The denominator of a fraction is the number under the horizontal bar, or vinculum. ![\[\frac{\text{Numerator}}{\text{Denominator}}\]](http://latex.artofproblemsolving.com/5/b/8/5b8958566dc7d3c70df5ccb970a7e0a741ce91c2.png)
It represents the amount of parts in an object. The denominator can never be zero. An expression such as 
, will be undefined, because the denominator equals 
. As the denominator of a fraction gets smaller, the value of the fraction will get larger. Conversely, as the denominator of a fraction gets larger, the value of the fraction gets smaller.
If the absolute value of the denominator is greater than the absolute value of the numerator of a fraction, it is a proper fraction. If it is the other way around, the fraction is improper.
