Ratio |
In Algebra, a ratio is the relationship between two quantity. It is expressed as the quotient of two numbers, or as two numbers separated by a colon (punctuation) (pronounced to ). A number that can be written as a ratio of two integers is a rational number. In Physics, a ratio between two magnitudes of the same type of quantity gives a positive real number when the magnitudes are expressed relative to an absolute or natural zero. The ratio between a difference of two magnitudes to a third magnitude, such as a unit, gives a real number (i.e. positive or negative).
=Examples=
Note the use of words such as times , parts , number , etc. Because two objects are being compared using the same measure, ratios are unitless; the units cancel out of the ratio. For example, the ingredients in a recipe that required 500 grams and 300 grams of each, would be in the ratio of 5:3, with no units.
Note also the difference between ratios and vulgar fractions. For example, if I have three raspberry candies and five blackcurrant candies, then the ratio of raspberry candies to blackcurrant candies is 3:5. This indicates that there are three fifths as many raspberry candies as blackcurrant candies. However the fraction of all the candies that are raspberry is three out of a total of all eight candies or 3/(3+5) = 3/8. Thus the chances of a randomly selected candy being raspberry are three in eight.
=See also=
*Analogy *Conversion factor *Financial ratio *Golden ratio *Odds *Proportionality (mathematics) *Ratio decidendi — the reasoning for a court of law s decision *Rational number|
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