Properties of Proportions
An equality of two ratios is called a proportion.
Four quantities a, b, c, d are said to be in proportion if a : b = c : d (also written as a : b :: c : d) That is, if a/b = c/d.
Addendo :
If a : b = c : d = e : f =.........., then each of these ratios is equal (a + c + e + ........) : (b + d + f + ........)
Subtrahendo :
If a : b = c : d = e : f =.........., then each of these ratios is equal (a - c - e - ........) : (b - d - f - ........)
Componendo :
If a : b = c : d, then (a+b) : b = (c+d) : d
Dividendo :
If a : b = c : d, then (a-b) : b = (c-d) : d
Alternendo
If a : b = c : d, then a : c = b : d
Invertendo
If a : b = c : d, then b : a = d : c
Mean Proportional - Middle Term
If a, b, c are in continuous proportion, then the middle term b is called the mean proportional between a and c, a is the first proportional and c is the third proportional. Thus, if b is mean proportional between a and c, then
Direct and Indirect Proprotions
In a proportion a : b = c : d, all the four quantities need not be of the same type. The first two quantities should be of the same kind and last two quantities should be of the same kind.
Cross Products
In a proportion, product of extremes = product of means. If a : b = c : d are in proportion, ad = bc. This is called cross product rule.
Means-Extremes Property
The quantities a, b, c, d are called terms of the proportion; a, b, c and d are called its first, second, third and fourth terms respectively. First and fourth terms are called extremes (or extreme terms). Second and third terms are called means (or middle terms).
Continuous Proportion
Three quantities a, b, c of the same kind (in same units) are said to be in continuous proportion. Now, we can write a, b, c in proportion as given below. a : b = b : c Using cross product rule, we have b2 = ac
