Ratio and Proportion

Ratios and proportions are used for comparison. A ratio is a comparison of two quantities, while a proportion is a comparison of two ratios.

This article contains the definition of ratio and proportion, along with their properties, formulas, and quick tricks to solve related questions efficiently.

Ratio

A Ratio is a comparison of two quantities of the same unit. The ratio of two quantities is given by using the colon symbol (:). The ratio of two quantities a and b is given as :

a : b
where

• a is called Antecedent.
• b is called Consequent.

The ratio a:b means ak/bk where k is the common factor k is multiplied to give equivalent fractions whose simplest form will be a/b. We can read a:b as 'a ratio b' or 'a to b'.

Ratio Properties

Some Key properties of the Ratio are:

• If a ratio is multiplied by the same term both in the antecedent and consequent, then there is no change in the actual ratio.
  Example, A : B = nA : nB

• If the antecedent and consequent of a ratio are divided by the same number, then there is no change in the actual ratio.
  Example, A : B = A/n : B/n

• If two ratios are equal, then their reciprocals are also equal.
  Example: If A : B = C : D then B : A = D : C

• If two ratios are equal then their cross-multiplications are also equal.
  Example: A : B = C : D then A × D = B × C.

• The ratios for a pair of comparisons can be the same but the actual value may be different.
  Example 50:60 = 5:6 and 100:120 = 5:6 hence ratio 5:6 is the same but the actual value is different.

Proportion

Proportion refers to the comparison of ratios. If two ratios are equal then they are said to be proportionate to each other. Two proportional ratios are represented by a double colon(::). If two ratios a:b and c:d are equal then they are represented as 

a : b :: c : d

where 

• a and d are called extreme terms.
• b and c are called mean terms.

Proportion Properties

Key properties of Proportions are:

• For two ratios in proportion i.e. A/B = C/D, A/C = B/D holds true.
• For two ratios in proportion i.e. A/B = C/D, B/A = D/C holds true.
• For two ratios in proportion i.e. A : B :: C : D, the product of mean terms is equal to the product of extreme terms i.e. AD = BC
• For two ratios in proportion i.e. A/B = C/D, (A + B)/B = (C + D)/D is true.
• For two ratios in proportion i.e. A/B = C/D, (A - B)/B = (C - D)/D is true.

Types of Proportions

There are three types of Proportions:

Direct Proportion : When two quantities increase and decrease in the same ratio then the two quantities are said to be in Direct Proportion. It means if one quantity increases/decreases then the other will also increase/decrease. It is represented as a ∝ b.

Example, if the speed of vehicle increases then the distance travelled will also increase. ( provided time is same in both scenarios ) ....

Inverse Proportion: When two quantities are inversely related to each other i.e. increase in one leads to a decrease in the other or a decrease in the other leads to an increase in the first quantity then the two quantities are said to be Inversely Proportional to each other.

Example, if the speed of vehicle increases then the time taken to travel the same distance travelled will decrease.

Continued Proportion: If the ratio a:b = b:c = c:d, then we see that the consequent of the first ratio is equal to the antecedent of the second ratio, and so on then the a:b:c:d is said to be in continued proportion.

If the consequent and antecedent are not the same for two ratios then they can be converted into continued proportion by multiplying.

For Example, in the case of a:b and c:d consequent and antecedent are not same then the continued proportion is given as ac:cb:bd. 
In the continued proportion a:b:c:d., c is called the third proportion, and d is called the fourth proportion.

Also Check:

Quiz on Ratio and Proportion

Ratio and Proportion Formulas

Let's discuss the formulas for ratio and proportion in detail.

Compound Ratios: If Two ratios are multiplied together then the new ratio formed is called the compound ratio. Example a:b and c:d are two ratios then ac:bd is a compound ratio.

Duplicate Ratios:

• For a:b, a²:b² is called duplicate ratios
• For a:b, √a:√b is called sub-duplicate ratios
• For a:b, a³:b³ is called triplicate ratios

Proportion Formulas:
These are the formulas used to solve problems of proportion:

• If a:b = c:d, then we can say that (a + c):(b + d), it is also called Addendo.
• If a:b = c:d, then we can say that (a – c):(b – d), it is also called Subtrahendo.
• If a:b = c:d, then we can say that (a – b):b = (c – d):d, it is also known as Dividendo.
• If a:b = c:d, then we can say that (a + b):b = (c + d):d, it is also known as Componendo.
• If a:b = c:d, then we can say that a:c = b:d, it is also known as Alternendo.
• If a:b = c:d, then we can say that b:a = d:c, it is also called Invertendo.
• If a:b = c:d, then we can say that (a + b):(a – b) = (c + d):(c – d), it is also known as Componendo and Dividendo.
• If a is proportional to b, then it means a = kb where k is a constant.
• If a is inversely proportional to b, then a = k/b, where k is a constant.
• Dividing or multiplying a ratio by a certain number gives an equivalent ratio.

Mean Proportion: Consider two ratios a:b = b:c then as per the rule of proportion product of the mean term is equal to the product of extremes, this means b² = ac, hence b = √ac is called mean proportion.

Difference between Ratio and Proportion

The comparison between Ratio and Proportion is tabulated below:

Ratio and Proportion Tricks

Let us learn here about some rules and tricks to solve question-related ratios and proportions:

• If u/v = x/y then uy = vx
• If u/v = x/y then u/x = v/y
• If u/v = x/y then v/u =y/x
• If u/v = x/y then (u + v)/v = (x + y)/y
• If u/v = x/y then (u + v)/v = (x - y)/y
• If u/v = x/y then (u + v)/(u - v) = (x + y)/(x - y)
• If a/b + c = b/a +c = c/ a + b then a + b + c ≠ 0 then a = b = c

Related Articles:

• Percentage
• Ratios and Percentages
• Fractions
• Ration & Proportion Solved Questions