RATIO AND PROPORTION
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The concept of ratio & proportion is an important for the aptitude exams like Bank PO & CRT exams. Questions based on this topic have asked individually or in data interpretation question set.
Ratio:
The ratio of number x to a number y is defined as
x / y
Some Important Posts:
Important properties of ratio –
- If we multiply the numerator & the denominator of a ratio by the same number ,the ratio remain unchanged
That is
- If we divide the numerator & the denominator of a ratio by the same number ,the ratio remain unchanged
That is
- Two or more than two ratio compared by equating the denominators of the ratios & then compared the numerators of the ratios.
If & thenwhich is greater than we have to equating both the denominator than compare
it is know that
- The ratio of two fractions can be expressed as a ratio of two integers
: =
- The multiplication of two ratios is as
=
- If = = = then
=
- If we have two equation of three variables then we cannot find any value of variables but with the help of ratio we can find the proportion between them is
Then : :
- If three quantities a ,b & c in proportion then then
- If , then ad = bc and (Alternando)
- If (Componendo and dividendo)
- If are four unequal numbers, then lies between minimum and maximum of all these ratios.
VARIATION:
Two quantities A and B are said to be varying with each other if there exists some relationship between A and B such that the change in A and B is uniform and governed by some rule.
Some typical examples of variation
- Area of a square is , hence area of a square is directly proportional to .
- If the number of men on a project is doubled, the number of days will be halved. This shows indirect variation.
- Expenses of a hostel are partly constant and partly vary with the number of occupants.
Direct proportion :
A varies directly to B, and then A is said to be in direct proportion to B. It is written as
A or A = kB
It can be understood with the typical example of percentage relating to expenses, consumption and price of the article. If A is directly proportional to B, it simply means that the ratio is constant. If A becomes double, B also become double; if A is reduced to one third, then B is also reduced to one third etc. Now suppose A is proportional to , it means
A = k or the ratio of A and , is constant.
Now take a different case, suppose z is directly proportional to x, when y is constant and directly proportional to ,, when x is constant, then
z x when y is constant and
z , when x is constant
Combining both the relations, we get,
z x
Inverse variation:
If A is inversely proportional to B, it can be written as:
A
A = , where k is a constant.
Joint or mixed variation:
If C is a quantity which is partly constant and partly varies with n, then
C = A + Bn
Where A and B are constant.
