Equivalent Ratio – Concept and Its Uses
Introduction:
Definition of equivalent ratio:
The ratio which we get by multiplying or dividing by the same non-zero number to the two terms of the given ratio is called an equivalent ratio. Equivalent ratios are ratios that express the same relationship.
Obtaining an equivalent fraction:
To get a ratio equivalent to the given ratio, we begin by representing the ratio in the form of a fraction. Then multiplying and dividing the first term and second term by the same non-zero number, we get an equivalent ratio. At last, it is represented in the ratio form.
Example:
Find an equivalent ratio of 3/2
.
Solution: The fractional form of the ratio given is 3/2
.
Step 1: Multiply by a non-zero number to both numerator and denominator. In this case, let us take.
3 × 4 / 2 × 4= 12 / 8
Step 2: Write the equivalent fraction in the ratio form, i.e., 12:8.
Therefore, 12:8 is the equivalent ratio of 3:2.
5.2.1 Finding equivalent ratios using multiplications
Example 1: Write three equivalent ratios to 5:6.
Solution: The fractional form of the ratio given is 5/6
.
Step 1: Multiply by a non-zero number to both numerator and denominator. In this case, let us take 2, 3 and 4 since we are finding three equivalent ratios.
5 × 2 / 6 × 2=10/12
5 × 3 / 6 × 3=15/18
5 × 4 / 6 × 4=20/24
Step 2: Write the equivalent fraction in the ratio form, i.e., 10:12, 15:18 and 20:24.
Therefore 10:12, 15:18 and 20:24 are the equivalent ratios of 5:6.
Example 2: A team of disaster response force consists of 6 doctors for every 25 nurses. If the ratio remains constant and there are 30 doctors, find the numbers of nurses the team must have.
Solution:
First method: Make a table with equivalent ratios. We know that ratio of doctors to that of nurses is 6:25.
Step 1: Multiply both terms of ratio by same non-zero number till we obtain 30 doctors.
Step 2: Check the corresponding nurses when the doctors are 30. Hence, 125 nurses have to be arranged for 30 doctors.
Second method:
Solution:
Ratio of doctors to that of nurses is 6:25. Guess the non-zero number by which 6 is to be multiplied to get 30. Use the same number to multiply 25 as well. In this case, take 5.
Step 1: Write the ratio as a fraction and multiply 5 to both terms.
6 / 25 =6 × 5 / 25 × 5 =30/125
5.2.2 Finding equivalent ratios using divisions
Example 1: Jane is sharing pens. The table below shows you the ratio in which they are shared. If Jane keeps the ratio same and gives 7 black pens to his friend, then find how many blue pens he must also share.
Solution:
Step 1: Divide 56 and 32 by the same non-zero number until we get 7 black pens; let’s start by 4.
We get 56 ÷ 4 = 14 and 32 ÷ 4 = 8.
Step 2: Divide 56 and 32 by the same non-zero number until we get 7 black pens; let’s take 8.
We get 56 ÷ 8 = 7 and 32 ÷ 8 = 4.
Therefore, we understand that Jane gives 4 blue pens and 7 black pens.
Example 2: Shawn needs 180 kilograms of meat to feed his 8 pet dragons. Find the quantity of meat Shawn needs to feed 2 dragons only.
Solution:
Step 1: Divide 180 and 8 by the same non-zero number until we get 2 dragons; let’s start by 2.
We get 180 ÷ 2 = 90 and 8 ÷ 2 = 4.
Step 2: Divide 90 and 4 by the same non-zero number until we get 2 dragons; let’s start by 2.
We get 90 ÷ 2 = 45 and 4 ÷ 2 = 2.
Therefore, we understand that Shawn needs 45 kilograms of meat.
5.2.3 Finding equivalent ratios
Example 1: Which of the following ratios are equivalent to 16:20:
2:3, 4:5, 18:22, 20: 25
Solution:
Step 1: Make a table of equivalent ratios, take the given ratio and reduce it to the lowest possible value. Take 4 and divide both the terms.
Step 2: Make equivalent ratios with the now reduced form, i.e., 4:5.
Therefore, 4:5, 20:25 are the equivalent ratios to 16:20.
Example 2: Which of the following ratios are equivalent to 45:81:
30:54, 14:5, 18:20, 35: 25
Solution:
Step 1: Make a table of equivalent ratios, take the given ratio and reduce it to the lowest possible value. Take 9 and divide both the terms.
Step 2: Make equivalent ratios with the now reduced form, i.e., 5:9.
Therefore, 5:9, 30:54 are the equivalent ratios to 45:81.
What have we learned?
• Understanding equivalent ratios
• Find equivalent ratios using multiplications
• Find equivalent ratios using divisions
• Find equivalent ratios
Mind Map :
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