*In order to write a ratio in the form '1:n', you must make the left-hand side of the ratio equal to 1.Alternatively, in order to write a ratio in the form 'n:1', you must make the right-hand side of the ratio equal to 1.We will learn how to divide a quantity in a given ratio and its application in the word problems on ratio.1. If he reduces his weight in the ratio 5 : 4, find his reduced weight.*

2 - Equivalent ratios Equivalent ratios are ratios which all have the same meaning.

For example : 1:4 , 2:8 , , 2000 All of these ratios have the same meaning: that the amount of variable 'b' is 4 times the amount of variable 'a'.

The specific questions you will be expected to answer will vary depending upon which examination board with which you are registered, but as a rule you will be required to: 1 - Dividing in a ratio Without realizing, you use ratios every day in order to divide and share out amounts fairly.

As a result, there will be questions within your GCSE maths exam where you will be required to use ratios in order to share out amounts of money or other items: (a) - Firstly, you need to find the total number of parts in the ratio.

The calculator solves for C = D * (A/B) Enter A, B, C and D. The calculator finds the values of A/B and C/D and compares the results to evaluate whether the statement is true or false.

A part-to-part ratio states the proportion of the parts in relation to each other. The ratio 1 : 2 is read as "1 to 2." This means of the whole of 3, there is a part worth 1 and another part worth 2.

You can calculate equivalent ratios by multiplying or dividing both sides by the same number.

In this way, ratios are very similar to fractions: (a) - The ratio of boys to girls is The highest common factor of 21 and 18 is 3 If you divide both sides by 3, the equivalent ratio is 7: 6 Therefore, the simplest form of this ratio is 7:6, meaning that there are 7 boys in the classroom for every 6 girls.

When scaling ratios up or down, always remember that the same unit of measurement must be applied to both sides; i.e. As a result, the piece of fabric must be 120mm wide.

4 - Writing a ratio in the form 1:n or n:1 As well as being able to write a ratio in its simplest form, you must also be able to write a ratio in the form: 1:n or n:1 where 'n' can be any whole number, fraction or decimal.

## Comments How To Solve Ratios Problems

## How to Calculate Ratios 9 Steps with Pictures - wikiHow

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A Sizeable Problem. This is a level 5 number activity from the Figure It Out series. It relates to Stage 8 of the Number Framework. A PDF of the student activity is.…

## Ratios and Proportions - Proportions - In Depth -

In problems involving proportions, we can use cross products to test whether two ratios are equal and form a proportion. To find the cross products of a.…

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Jul 19, 2016. There are a few key concepts to get down in order to ace ACT Math ratios. Let's go right into how the ACT will test you on ratios and break it.…

## Word Problems on Ratio - Math Only Math

We will learn how to divide a quantity in a given ratio and its application in the word problems on ratio. 1. John weights 65.7 kg. If he reduces his weight in the.…