Ratio, Rate & Speed

Students are able to represent the simplest form of Ratio

Students are able to use the ratio into real world problems

A ratio is said to be in its simplest form (a:b) when a and b have no common factors!

Example:

10 : 24 is not the simplest form, because 10 and 24 have common factor of 2!

Thus, the simple ratio is 5 : 12

Before, we see the example of ratio in decimals, how do we simplify ratio of fractions?

Example: simplify ratio of $\frac{2}{3}:\ \frac{5}{6}$  !

First, multiply both parts by 6

 $\frac{2}{3}\times6\ :\ \frac{5}{6}\times6$  

Result = 4 : 5

In general, using ratio to compare two quantities of the same unit is equivalent to using fraction.

Example 1 : 5:7 is equivalent to  $\frac{5}{7}$  

Example 2: a:b is equivalent to  $\frac{5}{3}$  . This means a = 5 and b = 3.

Ratio can also be used to make comparisons among three or more quantities.

Example, if x = 18, y = 27 and z= 54

Then, the ratio is, x:y:z = 18:27:54

After simplification,

x:y:z = 2:3:6

Forms of ratio ( using ":" and "/" signs)

Simplification of ratio

Real world problems

Ratio with three quantities.