Chapter 2.6, Problem 3CYU

To determine

Whether the ratios $\frac{2.8}{4.4}\text{and}\frac{1.4}{2.1}$ are equivalent ratios

Answer to Problem 3CYU

  $\text{No}$

Explanation of Solution

Given information:

The pair of ratios: $\frac{2.8}{4.4}\text{and}\frac{1.4}{2.1}$ .

Concept Used:

• Equivalent fractions are those fractions which have different numerators and denominators, but represent the same value or number. Equivalent fractions are reduced to the same fraction in their simplified forms.
• Least Common Denominator (LCD) is the smallest number that is divisible by the denominator of all the fractions that are being added or subtracted.
• If two fractions have the same denominator, then we can compare them by their numerators. The fraction with the greater numerator will be greater than the other fraction.

Calculation:

In order to check whether the fractions $\frac{2.8}{4.4}\text{and}\frac{1.4}{2.1}$ are equivalent or no, first reduce both the fractions in the simplest form. And then check whether both fractions are equal or no.

Here observe that in the first fraction $\frac{2.8}{4.4}$ , the HCF of numerator and denominator is 2. So the fraction can be simplified further dividing up and down by 2 as below.

  $\frac{2.8}{4.4}=\frac{1.4}{2.2}=\frac{0.7}{1.1}$

Also observe that in the second fraction $\frac{1.4}{2.1}$ the HCF of numerator and denominator is 7. So the fraction can be simplified further dividing up and down by 7 as and as shown below,

  $\frac{1.4}{2.1}=\frac{0.2}{0.3}$.

So, in reduced form the ratios are $\frac{0.7}{1.1}\text{and}\frac{0.2}{0.3}$ . The numerator of the first ratio is not equal to the numerator of the second, so they are not equal.

Thus, the given ratios are not equivalent.