Chapter 3.6, Problem 3BGP

To determine

To calculate: have to calculate the subtraction of the given fraction.

Answer to Problem 3BGP

The subtraction of the given fraction is $\frac{13}{24}$ .

Explanation of Solution

Given data: $7\frac{1}{6}-6\frac{5}{8}$

Some simple steps have to follow to add or subtract the, unlike fractions.

Step-I: Change the Mixed fraction into an improper fraction (if any).

  $\begin{array}{l}=7\frac{1}{6}-6\frac{5}{8}\\ =\frac{7\times 6+1}{6}-\frac{6\times 8+5}{8}\end{array}$

  $=\frac{43}{6}-\frac{53}{8}$ [Unlike fraction]

Step-II: Calculate the ‘Least Common Multiple’ (LCM) of the denominator of the given fraction.

  $\begin{array}{cc}2& 6,8\\ 2& 3,4\\ & 3,2\end{array}$

Now, Least Common Multiple (LCM) $=2\times 2\times 3\times 2=24$

Step-III: Convert the each fraction into an equivalent fraction by multiplies and divide of its denominator and numerator to the equal to the ‘Least Common Multiple’ (LCM) obtained in step -II.

  $=\frac{43\times 4}{6\times 4}-\frac{53\times 3}{8\times 3}$

  $=\frac{172}{24}-\frac{159}{24}$ [Like fraction]

Step-IV: Add or subtract the like fraction to convert into a simple form.

  $\begin{array}{l}=\frac{172}{24}-\frac{159}{24}\\ =\frac{172-159}{24}\\ =\frac{13}{24}\end{array}$