Chapter 5.2, Problem 9E

To determine

To find: The length of ribbon $5\frac{1}{4}$ feet is sufficient or not to cut into two pieces of length $3\frac{3}{4}$ feet and $1\frac{3}{4}$ feet.

Answer to Problem 9E

The length of the ribbon is not enough to cut into two pieces of length $3\frac{3}{4}$ feet and $1\frac{3}{4}$ feet.

Explanation of Solution

Given information: You have $5\frac{1}{4}$ feet of ribbon. You want to cut one piece that is $3\frac{3}{4}$ feet long one that is $1\frac{3}{4}$ feet long.

Calculation: If the sum of the length of the two pieces of ribbon which have to cut from the original ribbon, is equal or less than the length of original ribbon, only in this condition we can cut the ribbon into two pieces as of the requirement.

If the sum of the two pieces of ribbon which have to cut from the original ribbon is greater than the length of original ribbon, in this situation the ribbon can’t be cut into two pieces as of the requirement.

Here is description,

Step1. The length of the original ribbon in the form of improper fraction is,

$\begin{array}{l}=5\frac{1}{4}\\ =\frac{(4\times 5)+1}{4}\\ =\frac{20+1}{4}\\ =\frac{21}{4}\end{array}$

The length of the first piece of ribbon in the form of improper fraction is,

$\begin{array}{l}=3\frac{3}{4}\\ =\frac{(4\times 3)+3}{4}\\ =\frac{12+3}{4}\\ =\frac{15}{4}\end{array}$

Length of the second piece of ribbon in the form of improper fraction is,

$\begin{array}{l}=1\frac{3}{4}\\ =\frac{(4\times 1)+3}{4}\\ =\frac{4+3}{4}\\ =\frac{7}{4}\end{array}$

Step2. Sum of the length of the two pieces of ribbon is,

$\begin{array}{l}=\frac{15}{4}+\frac{7}{4}\\ =\frac{15+7}{4}\\ =\frac{22}{4}\end{array}$ , Taking $4$ as the LCM (Least common multiple)

Step3. It is found that, $\frac{21}{4}\langle \frac{22}{4}$ ,that is the length of the ribbon is less than the sum of the length of two pieces of ribbon.

Hence, The ribbon is not enough to into two pieces as of the requirement.