Chapter 3.1, Problem 57PPS

a)

To determine

To represent: The given letter`s position on number line in fraction or mixed fraction form.

Answer to Problem 57PPS

Different letters are represented as:

  $A\left(\frac{4}{5}\right),B\left(\frac{9}{10}\right),C\left(1\frac{1}{5}\right),D\left(1\frac{7}{20}\right),E(1\frac{3}{5})$

Explanation of Solution

Given information: 

In given number line, the distance between two given values 1 and 1.5 is 0.5,that isdivide into ten equal parts, so that each equal part on this number line is $\frac{0.5}{10}=0.05$

Formula/concept used: The position of each letter after value 0.5 will be multiplied by 0.05 to get its position in decimal form and then it will be converted in fraction form.

Calculation:

A is at sixth position from 0.5, so its position is

$0.5+0.05\times 6=0.5+0.3=0.8$

Similarly, B is at eighth position from 0.5, so its position is

  $0.5+0.05\times 8=0.5+0.4=0.9$

So, C is at fourth position from value 1, so its position is

$1+0.05\times 4=1+0.2=1.2$

So, D is at seventh position from value 1, so its position is

  $1+0.05\times 7=1+0.35=1.35$

So, E is at second position from 1.5, so its position is

  $1.5+0.05\times 2=1.5+0.1=1.6$

Conclusion:In fraction form, letters positions are written as:

A`s position $=\frac{08}{10}=\frac{4}{5}$

B`s position

$=\frac{9}{10}$

C`s position $=\frac{12}{10}=1\frac{1}{5}$

D`s position = $\frac{135}{100}=\frac{27}{20}=1\frac{7}{20}$

E`s position $\frac{16}{10}=1\frac{6}{10}=1\frac{3}{5}$

b)

To determine

To write: The inequality using the position of points E and C.

Answer to Problem 57PPS

The positions of points E and C form the following inequalities:

  $1\frac{3}{5}>1\frac{1}{5}$

Explanation of Solution

From result of part (a), given letters are represented in fraction form as:

  $A\left(\frac{4}{5}\right),B\left(\frac{9}{10}\right),C\left(1\frac{1}{5}\right),D\left(1\frac{7}{20}\right),E(1\frac{3}{5})$

Out of above given fractions, E`s position is greater than position of point C, so in inequality form, it is written as:

  $1\frac{3}{5}>1\frac{1}{5}$