Represent the rational number on number line 2 over-the
Answers
Answer:
Step-by-step explanation:
1. Represent 34 on the number line.
Solution:
Since the given rational number is greater than zero. So, it will always be represented on the right side of zero on the number line. So, first of all we need to divide the number line between zero and one into 4 equal parts and the third part of the four parts will be representation of 34 on number line. It can be represented as:
Represent 3/4 on the Number Line
2. Represent 45 on the number line.
Solution:
As we know that 45 is a positive and that too proper fraction, so it will lie at the right side of the zero and will be less than 1. To do so first we will divide number line between zero and one into 5 equal parts. 45will be the fourth part of five equal parts. Let us represent this on the number line:
Represent 4/5 on the Number Line
3. Represent −35on the number line.
Solution:
As we can see that the given fraction is a proper fraction bur with a negative sign. So, it will be smaller than zero but greater than -1. Hence, the fraction will lie between zero and negative one. To represent we will divide number line between 0 and -1 into 5 equal parts and the third part of the five parts will be −35. This can be represented as:
Represent -3/5 on the Number Line
All proper fractions can be represented on the number using above mentioned steps.