Put the numbers in ascending order.
.062,, 1 1/9, 1 1/6, 0.01, 1 3/12
0.01, .062, 1 1/9, 1 1/6, 1 3/12
To put the numbers in ascending order, follow these steps:
1. Convert all mixed fractions to improper fractions:
- 1 1/9 = 10/9
- 1 1/6 = 7/6
- 1 3/12 = 15/12
2. Write all the numbers in decimal form:
- .062
- 10/9 ≈ 1.11
- 7/6 ≈ 1.17
- 0.01
- 15/12 ≈ 1.25
3. Arrange the numbers in ascending order:
- .062 < 0.01 < 1.11 < 1.17 < 1.25
Therefore, the numbers in ascending order are:
.062, 0.01, 1.11, 1.17, 1.25.
To put the numbers in ascending order, follow these steps:
1. First, convert any mixed numbers to improper fractions. In this case, the mixed numbers are "1 1/9" and "1 3/12". To convert "1 1/9" to an improper fraction, multiply the whole number (1) by the denominator (9) and add the numerator (1) to get 10/9. Similarly, for "1 3/12", multiply the whole number (1) by the denominator (12) and add the numerator (3) to get 15/12.
So, the numbers are now: 0.062, 10/9, 15/12, 0.01.
2. Next, compare the decimal and fraction numbers. Start with the smallest number and gradually work your way up.
The decimal numbers in this case are 0.062 and 0.01. When comparing these two numbers, we can see that 0.01 is smaller than 0.062. Therefore, we write 0.01 first.
The fraction numbers are 10/9 and 15/12. To compare these, we need to find a common denominator. The least common multiple of 9 and 12 is 36. We can convert 10/9 to 40/36 and 15/12 to 45/36. Now, we can see that 40/36 is smaller than 45/36. Therefore, we write 10/9 (or you can write it as 1 1/9) before 1 3/12.
Arranging the numbers in ascending order, we get:
0.01, 1 1/9, 1 3/12, 0.062.