Put 1 1/9, 1 1/6, 1 3/12, 0.01, and 0.062 in ascending order
0.01, 0.062, 1 1/9, 1 3/12, 1 1/6
To put the numbers in ascending order, we need to arrange them from smallest to largest. Let's begin:
1. Let's convert all the mixed numbers into improper fractions:
- 1 1/9 = (9/9) + (1/9) = 10/9
- 1 1/6 = (6/6) + (1/6) = 7/6
- 1 3/12 = (12/12) + (3/12) = 15/12
2. Now, let's write all the numbers in decimal form:
- 10/9 = 1.111...
- 7/6 = 1.166...
- 15/12 = 1.25
3. Finally, we put all the numbers in ascending order:
- 0.01
- 0.062
- 1.111...
- 1.166...
- 1.25
Therefore, the numbers in ascending order are 0.01, 0.062, 1.111..., 1.166..., and 1.25.
To put these numbers in ascending order, we need to arrange them from lowest to highest. Here are the steps to do that:
Step 1: Convert any mixed numbers or fractions to decimals:
- 1 1/9 = 1 + 1/9 = 1.111...
- 1 1/6 = 1 + 1/6 = 1.166...
- 1 3/12 = 1 + 3/12 = 1.25
So, the numbers in decimal form are:
- 1 1/9 = 1.111...
- 1 1/6 = 1.166...
- 1 3/12 = 1.25
- 0.01
- 0.062
Step 2: Arrange the decimals in ascending order:
- 0.01
- 0.062
- 1.111...
- 1.166...
- 1.25
Step 3: Convert any repeating decimal to a fraction:
- 1.111... = 1 1/9 (as mentioned earlier)
- 1.166... ≈ 1 1/6 (rounded to the nearest thousandth)
Now, the numbers in ascending order are:
- 0.01
- 0.062
- 1 1/9
- 1 1/6
- 1 3/12
Therefore, the final arrangement in ascending order is:
0.01, 0.062, 1 1/9, 1 1/6, 1 3/12