0.5, 3/5, 1 3/4, 0.9 in order from least to greatest

You have to change them all to decimal form to compare them. I would be happy to check your answer.

For example 3/5 = .6

0.5,3/5,.9,1 3/4

I'd like figure it out

To order the given numbers from least to greatest, we need to compare them and arrange them in ascending order. Here's how you can do it:

1. Convert all the numbers into a common format, such as decimals or improper fractions.

The given numbers are a mix of decimals and fractions. Let's convert them all to decimals for easier comparison:

0.5, 0.6, 1.75, 0.9

2. Compare the numbers.

Start by comparing the first two numbers:

0.5 < 0.6

Since 0.5 is smaller than 0.6, we place it first in the ordering.

The updated list is now: 0.5, (0.6), 1.75, 0.9

Next, compare the next number, 1.75, with the two numbers already in the list:

0.5 < 1.75

Since 0.5 is smaller than 1.75, we keep it as the first number.

Next, compare 0.6 and 1.75:

0.6 < 1.75

Since 0.6 is smaller than 1.75, we place it second in the ordering.

The updated list is now: 0.5, 0.6, (1.75), 0.9

Finally, compare the remaining number, 0.9, with the three numbers already in the list:

0.5 < 0.9

Since 0.5 is smaller than 0.9, we keep it as the first number.

Next, compare 0.6 and 0.9:

0.6 < 0.9

Since 0.6 is smaller than 0.9, we place it second in the ordering.

The updated list is now: 0.5, 0.6, (1.75), (0.9)

3. Arranging the numbers in ascending order:

Now, we have only one number left, 1.75, in the unplaced section. Since it is the largest among the remaining numbers, we place it last.

The final ordered list from least to greatest is: 0.5, 0.6, 0.9, 1.75.

Therefore, the numbers in order from least to greatest are 0.5, 0.6, 0.9, 1.75.