.

To order the numbers from least to greatest, let's first convert them into decimal forms or improper fractions for easier comparison:

1. 6 5/10 = 6.5
2. -6 = -6.0
3. 2/4 = 0.5

Now, we can compare the numbers:

• -6.0 (least)
• 0.5
• 6.5 (greatest)

Putting them in order from least to greatest:

-6, 2/4, 6 5/10

Put these numbers in order from greatest to least.

17/25, -26/40, 10

To order the numbers from greatest to least, we need to convert all the numbers to the same format, preferably decimal form for easy comparison.

1. 10 = 10.0
2. 17/25 = 0.68 (because 17 ÷ 25 = 0.68)
3. -26/40 = -0.65 (because -26 ÷ 40 = -0.65)

Now we can compare the numbers:

• 10.0
• 0.68
• -0.65

Putting them in order from greatest to least:

10, 17/25, -26/40

.
Put these numbers in order from least to greatest.

6.5, -14/20, 6.2

To order the numbers from least to greatest, let's first convert \(-14/20\) to a decimal.

1. 6.5 = 6.5
2. 6.2 = 6.2
3. -14/20 = -0.7 (since \(-14 ÷ 20 = -0.7\))

Now we can compare the numbers:

• -0.7
• 6.2
• 6.5

Putting them in order from least to greatest:

-14/20, 6.2, 6.5

.
Put these numbers in order from least to greatest.

6 10/25, 6.5, -12/24

Let's first convert all the numbers into a comparable format, preferably decimal form.

1. 6 10/25: To convert this mixed number to a decimal:

   • First, convert \(10/25\) to a decimal, which is \(0.4\).
   • Then, add it to \(6\): \(6 + 0.4 = 6.4\).

2. 6.5 is already in decimal form.

3. -12/24: Convert this fraction to a decimal:

   • \(-12/24 = -0.5\).

Now we have:

• 6 10/25 = 6.4
• 6.5 = 6.5
• -12/24 = -0.5

Now we can order them:

• -0.5 (least)
• 6.4
• 6.5 (greatest)

Putting them in order from least to greatest:

-12/24, 6 10/25, 6.5.

.
Put these numbers in order from greatest to least.

-0.2, 4 12/30, 4.

Let's first convert the mixed number \(4 \frac{12}{30}\) into a decimal for easier comparison.

1. 4 \(\frac{12}{30}\):
   • First, simplify \( \frac{12}{30} \) to \( \frac{2}{5} = 0.4 \).
   • Then, add it to \(4\): \(4 + 0.4 = 4.4\).

Now we have:

• 4.4 (equivalent to \(4 \frac{12}{30}\))
• 4 (already in decimal form)
• -0.2 (already in decimal form)

Now we can order them from greatest to least:

• 4.4 (greatest)
• 4
• -0.2 (least)

Putting them in order from greatest to least:

4 \frac{12}{30}, 4, -0.2.

Put these numbers in order from greatest to least.

18, -7, -4/25

To order the numbers \(18\), \(-7\), and \(-\frac{4}{25}\) from greatest to least, we need to convert \(-\frac{4}{25}\) into a decimal:

1. 18 (already in decimal form)
2. -7 (already in decimal form)
3. -\frac{4}{25}: To convert this to a decimal, divide \(-4\) by \(25\):
   • \(-\frac{4}{25} = -0.16\).

Now we have:

• 18
• -7
• -0.16

Now we can order them from greatest to least:

1. 18 (greatest)
2. -0.16
3. -7 (least)

Putting them in order from greatest to least:

18, -\frac{4}{25}, -7.