Asked by QUAAACK

To order the numbers from least to greatest, let's first simplify and convert them to a similar format.

1. **-5/40**: This simplifies to -1/8 or -0.125.
2. **2.075**: This is already in decimal form.
3. **2 4/34**: This can be converted to an improper fraction:
- Calculate \( 4/34 = 2/17 \) (simplifying 4/34).
- So, \( 2 4/34 = 2 + 2/17 = 2 + 0.11765 \approx 2.11765 \).
4. **6/16**: This simplifies to 3/8 or 0.375.
5. **15/24**: This simplifies to 5/8 or 0.625.

Now we have:
- \(-0.125\) (from -5/40)
- \(2.075\) (already a decimal)
- \(2.11765\) (from 2 4/34)
- \(0.375\) (from 6/16)
- \(0.625\) (from 15/24)

Now let's list them in decimal form:
- \(-0.125\)
- \(0.375\)
- \(0.625\)
- \(2.075\)
- \(2.11765\)

Now we can order them from least to greatest:
1. -0.125 (-5/40)
2. 0.375 (6/16)
3. 0.625 (15/24)
4. 2.075
5. 2.11765 (2 4/34)

Thus, the final ordered list from least to greatest is:
-5/40, 6/16, 15/24, 2.075, 2 4/34

To order the given numbers from greatest to least, let's first convert each of them to a decimal or improper fraction format where necessary.

1. **-15 3/25**: This is a mixed number. To convert it to a decimal:
- First, convert \( 3/25 \) to decimal: \( 3 \div 25 = 0.12 \).
- Then, combine with the whole number: \( -15 - 0.12 = -15.12 \).

2. **15.24**: This is already in decimal form.

3. **15**: This can also be written as \( 15.00 \) in decimal form for comparison.

Now we have:
- -15.12 (from -15 3/25)
- 15.24 (already in decimal form)
- 15.00 (already in decimal form)

Now, we can order them from greatest to least:
1. 15.24
2. 15.00
3. -15.12

So, the final ordered list from greatest to least is:
**15.24, 15, -15 3/25**.

To order the numbers from greatest to least, let's first convert all of them to decimal form where necessary.

1. **6.24**: This is already in decimal form.

2. **22/40**: This fraction simplifies to:
\[
\frac{22}{40} = \frac{11}{20}
\]
Converting \( \frac{11}{20} \) to decimal:
\[
11 \div 20 = 0.55
\]

3. **-24/35**: This fraction is already negative. We can convert it to decimal:
\[
-\frac{24}{35} \approx -0.6857 \quad (\text{approximately})
\]

4. **3 18/25**: This is a mixed number. To convert it to a decimal:
- First, convert \( \frac{18}{25} \) to decimal:
\[
18 \div 25 = 0.72
\]
- Then, combine with the whole number:
\[
3 + 0.72 = 3.72
\]

Now, we have all the numbers in decimal form:
- \(6.24\)
- \(0.55\) (from \(22/40\))
- \(-0.6857\) (from \(-24/35\))
- \(3.72\) (from \(3 18/25\))

Now we can order them from greatest to least:
1. \(6.24\)
2. \(3.72\)
3. \(0.55\)
4. \(-0.6857\)

Thus, the final ordered list from greatest to least is:
**6.24, 3 18/25, 22/40, -24/35**.

To order the numbers from greatest to least, let's convert everything to a consistent format (decimals) where necessary.

1. **0.68**: This is already in decimal form.

2. **-17**: This is already in whole number form.

3. **17 11/25**: This is a mixed number. To convert it to decimal:
- First, convert \( 11/25 \) to decimal:
\[
11 \div 25 = 0.44
\]
- Then combine with the whole number:
\[
17 + 0.44 = 17.44
\]

4. **-18/25**: Convert to decimal:
\[
-\frac{18}{25} = -0.72
\]

5. **0.75**: This is already in decimal form.

Now we have the numbers in decimal form:
- \(0.68\)
- \(-17\)
- \(17.44\) (from \(17 11/25\))
- \(-0.72\) (from \(-18/25\))
- \(0.75\)

Now let's order them from greatest to least:
1. **17.44** (from \(17 11/25\))
2. **0.75**
3. **0.68**
4. **-0.72** (from \(-18/25\))
5. **-17**

Thus, the final ordered list from greatest to least is:
**17 11/25, 0.75, 0.68, -18/25, -17**.

To order the numbers from least to greatest, we will first convert each number into a decimal or a simplified fraction, as necessary.

1. **12 28/32**:
- Convert \(28/32\) to decimal:
\[
\frac{28}{32} = \frac{7}{8} = 0.875
\]
- Thus, \(12 28/32 = 12 + 0.875 = 12.875\).

2. **12**: This is already in whole number form, or \(12.00\) in decimal.

3. **-9/24**: This simplifies to:
\[
\frac{-9}{24} = -\frac{3}{8} = -0.375
\]

4. **14/16**: This simplifies to:
\[
\frac{14}{16} = \frac{7}{8} = 0.875
\]

5. **12 15/40**:
- Convert \(15/40\) by simplifying:
\[
\frac{15}{40} = \frac{3}{8} = 0.375
\]
- Thus, \(12 15/40 = 12 + 0.375 = 12.375\).

Now, we can list all the numbers in decimal form:
- \(12.875\) (from \(12 28/32\))
- \(12.00\) (from \(12\))
- \(-0.375\) (from \(-9/24\))
- \(0.875\) (from \(14/16\))
- \(12.375\) (from \(12 15/40\))

Now let's order them from least to greatest:
1. **-0.375** (from \(-9/24\))
2. **0.875** (from \(14/16\))
3. **12.00** (from \(12\))
4. **12.375** (from \(12 15/40\))
5. **12.875** (from \(12 28/32\))

Thus, the final ordered list from least to greatest is:
**-9/24, 14/16, 12, 12 15/40, 12 28/32**.

To order the numbers from least to greatest, we need to convert everything into decimal form.

1. **17.95**: This is already in decimal form.

2. **9/20**: Convert to decimal:
\[
9 \div 20 = 0.45
\]

3. **-1/25**: Convert to decimal:
\[
-1 \div 25 = -0.04
\]

Now we have the numbers in decimal form:
- \(17.95\)
- \(0.45\) (from \(9/20\))
- \(-0.04\) (from \(-1/25\))

Now we can order them from least to greatest:
1. **-0.04** (from \(-1/25\))
2. **0.45** (from \(9/20\))
3. **17.95**

Thus, the final ordered list from least to greatest is:
**-1/25, 9/20, 17.95**.