Asked by QUAAACK

To order the numbers from greatest to least, we first convert all numbers to a common format for easy comparison.

1. **-10/16**: This fraction simplifies to -5/8, which is approximately -0.625.
2. **7**: This number is already in decimal form.
3. **7.375**: This number is also in decimal form.

Now, we have the following values for comparison:

- -0.625 (from -10/16)
- 7
- 7.375

Now we can order them from greatest to least:

1. 7.375
2. 7
3. -0.625 (or -10/16)

So the final order from greatest to least is:

**7.375, 7, -10/16**.

To order the numbers \( \frac{26}{40}, -7, 0.25, -7 \frac{24}{25} \) from greatest to least, we first convert them into a common format (decimals) for easy comparison.

1. **\( \frac{26}{40} \)**: This fraction simplifies to \( \frac{13}{20} \), which is \( 0.65 \).
2. **\( -7 \)**: This is already in decimal format as \( -7.0 \).
3. **\( 0.25 \)**: This is already in decimal format.
4. **\( -7 \frac{24}{25} \)**: This is a mixed number. To convert it to decimal, we calculate:
\[
-7 \frac{24}{25} = -7 - \frac{24}{25} = -7 - 0.96 = -7.96
\]

Now we have the following values:

- \( 0.65 \) (from \( \frac{26}{40} \))
- \( -7.0 \) (from \( -7 \))
- \( 0.25 \)
- \( -7.96 \) (from \( -7 \frac{24}{25} \))

Next, let's compare these values:

1. \( 0.65 \)
2. \( 0.25 \)
3. \( -7.0 \)
4. \( -7.96 \)

Now we can order them from greatest to least:

1. \( 0.65 \) (from \( \frac{26}{40} \))
2. \( 0.25 \)
3. \( -7.0 \)
4. \( -7.96 \) (from \( -7 \frac{24}{25} \))

So the final order from greatest to least is:

**\( \frac{26}{40}, 0.25, -7, -7 \frac{24}{25} \)**.

To order the numbers \(-\frac{7}{28}, 9.05, -9, \frac{6}{25}\) from greatest to least, we will first simplify and convert all values to decimal form for easier comparison.

1. **\(-\frac{7}{28}\)**: This fraction simplifies to \(-\frac{1}{4}\) which is \(-0.25\).
2. **\(9.05\)**: This number is already in decimal form.
3. **\(-9\)**: This is already in decimal form.
4. **\(\frac{6}{25}\)**: To convert this fraction to decimal, we perform the division:
\[
\frac{6}{25} = 0.24
\]

Now we have the following values in decimal form:

- \(-0.25\) (from \(-\frac{7}{28}\))
- \(9.05\)
- \(-9\)
- \(0.24\) (from \(\frac{6}{25}\))

Now we can compare and order these values from greatest to least:

1. \(9.05\)
2. \(-0.25\)
3. \(0.24\)
4. \(-9\)

Now let's put them in the correct order:

**\(9.05, \frac{6}{25}, -\frac{7}{28}, -9\)**.

In terms of the original values, the order from greatest to least is:

**\(9.05, \frac{6}{25}, -\frac{7}{28}, -9\)**.

To order the numbers \( \frac{9}{30}, -\frac{8}{10}, -\frac{2}{20} \) from greatest to least, we first simplify and convert them into decimal form for easier comparison.

1. **\( \frac{9}{30} \)**: This simplifies to \( \frac{3}{10} = 0.3 \).
2. **\( -\frac{8}{10} \)**: This is \( -0.8 \).
3. **\( -\frac{2}{20} \)**: This simplifies to \( -\frac{1}{10} = -0.1 \).

Now we have the following values:

- \( 0.3 \) (from \( \frac{9}{30} \))
- \( -0.8 \) (from \( -\frac{8}{10} \))
- \( -0.1 \) (from \( -\frac{2}{20} \))

Now we can order them from greatest to least:

1. \( 0.3 \)
2. \( -0.1 \)
3. \( -0.8 \)

So the final order from greatest to least is:

**\( \frac{9}{30}, -\frac{2}{20}, -\frac{8}{10} \)**.

To order the numbers \(1, -\frac{2}{16}, 0.375, 0.875, -\frac{39}{40}\) from greatest to least, let's convert any fractions to decimal form for easier comparison.

1. **\( -\frac{2}{16} \)**: This simplifies to \( -\frac{1}{8} = -0.125 \).
2. **\( -\frac{39}{40} \)**: To convert this fraction to decimal form, we calculate:
\[
-\frac{39}{40} = -0.975
\]

Now let's list all the numbers in decimal form:

- \( 1 \)
- \( -0.125 \) (from \( -\frac{2}{16} \))
- \( 0.375 \)
- \( 0.875 \)
- \( -0.975 \) (from \( -\frac{39}{40} \))

Now we can order these values from greatest to least:

1. \( 1 \)
2. \( 0.875 \)
3. \( 0.375 \)
4. \( -0.125 \)
5. \( -0.975 \)

So the final order from greatest to least is:

**\( 1, 0.875, 0.375, -\frac{2}{16}, -\frac{39}{40} \)**.

To order the numbers \(-15, -15 \frac{21}{25}, \frac{15}{25}\) from greatest to least, let's first convert the mixed number and fraction into decimal form for easier comparison.

1. **\(-15\)**: This is already in decimal form as \(-15.0\).
2. **\(-15 \frac{21}{25}\)**: To convert this mixed number into decimal form:
\[
-15 - \frac{21}{25} = -15 - 0.84 = -15.84
\]
3. **\(\frac{15}{25}\)**: This fraction simplifies to \(\frac{3}{5}\), which is equal to:
\[
\frac{15}{25} = 0.6
\]

Now we have the following numbers in decimal form:

- \(-15.0\)
- \(-15.84\)
- \(0.6\)

Now we can order these values from greatest to least:

1. \(0.6\)
2. \(-15.0\)
3. \(-15.84\)

So the final order from greatest to least is:

**\(\frac{15}{25}, -15, -15 \frac{21}{25}\)**.