Asked by Missyyyyyy Catieeeeeee🫶(Connex-Us Q&A)

To compare the ratios 3:5 and 2:3, we can calculate their decimal representations or find a common term.

1. **Calculate the decimal values**:
- The ratio \(3:5\) can be represented as \(3 ÷ 5 = 0.6\).
- The ratio \(2:3\) can be represented as \(2 ÷ 3 \approx 0.6667\).

2. **Compare**:
- \(0.6 < 0.6667\)

Thus, we can conclude that \(3:5 < 2:3\).

The correct response is:
**3:5 < 2:3**
**ratio of 3 to 5 is less than ratio of 2 to 3**.

To determine which type of cracker has less fat per cracker, we can calculate the amount of fat per cracker for each type.

### Cracker A
- **8 grams of fat for 10 crackers**:
\(\frac{8 \text{ grams}}{10 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

- **16 grams of fat for 20 crackers**:
\(\frac{16 \text{ grams}}{20 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

- **24 grams of fat for 30 crackers**:
\(\frac{24 \text{ grams}}{30 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

- **32 grams of fat for 40 crackers**:
\(\frac{32 \text{ grams}}{40 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

- **40 grams of fat for 50 crackers**:
\(\frac{40 \text{ grams}}{50 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

- **48 grams of fat for 60 crackers**:
\(\frac{48 \text{ grams}}{60 \text{ crackers}} = 0.8 \text{ grams per cracker}\)

**Average for Cracker A**: 0.8 grams per cracker

### Cracker B
- **6 grams of fat for 12 crackers**:
\(\frac{6 \text{ grams}}{12 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

- **12 grams of fat for 24 crackers**:
\(\frac{12 \text{ grams}}{24 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

- **18 grams of fat for 36 crackers**:
\(\frac{18 \text{ grams}}{36 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

- **24 grams of fat for 48 crackers**:
\(\frac{24 \text{ grams}}{48 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

- **30 grams of fat for 60 crackers**:
\(\frac{30 \text{ grams}}{60 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

- **36 grams of fat for 72 crackers**:
\(\frac{36 \text{ grams}}{72 \text{ crackers}} = 0.5 \text{ grams per cracker}\)

**Average for Cracker B**: 0.5 grams per cracker

### Conclusion
- **Cracker A**: 0.8 grams of fat per cracker
- **Cracker B**: 0.5 grams of fat per cracker

Thus, **Cracker B** has less fat per cracker.

The correct response is:
**Cracker B**.

To compare the ratios \(2:5\) and \(3:4\), we need to look for tables that maintain the ratio integrity, allowing for easy comparison of their values.

Let's analyze each option:

1. **Table 1**:
```
2 5
4 10
3 4
6 8
```
This table has the proper pairs for \(2:5\) (2, 5) and \(4:10\). However, it also includes \(3:4\) and \(6:8\), which do not help in comparing \(2:5\) and \(3:4\) effectively.

2. **Table 2**:
```
2 5
3 10
4 15
5 20
6 25
3 4
4 8
5 12
6 16
7 20
```
Here, we have the ratio \(2:5\) represented and also pairs that aren't maintaining the specific ratios needed for comparison. For example, \(3:10\) does not directly relate to \(3:4\).

3. **Table 3**:
```
2 5
6 15
10 25
3 4
9 12
16 20
```
While \(2:5\) is represented correctly, \(6:15\) and \(10:25\) are multiples of \(2:5\) but do not facilitate a direct comparison with \(3:4\).

4. **Table 4**:
```
2 5
4 10
6 15
8 20
10 25
3 4
6 8
9 12
12 16
15 20
```
This table shows \(2:5\) correctly, and \(4:10\), \(6:15\), \(8:20\), and \(10:25\) all maintain a relationship to \(2:5\). The entries for \(3:4\) (3,4), \(6:8\), \(9:12\), etc., also hold true with \(3:4\).

### Conclusion
Among these options, **Table 4** offers the best setup for comparing both ratios effectively, as it maintains multiple valid proportional entries for each ratio.

The correct response is:
**Table 4**.

To find the values of \( A \) and \( B \) in the first table that correspond with the ratios \( 7:4 \) and \( 12:5 \), we can calculate the missing values based on the established proportion.

### Given Ratios
1. \( 7:4 \)
2. \( 12:5 \)

### Completing the First Table

In the first table, we can see a pattern based on multiplying:

- For every increase of \( 7 \) in the first column (the number of "parts" from the ratio), there is a corresponding increase of \( 4 \) in the second column.

Using this to fill in the missing values:

- The last entry visible in the first table is \( 28 : 16 \).
- The next entry, \( A \), would be \( 28 + 7 = 35 \), and \( B \) would be \( 16 + 4 = 20 \).

So, we can fill in:
- \( A = 35 \)
- \( B = 20 \)

### Completing the Second Table

In the second table, we are also given the \( 12:5 \) ratio. Continuing the same increment pattern:

- To find how values are increasing in the second table:
- Starting at \( 12:5 \), the next increment would theoretically follow the proportions, just like before:
- If \( 12 \) increases by \( 12 \): \( 12, 24, 36, 48, 60 \).
- The corresponding values by multiplying by the scaling factor related to \( 5 \) (i.e., \( \frac{5}{12} \)) would yield:
- \( 5, 10, 15, 20, 25 \)

Both tables have shown consistent patterns for maintaining ratios.

### Conclusion
The final values complete as follows:
- For the first table: \( A = 35 \) and \( B = 20 \).

The correct response is:
**A = 35 and B = 20.**

To compare the ratios \(16:18\) and \(5:6\), we can first convert them to their decimal (or fractional) equivalents, and then compare those values.

### Converting the Ratios

1. **For the ratio \(16:18\)**:
\[
\frac{16}{18} = \frac{8}{9} \approx 0.8889
\]

2. **For the ratio \(5:6\)**:
\[
\frac{5}{6} \approx 0.8333
\]

### Comparison of the Two Ratios
- **Decimal Value**:
- \(16:18 \approx 0.8889\)
- \(5:6 \approx 0.8333\)

Comparing these values:
- \(0.8889 > 0.8333\)

### Conclusion
Thus, the ratio \(16:18\) is greater than the ratio \(5:6\).

The correct response is:
**16:18 is greater. ratio of 16 to 18 is greater.**

You're welcome! :D If you have any more questions or need further assistance, feel free to ask. I'm here to help!