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To find out how much the temperature needs to rise or fall to return to the initial temperature of 67 °F, let's follow the changes step by step:

1. Starting temperature: 67 °F
2. Temperature drops by 6 °F:
\[
67 °F - 6 °F = 61 °F
\]
3. Temperature rises by 10 °F:
\[
61 °F + 10 °F = 71 °F
\]

Now, we need to determine how to return to the starting temperature of 67 °F from the current temperature of 71 °F:
\[
71 °F - 67 °F = 4 °F
\]

Since the current temperature is above the initial temperature, it needs to fall to return to 67 °F.

Thus, the temperature needs to fall **4 °F**.

The correct response is: **Fall 4 °F**.

To solve the expression \(|-7| + |6|\), we need to find the absolute values of the numbers:

1. \(|-7| = 7\) (the absolute value of -7 is 7).
2. \(|6| = 6\) (the absolute value of 6 is 6).

Now, we can add these two absolute values together:

\[
|-7| + |6| = 7 + 6 = 13
\]

So, \(|-7| + |6| = 13\).

Let's analyze the changes in height of the Snake Eyes Roller Coaster step by step:

1. The coaster starts at ground level (0 feet).
2. It climbs **125 feet**:
\[
0 + 125 = 125 \text{ feet}
\]
3. It drops **60 feet**:
\[
125 - 60 = 65 \text{ feet}
\]
4. It climbs **135 feet**:
\[
65 + 135 = 200 \text{ feet}
\]

Now, the current height of the coaster is **200 feet**. To get back to ground level (0 feet), it needs to drop down from 200 feet:

To find out how far the coaster needs to drop:
\[
200 - 0 = 200 \text{ feet}
\]

Thus, the coaster needs to **drop 200 feet** to return to ground level.

The correct response is: **drop 200 feet**.

To find out how much of the yard Amnar and Aayush cut together, we need to add the fractions of grass they each cut:

- Amnar cut \( \frac{16}{1} \) (which is essentially the whole yard, or 100%).
- Aayush cut \( \frac{13}{1} \).

Now, if we add these fractions:
\[
\frac{16}{1} + \frac{13}{1} = \frac{16 + 13}{1} = \frac{29}{1}
\]

However, since this doesn't make sense because the total yard cannot exceed \( \frac{16}{1} + \frac{13}{1} \) unless both boys are cutting separate portions of the grass, let’s consider some reasonable assumptions.

Given that both fractions (16 and 13) are likely to represent portions of a whole yard when interpreted correctly, let’s assume the intended problem is about cutting parts of a yard represented as \( \frac{3}{4} \) of the total yard instead.

Now let’s analyze the options closely:

1. **The boys cut almost the whole yard.** - This could imply they cut around 1 whole yard which is likely not true since they cut portions.

2. **Together the boys cut three-fourths of the yard.** - If \( \frac{16}{16} + \frac{13}{16} = \frac{29}{16} \), that yields more than 1 which is incorrect.

3. **The boys cut exactly half of the yard.** - Incorrect because they collectively cut \( \frac{29}{16} \) which is more than that.

4. **Together the boys did not cut half of the yard.** - This statement holds since they cut much more than half.

Given that:

If fractions exist to cut yard portions they likely belong to, thus the last option **is the most plausible because together they amount to exceeding half of total yardage.**

Hence, the correct response is: **Together the boys did not cut half of the yard.**

To find the total number of cakes sold, we need to calculate the total for each type of cake and then sum them up.

1. Chocolate cakes sold: **214**
2. Red velvet cakes sold: **212**
3. Carrot cakes sold: **34**
4. Sugar cream cakes sold: **312**

Now, let's add these numbers together:

\[
214 + 212 + 34 + 312
\]

Calculating step by step:

1. \( 214 + 212 = 426 \)
2. \( 426 + 34 = 460 \)
3. \( 460 + 312 = 772 \)

So, the total number of cakes sold is **772** cakes.

### Reviewing the provided responses:
- **9 cakes**
- **8 and 1 half cakes**
- **7 and 1 half cakes**
- **7 and 6 sevenths cakes**

It appears none of the options exactly match **772 cakes**. Please double check the context or values in case there is additional information or modifications in question.

The calculated total is **772 cakes**.