Question

To collect like terms and simplify expressions, you can follow these steps:

### Step 1: Identify Like Terms
- Look for terms that contain the same variable raised to the same power. For example, in the expression \(3x\), \(x\), and \(2x\), all of these contain the variable \(x\).

### Step 2: Group Like Terms
- Rewrite the expression by grouping all like terms together. You can place constants together and variable terms together.

### Example:
Given the expression:
\[ 7 + 3x + x + 4 + 2x \]

### Step 3: Rewrite the Expression
- Start by grouping the constants and the like terms:
\[ (7 + 4) + (3x + x + 2x) \]

### Step 4: Combine Constants
- Evaluate the constants:
\[ 7 + 4 = 11 \]

### Step 5: Combine Like Variable Terms
- Combine the variable terms:
\[ 3x + x + 2x = 3x + 1x + 2x = 6x \]

### Final Step: Write the Simplified Expression
- Now, combine the results:
\[ 11 + 6x \]

### Summary:
After collecting like terms and simplifying, we find:
\[ 11 + 6x \]

### Final Note:
If you're solving an equation (like \(11 + 6x = 9\)), you would then proceed to isolate the variable \(x\) through standard algebraic methods.

What’s the answer

Based on the previous example \(11 + 6x = 9\), let's solve for \(x\):

1. **Start with the equation:**
\[
11 + 6x = 9
\]

2. **Isolate the variable term by subtracting 11 from both sides:**
\[
6x = 9 - 11
\]
\[
6x = -2
\]

3. **Divide both sides by 6 to solve for \(x\):**
\[
x = \frac{-2}{6}
\]
\[
x = \frac{-1}{3}
\]

### Final Answer:
\[
x = -\frac{1}{3}
\]

Um can u just say the humber

Sure! The answer is:

\(-\frac{1}{3}\)

BRO WHAT IS THE NUMBER!? WHAT IS THAT

I apologize for the confusion! The number is:

**-0.333...** (which is the decimal equivalent of \(-\frac{1}{3}\)).

If you're looking for just the numerical value, it's roughly **-0.33** when rounded to two decimal places.