circle the equations for which 6 is a solution of the equation.
$4x=2$
$y - 2 = 4$
$6z = 36$
$12\div w = 6$
$x + 2 = 6$
$56 = 5y$
$8 + z = 14$
$2 = \frac{w}{12}$

Question

Accepted Answer

To determine for which equations 6 is a solution, we substitute $ x = 6 $ (or the relevant variable) into each equation and check if it holds true. Let's analyze each equation:

### 1. $ y - 2 = 4 $
Substitute $ y = 6 $:
$ 6 - 2 = 4 $
$ 4 = 4 $ (True).

### 2. $ 12 \div w = 6 $
Substitute $ w = 6 $:
$ 12 \div 6 = 6 $
$ 2 = 6 $ (False).

### 3. $ 6z = 36 $
Substitute $ z = 6 $:
$ 6 \times 6 = 36 $
$ 36 = 36 $ (True).

### 4. $ z = \frac{w}{12} $ (Unclear variable, but if we assume $ z = 6 $):
$ 6 = \frac{w}{12} \implies w = 72 $. Not relevant to $ w = 6 $, but if $ w = 6 $:
$ z = \frac{6}{12} = 0.5
eq 6 $ (False).

### 5. $ 56 = 5y $
Substitute $ y = 6 $:
$ 56 = 5 \times 6 \implies 56 = 30 $ (False).

### 6. $ 8 + z = 14 $
Substitute $ z = 6 $:
$ 8 + 6 = 14 \implies 14 = 14 $ (True).

### Final Answer:
The equations where 6 is a solution are:
$ \boldsymbol{y - 2 = 4} $, $ \boldsymbol{6z = 36} $, and $ \boldsymbol{8 + z = 14} $.

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QUESTION IMAGE

Question

Explanation:

1. \( y - 2 = 4 \)

2. \( 12 \div w = 6 \)

3. \( 6z = 36 \)

4. \( z = \frac{w}{12} \) (Unclear variable, but if we assume \( z = 6 \)):

5. \( 56 = 5y \)

6. \( 8 + z = 14 \)

Final Answer:

Answer: