kuta software - infinite algebra 1
literal equations
solve each equation for the indicated variable.
1) $g = 6x$, for $x$
2) $u = 2x - 2$, for $x$
3) $z = m - x$, for $x$
4) $g = ca$, for $a$
5) $u = x - k$, for $x$
6) $g = c + x$, for $x$
7) $u = \frac{k}{a}$, for $a$
8) $g = xc$, for $x$
9) $12am = 4$, for $a$
10) $-3x + 2c = -3$, for $x$
11) $am = n + p$, for $a$
12) $u = \frac{ak}{b}$, for $a$
13) $a - c = d - r$, for $a$
14) $xm = np$, for $x$
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Question

Accepted Answer

Let's solve each equation one by one:

### 1) $ g = 6x $, for $ x $
## Step 1: Isolate $ x $
Divide both sides by 6:
$ \frac{g}{6} = x $ or $ x = \frac{g}{6} $

### 2) $ u = 2x - 2 $, for $ x $
## Step 1: Add 2 to both sides
$ u + 2 = 2x $
## Step 2: Divide by 2
$ x = \frac{u + 2}{2} = \frac{u}{2} + 1 $

### 3) $ z = m - x $ (assuming the first variable is $ z $), for $ x $
## Step 1: Rearrange to isolate $ x $
Add $ x $ to both sides: $ z + x = m $
Subtract $ z $ from both sides: $ x = m - z $

### 4) $ g = ca $, for $ a $
## Step 1: Divide by $ c $ ( $ c
eq 0 $ )
$ a = \frac{g}{c} $

### 5) $ u = x - k $, for $ x $
## Step 1: Add $ k $ to both sides
$ x = u + k $

### 6) $ g = c + x $, for $ x $
## Step 1: Subtract $ c $ from both sides
$ x = g - c $

### 7) $ u = \frac{k}{a} $, for $ a $
## Step 1: Multiply both sides by $ a $
$ ua = k $
## Step 2: Divide by $ u $ ( $ u
eq 0 $ )
$ a = \frac{k}{u} $

### 8) $ g = xc $, for $ x $
## Step 1: Divide by $ c $ ( $ c
eq 0 $ )
$ x = \frac{g}{c} $

### 9) $ 12am = 4 $, for $ a $
## Step 1: Divide by $ 12m $ ( $ m
eq 0 $ )
$ a = \frac{4}{12m} = \frac{1}{3m} $

### 10) $ -3x + 2c = -3 $, for $ x $
## Step 1: Subtract $ 2c $ from both sides
$ -3x = -3 - 2c $
## Step 2: Divide by $ -3 $
$ x = \frac{-3 - 2c}{-3} = 1 + \frac{2c}{3} $

### 11) $ am = n + p $, for $ a $
## Step 1: Divide by $ m $ ( $ m
eq 0 $ )
$ a = \frac{n + p}{m} $

### 12) $ u = \frac{ak}{b} $, for $ a $
## Step 1: Multiply both sides by $ b $
$ ub = ak $
## Step 2: Divide by $ k $ ( $ k
eq 0 $ )
$ a = \frac{ub}{k} $

### 13) $ a - c = d - r $, for $ a $
## Step 1: Add $ c $ to both sides
$ a = d - r + c $

### 14) $ xm = np $, for $ x $
## Step 1: Divide by $ m $ ( $ m
eq 0 $ )
$ x = \frac{np}{m} $

### Final Answers:
1. $ \boldsymbol{x = \frac{g}{6}} $
2. $ \boldsymbol{x = \frac{u + 2}{2}} $ (or $ \boldsymbol{x = \frac{u}{2} + 1} $)
3. $ \boldsymbol{x = m - z} $
4. $ \boldsymbol{a = \frac{g}{c}} $
5. $ \boldsymbol{x = u + k} $
6. $ \boldsymbol{x = g - c} $
7. $ \boldsymbol{a = \frac{k}{u}} $
8. $ \boldsymbol{x = \frac{g}{c}} $
9. $ \boldsymbol{a = \frac{1}{3m}} $
10. $ \boldsymbol{x = 1 + \frac{2c}{3}} $ (or $ \boldsymbol{x = \frac{2c + 3}{3}} $)
11. $ \boldsymbol{a = \frac{n + p}{m}} $
12. $ \boldsymbol{a = \frac{ub}{k}} $
13. $ \boldsymbol{a = c + d - r} $
14. $ \boldsymbol{x = \frac{np}{m}} $

QUESTION IMAGE

Question

Explanation:

1) \( g = 6x \), for \( x \)

Step 1: Isolate \( x \)

2) \( u = 2x - 2 \), for \( x \)

Step 1: Add 2 to both sides

Step 2: Divide by 2

3) \( z = m - x \) (assuming the first variable is \( z \)), for \( x \)

Step 1: Rearrange to isolate \( x \)

4) \( g = ca \), for \( a \)

Step 1: Divide by \( c \) ( \( c

5) \( u = x - k \), for \( x \)

Step 1: Add \( k \) to both sides

6) \( g = c + x \), for \( x \)

Step 1: Subtract \( c \) from both sides

7) \( u = \frac{k}{a} \), for \( a \)

Step 1: Multiply both sides by \( a \)

Step 2: Divide by \( u \) ( \( u

8) \( g = xc \), for \( x \)

Step 1: Divide by \( c \) ( \( c

9) \( 12am = 4 \), for \( a \)

Step 1: Divide by \( 12m \) ( \( m

10) \( -3x + 2c = -3 \), for \( x \)

Step 1: Subtract \( 2c \) from both sides

Step 2: Divide by \( -3 \)

11) \( am = n + p \), for \( a \)

Step 1: Divide by \( m \) ( \( m

12) \( u = \frac{ak}{b} \), for \( a \)

Step 1: Multiply both sides by \( b \)

Step 2: Divide by \( k \) ( \( k

13) \( a - c = d - r \), for \( a \)

Step 1: Add \( c \) to both sides

14) \( xm = np \), for \( x \)

Step 1: Divide by \( m \) ( \( m

Final Answers:

Answer:

1) \( g = 6x \), for \( x \)

Step 1: Isolate \( x \)

2) \( u = 2x - 2 \), for \( x \)

Step 1: Add 2 to both sides

Step 2: Divide by 2

3) \( z = m - x \) (assuming the first variable is \( z \)), for \( x \)

Step 1: Rearrange to isolate \( x \)

4) \( g = ca \), for \( a \)

Step 1: Divide by \( c \) ( \( c

5) \( u = x - k \), for \( x \)

Step 1: Add \( k \) to both sides

6) \( g = c + x \), for \( x \)

Step 1: Subtract \( c \) from both sides

7) \( u = \frac{k}{a} \), for \( a \)

Step 1: Multiply both sides by \( a \)

Step 2: Divide by \( u \) ( \( u

8) \( g = xc \), for \( x \)

Step 1: Divide by \( c \) ( \( c

9) \( 12am = 4 \), for \( a \)

Step 1: Divide by \( 12m \) ( \( m

10) \( -3x + 2c = -3 \), for \( x \)

Step 1: Subtract \( 2c \) from both sides

Step 2: Divide by \( -3 \)

11) \( am = n + p \), for \( a \)

Step 1: Divide by \( m \) ( \( m

12) \( u = \frac{ak}{b} \), for \( a \)

Step 1: Multiply both sides by \( b \)

Step 2: Divide by \( k \) ( \( k

13) \( a - c = d - r \), for \( a \)

Step 1: Add \( c \) to both sides

14) \( xm = np \), for \( x \)

Step 1: Divide by \( m \) ( \( m

Final Answers: