18) $5x + 4y = -30$
$3x - 9y = -18$

20) $3x - 2y = 2$
$5x - 5y = 10$

22) $2x + 8y = 6$
$-5x - 20y = -15$

24) $3 + 2x - y = 0$
$-3 - 7y = 10x$

Question

18) $5x + 4y = -30$
    $3x - 9y = -18$

20) $3x - 2y = 2$
    $5x - 5y = 10$

22) $2x + 8y = 6$
    $-5x - 20y = -15$

24) $3 + 2x - y = 0$
    $-3 - 7y = 10x$

Accepted Answer

### Problem 18: $ \boldsymbol{5x + 4y = -30} $ and $ \boldsymbol{3x - 9y = -18} $
# Explanation:
## Step 1: Simplify the second equation
Divide the second equation $ 3x - 9y = -18 $ by 3:
$ \frac{3x}{3} - \frac{9y}{3} = \frac{-18}{3} $
$ x - 3y = -6 $
Then, solve for $ x $:
$ x = 3y - 6 $

## Step 2: Substitute $ x = 3y - 6 $ into the first equation
Substitute $ x $ into $ 5x + 4y = -30 $:
$ 5(3y - 6) + 4y = -30 $

## Step 3: Expand and simplify
$ 15y - 30 + 4y = -30 $
Combine like terms:
$ 19y - 30 = -30 $

## Step 4: Solve for $ y $
Add 30 to both sides:
$ 19y = 0 $
$ y = 0 $

## Step 5: Solve for $ x $
Substitute $ y = 0 $ into $ x = 3y - 6 $:
$ x = 3(0) - 6 = -6 $

### Problem 20: $ \boldsymbol{3x - 2y = 2} $ and $ \boldsymbol{5x - 5y = 10} $
# Explanation:
## Step 1: Simplify the second equation
Divide the second equation $ 5x - 5y = 10 $ by 5:
$ \frac{5x}{5} - \frac{5y}{5} = \frac{10}{5} $
$ x - y = 2 $
Solve for $ x $:
$ x = y + 2 $

## Step 2: Substitute $ x = y + 2 $ into the first equation
Substitute $ x $ into $ 3x - 2y = 2 $:
$ 3(y + 2) - 2y = 2 $

## Step 3: Expand and simplify
$ 3y + 6 - 2y = 2 $
Combine like terms:
$ y + 6 = 2 $

## Step 4: Solve for $ y $
Subtract 6 from both sides:
$ y = 2 - 6 = -4 $

## Step 5: Solve for $ x $
Substitute $ y = -4 $ into $ x = y + 2 $:
$ x = -4 + 2 = -2 $

### Problem 22: $ \boldsymbol{2x + 8y = 6} $ and $ \boldsymbol{-5x - 20y = -15} $
# Explanation:
## Step 1: Simplify both equations
Simplify the first equation $ 2x + 8y = 6 $ by dividing by 2:
$ x + 4y = 3 $

Simplify the second equation $ -5x - 20y = -15 $ by dividing by -5:
$ x + 4y = 3 $

## Step 2: Analyze the equations
Both equations simplify to $ x + 4y = 3 $, meaning they are the same line. Thus, there are infinitely many solutions (all points on $ x + 4y = 3 $).

### Problem 24: $ \boldsymbol{3 + 2x - y = 0} $ and $ \boldsymbol{-3 - 7y = 10x} $
# Explanation:
## Step 1: Rearrange the first equation
From $ 3 + 2x - y = 0 $, solve for $ y $:
$ y = 2x + 3 $

## Step 2: Substitute $ y = 2x + 3 $ into the second equation
Substitute $ y $ into $ -3 - 7y = 10x $:
$ -3 - 7(2x + 3) = 10x $

## Step 3: Expand and simplify
$ -3 - 14x - 21 = 10x $
Combine like terms:
$ -14x - 24 = 10x $

## Step 4: Solve for $ x $
Add $ 14x $ to both sides:
$ -24 = 24x $
Divide by 24:
$ x = -1 $

## Step 5: Solve for $ y $
Substitute $ x = -1 $ into $ y = 2x + 3 $:
$ y = 2(-1) + 3 = 1 $

# Answers:
18) $ x = -6 $, $ y = 0 $
20) $ x = -2 $, $ y = -4 $
22) Infinitely many solutions (all points on $ x + 4y = 3 $)
24) $ x = -1 $, $ y = 1 $

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Problem 18: \( \boldsymbol{5x + 4y = -30} \) and \( \boldsymbol{3x - 9y = -18} \)

Step 1: Simplify the second equation

Step 2: Substitute \( x = 3y - 6 \) into the first equation

Step 3: Expand and simplify

Step 4: Solve for \( y \)

Step 5: Solve for \( x \)

Problem 20: \( \boldsymbol{3x - 2y = 2} \) and \( \boldsymbol{5x - 5y = 10} \)

Step 1: Simplify the second equation

Step 2: Substitute \( x = y + 2 \) into the first equation

Step 3: Expand and simplify

Step 4: Solve for \( y \)

Step 5: Solve for \( x \)

Problem 22: \( \boldsymbol{2x + 8y = 6} \) and \( \boldsymbol{-5x - 20y = -15} \)

Step 1: Simplify both equations

Step 2: Analyze the equations

Problem 24: \( \boldsymbol{3 + 2x - y = 0} \) and \( \boldsymbol{-3 - 7y = 10x} \)

Answer: