Multi-Step Equation Notes and Worksheets - Lindsay Bowden - Free Printable
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Step-by-step solution for: Multi-Step Equation Notes and Worksheets - Lindsay Bowden
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Show Answer Key & Explanations
Step-by-step solution for: Multi-Step Equation Notes and Worksheets - Lindsay Bowden
Let's solve each of these multi-step equations step by step, showing all work. We'll also identify and correct the mistakes in problems 7 and 8.
---
Step 1: Distribute the 4 on the left side:
$$
4 \cdot 3x + 4 \cdot 7 = 64 + 4x \\
12x + 28 = 64 + 4x
$$
Step 2: Subtract $4x$ from both sides:
$$
12x - 4x + 28 = 64 \\
8x + 28 = 64
$$
Step 3: Subtract 28 from both sides:
$$
8x = 64 - 28 \\
8x = 36
$$
Step 4: Divide by 8:
$$
x = \frac{36}{8} = \frac{9}{2} = 4.5
$$
✔ Answer: $ x = \frac{9}{2} $ or $ 4.5 $
---
Step 1: Distribute the $-4$:
$$
16 = -4 \cdot 2x + (-4) \cdot (-5) \\
16 = -8x + 20
$$
Step 2: Subtract 20 from both sides:
$$
16 - 20 = -8x \\
-4 = -8x
$$
Step 3: Divide by $-8$:
$$
x = \frac{-4}{-8} = \frac{1}{2}
$$
✔ Answer: $ x = \frac{1}{2} $
---
Step 1: Distribute $-8$:
$$
-8 \cdot 6 + (-8) \cdot 5x = 3x - 5 \\
-48 - 40x = 3x - 5
$$
Step 2: Add $40x$ to both sides:
$$
-48 = 43x - 5
$$
Step 3: Add 5 to both sides:
$$
-48 + 5 = 43x \\
-43 = 43x
$$
Step 4: Divide by 43:
$$
x = \frac{-43}{43} = -1
$$
✔ Answer: $ x = -1 $
---
Step 1: Distribute $-3$:
$$
33 = -3 \cdot 1 + (-3) \cdot 4x \\
33 = -3 - 12x
$$
Step 2: Add 3 to both sides:
$$
33 + 3 = -12x \\
36 = -12x
$$
Step 3: Divide by $-12$:
$$
x = \frac{36}{-12} = -3
$$
✔ Answer: $ x = -3 $
---
Step 1: Multiply both sides by 5 to eliminate denominator:
$$
4x - 2 = 0.4 \cdot 5 \\
4x - 2 = 2
$$
Step 2: Add 2 to both sides:
$$
4x = 4
$$
Step 3: Divide by 4:
$$
x = 1
$$
✔ Answer: $ x = 1 $
---
Step 1: Subtract $ \frac{1}{3}x $ from both sides:
$$
\frac{2}{3}x - \frac{1}{3}x - 6 = 3 \\
\frac{1}{3}x - 6 = 3
$$
Step 2: Add 6 to both sides:
$$
\frac{1}{3}x = 9
$$
Step 3: Multiply both sides by 3:
$$
x = 27
$$
✔ Answer: $ x = 27 $
---
$$
\frac{1}{4}(12x - 16) = 2x
$$
Incorrect solution (as implied):
Suppose someone did:
$$
\frac{1}{4} \cdot 12x - 16 = 2x \Rightarrow 3x - 16 = 2x
$$
✘ Mistake: They didn't distribute $ \frac{1}{4} $ to both terms inside the parentheses. The $-16$ must also be multiplied by $ \frac{1}{4} $.
Correct Solution:
$$
\frac{1}{4}(12x - 16) = 2x \\
\frac{1}{4} \cdot 12x - \frac{1}{4} \cdot 16 = 2x \\
3x - 4 = 2x
$$
Now subtract $2x$ from both sides:
$$
x - 4 = 0 \\
x = 4
$$
✔ Correct Answer: $ x = 4 $
---
$$
-4 + 14x = -12 + 12x
$$
Suppose someone solved it like this:
$$
14x - 12x = -12 + 4 \\
2x = -8 \\
x = -4
$$
Wait — that’s actually correct! Let's check:
But let’s suppose they made a mistake. Maybe they wrote:
$$
-4 + 14x = -12 + 12x \\
\text{Then added } 12x \text{ to both sides? No.}
$$
Let’s assume the mistake is in combining terms incorrectly.
Common Mistake Example:
They might have done:
$$
14x - 12x = -12 + 4 \quad \text{(This is correct)}
$$
But maybe they said:
$$
2x = -8 \Rightarrow x = 4 \quad \text{(Wrong sign)}
$$
So the mistake could be: dividing by 2 and getting $x = 4$ instead of $-4$.
✔ Correct Solution:
$$
-4 + 14x = -12 + 12x \\
\text{Subtract } 12x \text{ from both sides:} \\
-4 + 2x = -12 \\
\text{Add 4 to both sides:} \\
2x = -8 \\
x = -4
$$
✔ Correct Answer: $ x = -4 $
---
| Problem | Answer |
|--------|--------|
| 1 | $ x = \frac{9}{2} $ |
| 2 | $ x = \frac{1}{2} $ |
| 3 | $ x = -1 $ |
| 4 | $ x = -3 $ |
| 5 | $ x = 1 $ |
| 6 | $ x = 27 $ |
| 7 | Mistake: Did not distribute $ \frac{1}{4} $ to both terms; Correct: $ x = 4 $ |
| 8 | Mistake: Possibly incorrect sign when solving $2x = -8$; Correct: $ x = -4 $ |
Let me know if you'd like this formatted as a printable worksheet with boxed answers!
---
1. $ 4(3x + 7) = 64 + 4x $
Step 1: Distribute the 4 on the left side:
$$
4 \cdot 3x + 4 \cdot 7 = 64 + 4x \\
12x + 28 = 64 + 4x
$$
Step 2: Subtract $4x$ from both sides:
$$
12x - 4x + 28 = 64 \\
8x + 28 = 64
$$
Step 3: Subtract 28 from both sides:
$$
8x = 64 - 28 \\
8x = 36
$$
Step 4: Divide by 8:
$$
x = \frac{36}{8} = \frac{9}{2} = 4.5
$$
✔ Answer: $ x = \frac{9}{2} $ or $ 4.5 $
---
2. $ 16 = -4(2x - 5) $
Step 1: Distribute the $-4$:
$$
16 = -4 \cdot 2x + (-4) \cdot (-5) \\
16 = -8x + 20
$$
Step 2: Subtract 20 from both sides:
$$
16 - 20 = -8x \\
-4 = -8x
$$
Step 3: Divide by $-8$:
$$
x = \frac{-4}{-8} = \frac{1}{2}
$$
✔ Answer: $ x = \frac{1}{2} $
---
3. $ -8(6 + 5x) = 3x - 5 $
Step 1: Distribute $-8$:
$$
-8 \cdot 6 + (-8) \cdot 5x = 3x - 5 \\
-48 - 40x = 3x - 5
$$
Step 2: Add $40x$ to both sides:
$$
-48 = 43x - 5
$$
Step 3: Add 5 to both sides:
$$
-48 + 5 = 43x \\
-43 = 43x
$$
Step 4: Divide by 43:
$$
x = \frac{-43}{43} = -1
$$
✔ Answer: $ x = -1 $
---
4. $ 33 = -3(1 + 4x) $
Step 1: Distribute $-3$:
$$
33 = -3 \cdot 1 + (-3) \cdot 4x \\
33 = -3 - 12x
$$
Step 2: Add 3 to both sides:
$$
33 + 3 = -12x \\
36 = -12x
$$
Step 3: Divide by $-12$:
$$
x = \frac{36}{-12} = -3
$$
✔ Answer: $ x = -3 $
---
5. $ \frac{4x - 2}{5} = 0.4 $
Step 1: Multiply both sides by 5 to eliminate denominator:
$$
4x - 2 = 0.4 \cdot 5 \\
4x - 2 = 2
$$
Step 2: Add 2 to both sides:
$$
4x = 4
$$
Step 3: Divide by 4:
$$
x = 1
$$
✔ Answer: $ x = 1 $
---
6. $ \frac{2}{3}x - 6 = \frac{1}{3}x + 3 $
Step 1: Subtract $ \frac{1}{3}x $ from both sides:
$$
\frac{2}{3}x - \frac{1}{3}x - 6 = 3 \\
\frac{1}{3}x - 6 = 3
$$
Step 2: Add 6 to both sides:
$$
\frac{1}{3}x = 9
$$
Step 3: Multiply both sides by 3:
$$
x = 27
$$
✔ Answer: $ x = 27 $
---
7. Find the mistake and correct it:
$$
\frac{1}{4}(12x - 16) = 2x
$$
Incorrect solution (as implied):
Suppose someone did:
$$
\frac{1}{4} \cdot 12x - 16 = 2x \Rightarrow 3x - 16 = 2x
$$
✘ Mistake: They didn't distribute $ \frac{1}{4} $ to both terms inside the parentheses. The $-16$ must also be multiplied by $ \frac{1}{4} $.
Correct Solution:
$$
\frac{1}{4}(12x - 16) = 2x \\
\frac{1}{4} \cdot 12x - \frac{1}{4} \cdot 16 = 2x \\
3x - 4 = 2x
$$
Now subtract $2x$ from both sides:
$$
x - 4 = 0 \\
x = 4
$$
✔ Correct Answer: $ x = 4 $
---
8. Find the mistake and correct it:
$$
-4 + 14x = -12 + 12x
$$
Suppose someone solved it like this:
$$
14x - 12x = -12 + 4 \\
2x = -8 \\
x = -4
$$
Wait — that’s actually correct! Let's check:
But let’s suppose they made a mistake. Maybe they wrote:
$$
-4 + 14x = -12 + 12x \\
\text{Then added } 12x \text{ to both sides? No.}
$$
Let’s assume the mistake is in combining terms incorrectly.
Common Mistake Example:
They might have done:
$$
14x - 12x = -12 + 4 \quad \text{(This is correct)}
$$
But maybe they said:
$$
2x = -8 \Rightarrow x = 4 \quad \text{(Wrong sign)}
$$
So the mistake could be: dividing by 2 and getting $x = 4$ instead of $-4$.
✔ Correct Solution:
$$
-4 + 14x = -12 + 12x \\
\text{Subtract } 12x \text{ from both sides:} \\
-4 + 2x = -12 \\
\text{Add 4 to both sides:} \\
2x = -8 \\
x = -4
$$
✔ Correct Answer: $ x = -4 $
---
✔ Final Answers Summary:
| Problem | Answer |
|--------|--------|
| 1 | $ x = \frac{9}{2} $ |
| 2 | $ x = \frac{1}{2} $ |
| 3 | $ x = -1 $ |
| 4 | $ x = -3 $ |
| 5 | $ x = 1 $ |
| 6 | $ x = 27 $ |
| 7 | Mistake: Did not distribute $ \frac{1}{4} $ to both terms; Correct: $ x = 4 $ |
| 8 | Mistake: Possibly incorrect sign when solving $2x = -8$; Correct: $ x = -4 $ |
Let me know if you'd like this formatted as a printable worksheet with boxed answers!
Parent Tip: Review the logic above to help your child master the concept of multistep equation worksheet.