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Linear Equations in 2 variables worksheet - Free Printable

Linear Equations in 2 variables worksheet

Educational worksheet: Linear Equations in 2 variables worksheet. Download and print for classroom or home learning activities.

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Problem: Solving a System of Two Linear Equations in Two Variables by Substitution



The task is to solve each system of linear equations using the substitution method. Let's go through each problem step by step.

---

#### Problem 1:
\[
\begin{aligned}
1) & \quad y = -4x + 16 \quad \text{(1)} \\
& \quad -3x + 8y = 23 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Substitute \( y = -4x + 16 \) from equation (1) into equation (2):
\[
-3x + 8(-4x + 16) = 23
\]
2. Simplify:
\[
-3x - 32x + 128 = 23
\]
\[
-35x + 128 = 23
\]
3. Solve for \( x \):
\[
-35x = 23 - 128
\]
\[
-35x = -105
\]
\[
x = \frac{-105}{-35} = 3
\]
4. Substitute \( x = 3 \) back into equation (1) to find \( y \):
\[
y = -4(3) + 16
\]
\[
y = -12 + 16 = 4
\]

Answer:
\[
\boxed{x = 3, y = 4}
\]

---

#### Problem 2:
\[
\begin{aligned}
2) & \quad -3x + 6y = -24 \quad \text{(1)} \\
& \quad y = 7x + 22 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Substitute \( y = 7x + 22 \) from equation (2) into equation (1):
\[
-3x + 6(7x + 22) = -24
\]
2. Simplify:
\[
-3x + 42x + 132 = -24
\]
\[
39x + 132 = -24
\]
3. Solve for \( x \):
\[
39x = -24 - 132
\]
\[
39x = -156
\]
\[
x = \frac{-156}{39} = -4
\]
4. Substitute \( x = -4 \) back into equation (2) to find \( y \):
\[
y = 7(-4) + 22
\]
\[
y = -28 + 22 = -6
\]

Answer:
\[
\boxed{x = -4, y = -6}
\]

---

#### Problem 3:
\[
\begin{aligned}
3) & \quad y = 5x + 5 \quad \text{(1)} \\
& \quad y = x + 5 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Since both equations are solved for \( y \), set them equal to each other:
\[
5x + 5 = x + 5
\]
2. Solve for \( x \):
\[
5x - x = 5 - 5
\]
\[
4x = 0
\]
\[
x = 0
\]
3. Substitute \( x = 0 \) back into either equation (1) or (2) to find \( y \):
\[
y = 5(0) + 5 = 5
\]

Answer:
\[
\boxed{x = 0, y = 5}
\]

---

#### Problem 4:
\[
\begin{aligned}
4) & \quad y = 4x + 22 \quad \text{(1)} \\
& \quad y = -4x - 18 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Set the two expressions for \( y \) equal to each other:
\[
4x + 22 = -4x - 18
\]
2. Solve for \( x \):
\[
4x + 4x = -18 - 22
\]
\[
8x = -40
\]
\[
x = \frac{-40}{8} = -5
\]
3. Substitute \( x = -5 \) back into either equation (1) or (2) to find \( y \):
\[
y = 4(-5) + 22
\]
\[
y = -20 + 22 = 2
\]

Answer:
\[
\boxed{x = -5, y = 2}
\]

---

#### Problem 5:
\[
\begin{aligned}
5) & \quad x - 3y = -12 \quad \text{(1)} \\
& \quad 4x + 6y = -12 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Solve equation (1) for \( x \):
\[
x = 3y - 12
\]
2. Substitute \( x = 3y - 12 \) into equation (2):
\[
4(3y - 12) + 6y = -12
\]
3. Simplify:
\[
12y - 48 + 6y = -12
\]
\[
18y - 48 = -12
\]
4. Solve for \( y \):
\[
18y = -12 + 48
\]
\[
18y = 36
\]
\[
y = \frac{36}{18} = 2
\]
5. Substitute \( y = 2 \) back into \( x = 3y - 12 \) to find \( x \):
\[
x = 3(2) - 12
\]
\[
x = 6 - 12 = -6
\]

Answer:
\[
\boxed{x = -6, y = 2}
\]

---

#### Problem 6:
\[
\begin{aligned}
6) & \quad 2x - 5y = 22 \quad \text{(1)} \\
& \quad x + 5y = -4 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Solve equation (2) for \( x \):
\[
x = -5y - 4
\]
2. Substitute \( x = -5y - 4 \) into equation (1):
\[
2(-5y - 4) - 5y = 22
\]
3. Simplify:
\[
-10y - 8 - 5y = 22
\]
\[
-15y - 8 = 22
\]
4. Solve for \( y \):
\[
-15y = 22 + 8
\]
\[
-15y = 30
\]
\[
y = \frac{30}{-15} = -2
\]
5. Substitute \( y = -2 \) back into \( x = -5y - 4 \) to find \( x \):
\[
x = -5(-2) - 4
\]
\[
x = 10 - 4 = 6
\]

Answer:
\[
\boxed{x = 6, y = -2}
\]

---

#### Problem 7:
\[
\begin{aligned}
7) & \quad y = -4 \quad \text{(1)} \\
& \quad -3x - 6y = 15 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Substitute \( y = -4 \) from equation (1) into equation (2):
\[
-3x - 6(-4) = 15
\]
2. Simplify:
\[
-3x + 24 = 15
\]
3. Solve for \( x \):
\[
-3x = 15 - 24
\]
\[
-3x = -9
\]
\[
x = \frac{-9}{-3} = 3
\]

Answer:
\[
\boxed{x = 3, y = -4}
\]

---

#### Problem 8:
\[
\begin{aligned}
8) & \quad 2x + 4y = -10 \quad \text{(1)} \\
& \quad 7x + 8y = -23 \quad \text{(2)}
\end{aligned}
\]

Solution:
1. Solve equation (1) for \( y \):
\[
2x + 4y = -10
\]
\[
4y = -10 - 2x
\]
\[
y = \frac{-10 - 2x}{4} = -\frac{5}{2} - \frac{x}{2}
\]
2. Substitute \( y = -\frac{5}{2} - \frac{x}{2} \) into equation (2):
\[
7x + 8\left(-\frac{5}{2} - \frac{x}{2}\right) = -23
\]
3. Simplify:
\[
7x + 8\left(-\frac{5}{2}\right) + 8\left(-\frac{x}{2}\right) = -23
\]
\[
7x - 20 - 4x = -23
\]
\[
3x - 20 = -23
\]
4. Solve for \( x \):
\[
3x = -23 + 20
\]
\[
3x = -3
\]
\[
x = \frac{-3}{3} = -1
\]
5. Substitute \( x = -1 \) back into \( y = -\frac{5}{2} - \frac{x}{2} \) to find \( y \):
\[
y = -\frac{5}{2} - \frac{-1}{2}
\]
\[
y = -\frac{5}{2} + \frac{1}{2} = -\frac{4}{2} = -2
\]

Answer:
\[
\boxed{x = -1, y = -2}
\]

---

Final Answers:


\[
\boxed{
\begin{aligned}
1) & \quad x = 3, y = 4 \\
2) & \quad x = -4, y = -6 \\
3) & \quad x = 0, y = 5 \\
4) & \quad x = -5, y = 2 \\
5) & \quad x = -6, y = 2 \\
6) & \quad x = 6, y = -2 \\
7) & \quad x = 3, y = -4 \\
8) & \quad x = -1, y = -2
\end{aligned}
}
\]
Parent Tip: Review the logic above to help your child master the concept of two variable equations worksheet.
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