Solve the system of linear equations using substitution. \( \begin{array}{l}y=6 x-14 \\ y=-8 x \\ \text { Solution }\end{array} \)

To solve the system of linear equations using substitution: \[ \begin{cases} y = 6x - 14 \quad \text{(Equation 1)} \\ y = -8x \quad \text{(Equation 2)} \end{cases} \] **Step 1: Substitute \( y \) from Equation 2 into Equation 1.** Since \( y = -8x \) from Equation 2, substitute this into Equation 1: \[ -8x = 6x - 14 \] **Step 2: Solve for \( x \).** \[ -8x - 6x = -14 \\ -14x = -14 \\ x = \frac{-14}{-14} \\ x = 1 \] **Step 3: Substitute \( x = 1 \) back into Equation 2 to find \( y \).** \[ y = -8(1) \\ y = -8 \] **Solution:** \[ x = 1 \quad \text{and} \quad y = -8 \] **Verification:** To ensure the solution is correct, substitute \( x = 1 \) and \( y = -8 \) into both original equations. - **Equation 1:** \( y = 6x - 14 \) \[ -8 = 6(1) - 14 \\ -8 = 6 - 14 \\ -8 = -8 \quad \text{✓} \] - **Equation 2:** \( y = -8x \) \[ -8 = -8(1) \\ -8 = -8 \quad \text{✓} \] Both equations are satisfied, confirming that the solution is correct. **Final Answer:** \( x = 1 \) and \( y = -8 \)