To find the solution to the system of equations given by \( x - 5y = 7 \) and \( 3x - 2y = -4 \), we can solve the equations simultaneously.
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First Equation: \( x - 5y = 7 \) We can express \( x \) in terms of \( y \): \[ x = 5y + 7 \]
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Second Equation: \( 3x - 2y = -4 \) We can substitute \( x \) from the first equation into the second equation: \[ 3(5y + 7) - 2y = -4 \] Expanding this gives: \[ 15y + 21 - 2y = -4 \] Simplifying it results in: \[ 13y + 21 = -4 \] Now subtract 21 from both sides: \[ 13y = -25 \] Dividing by 13 gives: \[ y = -\frac{25}{13} \]
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Finding \( x \): Now substitute \( y = -\frac{25}{13} \) back into the equation \( x = 5y + 7 \): \[ x = 5\left(-\frac{25}{13}\right) + 7 \] \[ x = -\frac{125}{13} + \frac{91}{13} = -\frac{34}{13} \]
Thus, the solution (the intersection point of the two lines) is: \[ \left(-\frac{34}{13}, -\frac{25}{13}\right) \]
Therefore, the final answer is: \[ \text{The intersection point is } \left(-\frac{34}{13}, -\frac{25}{13}\right). \]