5 Must Know Facts For Your Next Test

1. The coefficients $a$, $b$, and $c$ in the equation $ax + by = c$ define the characteristics of the linear equation, such as the slope and y-intercept.
2. The graph of $ax + by = c$ is a straight line in the coordinate plane, and the line passes through the point $(-c/a, 0)$ on the $x$-axis and the point $(0, -c/b)$ on the $y$-axis.
3. The slope of the line represented by $ax + by = c$ is $-a/b$, and the y-intercept is $c/b$.
4. The general equation $ax + by = c$ can be transformed into the slope-intercept form $y = mx + b$ by solving for $y$.
5. The point-slope form of a linear equation, $y - y_1 = m(x - x_1)$, can be derived from the general equation $ax + by = c$ by using a known point $(x_1, y_1)$ on the line.

Review Questions

• Explain how the coefficients $a$, $b$, and $c$ in the equation $ax + by = c$ define the characteristics of the linear equation.
  • The coefficients $a$, $b$, and $c$ in the equation $ax + by = c$ play a crucial role in defining the characteristics of the linear equation. The coefficient $a$ represents the slope of the line, the coefficient $b$ represents the y-intercept, and the constant $c$ determines the point where the line intersects the $x$-axis. By knowing these three values, you can determine important features of the line, such as its orientation, direction, and location in the coordinate plane.
• Describe how the general equation $ax + by = c$ can be transformed into the slope-intercept form $y = mx + b$.
  • To transform the general equation $ax + by = c$ into the slope-intercept form $y = mx + b$, you need to solve the equation for $y$. This can be done by first rearranging the terms to isolate $y$ on one side of the equation: $by = -ax + c$. Then, dividing both sides by $b$ to get the slope-intercept form: $y = (-a/b)x + (c/b)$. In this form, the slope is $-a/b$ and the y-intercept is $c/b$, which provides a more intuitive representation of the linear equation.
• Explain how the general equation $ax + by = c$ can be used to determine the relationship between two lines, such as whether they are parallel or perpendicular.
  • The general equation $ax + by = c$ can be used to determine the relationship between two lines, such as whether they are parallel or perpendicular. If two lines have the same slope, meaning the coefficients $a$ and $b$ are the same for both lines, then the lines are parallel. Conversely, if the slopes of the two lines are negative reciprocals, meaning $a_1/b_1 = -a_2/b_2$, then the lines are perpendicular. This relationship can be derived directly from the general equation, which allows you to analyze the relative orientation of lines in the coordinate plane.

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