5 Must Know Facts For Your Next Test

1. The slopes of perpendicular lines are negative reciprocals of each other, meaning the product of their slopes is -1.
2. When graphing perpendicular lines, they will intersect at a single point, forming a right angle.
3. Perpendicular lines can be used to find the shortest distance between a point and a line, or between two parallel lines.
4. In the context of linear functions, perpendicular lines can be used to model relationships between variables, such as the motion of an object along two perpendicular axes.
5. The properties of perpendicular lines are essential in understanding the behavior of linear functions and their graphical representations.

Review Questions

• Explain how the slopes of perpendicular lines are related and how this relationship can be used to identify perpendicular lines.
  • The slopes of perpendicular lines are negative reciprocals of each other, meaning if the slope of one line is $m$, the slope of the perpendicular line will be $-1/m$. This relationship can be used to identify perpendicular lines, as the product of their slopes will always be -1. For example, if one line has a slope of 2, the perpendicular line will have a slope of -1/2, as $2 \cdot (-1/2) = -1$.
• Describe the graphical representation of perpendicular lines and how this can be used to solve systems of linear equations.
  • When graphed, perpendicular lines intersect at a single point, forming a right angle. This point of intersection represents the solution to a system of linear equations, where the two lines represent the equations. The unique point of intersection can be found by solving the system of equations, either algebraically or by using the graphical representation of the perpendicular lines. The properties of perpendicular lines are crucial in understanding the behavior of linear functions and their graphical representations, which is essential for solving systems of linear equations.
• Analyze how the properties of perpendicular lines can be used to model relationships between variables in the context of linear functions.
  • The properties of perpendicular lines, such as the relationship between their slopes and the right-angle formation when graphed, can be used to model relationships between variables in the context of linear functions. For example, in the motion of an object along two perpendicular axes, the relationships between the object's position, velocity, and acceleration along each axis can be represented by perpendicular linear functions. Understanding the properties of perpendicular lines allows for the creation of mathematical models that accurately describe and predict the behavior of these types of systems involving linear relationships between variables.

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