Equation Of A Line Perpendicular To A Line

Finding the Equation of a Line Perpendicular to a Given Line

Understanding perpendicular lines is crucial in various fields, from geometry and calculus to physics and engineering. This comprehensive guide will walk you through the process of finding the equation of a line perpendicular to a given line, covering different scenarios and providing a solid foundation for this important mathematical concept. We'll explore the underlying principles, step-by-step procedures, and real-world applications, ensuring you master this skill.

Introduction: The Concept of Perpendicularity

Two lines are considered perpendicular if they intersect at a right angle (90°). This seemingly simple geometric relationship has profound implications in mathematics and beyond. The key to finding the equation of a perpendicular line lies in understanding the relationship between their slopes.

The Relationship Between Slopes of Perpendicular Lines

The slope of a line, often denoted as m, represents the steepness or inclination of the line. It's calculated as the ratio of the vertical change (rise) to the horizontal change (run) between any two points on the line: m = (y₂ - y₁) / (x₂ - x₁).

The crucial relationship between the slopes of two perpendicular lines is that their product is -1. In other words:

m₁ * m₂ = -1

Where m₁ is the slope of the first line and m₂ is the slope of the line perpendicular to it. This means that if you know the slope of one line, you can easily determine the slope of its perpendicular counterpart.

Step-by-Step Guide: Finding the Equation of a Perpendicular Line

Let's break down the process into clear, manageable steps. We will explore different scenarios to solidify your understanding.

Step 1: Determine the Slope of the Given Line

The first step is to identify the slope (m₁) of the line to which you want to find a perpendicular line. This can be done in several ways:

• If the equation is in slope-intercept form (y = mx + b): The slope (m₁) is simply the coefficient of x. For example, in the equation y = 2x + 5, the slope m₁ is 2.

• If the equation is in standard form (Ax + By = C): Rewrite the equation in slope-intercept form by solving for y. For example, if the equation is 3x + 2y = 6, we solve for y: 2y = -3x + 6 => y = (-3/2)x + 3. Therefore, the slope m₁ is -3/2.

• If you have two points on the line: Use the slope formula: m₁ = (y₂ - y₁) / (x₂ - x₁).

Step 2: Calculate the Slope of the Perpendicular Line

Once you have m₁, calculate the slope of the perpendicular line (m₂) using the relationship:

m₂ = -1 / m₁

For example:

• If m₁ = 2, then m₂ = -1/2.
• If m₁ = -3/2, then m₂ = 2/3.
• If m₁ = 0 (horizontal line), then m₂ is undefined (vertical line).
• If m₁ is undefined (vertical line), then m₂ = 0 (horizontal line).

Step 3: Use the Point-Slope Form or Slope-Intercept Form

Now that you have the slope of the perpendicular line (m₂), you need a point that lies on this perpendicular line. This point could be given in the problem, or you might need to find it based on the provided information.

• Point-Slope Form: The point-slope form of a line is y - y₁ = m₂(x - x₁), where (x₁, y₁) is a point on the line and m₂ is the slope. This form is particularly useful when you have a point and the slope.

• Slope-Intercept Form: The slope-intercept form is y = m₂x + b, where m₂ is the slope and b is the y-intercept. Once you have the slope and a point, substitute the values into the point-slope form and solve for b.

Step 4: Write the Equation of the Perpendicular Line

Substitute the calculated slope (m₂) and the coordinates of the point (x₁, y₁) into either the point-slope form or the slope-intercept form. Simplify the equation to obtain the final equation of the perpendicular line.

Examples: Putting it All Together

Let's work through a few examples to solidify your understanding:

Example 1: Find the equation of the line perpendicular to y = 3x + 2 that passes through the point (1, 4).

1. Slope of the given line: m₁ = 3
2. Slope of the perpendicular line: m₂ = -1/3
3. Using point-slope form: y - 4 = (-1/3)(x - 1) => y = (-1/3)x + 13/3

Example 2: Find the equation of the line perpendicular to 2x - 4y = 8 that passes through the point (2, 1).

1. Rewrite in slope-intercept form: y = (1/2)x - 2. Therefore, m₁ = 1/2.
2. Slope of the perpendicular line: m₂ = -2
3. Using point-slope form: y - 1 = -2(x - 2) => y = -2x + 5

Example 3: Find the equation of the line perpendicular to the line passing through points (1,2) and (3,4).

1. Slope of the given line: m₁ = (4-2)/(3-1) = 1
2. Slope of the perpendicular line: m₂ = -1
3. Let's assume the perpendicular line passes through the origin (0,0). Using point-slope form: y - 0 = -1(x-0) => y = -x

Handling Special Cases: Horizontal and Vertical Lines

• Perpendicular to a horizontal line (slope = 0): The perpendicular line will be a vertical line with an undefined slope. Its equation will be of the form x = c, where c is the x-coordinate of any point on the line.

• Perpendicular to a vertical line (undefined slope): The perpendicular line will be a horizontal line with a slope of 0. Its equation will be of the form y = c, where c is the y-coordinate of any point on the line.

Further Applications and Extensions

The concept of perpendicular lines extends beyond basic geometry. It's fundamental in:

• Calculus: Finding tangent and normal lines to curves.
• Linear Algebra: Orthogonal vectors and projections.
• Physics: Analyzing forces and motion.
• Computer Graphics: Creating precise geometric shapes and transformations.

Frequently Asked Questions (FAQ)

Q1: What if I don't have a point on the perpendicular line?

A1: You'll need additional information to determine a point. This might involve finding the intersection point of the given line and another line, or using other geometric relationships.

Q2: Can two perpendicular lines have the same y-intercept?

A2: Yes, they can. This occurs when the lines intersect at the y-axis.

Q3: How do I check if my answer is correct?

A3: Verify that the product of the slopes of the two lines is -1. You can also graph both lines to visually confirm their perpendicularity.

Conclusion: Mastering Perpendicular Lines

Finding the equation of a line perpendicular to a given line is a fundamental skill in mathematics with widespread applications. By understanding the relationship between slopes and mastering the steps outlined in this guide, you'll be well-equipped to tackle various problems involving perpendicular lines. Remember to practice regularly and apply your knowledge to real-world scenarios to solidify your understanding. With consistent effort, you'll develop a strong grasp of this crucial mathematical concept.