Word Problems
📖 Learn
This lesson focuses on applying coordinate geometry to real-world situations. Word problems require you to translate scenarios into mathematical models using the coordinate plane.
Strategies for Word Problems
- Read carefully - Identify what is given and what is asked
- Draw a diagram - Sketch the situation on a coordinate plane
- Assign coordinates - Place points strategically (often using the origin)
- Choose the right formula - Distance, midpoint, or slope
- Solve and interpret - Make sure your answer makes sense in context
Common Word Problem Types
- Navigation/Maps: Finding distances between locations
- Construction: Finding midpoints for supports or center points
- Motion: Determining if paths are parallel or perpendicular
- Area/Perimeter: Calculating measurements of figures on a coordinate plane
💡 Examples
Work through these examples to see how to approach word problems.
Example 1: Map Distance
Problem: On a city map where each unit represents 1 mile, a hospital is located at (3, 7) and a fire station is at (15, 2). How far apart are they?
Solution:
- This is a distance problem between two points
- d = sqrt[(15-3)^2 + (2-7)^2]
- d = sqrt[144 + 25] = sqrt[169] = 13
- Answer: The hospital and fire station are 13 miles apart
Example 2: Construction Project
Problem: A suspension bridge has support towers at coordinates A(20, 0) and B(80, 0). Where should a center support be placed?
Solution:
- This is a midpoint problem
- M = ((20+80)/2, (0+0)/2)
- M = (50, 0)
- Answer: The center support should be at (50, 0), which is 50 units from the origin along the x-axis
Example 3: Garden Design
Problem: A rectangular garden has corners at A(0, 0), B(8, 0), C(8, 6), and D(0, 6). Find the length of the diagonal and verify it is a rectangle.
Solution:
- Diagonal AC: d = sqrt[(8-0)^2 + (6-0)^2] = sqrt[64 + 36] = sqrt[100] = 10
- To verify rectangle: opposite sides must be equal and parallel
- AB = 8, DC = 8 (both horizontal, parallel)
- AD = 6, BC = 6 (both vertical, parallel)
- Answer: Diagonal is 10 units; it is a valid rectangle
✏️ Practice
Solve these 10 word problems. Draw diagrams to help visualize each situation.
1. A drone starts at position (0, 0) and flies to (9, 12). If each unit is 100 meters, how far did the drone travel?
2. Two friends are at a park. Alex is at coordinates (2, 5) and Jordan is at (10, 11). They want to meet exactly halfway. Where should they meet?
3. A ship travels from port A at (0, 0) to port B at (40, 30). If the ship can travel 10 km per hour, how long will the trip take?
4. A triangular plot of land has vertices at P(0, 0), Q(12, 0), and R(6, 8). What is the perimeter of the plot?
5. A sprinkler at the origin can spray water in a circle with radius 15 feet. Can it reach a flower bed at position (9, 12)?
6. A cable company needs to run a cable from point A(-3, 4) to point B(5, -2). If cable costs $2.50 per unit length, how much will the cable cost?
7. A treasure map shows buried treasure at the midpoint between a palm tree at (8, 2) and a rock at (4, 10). Where is the treasure?
8. A road runs through points (0, 3) and (6, 7). A second road runs through (2, 0) and (8, 4). Are these roads parallel? Explain.
9. A circular track has its center at (5, 5). If a point on the track is at (5, 12), what is the circumference of the track?
10. A kite has vertices at A(0, 3), B(2, 5), C(4, 3), and D(2, -1). Find the lengths of both diagonals AC and BD.
✅ Check Your Understanding
Verify your answers to the practice problems.
1. 1500 meters (15 units x 100 m)
2. (6, 8)
3. 5 hours (50 km at 10 km/hr)
4. 32 units (12 + 10 + 10)
5. Yes (distance is 15 feet, equal to radius)
6. $25.00 (10 units x $2.50)
7. (6, 6)
8. Yes, both have slope 2/3
9. 14pi (approximately 43.98) units; radius = 7
10. AC = 4 units, BD = 6 units
🚀 Next Steps
- Practice drawing coordinate diagrams for each problem type
- Review problems you found challenging
- Look for real-world applications of coordinate geometry in your daily life
- Move on to Common Mistakes to learn what errors to avoid