Trigonometry related to triangles has been the focus of the entire chapter, beginning with right triangles and the Pythagorean theorem and ending with formulas that require the use of sine and cosine to work with non-right triangles. We focus on applying and analyzing models for triangles in the real world.
Each time we model a real-world situation we should:
Identify the essential features of the problem
Create a model using a diagram, graph, table, equation or expression, or statistical representation
Analyze and use the model to find solutions
Interpret the results in the context of the problem
Verify that the model works as intended and improve the model as needed
Report on our findings and the reasoning behind them
The trigonometric ratios give us relationships between the sides and angles in a right triangle. In real-world situations, we won't always know all the information about a right triangle and we can use the trigonometric ratios, and their inverses, to find those missing values.
Real-world applications often involve objects or points of reference that are at different heights. The following terms are used to define the angles between objects at different heights.
We can also take the law of sines, law of cosines, and the formula for the area of a non-right triangle into consideration when working with triangles to model real-world situations.
After creating models involving triangles, we need to apply the model to the real life context and analyze the results. After analysis, we may realize that we need to revise our model to better fit the situation.
Adalberon is building stairs for the deck at his grandparents' house. He starts his project with pre-cut treads from a friend that have a depth of 11 \text{ in}.
Adalberon reads information regarding advice and safety measures for the rise and run of each stair. The angle of elevation from one stair to the next can vary from 30 \degree to 50 \degree. Given that the run of each stair is 11 \text{ in}, create a model with an appropriate rise for each stair.
Adalberon's parents think he should make the angle of elevation between 30 \degree and 35 \degree for his grandparents' safety. They also tell Adalberon to consider cutting new treads for the stairs so that he is not restricted to a specific run for each stair and that he use an official website that will have safety guidelines for stairs.
The Occupational Safety and Health Administration (OSHA) in the United States Department of Labor has requirements that Adalberon can use for the deck stairs:
The rise of each stair should be between 6 \text{ in} and 7 \frac{1}{2} \text{ in}
Revise your model from part (a) and apply the new requirements.
The deck sits 4 \frac{1}{2} \text{ ft} above the ground. Analyze your new model from part (b) and use it to plan out a report for Adalberon's parents that includes the model, the dimensions of each stair and the stairway as a whole, and a rationale for why this plan will meet all the necessary criteria.
In preparation for selling a triangular corner of her property, Florina hires a surveyor to take some measurements. She plans to sell 1 \frac{1}{2} acres of land in total, with one side of the plot along a road. Florina is willing to partition off anywhere from 120 \text{ ft} to 200 \text{ ft} along the road side of her property. The surveyor's notes so far include the 72 \degree angle at the corner of the plot and the 500-foot length of property line on that road, as shown:
When Florina decides what portion of the land to sell, she will have to purchase fencing for the side of the triangular plot that coincides with her property. The fencing she is looking to buy costs \$70 for every 2 yards of fence.
If 1 acre is equivalent to 43 \, 560 \text{ ft}^2, create a model of the plot of land if Florina only chooses to sell the minimum required road frontage of 120 \text{ ft}. Determine whether this is a good model and consider the conclusions of selling the plot of land using this model.
Apply the concept from part (a) to revise your model and create a new model that will help Florina compare different-sized road frontage options.
Make a final recommendation to Florina about the dimensions of the parcel she should sell.
An amphitheater is designed with a semicircular viewing section and a rectangular stage. The viewing section is designed so that the furthest audience member is 10 meters from the middle of the front of the stage. The stage is 20 meters by 6 meters.
Find the approximate area covered by the amphitheater to the nearest square meter.
If there are 300 people in the audience and 20 actors on stage, find the population density of the amphitheater.
We can use the trigonometric tools that we've learned about to make sense of and solve real-world problems. Applying and analyzing models with these tools empowers us to make informed decisions and at times necessary changes.