Unit 3, Lesson 9
Trigonometry Squared
Integrated Math 2
Lesson Synthesis
Display this triangle for all to see, then ask students to find and .
Ask students, “How can all these different triangles have the same ratios for cosine and sine?” (All the triangles are similar, so the fractions are equivalent.)
Student Lesson Summary
In a previous lesson we saw a relationship between the cosine of an angle and the sine of its complementary angle. There is also a relationship between the cosine and sine of the same angle. Let's consider the squares of each value.
Here is a table with a few angle measures, the cosine and sine of each, and the squares of the cosine and sine of each.
| angle | cosine | sine | square of cosine | square of sine |
|---|---|---|---|---|
| 30 | 0.866 | 0.5 | 0.75 | 0.25 |
| 35 | 0.819 | 0.574 | 0.671 | 0.329 |
| 40 | 0.766 | 0.643 | 0.587 | 0.413 |
We notice that the sum of the squares of the cosine of an angle and the sine of the same angle is always equal to 1. Summing squares reminds us of the Pythagorean Theorem, and this claim can be justified by using the Pythagorean Theorem.
In this right triangle, because of the Pythagorean Theorem. Divide both sides of the equation by . Now the equation is . In this triangle, by the definition of cosine, so . Similarly, . Substitution results in . This proof works for any right triangle, so the equation works for any acute angle .
We can use this equation to find the cosine of any acute angle when given the sine of the angle, and vice versa. For example, if we know the sine of an angle is , we can substitute that value into the equation to get . This is equivalent to . There are two solutions to this equation, one positive and one negative. Since the cosine of an acute angle is positive, we choose that value and get .