Final answer:
The proof involves using the Pythagorean trigonometric identity to express sin²A in terms of cos²A, and then using the definition of tangent to show that tan²A cos²A equals 1 - cos²A.
Step-by-step explanation:
To prove that tan²A cos²A equals 1 - cos²A, we need to manipulate the trigonometric identities. Let's start with the Pythagorean identity, which states:
sin²A + cos²A = 1
From this identity, we can express sin²A in terms of cos²A:
sin²A = 1 - cos²A
Now let's consider the definition of the tangent function in terms of sine and cosine:
tanA = sinA / cosA
If we square the tangent function, we get:
tan²A = sin²A / cos²A
Using the expression we found for sin²A, we substitute it into the equation for tan²A:
tan²A = (1 - cos²A) / cos²A
We then multiply both sides by cos²A to get:
tan²A cos²A = 1 - cos²A, which is what we were asked to prove.