Final answer:
When angles A and B are complementary, the correct trigonometric relationship between tan 2A and tan B is tan 2A = (2tan B) / (1 - tan^2 B). Option b) is correct. Other options don't match the trigonometric identities for a double angle or complementary angles.
Step-by-step explanation:
When we know that m∠A + m∠B = 90°, angles A and B are complementary angles, and the trigonometric identities for the tangent of a double angle and the tangent of a complementary angle come into play. The tangent of a double angle is given by:
tan 2A = (2tan A) / (1 - tan2 A)
Since angles A and B are complementary (A + B = 90°), we have tan B = cot A, which means tan B = 1/tan A. We can use this relationship to express tan 2A in terms of tan B, leading to:
tan 2A = (2(1/tan B)) / (1 - (1/tan B)2)
This simplifies to:
tan 2A = (2tan B) / (1 - tan2 B)
Therefore, the correct relationship is option b). None of the other options accurately depict the relationship between tan 2A and tan B when A and B are complementary.
Options a), c), and d) do not correspond to the established trigonometric identities for tan 2A or tan B and should be disregarded in this context.