![]() ![]() Consider a right-angled triangle ABC right angled at B. ![]() Now that we have discussed the cofunction identities in the previous section, let us now derive them using the right angle triangle. We will also solve various examples to understand the usage of these cofunction identities to solve various math problems involving trigonometric functions. In this article, we will derive the cofunction identities and verify them using the sum and difference formulas of trigonometric functions. We use the angle sum property of a triangle to derive the six cofunction identities. Cofunction identities are trigonometric identities that show the relationship between trigonometric ratios pairwise (sine and cosine, tangent and cotangent, secant and cosecant). Two angles are said to be complementary angles if their sum is equal to π/2 radians or 90°. Let us recall the meaning of complementary angles. Cofunction identities in trigonometry give the relationship between the different trigonometric functions and their complementary angles. ![]()
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