Verify that each equation is an identity.
(tan(α + β) - tan β)/(1 + tan(α + β) tan β) = tan α

Trigonometric identities are equations that hold true for all values of the variables involved. They are fundamental in simplifying expressions and solving equations in trigonometry. Common identities include the Pythagorean identities, angle sum and difference identities, and reciprocal identities. Understanding these identities is crucial for verifying equations and proving relationships between different trigonometric functions.

The angle sum identity for tangent states that tan(α + β) = (tan α + tan β) / (1 - tan α tan β). This identity is essential for manipulating expressions involving the tangent of a sum of angles. It allows us to express the tangent of a combined angle in terms of the tangents of the individual angles, which is particularly useful in proving identities and simplifying complex trigonometric expressions.

Algebraic manipulation involves rearranging and simplifying expressions using algebraic rules. In the context of trigonometric identities, this includes factoring, combining like terms, and applying identities to transform one side of an equation to match the other. Mastery of algebraic manipulation is vital for verifying identities, as it enables students to systematically show that both sides of an equation are equivalent.