Solve each equation for x.
arccos x + arctan 1 = 11π/12

Inverse trigonometric functions, such as arccos and arctan, are used to find angles when given a ratio of sides in a right triangle. For example, arccos x gives the angle whose cosine is x, while arctan 1 gives the angle whose tangent is 1, which is π/4. Understanding these functions is crucial for solving equations involving angles.

The concept of angle addition is essential when working with trigonometric equations. In this case, the equation involves the sum of two angles: arccos x and arctan 1. Recognizing that arctan 1 equals π/4 allows us to rewrite the equation as arccos x + π/4 = 11π/12, facilitating the isolation of x.

Solving trigonometric equations often involves isolating the variable and using known values of trigonometric functions. In this problem, after simplifying the equation, we can find x by applying the cosine function to both sides. This process requires familiarity with the unit circle and the properties of trigonometric functions to determine valid solutions.