Find functions ƒand g such that ƒ(g(x)) = (x² +1)⁵ . Find a different pair of functions ƒ and g that also satisfy ƒ(g(x)) = (x² +1)⁵  

The composition of functions involves combining two functions, where the output of one function becomes the input of another. This is denoted as ƒ(g(x)), meaning you first apply g to x, and then apply ƒ to the result. Understanding this concept is crucial for solving the problem, as it requires finding two functions that, when composed, yield a specific result.

Polynomial functions are expressions that involve variables raised to whole number powers, combined using addition, subtraction, and multiplication. The function (x² + 1)⁵ is a polynomial function raised to a power, which can be expanded using the binomial theorem. Recognizing the structure of polynomial functions helps in identifying potential forms for ƒ and g that can achieve the desired composition.

Function decomposition is the process of breaking down a complex function into simpler component functions. In this context, it involves finding two distinct functions ƒ and g such that their composition results in (x² + 1)⁵. This concept is essential for exploring different pairs of functions that can satisfy the given equation, allowing for creative solutions and insights into function behavior.