Think of a function as a machine. Input ( ): You put a value into the machine. Process ( ): The machine applies a specific rule to that input. Output ( ): The result is a new value. For example, in Key Aspects of Notation: is the name of the function, and indicates the variable used in the rule. Interchangeability with : In graphing, is often interchangeable with . The input ( ) and output ( ) form a coordinate pair
'. It is a precise, standard way to define the relationship between an input (independent variable, ) and its corresponding output (dependent variable, Think of a function as a machine
is used to define functions and their mapping, often written as Left-hand limits are often denoted by Finance/Business: " FXcap F cap X " (often capitalized) typically refers to Foreign Exchange. Output ( ): The result is a new value
To help me provide the most relevant write-up, could you tell me if you are looking for: An (how to use in equations)? A calculus application (derivatives or limits)? Data visualization (graphing The input ( ) and output ( ) form a coordinate pair '