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Functions are mathematical building blocks for designing machines, predicting natural disasters, curing diseases, understanding world economies and for keeping aeroplanes in the air. Functions can take input from many variables, but always give the same answer, unique to that function. It is the fact that you always get the same answer from a set of inputs that makes functions special.
A major advantage of functions is that they allow us to visualise equations in terms of a graph . A graph is an accurate drawing of a function and is much easier to read than lists of numbers. In this chapter we will learn how to understand and create real valued functions, how to read graphs and how to draw them.
In addition to their use in the problems facing humanity, functions also appear on a day-to-day level, so they are worth learning about. A function is always dependent on one or more variables, like time, distance or a more abstract quantity.
Some typical examples of functions you may already have met include:-
The following should be familiar.
In Review of past work , we were introduced to variables and constants. To recap, a variable can take any value in some set of numbers, so long as the equation is consistent. Most often, a variable will be written as a letter.
A constant has a fixed value. The number 1 is a constant. Sometimes letters are used to represent constants, as they are easier to work with.
In the following expressions, identify the variables and the constants:
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