An increasing function is a function where the value of the output increases as the input increases. Mathematically, for any two values $x_1$ and $x_2$ such that $x_1 < x_2$, the function $f(x)$ satisfies $f(x_1) \leq f(x_2)$.
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In an increasing function, if $x_1 < x_2$ then $f(x_1) \leq f(x_2)$ holds true.
If the inequality is strict, i.e., $f(x_1) < f(x_2)$ when $x_1 < x_2$, then the function is called strictly increasing.
The slope of the graph of an increasing linear function is always positive.
In calculus terms, if the derivative of a function $f'(x) > 0$ for all $x$ in its domain, then it is an increasing function.
An increasing function may have flat regions where the slope is zero but does not decrease at any point.
Review Questions
What condition must hold for a function to be considered increasing?
How does the slope of a linear increasing function compare to zero?
Describe how you can determine if a non-linear function is increasing using calculus.
Related terms
Decreasing Function: A decreasing function is one where as the input increases, the output decreases. Mathematically, for any two values $x_1$ and $x_2$ such that $x_1 < x_2$, then $f(x_1) \geq f(x_2)$.