Given a function, how do you find the average?

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Given a function, how do you find the average?

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Answer 1 · 2015-06-07T13:16:07

If you have two numbers $a$ $a$ and $b$ $b$ , then their average is $\frac{a + b}{2}$ $(a+b)/2$ .

If you have three numbers $a$ $a$ , $b$ $b$ and $c$ $c$ , then their average is
$\frac{a + b + c}{3}$ $(a+b+c)/3$

If you have a finite sequence of numbers: $a_1, a_2,...,a_n$ , then their average is $(sum_(i=1)^(i=n) a_i)/n$

If you have a finite set $F$ and a function $f:F->RR$ then
the average value of $f$ over $F$ is

$(sum_(x in F)(f(x)))/|F|$

If instead of a finite set you have a measurable set $S$ of finite measure such as a finite interval or the surface of a sphere or suchlike and $f:S->RR$ then the average of $f$ over $S$ is

$(int_(x in S)f(x))/|S| = (int_(x in S)f(x))/(int_(x in S)1)$

Answer 2 · 2015-06-07T13:31:06

Given the topic "Graphs of Linear Equations and Functions > Slope" you may be wondering how to calculate the "average slope" of a function between two points.

If you are given points $(x_1, f(x_1))$ and $(x_2, f(x_2))$ through which a curve described by a function $f$ passes, and $f$ is suitably continuous and differentiable between those points, then the average slope of $f(x)$ between those points is:

$(f(x_2) - f(x_1))/(x_2 - x_1)$

It doesn't matter how much the curve wiggles in between - essentially we are dealing with the integral of the derivative of $f(x)$ .

The average slope is:

$(int_(x=x_1)^(x=x_2) d/(dx)f(x)) / (x_2-x_1)$

which simplifies to $(f(x_2) - f(x_1))/(x_2 - x_1)$

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Given a function, how do you find the average?

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