38 lines
2.1 KiB
Markdown
38 lines
2.1 KiB
Markdown
# Maximum/Minimum
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A function $f$ has an *absolute maximum* at $c$ if $f(c) >= f(x)$. We call $f(c)$ the maximum value of $f$.
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The absolute **maximum** is the largest possible output value for a function.
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A function $f$ has an absolute minimum at $c$ if $f(c) <= f(x)$. $f(c)$ is the absolute minimum value of $f$.
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The absolute **minimum** is the smallest possible output value for a function.
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- Where the derivative of a function is zero, there is either a peak or a trough.
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# Critical Numbers
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A number is considered critical if the output of a function exists and $\dfrac{d}{dx}$ is zero or undefined.
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# Local Max/Min
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A local max/min is a peak or trough at any point along the graph.
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# Extreme Value Theorem
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If $f$ is a continuous function in a closed interval $[a, b]$, then $f$ achieves both an absolute maximum and an absolute minimum in $[a, b]$. Furthermore, the absolute extrema occur at $a$ or at $b$ or at a critical number between $a$ and $b$.
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## Examples
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> Find the absolute maximum and absolute minimum of the function $f(x) = x^2 -3x + 2$ on the closed interval $[0, 2]$:
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1. $x=0$ and $x=2$ are both critical numbers because they are endpoints. Endpoints are *always* critical numbers because $\dfrac{d}{dx}$ is undefined.
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2. $\dfrac{d}{dx} x^2 -3x + 2 = 2x -3$
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3. Setting the derivative to zero, $0 = 2x - 3$
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4. Solving for x, we get $x = \dfrac{3}{2}$. Three halves is a critical number because $f'(\dfrac{3}{2})$ is $0$.
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5. Now check the outputs for all critical numbers ($f(x)$ at $x = \{0, 2, \dfrac{3}{2}\}$)
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6. $f(0) = 0^2 -3(0) + 2 = 2$
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7. $f(2) = 2^2 - 3(2) + 2) = 0$
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8. $f(\dfrac{3}{2}) = (\dfrac{3}{2})^2 - 3(\dfrac{3}{2}) + 2 = -\dfrac{1}{4}$
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9. The minimum is the lowest of the three, so it's $-\dfrac{1}{4}$ and it occurs at $x = \dfrac{3}{2}$
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10. The maximum is the highest of the three, so it's $2$ at $x = 0$.
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> Find the absolute maximum and absolute minimum of the function $h(x) = x + 2cos(x)$ on the closed interval $[0, \pi]$.
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1. $x = 0$ and $x = \pi$ are both critical numbers because they are endpoints. Endpoints are critical because $\dfrac{d}{dx}$ is undefined.
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2.
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