Piecewise functions: Got an example of a real world piecewise function?

Looking for something beyond a contrived textbook problem concerning jelly beans or equations that do not represent anything concrete. Not just a piecewise function for its own sake. Anyone?

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I use b-splines for some image processing work. These are piecewise polynomial functions and very useful I might add! – WimC Jun 5 '12 at 12:37
Piecewise what? Piecewise defined, piecewise linear, piecewise continuous... – Simon Markett Jun 5 '12 at 12:37
And if you are going for full on real life: The marginal tax rate is piecewise linear (at least in some countries) – Simon Markett Jun 5 '12 at 12:40
@SimonMarkett: I think you mean the marginal tax rate is piecewise constant, so that the amount of tax to be payed itself is a piecewise linear function of the income. What you sugfgest would make the tax amount piecewise quadratic, which would be fun (sort of) but is not common. – Marc van Leeuwen Jun 5 '12 at 14:19
@MarcvanLeeuwen, yes you are right. Since I don't pay tax yet I just vaguely remembered the graph as it was shown to us back in high school and probs confused it. Luckily I am still right strictly speaking, since any constant function is linear :P – Simon Markett Jun 5 '12 at 14:25

Something like "buy $5$, and get each one after that at half price" say at a grocery store or clothing store. For example, let $C(x)$ be the cost of the item for the consumer and $p(x)$ be the price (assume it is constant.)

Then,

$C(x) = 5p |x\le5$ or $C(x) = 5p + (x-5)\cdot\frac{1}{2}p|x>5$

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Are we assuming that the customer is not allowed to buy one item at the price $p$? – ahorn Apr 28 at 20:39

I always thought the horizontal distance from a wall to an object is a good example of a piecewise continuous function (of the height):

Here the various red lines show the various distances and the green line marks the point of discontinuity.

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Computing income taxes in a bracketed system.

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Cab fares are a piecewise constant function of distance travelled.

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They charge for time, too! – The Chaz 2.0 Jun 5 '12 at 13:05

The classic example is friction---say for a block sitting on a rough horizontal plane and subject to a continuously increasing horizontal force. The frictional force rises steadily to match the applied force, and then it drops back a bit to a constant value when the block begins to slide.

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Though this, like every example from physics, is of course just an approximation. If you measure precise and quickly enough, the drop of the frictional force is really just a fuzzy transition, governed by randomness (thermal fluctuations). – leftaroundabout Jun 5 '12 at 17:51
@leftroundabout: If you measure even more precisely and quickly, you will get only discrete (quantized) transitions in the output of your measuring device. – John Bentin Jun 5 '12 at 20:50
Close to absolute zero temperature / in a closed system yes, but not at the conditions where you would usually measure something like friction. Force isn't much good as a quantum-mechanical observable anyway. – leftaroundabout Jun 5 '12 at 22:46
Is this also called static vs dynamic friction ? – JackOfAll Sep 17 '14 at 12:10
@JackOfAll: Yes. – John Bentin Sep 17 '14 at 16:36

How about a monthly mobile phone plan? Your cost is constant (maybe $50/month) as long as you stay under the allotted minutes (maybe 1000/month), but then you are charged per minute after. - Any disturbed physical system. If you're dealing with circuits you'll often want to solve an equation that involves switches. E.g, letting a capacitor charge for 1 ms and then switching the connection to a closed loop where it discharges. That switch naturally gives a piecewise-defined function. Similar ideas go for physical systems involving collisions, such as a bouncing ball. They come up all the time. - Shock waves. Properties of materials before and after phase transitions. - Hyperphysics has a graph showing the piecewise nature of temperature vs energy across phase changes. hyperphysics.phy-astr.gsu.edu/hbase/thermo/phase.html – Dan Neely Jun 5 '12 at 19:17 As Wim mentions in the comments, piecewise polynomials are used a fair bit in applications. In designing profiles and shapes for cars, airplanes, and other such devices, one usually uses pieces of Bézier or B-spline curves (or surfaces) during the modeling process, for subsequent machining. In fact, the continuity/smoothness conditions for such curves (usually continuity up to the second derivative) are important here, since during machining, an abrupt change in the curvature can cause the material for the modeling, the mill, or both, to crack (remembering that velocity and acceleration are derivatives of position with respect to time might help to understand why you want smooth curves during machining). - Depth of a swimming pool as function of the distance from one end: - Postal rates (as a function of weight, in ounces): Look at the price of a$1.9$oz letter, then$1.99$oz letter, then$2.01$oz letter, etc. - What about the travel time to a fixed destination in a scheduled public transport system? It is a piecewise linear function of the departure time with slope$-1\$.

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Piecewise constant functions come up all the time in the design and analysis of digital circuits (see square waves, for example). The finite element method is a very widely used technique that approximates solutions of differential equations as piecewise linear functions.

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Bussiness is a good example. The increase in salary shows a piecewise function.

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