• @Mostly_Gristle
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    11610 months ago

    Student: “Hey, a shortcut! Let me first just walk around the long way so I can measure the length of the other two sides, multiply those lengths by themselves, add them together, and find out how much extra walking I’ve saved myself by taking the shortcut. Boy, this shortcut sure is saving me a lot of effort. Hooray Pythagoras!”

  • @DanglingFury
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    10 months ago

    There’s a college in Chicago, i think it’s IIT maybe, that used aerial photography to map out the student cow paths, then they redid all the sidewalks to incorporate those paths.

    Edit: they ended up adding a building in a grassy area and maintained all the hall/walkways of the building in line with the sidewalks/cowpaths. Kinda neat.

    • @Crashumbc
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      1610 months ago

      This has happened at a LOT of colleges. Penn State’s quad is crisscrossed with paths that they paved.

    • Sabre363
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      1310 months ago

      I’d be surprised if students didn’t immediately make new paths off the new sidewalks

      • @kameecoding
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        2510 months ago

        why would they, desire paths happen because the initial pavements aren’t designed well.

        • volvoxvsmarla
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          1110 months ago

          We had that in my local park. There was a huge field that everyone walked through because it was much quicker than going around. So they finally made a sidewalk there (not with tarmac though, more like gravel and sand mix). Just a couple of weeks later there was a new path just parallel to this one. My guess is the problem was that the field was a bit hole shaped (sorry I don’t know a better term in English) and this, as well just the nature of the sidewalk, led to it accumulating water puddles, and also it just turned into sandy/stoney mud when it rained. For bikes it was also just more comfortable to ride over the grass than over gravel. But it still felt like an asshole move.

          • @uis
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            210 months ago

            For bikes it was also just more comfortable to ride over the grass than over gravel.

            True. Personal experience.

        • Sabre363
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          410 months ago

          Because that’s exactly what has happened multiple times at the community college I go to.

          • kase
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            610 months ago

            Just pave the entire thing at that point (sarcasm) (pls don’t do this)

            • Sabre363
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              310 months ago

              Sadly this seems to be exactly their plan, just as soon as the government gives them another $10*10^6 to lose

    • Trollivier
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      10 months ago

      I love this type of urbanism. Some cities also study how cars behave in winter by looking at the tracks in the street, and they realized cars actually needed much less room on street corners than they thought.

      • @uis
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        110 months ago

        Every winter I see same corner filled with snow and nothing changed. They for sure need to cut some corners.

  • CashewNut 🏴󠁢󠁥󠁧󠁿
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    4710 months ago

    I wish I was taught about the usefulness of maths growing up. When I did A-level with differentition and integration I quickly forgot as I didn’t see a point in it.

    At about 35 someone mentioned diff and int are useful for loan repayment calculations, savings and mortgages.

    Blew my fucking mind cos those are useful!

    • @thehatfox
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      10 months ago

      That’s one of the big problems with maths teaching in the UK, it’s almost actively hostile to giving any sort of context.

      When a subject is reduced to a chore done for its own sake it’s no wonder most students don’t develop a passion or interest in it.

      • @[email protected]
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        1010 months ago

        In the US it’s common to give students “word problems” that describe a scenario and ask them to answer a question that requires applying whatever math they’re studying at the time. Students hate them and criticize the problems for being unrealistic, but I think they really just hate word problems because because they find them difficult. To me that means they need more word problems so they can actually get used to thinking about how math relates to the real world.

        • @[email protected]
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          310 months ago

          I don’t see it that way. Most “word problems” are just poorly posed, lack important information, or are ambiguous. Often, they are mostly fairly unrealistic.

          It would be better to describe usage scenarios, talk about examples in class, and give exercises which have a clear, discernible pattern. Like, actual physics problems.

        • @commandar
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          310 months ago

          Part of what makes all the hatred for Common Core math so hilarious to me is that when I finally saw what they were teaching, it was a moment of “holy shit, this is exactly how I use and do math in real life.” It’s full of contextualizing with a focus on teaching mental shortcuts that allow you to quickly land on ballpark answers. I think it’s absolutely wonderful.

          But it’s so foreign to the rote manner that a lot of parents were taught that many of them have a hard time grasping it, and get angry as a result.

        • R0cket_M00se
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          210 months ago

          Nah, the word problems suck because they’re intended to teach you how to convert word problems into math problems. They did absolutely nothing to show how math is used in real world scenarios.

        • @[email protected]
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          210 months ago

          There are three problems I had with word problems in school. Not every problem applied to every word problem.

          1. “This is way too vague.”

          2. “Why would someone buy 35 apples and 23 oranges?”

          3. “Why would the person in the problem want to try to figure this problem out? It’s completely unrelated to what they were doing.”

          I get the point was for us to be able to convert information given in a text format into something we can actually solve, but the word problems were usually situations you’d never realistically find yourself in in real life.

            • @[email protected]
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              210 months ago

              No, 2 is more “why are they buying this many”, and 3 is more “why would this person want to figure out some random thing that popped into their head about this”.

              • @[email protected]
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                10 months ago

                Okay, concerning 2 I thought you meant, why count and buy exactly this number. But it’s actually realistic, for a big family, or for desserts for a party, etc.

    • TimeSquirrel
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      1910 months ago

      Hated Algebra in high school. Then years later got into programming. It’s all algebra. Variables, variables everywhere.

      • @[email protected]
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        1710 months ago

        Ehh I wouldn’t say variables in programming are all that similar to variables in algebra. In a programming language, variables typically are just a name for some data. Whereas in algebra, they are placeholders for unknown values.

        • @[email protected]
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          710 months ago

          Machine Learning is basically a lot of linear algebra, which is mathematically equivalent to solving simultaneous equations.

    • @[email protected]
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      810 months ago

      The other use is as a door-opener; Learning these maths fundamentals enables you to pursue a stem degree

      • CashewNut 🏴󠁢󠁥󠁧󠁿
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        1010 months ago

        as a door-opener

        You say that but they still need to teach you the “why”. For example I did A-level maths which was a door to learning discrete maths in uni. Matrices, graphs, etc.

        In 20yrs as a software dev I never used any of it. Only needed basic arithmetic.

        To this day I’ve got no bloody clue what the point of matrices are.

        • @[email protected]
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          710 months ago

          I used them in computer graphics and game programming. As a regular software dev, not so much.

        • @[email protected]
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          10 months ago

          They’re used for manipulating vectors.
          Just like how in
          v
          the a makes the vector v longer or shorter, in
          v
          M can change the vector, for example rotate it.

          Just like vectors and other mathematical objects, matrices are purely theoretical concepts. There is no direct real-life meaning to them.
          However, there are a bunch of real-world problems where matrices can be put to use to calculate something meaningful.

          • CashewNut 🏴󠁢󠁥󠁧󠁿
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            210 months ago

            I fucking loved maths mechanics which is like applied maths/physics. So you’d calculate the distance a ball is thrown or a cannon ball dropped from a cliff. Don’t think we ever did matrices in it though. I enjoyed it so much I’d do excersizes in the book for fun!! That and politics were the only courses I was passionate about.

            But I became a software dev that didn’t use maths or politics. :/

            So from age 5-17 I hated maths cos I saw no point in it. Until I hit 17 and someone said I can work out how fast a fucking cannon ball travels on impact?! I mean holy dog shit! If someone told me that in primary school I’d have loved maths!

            It was very much taught as a means to answer questions though rather than application. So as an adult I’d have to be shown how a number could be found using algebra. But because it wasn’t in an algebra question format it went over my head. It literally required someone taking numbers I’d been given and putting them in a line with letters before my brain engaged to “Oh shit - algebra! I know this!”.

            Another example is differentiation. I recently looked up my notes and remembered it was told to us very mechanically: f(x) = 4x^3 => f'(x) = 4(3x^2) = 12x^2

            No idea why that’s the case - it just is.

            It’s a shame cos I learnt I love maths at 17 but by that point I’d lost years of potential.

            P.S. any advice on where I can re-learn real-world maths? I’d love to redo my teens maths learning for fun.

  • @Doublepluskirk
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    4110 months ago

    One of my favourite names for anything is these being called ‘desire lines’. It’s so whimsical.

  • @RunAroundDesertYou
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    4010 months ago

    Idk, this really doesn’t have to do anything with Pythagora’s Theorem

    • Transporter Room 3
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      2210 months ago

      Beyond the general “hehe funny meme” Some seem to think there’s some kind of math going on in people’s heads other than “shortcut”

      The knowledge of Pythagoras or math doesn’t factor in here at all. Toddlers do this.

      Having the knowledge just gives you fancy words for the resulting coincidental shape.

      • TimeSquirrel
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        10 months ago

        Having the knowledge just gives you fancy words for the resulting coincidental shape.

        Isn’t that basically all of physics? Just an abstract concept to describe something that sort of fits the rules we extrapolated from observations so far.

      • @[email protected]
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        310 months ago

        Yeah, somebody once explained this to me like

        “even stupid animals go directly at where they want to go”

    • @myslsl
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      410 months ago

      Yeah, true. No Euclidean distances implicit to this problem. Oh, wait…

    • Dessalines
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      310 months ago

      Yeah… this is just “the shortest distance between two points is a straight line”

    • @jenny_ball
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      110 months ago

      yea i get the intent but it doesn’t really make sense

  • pflanzenregal
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    10 months ago

    I think this is more a case of the triangle inequality in metric spaces, as you don’t have to calculate any particular edge to see the shortcut, as well as that it applies to any even non-rectangular triangle.

    • @petersr
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      10 months ago

      But if you want to know your saving, you will need to dust off the old formula. And if you do, you find the maximum saving to be around 41% (in the case of isosceles right triangle where the hypotenuse is a factor of sqrt 2 shorter).

  • @[email protected]
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    1310 months ago

    Now, I’m wondering if we have a thriving Desire Paths (that’s what these paths are called) community somewhere on here.

  • KptnAutismus
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    1010 months ago

    this is actually the one thing i am glad to have learned in math class. saves me a lot of guesswork sometimes.

    • @[email protected]
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      310 months ago

      I can’t think of when I’ve actually used it.

      I’ve seen comments about how 3, 4, 5 allows you to make a square corner with a tape measure, but I’ve never had an opportunity to use that trick.

      I find myself trying to guess the area of things a lot more.

      • @[email protected]
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        10 months ago

        I guess your not a carpenter and you don’t build things? It’s super useful. I don’t use it all that often but it’s an excellent tool to have. Even just laying out a square garden, say. It also works with any multiple to make bigger perpendiculars, 6, 8, 10 or 15, 20, 25

  • AwkwardLookMonkeyPuppet
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    10 months ago

    I have literally done this calculation in my head while walking before to see if it was faster to cut the corner or walk around. Nice!