• subignition@kbin.social
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    1 year ago

    […] the question is ambiguous. There is no right or wrong if there are different conflicting rules. The only ones who claim that there is one rule are the ones which are wrong!

    https://people.math.harvard.edu/~knill/pedagogy/ambiguity/index.html

    As youngsters, math students are drilled in a particular
    convention for the “order of operations,” which dictates the order thus:
    parentheses, exponents, multiplication and division (to be treated
    on equal footing, with ties broken by working from left to right), and
    addition and subtraction (likewise of equal priority, with ties similarly
    broken). Strict adherence to this elementary PEMDAS convention, I argued,
    leads to only one answer: 16.

    Nonetheless, many readers (including my editor), equally adherent to what
    they regarded as the standard order of operations, strenuously insisted
    the right answer was 1. What was going on? After reading through the
    many comments on the article, I realized most of these respondents were
    using a different (and more sophisticated) convention than the elementary
    PEMDAS convention I had described in the article.

    In this more sophisticated convention, which is often used in
    algebra, implicit multiplication is given higher priority than explicit
    multiplication or explicit division, in which those operations are written
    explicitly with symbols like x * / or ÷. Under this more sophisticated
    convention, the implicit multiplication in 2(2 + 2) is given higher
    priority than the explicit division in 8÷2(2 + 2). In other words,
    2(2+2) should be evaluated first. Doing so yields 8÷2(2 + 2) = 8÷8 = 1.
    By the same rule, many commenters argued that the expression 8 ÷ 2(4)
    was not synonymous with 8÷2x4, because the parentheses demanded immediate
    resolution, thus giving 8÷8 = 1 again.

    This convention is very reasonable, and I agree that the answer is 1
    if we adhere to it. But it is not universally adopted.

    • […] the question is ambiguous. There is no right or wrong if there are different conflicting rules. The only ones who claim that there is one rule are the ones which are wrong!

      https://people.math.harvard.edu/~knill/pedagogy/ambiguity/index.html

      Yeah nah. Actual Maths textbooks and proofs - did you not notice the complete lack of references to textbooks in the blog? It’s funny that he mentions Cajori though, given Cajori has a direct reference to Terms #MathsIsNeverAmbiguous

    • Coreidan@lemmy.world
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      1 year ago

      Everyone in this threading referencing PEMDAS and still thinking the answer is 1 are completely ignoring the part of the convention is left to right. Only way to get 1 is to violate left to right on multiplication and division.

      • Zagorath@aussie.zone
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        1 year ago

        The problem is that BIDMAS and its variants are lies-to-children. Real mathematicians don’t use BIDMAS. Multiplication by juxtaposition is extremely common, and always takes priority over division.

        Nobody in their right minds would saw 1/2x is the same as (1/2)x. It’s 1/(2x).

        That’s how you get 1. By following conventions used by mathematicians at any level higher than primary school education.

        • EndlessApollo@lemmy.world
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          1 year ago

          Source? I have a hard ass time believing that nobody in their right mind would do pemdas the way you’re supposed to do it xD

          • Zagorath@aussie.zone
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            1 year ago

            The problem is that you’re thinking of BIDMAS as a set of hard rules, rather than the set of rough guidelines created in the early 20th century by one random teacher for the purposes of teaching 10-year-olds how to do the level of maths that 10-year-olds do.

            This video and this one point to some examples of style guides in academia as well as practical examples in the published works of mathematicians and physicists, which are pretty consistent.

            If you want to come up with a hard rule, doing BIJMDAS, adding in “multiplication indicated by juxtaposition” with the J, is a much better way to do it than what you learnt when you were 10. But even that’s still best to think of as a handy guideline rather than a hard and fast rule.

            • EndlessApollo@lemmy.world
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              1 year ago

              That’s cool, but still wrong :3

              No fr I had no idea that those acronyms weren’t the whole picture, I just assumed some mathematicians a long time ago decided how that stuff should be written out and that BEDMAS/PEMDAS/whatever contained all the rules in it. Thank you for the info, Idk why this isn’t more widely taught, ig because those acronyms are what all the questions are already written for? It doesn’t seem that hard to just teach it as BEADMAS, where the A refers to numbers adjacent to variables