The NumWorks graphing calculator
The NumWorks graphing calculator
Posted Sep 29, 2017 6:53 UTC (Fri) by sytoka (guest, #38525)Parent article: The NumWorks graphing calculator
Posted Sep 29, 2017 7:20 UTC (Fri)
by madhatter (subscriber, #4665)
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Posted Sep 29, 2017 7:42 UTC (Fri)
by Lionel_Debroux (subscriber, #30014)
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Posted Sep 29, 2017 9:04 UTC (Fri)
by anselm (subscriber, #2796)
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In my school, shoes with track spikes were absolutely no problem for the PE tests, but programmable calculators in mathematics exams were right out. It was apparently OK if you could afford giving yourself an edge in sports, but not in maths.
Posted Sep 29, 2017 10:29 UTC (Fri)
by gdt (subscriber, #6284)
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The problem being that modern calculators are so good that allowing them in secondary school exams would turn them into simple copying from the screen to the exam paper. To see an example, enter a polynominal into Wolfram Alpha, it will graph it, show the roots, and even show line-by-line working for obtaining the roots using all the different methods. So the examination bodies have choosen to restrict calculators to have little capability beyond what is possible with pen, paper and tables of functions. There is a deeper question here, which is why in the presence of such computing power we persist in teaching mathematics as if that tool is not available. A way which is now very different to the way professional mathematicians, statisticians and engineers approach the same tasks. I was watching my daughter be taught graph theory and surprised that it didn't end with an introduction to a library like Python's NetworkX, which would have considerably helped them with their task of computing a 50 vertice graph. Similarly that the statistics topic didn't introduce R. There are obvious answers of course, and they are so difficult to overcome that it's clear how we got to this point. It's less clear how to get out beyond this point and towards a better mathematics experience for students.
Posted Sep 29, 2017 12:18 UTC (Fri)
by aleXXX (subscriber, #2742)
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I know this may sound old...
Posted Sep 29, 2017 15:07 UTC (Fri)
by gutschke (subscriber, #27910)
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There are a good number of numerical problems that can be computed without the help of calculators.
And once the student has mastered the mechanics of math, you can let them take future tests "open book" and with a calculator.
Of course, those tests will be much more difficult
Posted Oct 12, 2017 15:08 UTC (Thu)
by Wol (subscriber, #4433)
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Somebody who's been taught to just enter it into a calculator will quite happily accept an answer that is approximately 10, or approximately 1000.
I regularly do a "sloppy calculation" in my head when using a calculator, precisely to pick up "finger trouble" errors, and it regularly saves my bacon ... :-)
Cheers,
Posted Oct 12, 2017 16:34 UTC (Thu)
by gutschke (subscriber, #27910)
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There are an amazing number of problems that can be approximated, if you know these logarithms. You can usually get the order of magnitude and sometimes one or two significant digits. That's absolutely good enough to eyeball the results for plausibility.
Also, like most of you, I know the powers of two up to at least 16 -- and probably higher, if I give it a little thought. Turns out, a lot of problems that look difficult in base 10 look really easy in base 2.
Math is all about reducing a complicated problem to a different problem that is easy. And if you memorize a small number of constants from different problem domains, then your toolbox grows exponentially more powerful. Logarithms are particularly good for this, but some of the trigonometric functions are pretty useful, too.
I distinctly remember moments in university (back, when I still needed to do lots of math), when I would arrive at an approximate answer within seconds, whereas my peers took about one minute to get the exact answer from their calculators. Turns out, my answers were always within less than 10% of theirs, and often better -- which frequently is good enough.
Posted Oct 14, 2017 7:22 UTC (Sat)
by micka (subscriber, #38720)
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Posted Sep 29, 2017 13:13 UTC (Fri)
by mjthayer (guest, #39183)
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Posted Sep 29, 2017 14:15 UTC (Fri)
by cpitrat (subscriber, #116459)
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Posted Sep 29, 2017 14:30 UTC (Fri)
by tialaramex (subscriber, #21167)
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OK, so, ultimately the goal is for the student to learn stuff. We have exercises, tests, coursework, all that stuff _only_ in service of this goal. At the top end, everybody involved is aware that's what is going on, and if you propose to cheat the tests rather than learn the material they will stare at you like you just said you've got an idea how to defeat the safety limits and cut your own arms off with the wood saw. We do not much care that you are able to actually add 5 + 7 = 12‡, our goal in asking that is only to verify that you properly understood what's going on there so that when we later assume that knowledge you're not left staring blankly into space.
‡ Although it will help in some jobs to not need a calculator or other machine to do this sort of simple arithmetic that's not why we're teaching it to children in 2017.
But at high school level this idea about cheating being _futile_ is not going to be something we can expect most of the students to understand. So rather than replace 100 hours of her classes with material about "This is why you probably ought to pay attention and not cheat in tests" we just go out of our way to not let your daughter cheat until much later, by which time hopefully she'll have figured this out for herself.
Posted Sep 29, 2017 22:28 UTC (Fri)
by anselm (subscriber, #2796)
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I probably should have mentioned that that was in the 1980s. Calculators (programmable or not) used to be a lot more primitive then.
Posted Oct 5, 2017 3:54 UTC (Thu)
by Matt_G (subscriber, #112824)
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At university I found out about 10 minutes before my first exam all forms of programmable calculators were banned from examinations I rushed off and bought a cheap $10 Casio scientific calculator and (barely) made it back in time for the start of the exam. I used that Casio for the entirety of my Engineering degree - still have it. No idea what happened to my Graphical calculator.
Posted Oct 9, 2017 15:45 UTC (Mon)
by giraffedata (guest, #1954)
[Link] (2 responses)
What were your PE tests like? Were you graded on how fast you ran?
Posted Oct 15, 2017 22:10 UTC (Sun)
by anselm (subscriber, #2796)
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Basically yes. There was an official table from the state education ministry that converted timings into grades. To add insult to injury, the official table was blatantly sexist – for example, for some track lengths the same time meant a dismal grade for a male student but an excellent grade for a female student, even though for the distances in question the respective world-class times for men and women are very close together.
Posted Oct 16, 2017 13:11 UTC (Mon)
by mathstuf (subscriber, #69389)
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Anyways, that sounds odd. I feel that we'd do it more by effort in the US. I can walk a 12 minute mile, but others can't even run that (for various reasons). I do not deserve the same grade for slacking off if they're giving it their all to get the same time. There are benchmarks for special mention, but I believe those are set up at some percentile of times across the nation (per sex) and are more descriptive than prescriptive.
How did your grading system deal with handicaps such as crutches (temporary injuries), wheelchairs (for longer-term afflictions), and the like?
Posted Sep 29, 2017 17:54 UTC (Fri)
by Cyberax (✭ supporter ✭, #52523)
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Posted Sep 29, 2017 18:11 UTC (Fri)
by gutschke (subscriber, #27910)
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You only need it, if the instructor is too lazy to pick problems that can be solved with pencil and paper. It doesn't take much more effort. But it does take non-zero effort when designing the test. And then of course, you could have a professor like the one I had in my first year in university. For some inscrutable reason, he thought it was a good idea to give 20% of the test score to anybody who successfully computed the value of a 4×4 determinant. I still don't follow his thinking on that.
Posted Oct 5, 2017 13:19 UTC (Thu)
by droundy (subscriber, #4559)
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The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
Without doing it manually on paper you don't understand how it works, and it trains your brain.
I still think that one of the best lectures I had (20 years ago) was one where the professor explained the stuff by drawing it on a blackboard. IMO the best way to make somebody understand a problem is a person writing/drawing and explaining and pointing at the same time. Works without any computer.
The NumWorks graphing calculator
The NumWorks graphing calculator
Wol
The NumWorks graphing calculator
The NumWorks graphing calculator
Take for example decimal comma positioning in manual multiplication. It will be placed by a calculus on operand comma position, not on estimated expected order of magnitude of the result. And learners will stick with it.
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
The problem being that modern calculators are so good that allowing them in secondary school exams would turn them into simple copying from the screen to the exam paper.
The NumWorks graphing calculator
The NumWorks graphing calculator
In my school, shoes with track spikes were absolutely no problem for the PE tests,
The NumWorks graphing calculator
Were you graded on how fast you ran?
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator
The NumWorks graphing calculator