this post was submitted on 18 Oct 2024
641 points (95.1% liked)

Curated Tumblr

3886 readers
893 users here now

For preserving the least toxic and most culturally relevant Tumblr heritage posts.

Image descriptions and plain text captions of written content are expected of all screenshots. Here are some image text extractors (I looked these up quick and will gladly take FOSS recommendations):

-web

-iOS

-android

Please begin copied raw text posts (lacking a screenshot that makes it apparent it is from Tumblr) with:

# This has been reposted here to Lemmy as part of the "Curated Tumblr Project."

I made the icon using multiple creative commons svg resources, the banner is this.

founded 1 year ago
MODERATORS
 
you are viewing a single comment's thread
view the rest of the comments
[–] [email protected] 31 points 2 weeks ago (6 children)

I would have done 10+6, but that's effectively the same thing as the OP.

Aside from literally counting, what other way is there to arrive at 16? You either memorize it, batch the numbers into something else you have memorized, or you count.

Am I missing some obvious 'natural' way?

[–] [email protected] 12 points 2 weeks ago

I'd argue memorizing it is the natural way, at least if you work with numbers a lot. Think about how a typist can type a seven letter word faster than a string of seven random characters. Is that not good proof that we have pathways in our brain that short circuit simpler procedural steps?

[–] [email protected] 4 points 2 weeks ago

I'm also in 10+6 gang, and it's more universal, as in a decimal system you will always have a 10 or 100 to add up to, and a "pretty" 8+8 is less usual

[–] [email protected] 4 points 2 weeks ago

My mental image is squishing the 7 into the 9 but only 1 is able to be squished in, leaving 6 overflowing

[–] [email protected] 4 points 2 weeks ago* (last edited 2 weeks ago) (2 children)

For my kids, apparently some kind of number line nonsense, which is counting with extra steps.

I just memorize it. When the numbers get big, I do it like you did. For example, my kid and I were converting miles to feet (bad idea) in the car, and I needed to calculate 2/3 mile to feet. So I took 1760 yards -> 1800 yards, divided by three (600), doubled it (1200), and multiplied by 3 to get feet (3600). Then I handled the 40, but did yards -> feet -> 2/3 (40 yards -> 120 ft -> 80 ft). So the final answer is 3520 ft (3600 - 80). I know the factors of 18, and I know what 2/3 of 12 is, so I was able to do it quickly in my head, despite the imperial system's best efforts.

So yeah, cleaning up the numbers to make the calculation easier is absolutely the way to go.

[–] [email protected] 2 points 2 weeks ago* (last edited 2 weeks ago) (2 children)

A mile is 1760 yards, and there are three feet in a yard. Therefore, 1760 feet is 1/3 of a mile, and 2/3s of a mile is 3520 feet.

The imperial system is actually excellent for division and multiplication. All units are very composite, so you usually don't need to worry about decimals.

[–] [email protected] 2 points 2 weeks ago

Yup. The reason I went with yards was because I knew 1760 was closer to a nice multiple of 3 than 5280 (neither 5200 or 5300 is a multiple of 3; I'd have to go to 5100 or 5400).

But yeah, imperial works pretty well for multiplication and division, it's just not intuitive for figuring out the next denomination. Why is a mile 1760 yards instead of 1000 or 1200? Why is it 5280 feet instead of 6000? Why is a cup 8 oz instead of 6 (nicer factors) or 10? Why is a pound 16 oz instead of 8 oz like a cup would be (or are pints the "proper" larger unit for an oz)?

The system makes no sense as a tiered system, but it does make calculations a bit cleaner since there's usually a whole number or reasonable fraction for common divisions. Base 10 sucks for that, but at least it's intuitive.

[–] [email protected] 2 points 2 weeks ago (1 children)

Metric would be perfect if 10 wasn't such a dog shit number to base our counting off of. Sure it works for dividing things in half, but how often do you need to break something down into fifths? Halves, thirds, and quarters are 90% of typical division people do, with tenths being most of the rest since 10 is that only number that our base system actually works with.

[–] [email protected] 1 points 2 weeks ago

It is not as if any other system of measurement used base 12 which would be the sensible choice by that standard (or base 60 but that might be a bit unwieldy in terms of number of digits required).

[–] [email protected] 1 points 2 weeks ago (1 children)

As in, visualizing a number line in their heads? Or physically drawing one out?

I could see a visual method being very powerful if it deals in scale. Can you elaborate on that? Or, like try to understand what your kids' 'nonsense' is?

[–] [email protected] 1 points 2 weeks ago (1 children)

I think my 7yo visualizes the number line in their head when there's no paper around, but they draw it out in school. I personally don't understand that method, because I always learned to do it like this:

 7372
+ 273
=====

And add by columns. With a number line you add by places, so left to right (starting at 7372, jump 2 hundreds, 7 tens, and 3 ones), whereas with the above method, you'd go right to left, carrying as you go. The number line method gets you close to the number faster (so decent for mental estimates), but it requires counting at the end. The column method is harder for mental math, but it's a lot closer to multiplication, so it's good to get practice (IMO) with keeping intermediate calculations in your head.

I think it's nonsense because it doesn't scale to other types of math very well.

[–] [email protected] 1 points 2 weeks ago (1 children)

You still haven't told me what the number line method actually is. I know how to add up the columns bud

[–] [email protected] 2 points 2 weeks ago* (last edited 2 weeks ago) (1 children)

Number line is something like this:

100 | 200 | 300 ... | 10 | 20 | 30 ... | 1 | 2 | 3
==================================================

You write out the numbers that are relevant and hop by those increments. So for 7372 + 273, you'd probably start at 7000, hop 100 x 5 (3 for 372 and 2 for 273), hop 10 x 14 (7 for 72 and 7 for 73), and so on. It's basically teaching you to count in larger groups.

To multiply, you count by the multiple (so for 7 x 3, you'd jump in groups of 3).

This article seems to explain it. I didn't learn it that way, so I could be getting it wrong, but it seems you do larger jumps and and the jumps get smaller as you go. I think it's nonsense, but maybe it helps some kids. I was never a visual/graphical learner though.

[–] [email protected] 1 points 2 weeks ago (1 children)

So, are you just talking about number lines in general?

I learned how to use those in grade school too. 20+ years ago. But the way you phrased it made me think there was more to it. Calling it nonsense is.. shocking.

[–] [email protected] 1 points 2 weeks ago* (last edited 2 weeks ago)

I guess we used it for an exercise or something a couple times, but never for more than indicating how numbers work. They've taken that idea and kind of run with it, instead of leaving it behind once the basics of addition have been mastered. I learned multiplication as just repeated addition, and there's no reason IMO to get a number line involved because addition should already be mastered.

This is a 2nd grade class, and I expect them to have long since mastered addition. At that point, a number line feels like a crutch more than a useful tool. Sure, use them in kindergarten and first grade to grasp how counting works (and counting by 2s and 10s), but that should honestly be as far as it goes. But they still use it for fractions and larger sums and products.

[–] [email protected] 3 points 2 weeks ago

Theres more complicated ways for sure, but I think we have identified all the simple ones. Could break it into twos I guess.

[–] [email protected] 1 points 2 weeks ago

Mental abacus. You visualize the beads to come to the answer.

Definitely not 'natural', that shit takes major training.