weird@sub.wetshaving.social to memes@lemmy.world · 3 days agoBig naturals is way easier to pronouncesub.wetshaving.socialimagemessage-square69fedilinkarrow-up11.16Karrow-down19
arrow-up11.15Karrow-down1imageBig naturals is way easier to pronouncesub.wetshaving.socialweird@sub.wetshaving.social to memes@lemmy.world · 3 days agomessage-square69fedilink
minus-squareZwiebel@feddit.orglinkfedilinkEnglisharrow-up50·2 days ago Natural numbers include zero That is a divisive opinion and not actually a fact
minus-squareKogasa@programming.devlinkfedilinkarrow-up5·2 days agoYeah, it’s a matter of convention rather than opinion really, but among US academia the convention is to exclude 0 from the naturals. I think in France they include it.
minus-squareSchwertImStein@lemmy.dbzer0.comlinkfedilinkEnglisharrow-up3·2 days agopositive interers with addition are not a monoid though, since the identity element of addition is 0
minus-squareLog in | Sign up@lemmy.worldlinkfedilinkarrow-up2·1 day agoThey’re not a complete algebraically closed field either, but I don’t see you advocating for including e - i in the natural numbers!
minus-squareSchwertImStein@lemmy.dbzer0.comlinkfedilinkEnglisharrow-up1·1 day agoyeah, this is kinda weak argument
minus-squareLog in | Sign up@lemmy.worldlinkfedilinkarrow-up1·16 hours agoNot sure if you’re conceding the monoid part or not. We can agree that the natural numbers are a semigroup, I think, which should make us all happy.
minus-squareSchwertImStein@lemmy.dbzer0.comlinkfedilinkEnglisharrow-up2·2 days agoI hope that explains everything
minus-squarelengau@midwest.sociallinkfedilinkarrow-up1arrow-down1·edit-22 days agoYeah I find it easier to just accept the terminology of natural numbers and whole numbers so we have simple names for both.
That is a divisive opinion and not actually a fact
Yeah, it’s a matter of convention rather than opinion really, but among US academia the convention is to exclude 0 from the naturals. I think in France they include it.
positive interers with addition are not a monoid though, since the identity element of addition is 0
They’re not a complete algebraically closed field either, but I don’t see you advocating for including e - i in the natural numbers!
yeah, this is kinda weak argument
Not sure if you’re conceding the monoid part or not.
We can agree that the natural numbers are a semigroup, I think, which should make us all happy.
Okay
I hope that explains everything
Yeah I find it easier to just accept the terminology of natural numbers and whole numbers so we have simple names for both.