mudkip@lemdro.id to memes@lemmy.worldEnglish · 22 days ago123 + 456 = 123456files.catbox.moeimagemessage-square7linkfedilinkarrow-up14arrow-down13
arrow-up11arrow-down1image123 + 456 = 123456files.catbox.moemudkip@lemdro.id to memes@lemmy.worldEnglish · 22 days agomessage-square7linkfedilink
minus-squareabbadon420@sh.itjust.workslinkfedilinkarrow-up0·22 days agoI disagree with you definition of base 1. Since base 10 is 0 through 9, and base 2 is 0 and 1, therefor base 1 must be only 0. The real question is: How do we continue? What is base 0? Is that equal to base 1? Are the negative bases?
minus-squaremacniel@feddit.orglinkfedilinkarrow-up0·22 days agoBase 1 is just run length encoding. 1: 1 2: 11 3: 111 ... 10: 1111111111
minus-square4am@lemmy.zipcakelinkfedilinkarrow-up0·22 days agoThat would be reverse run length encoding. Also, Base 1 is just zero, everything equals zero. 123 = 000 = 0 456 = 000 = 0 123456 = 000000 = 0 123 + 456 = 123456 0 + 0 = 0 69 + 420 = 42069
minus-squareSnazz@lemmy.worldlinkfedilinkarrow-up1·22 days agoBase-n is a numeral positioning system where the value of each digit is n times the value of the dight directly to its right. We typically don’t let the maximum digit we use to be greater than or equal to n because then there would be multiple ways to express the same number. However when working with weird bases, sometimes it’s useful to forgo this convention.
I disagree with you definition of base 1. Since base 10 is 0 through 9, and base 2 is 0 and 1, therefor base 1 must be only 0.
The real question is: How do we continue?
What is base 0?
Is that equal to base 1?
Are the negative bases?
Base 1 is just run length encoding.
1: 1 2: 11 3: 111 ... 10: 1111111111That would be reverse run length encoding. Also, Base 1 is just zero, everything equals zero.
123 = 000 = 0
456 = 000 = 0
123456 = 000000 = 0
123 + 456 = 123456
0 + 0 = 0
69 + 420 = 42069
Base-n is a numeral positioning system where the value of each digit is n times the value of the dight directly to its right.
We typically don’t let the maximum digit we use to be greater than or equal to n because then there would be multiple ways to express the same number.
However when working with weird bases, sometimes it’s useful to forgo this convention.