@[email protected] to Science [email protected]English • 1 year agoCrazy how nature be like thatfiles.catbox.moeimagemessage-square33fedilinkarrow-up1236arrow-down111
arrow-up1225arrow-down1imageCrazy how nature be like thatfiles.catbox.moe@[email protected] to Science [email protected]English • 1 year agomessage-square33fedilink
minus-square@[email protected]linkfedilinkEnglish49•1 year agoIt’s not mysterious that they meet somewhere. These are linear functions so they can’t help but meet at exactly one point (or zero if they were parallel)
minus-square@[email protected]linkfedilinkEnglish21•1 year agoIf they were parallel they wouldn’t meet. See °C and K
minus-square@[email protected]linkfedilinkEnglish27•1 year agoI meant “meet at zero points” so they don’t meet. Maybe my wording wasn’t perfectly clear
minus-square@[email protected]linkfedilinkEnglish7•1 year agoAh right, for some reason I couldn’t read it properly. My bad
minus-square@affiliatelinkEnglish2•1 year agoeven parallel lines will meet at a point if you’re working in projective space
minus-square@[email protected]linkfedilinkEnglish12•1 year agoThey could have met below absolute zero!
minus-square@[email protected]linkfedilinkEnglish2•1 year agoNow we have to determine what the absolute one is. The number one temperature? Maybe “room temperature”?
minus-squareJackGreenEarthlinkfedilinkEnglish2•1 year agoWhat do you mean absolute? Is 1? the absolute value of 1. I thought |1| would be.
minus-square@[email protected]linkfedilinkEnglish2•1 year agoYes but which unit? “absolute zero point” doesn’t need a unit since zero is zero (and degree isn’t a unit in this sense). But what is |1|? 1K? The highest possible temperature maybe as in “on a scale from 0 to 1”
minus-square@[email protected]linkfedilinkEnglish1•1 year agoDude I hope that what you said does not have sense at all.
It’s not mysterious that they meet somewhere. These are linear functions so they can’t help but meet at exactly one point (or zero if they were parallel)
If they were parallel they wouldn’t meet. See °C and K
I meant “meet at zero points” so they don’t meet. Maybe my wording wasn’t perfectly clear
Ah right, for some reason I couldn’t read it properly. My bad
even parallel lines will meet at a point if you’re working in projective space
Or °F and °R. Not that anyone really uses R.
They could have met below absolute zero!
[email protected]
Is 0! 1?
Yup
Now we have to determine what the absolute one is. The number one temperature? Maybe “room temperature”?
What do you mean absolute? Is 1? the absolute value of 1. I thought |1| would be.
Yes but which unit? “absolute zero point” doesn’t need a unit since zero is zero (and degree isn’t a unit in this sense).
But what is |1|? 1K? The highest possible temperature maybe as in “on a scale from 0 to 1”
Dude I hope that what you said does not have sense at all.
Elaborate