What do you mean? I remove all vendor keys and enroll my own secure boot keys. This way only my install with my bootloader signed by my keys will boot.
Not familiar with iphones, can't you just use plain wireguard?
But if you're more productive in the time you actually work, you have more time to slack off
Finite elements, of course!
Not related to the refund at all, but: Why would you turn off the monitor and not the computer? Even when idling it eats way more power than a monitor in standby.
Seems like something you would think about while, you know, designign a product? And not after its release?
Especially in a middle school math/physics setting, I would expect reasonable units. Otherwise, how would kids understand the relationship between force and acceleration? Do you use mile / hour / min for the acceleration due to gravity as well? Do you have a funky replacement for Newton too?
Just install and try to resolve all your issues (if any) in a dualboot. That way you can always go back to Windows if something doesn't work. But if your experience is anything like mine, you'll find that 99% works either out of the box or after some minimal configuration. The only notable exception for me are online games that insist on intrusive anti-cheat software (e.g. BattleEye) and choose not to support Proton/Wine on Linux. Curse you, Escape from Tarkov!
I didn't get it for a solid 2 minutes before realizing you have to pronounce it wrong for the joke to work
That's not the problem. Coming from metric, I expected m s-2 for acceleration. The imperial units for distances are weird enough in their own right – but using two different units of time for the two time derivatives is truly unholy.
I was not ready for the truly unholy unit of mile per hour per minute
The natural representation would be the transient solution u(t) or i(t). Harmonic solutions are merely a special case, for which it turned out complex numbers were useful (because of the way they can represent rotation). They certainly serve a purpose there, but imo this is not an instance of 'complex numbers appearing in nature'.
But that is hardly a 'natural occurence' of complex numbers - it just turned out that they were useful to represent the special case of harmonic solutions because of their relationship with trig functions.