it’s floor 5 from monday to wednesday, and floor 2 from thursday to sunday
it’s floor 5 from monday to wednesday, and floor 2 from thursday to sunday
and lots of tasty styrofoam bits for extra seasoning
you cook the oatmeal in milk and water, then use goo gone to dry it out again. rinse and repeat
i wonder why people haven’t made a language that starts indexing at 2 yet. maybe some day
i wish the people making buildings around here knew that. some start at floor 3, others at 5. some start at 0. others at 2. every building has its own story. you need to understand the building before you can understand your position in it.
do you also have minced tables there?
just like the blue shells in mario cart
what if they called it the wall of shame instead
i would try it. i like strawberries and i like pasta, so why not
he’s in a better place now
another chicken and egg problem
yeah it sucks
if n = 0 then k = ∞ and just about any value of x works in this case. however x = arcsin(nk -1) still doesn’t work since 0 * ∞ is not defined. so i think the B grade is fair.
(this is all assuming we’re working on the riemann sphere)
i’m guessing they want you to solve for x by rearranging and then taking arcsin
anytime. i’ve also had my fair share of long days studying analysis. and i feel like most of my time spent trying to learn analysis was spent fighting with the textbooks. i think the (ε,δ) stuff is to blame for that, but that’s a whole other topic.
anyways, i was thinking a bit more about the matrix stuff and i think i have a better explanation if you’re interested, since my previous one was probably a bit too abstract. i think it should honestly be criminal to teach multivariate analysis before linear algebra, since a lot of the purpose of multivariate analysis is to turn complicated problems into linear problems. but anyways, here’s the big picture:
you don’t really need to understand the ins and outs of matrices and be super familiar with them to get a sense of what the total derivative is, and how it should behave. for that purpose, here are some of the highlights of matrices and the total derivative:
Let A be an m x n matrix. Then:
So those are two ways to look at the total derivative: you can try to get a geometric understanding of what it does (approximate the function with the best fitting plane), or try to look at why it’s useful (turning harder problems into easier problems). But just to be clear, dealing with matrices is still hard, it’s just comparably a lot easier than dealing with random functions.
people can’t be in two places at once
there is much wisdom in those words
i wish some of them were made up
what if the M1 doesn’t have a touch screen though