I have a React app working with a REST backend built in Python and Flask. I'm downloading data from a database and saving it as a CSV file through the browser. I have this working. What I don't understand, however, is why I had to go beyond the sources I've been reading and mash stuff up to ge...
Hey All. When working with Angular2, I want to seperate the login part from the main part (when logged in). However, I define some routes in my module that don't match for the "login" part, but do match for the main part. So then I get an error about routing. Is there any way I can fix this? Working with two seperate modules maybe? But how can I change the module then?
@ndugger just read an article about " lal bhatti " or something, that it gets removed at 1 may. And the richies in India are complaining about that. Lol
Why does it matter though? If you want to explain what one is, examples from the realm that they know and have probably dabbled in is probably a good way
Personally I find taxonomy in those things to be daunting. When learning about it some time ago, it took me forever to map functors and monads to concepts I understood trivially
I'm also not in the camp which thinks you need to call these babies by their names. If you understand usage but not terms and can use them for greater glory...I don't care if you know exactly what an Applicative is
@BartekBanachewicz True, to truly understand something you can't go by example alone. Luckily we don't live in a binary world, right? And we can use judgement to decide how to go about things
@BartekBanachewicz Specifically speaking of the teaching aspect. Throwing "Monads Follow These Laws" gives you "wtf". Saying "here's some of the places where you use this concept" and building up these things is, at least for me, much better
In category theory, a branch of mathematics, a monad (also triple, triad, standard construction and fundamental construction) is an endofunctor (a functor mapping a category to itself), together with two natural transformations. Monads are used in the theory of pairs of adjoint functors, and they generalize closure operators on partially ordered sets to arbitrary categories.
== Introduction ==
A monad is a certain type of endofunctor. For example, if
F
{\displaystyle F}
and
G
{\displaystyle G}
are a pair...
It's akin to closures (as I said), it's just a concept that's weird to explain but relatively easy to demonstrate. I understood closures and pointers really well before anyone said "yeah they have X and Y properties", but the first few times I read about monads my existence screamed in agony
@SterlingArcher I 6*'d Mav last night and then 40'd him off wind angelmons. What a difference that made alone. I manualed/auto'd to 90, but now I think I need to skill up Mav and get those runes upgraded more.