I worked really hard on a math problem but messed up so I got the wrong answer
I worked really hard on a math problem but messed up so I got the wrong answer
u got this bro
better luck next time
i don't feel like trying again until tomorrow or something
at least u tried
and got quads :)
>luck
hahahahahhagfhafijashafjh It's all skill
yes I luv u jimmy
well yeah i guess but good skill next time then
akari akaza = best girl
jimmy = best friend
yes I think I will get it next time I did figure out that the integral of the fractional part function ({x}) to the nth power = {x}^(n+1)/(n+1)+ floor(x)/(n+1)
so it wwas not total waste
no u
good luck next time
yes I hope I am more lucky next time
also thanks frend
Nice quads
Post it and see if we can solve
same lole
im not smart at all and bad at everything especially maffs lole
I don't understand
help pls
okey
the thing on the left is the indefinite integral the thing in the middle is the ceiling function squared and the on the left is dx to signify you are integrating with respect to x
something times x to the power of 2 times dx?
LOLE
I forget how to fucking integrate anything other than a single term expression
Do you not understand or are you shitposting
What you mean by single term expression
I dont
I am bad at maths and not smart
I think a term is just any set of variables to whatever multiplying eachother?
you know, x(y^2)z is one term, x + y is two
and an expression is anything that can go on either side of an equals sign
Is that like a unit step function type thing
It is only one term though.
If you want to integrate two things with a plus sign between them you can integrate them separately and add them together
k thanks forgot that rule
but no a function is not a term, it has to be variables and constants to be a term
I can't do functions anymore I forget the rules
Ceiling looks like a step function ceiling just rounds up from x . So ceil(1) = 1 and ceil (1.1) = 2, ceil(1.3) = 2 , ceil (2.1)=3 ect
Integrating matters to what the function is . To my knowledge there isn't a rule that works for any function
*Works for all functions
wow it's even been so long I forgot there's no rule for functions in general, just individual functions
also I'm sorry I have to sleep goodnight
Oh man i remember how i did something like this on the test. I did everything good but then i massed up. During lunch break i argued that my answer was good and everyone else was wrong. Genius
I was just doing the math because it was fun and not because I had to