Question

question

Answer 1

Answer? :o

I will see if I can help =3

Answer 2

Suppose you are given \[f''(x)\] and you want to find
\[f(x)\]
how can that be written in a single step?
\[\int\limits \int\limits f''(x) dx?\]

Answer 3

@sammixboo

Answer 4

Ah, sorry. Can't help with that =(

Answer 5

Oh, ok, thanks anyway

Answer 6

@mathmath333

Answer 7

u mean this

\(\large \begin{align} \color{black}{\int\limits \int\limits f''(x) dx \hspace{.33em}\\~\\
=\int\limits f'(x) dx \hspace{.33em}\\~\\
=F(x) \hspace{.33em}\\~\\
}\end{align}\)

Answer 8

I want to write it in a single step

Answer 9

perhaps ganeshie knows it better

Answer 10

im thinking of something like..
\[\int\limits \int\limits f(x) dx^2\]

Answer 11

is the website being updated?

Answer 12

first thing this double integral so dx or dy should come 2 times i think

Answer 13

lagging is always there in the site

Answer 14

I was thinking that the 2nd order derivative is denoted by
\[\frac{d}{dx^2}\]
So is there a notation for 2nd order integral?
like
\[\int\limits \int\limits y(x) dx^2\]

Answer 15

\[\frac{d^2}{dx^2}\] sorry

Answer 16

or is it just
\[\int\limits[\int\limits y(x)dx ]dx\]

Answer 17

m not really familier with this double integral , may u should ask someone

Answer 18

I'll close the question for now, thanks anyway