Let $U\subseteq\mathbb{R}^n$ be an open set that contains $0$, and for all $t\in[0,1]$ and $ x\in U$, $tx\in\mathbb{R}^n$. Show that every closed differentiable 1-form $w$, (i.e. $dw=0$) is an exact form (i.e. there exists a function $f:U\to\mathbb{R}^n$ such that $w=df$).
Hint: Present $w=\sum_{i=1}^nw_idx_i$ and define $f=\sum_{i=1}^n\int _0^1w_i(tx)x_idt$.
I have a start but I don't know how to keep on: $$ \begin{align} df&=d(\sum_{i=1}^n\int_0^11w_i(tx)x_idt) \text{ =[by Leibnitz]}\\ &= \sum_{i=1}^n\int_0^1d(w_i(tx)x_idt) \\&= \sum_{i=1}^n\int_0^1\sum_{j=1}^n{\partial\over\partial x_j}(w_i(tx_i)x_i)dx_j\wedge dt \\&= \sum_{i=1}^n\int_0^1( \sum_{j\ne i} {\partial w_i\over\partial x_j}(tx_i)\cdot0\cdot x_i)dx_j\wedge dt \\ &+( x_it{\partial w_i\over \partial x_i}(tx_i)+w_i(tx_i))dx_i\wedge dt) \\&= \sum_{i=1}^n\int_0^1{\partial w_i\over \partial x_i}(tx_i)\cdot tx_i dx_i\wedge dt+\sum_{i=1}^n\int _0^1w_i(tx_i)dx_i\wedge dt \end{align}$$
$df=d(\int_0^1\sum w_i(tx)dx_idt)=\int_0^1\sum d(w_i(tx)x_i)dt$.
We have $d(w_i(tx)x_i)=\sum_{j=1}^{j=n}{\partial \over{\partial x_j}}(w_i(tx)x_i)dx_j$ $=\sum_{j=1}^{j=n}{\partial \over{\partial x_j}}w_i(tx)tx_i +w_i(tx)dx_i$,
since $dw=0$, we have ${\partial \over{\partial x_j}}w_i={\partial \over{\partial x_i}}w_j$,
we deduce that $df=\int_0^1\sum_{i=1}^{i=n}(\sum_{j=1}^{j=n}({\partial \over{\partial x_j}}w_i(tx))(tx_j)dx_i+w_i(tx)dx_i$
Remark that ${\partial \over{\partial t}}w_i(tx)=\sum_{j=1}^{j=n}{\partial \over{\partial x_j}}w_i(tx)x_j$, we can integrate by parts and obtain:
$\int_0^1(\sum_{j=1}^{j=n}({\partial \over{\partial x_j}}w_i(tx))(tx_j)dx_i+w_i(tx)dx_i)dt =(w_i(tx)]_0^1-w_i(tx)+w_i(tx))dx_i$.
This implies that $d(f+\sum_{i=1}^{i=n}w_i(0)x_i)=\sum_{i=1}^{j=n}w_i(x)dx_i$.