我正在尝试放置不同minipages长度和高度的不同盒子以最好地适应空白处,但是我不知道如何解决这个问题:
这是我的代码以及我想要做的事情:
我知道 MWE 可能不是最好的,但我不知道如何做到这一点,非常感谢您的帮助!
\begin{minipage}[t]{0.33\textwidth}
$\bm{a=a(t) \rightarrow }$\textbf{2x integrieren}\\
$a(t) =\dfrac{dv}{dt} \rightarrow v(t) = v_0 + \int_{t_0}^{t} a(\bar{t}) \cdot d\bar{t}$\\
$v(t) = \dfrac{dx}{dt} \rightarrow x(t) = x_0 + \int_{t_0}^{t} v(\bar{t}) \cdot d\bar{t}$
\end{minipage}
\hfill
\begin{minipage}[t]{0.3\textwidth}
$\bm{a=a(v) \rightarrow }$\textbf{1x integrieren}\\
dt =$\dfrac{dv}{dt} \rightarrow \int_{t_0}^{t} d(\bar{t}) = \int_{t_0}^{t} \dfrac{d\bar{v}}{a(v)}\\
t = t_0 + \int_{v_0}^{v} \dfrac{d\bar{v}}{a(v)} = f(v)$\\
Umk.funktion: $t=f(v) \rightarrow v=F(t)$\\
$x(t) = x_0 +\int_{t0}^{t}F(\bar{t}) \cdot d\bar{t}$
\end{minipage}
\hfill
\begin{minipage}[t]{0.3\textwidth}
$\bm{a=a(x)} \rightarrow \dfrac{dv}{dt} = \dfrac{dv}{dx} \cdot \dfrac{dx}{dt}\\
a(x)\cdot dx = dv \cdot v\\
v(x)= \sqrt{v_0^2+2\cdot \int_{x_0}^{x} a(\bar{x}) \cdot d\bar{x}}\\
t=t_0 + \int_{x_0}^{x}\dfrac{d\hat{x}}{\sqrt{v_0^2+2 \cdot \int_{x_0}^{\hat{x}} a({\bar{x}} d\bar{x}}}$\\
Umk.funktion: $t=f(x) \rightarrow x=f(t)$
\end{minipage}
\begin{minipage}[t]{0.33\textwidth}
$\bm{a=a(t) \rightarrow }$\textbf{2x integrieren}\\
$a(t) =\dfrac{dv}{dt} \rightarrow v(t) = v_0 + \int_{t_0}^{t} a(\bar{t}) \cdot d\bar{t}$\\
$v(t) = \dfrac{dx}{dt} \rightarrow x(t) = x_0 + \int_{t_0}^{t} v(\bar{t}) \cdot d\bar{t}$
\end{minipage}
\hspace{7.5cm}
\begin{minipage}[t]{0.3\textwidth}
$\bm{a=a(v) \rightarrow }$\textbf{1x integrieren}\\
dt =$\dfrac{dv}{dt} \rightarrow \int_{t_0}^{t} d(\bar{t}) = \int_{t_0}^{t} \dfrac{d\bar{v}}{a(v)}\\
t = t_0 + \int_{v_0}^{v} \dfrac{d\bar{v}}{a(v)} = f(v)$\\
Umk.funktion: $t=f(v) \rightarrow v=F(t)$\\
$x(t) = x_0 +\int_{t0}^{t}F(\bar{t}) \cdot d\bar{t}$
\end{minipage}
\end{document}