latex公式显示:
$$\frac {1} {2}\left ( {x+a} \right )^{2}=\sum ^{n}_{k=0} {\left ( {^{n}_{k}} \right ){x}^{k}{a}^{n-k}}$$
长公式换行与对齐:
\begin{align}
\int_{0}^{1}f(x) \sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \\
&\sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \\&\sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x) \sum_{1}^{2}
\end{align}
\begin{align}\int_{0}^{1}f(x) \\&=\sum_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \tag{1}\\&= m_{1}^{2}\int_{0}^{1}f(x)dx \sum_{1}^{2}\int_{0}^{1}f(x)dx \\&=\sum_{1}^{2}\int_{0}^{1}f(x)dx \tag{2}\end{align}
【例】某建筑工地打地基时,需用汽锤将桩打进土层。汽锤每次击打,都将克服土层对桩的阻力而做功。设土层对桩的阻力的大小与桩被打进地下的深度成正比(比例系数为$k$,$k<0)$,汽锤第一次击打将桩打进地下$a$(米)。根据设计方案,要求汽锤每次击打桩时所做的功与前一次击打时所做的功之比为常数$k(0<k<1)。问:$
(1)汽锤击打桩3次后,可将桩打进地下多深?
(2)基击打次数不限,汽锤至多能将桩打进地下多深?
【分析】本题属于变力做功问题,可用定积分进行计算,而击打次数不限,相当于求数列的极限。
解:设第$n$次击打后,桩被打进地下${x}_{n}$,第$n$次击打时,汽锤所做的功为${W}_{n}(n=1,2,3,\cdots )$,通过求$\sum\limits ^{n}_{i=1} {{W}_{i}}$直接求出${x}_{n}$。因为当桩被打进地下的深度为$x$时,土层对桩的阻力的大小为$kx$,所以
${W}_{1}=\int ^{{x}_{1}}_{0} {kxdx=\frac {k} {2}}{x}^{2}_{1}=\frac {k} {2}{a}^{2}$,
${W}_{2}=\int ^{{x}_{2}}_{{x}_{1}} {kxdx}$,
${W}_{3}=\int ^{{x}_{3}}_{{x}_{2}} {kxdx}$,
…
${W}_{n}=\int ^{{x}_{n}}_{{x}_{n-1}} {kxdx}$,,
相加得
$\begin{align}\sum ^{n}_{i=1} {{W}_{i}} \\&={W}_{1}+{W}_{2}+{W}_{3}+\cdots +{W}_{n} \\&=\int ^{{x}_{1}}_{0} {kxdx}+\int ^{{x}_{2}}_{{x}_{1}} {kxdx}+\int ^{{x}_{3}}_{{x}_{2}} {kxdx}+\cdots +\int ^{{x}_{n}}_{{x}_{n-1}} {kxdx} \\&=\int ^{{x}_{n}}_{0} {kxdx}=\frac {k} {2}{x}^{2}_{n} \end{align} .$
又由题设知,${W}_{i+1}=r{W}_{i},i=1,2,\cdots ,n.$ 因此
$\begin{align}\sum ^{n}_{i=1} {{W}_{i}} \\&={W}_{1}+r{W}_{1}+{r}^{2}{W}_{1}+\cdots +{r}^{n-1}{W}_{1} \\&=(1+r+{r}^{2}+\cdot +{r}^{n-1})\cdot \frac {1} {2}k{a}^{2} \\&=\frac {1-{r}^{n}} {1-r}\cdot \frac {1} {2}k{a}^{2}\end{align}.$
从而
${x}_{n}=a\sqrt {\frac {1-{r}^{n}} {1-r}}(m)$
因此
(1)${x}_{3}=\sqrt {1+r+{r}^{2}}a(m)$,即汽锤击打桩3次后,可将桩打进地下$\sqrt {1+r+{r}^{2}}a(m)$。
(2)$\lim\limits_{n\to \infty }{x}_{n}=\frac {a} {\sqrt {1-r}}(m)$.