前置知识:牛顿-莱布尼茨公式
题1: f f f在 [ a , b ] [a,b] [a,b]上连续, F ( x ) = ∫ a x ( x − t ) f ( t ) d t F(x)=\int_a^x(x-t)f(t)dt F(x)=∫ax(x−t)f(t)dt,求 F ′ ′ ( x ) F''(x) F′′(x)
解:
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F(x)=x\int_a^xf(t)dt-\int_a^xtf(t)dt
F(x)=x∫axf(t)dt−∫axtf(t)dt
所以
F ′ ( x ) = ∫ a x f ( t ) d t + x f ( x ) − x f ( x ) = ∫ a x f ( t ) d t F'(x)=\int_a^xf(t)dt+xf(x)-xf(x)=\int_a^xf(t)dt F′(x)=∫axf(t)dt+xf(x)−xf(x)=∫axf(t)dt
由此可得
F ′ ′ ( x ) = f ( x ) F''(x)=f(x) F′′(x)=f(x)
题2: 计算 lim x → + ∞ ( ∫ 0 x e t 2 d t ) 2 ∫ 0 x e 2 t 2 d t \lim\limits_{x\to +\infty}\dfrac{(\int_0^xe^{t^2}dt)^2}{\int_0^xe^{2t^2}dt} x→+∞lim∫0xe2t2dt(∫0xet2dt)2
解:
\qquad
运用洛必达法则,
\qquad 原式 = lim x → + ∞ 2 e x 2 ∫ 0 x e t 2 d t e 2 x 2 = lim x → + ∞ 2 ∫ 0 x e t 2 d t e x 2 = lim x → + ∞ 2 e x 2 2 x e x 2 = lim x → + ∞ 1 x = 0 =\lim\limits_{x\to +\infty}\dfrac{2e^{x^2}\int_0^xe^{t^2}dt}{e^{2x^2}}=\lim\limits_{x\to +\infty}\dfrac{2\int_0^xe^{t^2}dt}{e^{x^2}}=\lim\limits_{x\to +\infty}\dfrac{2e^{x^2}}{2xe^{x^2}}=\lim\limits_{x\to +\infty}\dfrac 1x=0 =x→+∞lime2x22ex2∫0xet2dt=x→+∞limex22∫0xet2dt=x→+∞lim2xex22ex2=x→+∞limx1=0