已知函数f(x),g(x)f(x),g(x)f(x),g(x)在区间[0,4][0,4][0,4]上均连续,且∫04f(x)dx=−3\int_{0}^{4}f(x)dx=-3∫04f(x)dx=−3,∫04g(x)dx=1\int_{0}^{4}g(x)dx = 1∫04g(x)dx=1,则∫04[3f(x)+2g(x)]dx=\int_{0}^{4}[3f(x)+2g(x)]dx=∫04[3f(x)+2g(x)]dx=( ).
(A)−7-7−7
(B)−5-5−5
(C)−3-3−3
(D)222
已知∫a11xdx=2\int_{a}^{1}\dfrac{1}{\sqrt{x}}dx = 2∫a1x1dx=2,则a=a=a=( ).
(A)−1-1−1
(B)111
(C)222
(D)12\dfrac{1}{2}21
若limx→2ax+4x−2=−2\lim\limits_{x\rightarrow2}\dfrac{ax + 4}{x - 2}=-2x→2limx−2ax+4=−2,则a=−2a = - 2a=−2.( )
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