作业帮lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,
来源:学生作业帮助网 编辑:作业帮 时间:2024/04/30 09:04:36
![lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,](/uploads/image/z/11612813-5-3.jpg?t=lim%28x%E2%86%920%EF%BC%89%EF%BC%88%E2%88%AB%EF%BC%BB0%2Cx%EF%BC%BDe%5E%28t%5E2%29dt%29%5E2%2F%E2%88%AB%EF%BC%BB0%2Cx%EF%BC%BDe%5E%282t%5E2%29dt%E5%85%88%E4%B8%8A%E4%B8%8B%E6%B1%82%E5%AF%BC%E5%BE%97%E5%88%B02%E2%88%AB%EF%BC%BB0%2Cx%EF%BC%BDe%5E%28t%5E2%29dt%2Fe%5E%28x%5E2%29+%2C)
lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,
lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt
先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,
lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,
原式 = lim(x->0) 2 ∫0,x]e^(t²)dt / e^(x²) = 0/1 = 0
显然分母极限为1
而分子的极限为0
故所求=0
lim(x→0)〖(∫[cosx,0](e^t-t)dt/x^4 〗
lim(x→0)[∫(x,0)e^t²dt]/x
lim(x→0)[∫(0,x)(e^(t^2)-1)dt]/x^3
lim(x→0)[∫(0,x)(e^(t^2)-1)dt]/x^3
lim(x→∞)[∫(0积到x)(t²乘以e的t²次方)dt]/[x乘以e的x²次方]=?
lim(x→∞)[∫(0积到x)(t²乘以e的t²次方)dt]/[x乘以e的x²次方]=?
lim(x→∞)[∫(0积到x)(t²*e^t²)dt]/[x*e^x²]=?
lim(x→∞)[∫(0积到x)(t²*e^t²)dt]/[x*e^x²]=?
lim(x→0)1/x∫[x,0](1+t^2)*e^(t^2-x^2)dt
求极限lim(x→+∞)(∫[0,x]e^t²dt)²/∫[0,x]e^2t²dt
lim(n,0)x/(1-e^x^2)∫(0,x)e^t^2dt
limx→0 ∫1 cosx e^(-t^2) /x^2洛必达法则lim【x→0】 ∫(1→cosx) e^(-t^2)dt /x^2=lim【x→0】-e^(-cos²x)·(cosx) '/(2x)=lim【x→0】e^(-cos²x)·sinx/(2x) 【等价无穷小代换x→0时,sinx~x】=lim【x→0】e^(-cos
lim→0+ [∫(上限x,下限0)ln(t+e^t)dt] / (1-cosx)
lim(x→0)(∫[0,x]e^(t^2)dt)^2/∫[0,x]e^(2t^2)dt先上下求导得到2∫[0,x]e^(t^2)dt/e^(x^2) ,
lim(x→0)[e^x-e^(2x)]/x
lim(x趋向0)(e^x-e^-x)/x
lim(x趋向0)(e^x-x^-x)/x
lim→0[∫(上限x,下限0)(1+t^2)e^t^2dt]/xe^x^2