先算这个了
4.∫(x+sinx)/(1+cosx)dx
=∫xdx/(1+cosx)+∫sinxdx/(1+cosx)
=∫xd(x/2)/[cos(x/2)]^2 +∫tan(x/2)dx
=∫xdtan(x/2)+∫tan(x/2)dx
=xtan(x/2)-∫tan(x/2)dx+∫tan(x/2)dx+C
=xtan(x/2) +C
1=lim_(x-0)根号(1+sinx){根号[(1+tanx)/(1+sinx)]-1}/x[ln(1+x)-x^2]
=lim_(x-0)根号[1+(tanx-sinx)/(1+sinx)]-1}/x[ln(1+x)-x]
=lim_(x-0)1/2*(tanx-sinx)/(1+sinx)/x[ln(1+x)-x]
=lim_(x-0)1/2*sinx(1-cosx)/x[ln(1+x)-x]
=lim_(x-0)1/2*(1-cosx)/[ln(1+x)-x]
=lim_(x-0)1/2*(x^2/2)/[ln(1+x)-x]
=lim_(x-0)(x^2/4)/[ln(1+x)-x]
=lim_(x-0)(x/2)/[1/(1+x)-1]
=lim_(x-0)(x/2)(1+x)/[-x]=-1/2
2. dy/dx=(1+sint)/(1-cost),y''=[cost(1-cost)-(1+sint)sint]/a(1-cost)^3 =[cot-sint-1]/a(1-cost)^3
3 y'=e^f(x) f'(x),y''=e^f(x)[ f'(x)]+f''(x)]>0,曲线是凹的
4..∫(x+sinx)/(1+cosx)dx
=∫xdx/(1+cosx)+∫sinxdx/(1+cosx)
=∫xd(x/2)/[cos(x/2)]^2 +∫tan(x/2)dx
=∫xdtan(x/2)+∫tan(x/2)dx
=xtan(x/2)-∫tan(x/2)dx+∫tan(x/2)dx+C
=xtan(x/2) +C
5 l_1的方向向量s_1={1,2,-1}×{1,-1,1}={1,2,-3},l2的方向向量s_2={2,-1,1}×{1,-1,1}={0,1,-1}
平面的法向量n=s_1×s_2={1,-1,1}平面方程:(x-1)-(y-2)+(z-1)=0即
x-y+z=0
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以前这么简单的都会做,十几年没做了,也就忘了。
题目挺难的,我的图形计算器都算不出来。
你在考微积分、、、
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