x=lnsint y=cost 求切线方程-搜答案-智慧作业帮

dx/dt=(e^t)sint+(e^t)cost=(e^t)(sint+cost)dy/dt=(e^t)cost-(e^t)sint=(e^t)(cost-sint)dy/dx=(dy/dt)/(d

dx/dt=2tdy/dt=-sin(t)dy/dx=-sin(t)/2t同理:d²y/dx²=-cos(t)/2

=(1+e^t)/(2-sint)不通,看书.

∵(sint+cost)²=sin²t+2sintcost+cos²t=1+2sintcost∴x²=1+2y∴y=x²/2-1/2

由对称性,S＝4∫(0→a)ydx＝4∫(π/2→0)a(sint)^3d[a(cost)^3]＝12a^2×∫(0→π/2)(sint)^4×(cost)^2dt＝12a^2×∫(0→π/2)[(s

dy/dx=y'(t)/x'(t)=(sint+tcost)/(1-cost+tsint)再问：要过程谢谢再答：dy=y'(t)dt.dx=x'(t)dt=>dy/dx=y'(t)/x'(t)

dy=sintdr+rcostdtdX=costdr-rsintdtdr/dt=-asintdy/dx=[-a(sint)^2+acost+a(cost)^2]/[-asintcost-asintco

需要注意的是有个隐藏条件：(sint)^2+(cost)^2=1即(sint+cost)^2-2sint*cost=1将x=cost+sint,y=sint*cost代入得x^2-2y=1,即y=(x

dy/dx=(dy/dt)/(dx/dt)=-sint/2td²y/dx²=d(dy/dx)/dx=[d(dy/dx)/dt]/(dx/dt)=d(-sint/2t)/dt/2t=

解dy/dx=(1-sint)'/(t²+cost)'=(-cost)/(2t-sint)

算反?积分上下限换一下,前面加个负号就行了.具体你应该会算吧.

x=sint-costy=sint+cost则：x+y=2sintx-y=-2cost所以：(x+y)^2+(x-y)^2=2再问：这个不像圆的方程啊再答：这个是圆的方程。(x+y)^2+(x-y)^

cost*sint=1/2sin2t=1/2*2tant/(tan^2t+1)=x/(x^2+1)

dy=lnt+1dx=1-sintdy/dx=(lnt+1)/(1-sint)

这个自己就乘几次就会知道啦,比如说我们先来算A的平方好了(a2)11=(cost)^2-(sint)^2=cos(2t)(cos的倍角公式哦)(a2)12=2costsint=sin(2t)(sin的

∵x=a(t-sint)∴dx=d[a(t-sint)]=(a-cost)dt∴y=a(1-cost)∴dy=d[a(1-cost)]=asintdt∴dy/dx=(asint)/(a-cost)再问

∫(上限2π下限0)f(x)dx=∫(上限2π下限0)costdt=0

直接求导,根据导数也就是微商的定义y'=dy/dx=(dy/dt)/(dx/dt)=-sint/cost=-tgt当t=Pi/4时,y'=-tgt=-1,并且曲线过点(sqrt2/2,sqrt2/2)

x,y随t增减趋势,大致画出图像是从A(1,0) 沿着逆时针到B(1,-2π)的一段曲线..设原题目中P=y+ye^x,Q=x+e^x因为Q'x=P'y,所以原积分与路径无关

dy/dx=y'/x'=tsint/(-sint)=-t再问：在详细一点呗再答：dy/dx=(dy/dt)/(dx/dt)=(cost-cost+tsint)/(-sint)=-t