设参数方程x=arctant,y=et,求
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X=arctantdx/dt=1/(1+t^2)y=ln(1+t2)dy/dt=2t/(1+t^2)dy/dx=(dy/dt)/(dx/dt)=2td2y/dx2=d(dy/dx)/dx=2dt/dx
x't=2ty't=1-1/(1+t^2)=t^2/(1+t^2)y'=dy/dx=y't/x't=t/[2(1+t^2)]d^y/dx^2=d(y')/dx=d(y')/dt/x't=1/2*[1+
x^2/4+y^2/16=0所以x=2cosθy=4sinθ
∵直线l的参数方程为x=2+t2y=3+32t(t为参数),∴消去参数t得y=3x+3-23,则它的斜截式方程为y=3x+3-23,故答案为:y=3x+3-23.
dy/dx=(dy/dt)/(dx/dt)=[2t/(1+t^2)]/[1-1/(1+t^2)]=2/t
dy/dx=(dy/dt)/(dx/dt)显然dx/dt=1/(1+t²)给出的y是关于t的隐函数,可以不管这些,直接把y看成是t的函数,然后两边求导,得2dy/dt-(y²+2t
(1)x=y^2-y-1=(t-1)^2-(t-1)-1=t^2-3t+1参数方程为x=t^2-3t+1y=t-1(2)y^1/2=a^1/2-x^1/2=a^1/2-a^1/2*cos^2θ=a^1
dy/dx=[1-1/(1+t²)]/[2t/(1+t²)]=t/2d²y/dx²=(1/2)*dt/dx=(1/2)/(dx/dt)=(1/2)/[2t/(1
dx/dt=1-2t/(1+t^2)=(1+t^2-2t)/(1+t^2)=(t-1)^2/(1+t^2)dy/dt=1/(1+t^2)y'=1/(t-1)^2dy'/dt=-2/(t-1)^3y"=
y=2+t^3dy/dt=3t^2x=1+t^2dx/dt=2t所以dy/dx=(dy/dt)/(dx/dt)=(3t^2)/(2t)=3t/2选C
dy/dt=2t/(1+t²)dx/dt=1-[1/(1+t²)]=t²/(1+t²)dy/dx=(dy/dt)/(dx/dt)=2/t
书上给的公式也只有两阶导呀.
x't=2t/(1+t^2)y't=1-1/(1+t^2)=t^2/(1+t^2)y'=dy/dx=y't/x't=t/2y"=d(y')/dx=d(y')/dt/(dx/dt)=(1/2)/[2t/
dx/dt=1-1/(1+t^2)=t^2/(1+t^2)dy/dt=2t/(1+t^2)dy/dx=(dy/dt)/(dx/dt)=2t/t^2=2/t同理求d^2x/dt^2=2t/(1+t^2)
楼主的补充问题,涉及到我们教学中长期普遍存在,却无人介意,更无人愿意更改的一个懒惰习惯,这是我们与英美教学的显著区别之处.点击放大,荧屏放大再放大:
答:x=ln(1+t²),x'(t)=2t/(1+t²)y=t-arctant,y'(t)=1-1/(1+t²)=t²/(1+t²)dy/dx=(dy
dx=1/(1+t^2)*dt,dy=2t/(1+t^2)*dt,所以切线斜率为k=dy/dx=2t|(t=1)=2,又切点坐标为x=arctan1=π/4,y=ln(1+1)=ln2,所以切线方程为
dy=lnt+1dx=1-sintdy/dx=(lnt+1)/(1-sint)