神马作文网cos(xy)=x-y所确定的隐函数y=y(x)的导数dy/dx
来源:学生作业帮 编辑:神马作文网作业帮 分类:数学作业 时间:2024/11/11 15:09:35
cos(xy)=x-y所确定的隐函数y=y(x)的导数dy/dx
快
快
cos(xy)=x-y,隐函数,两边求导
-sin(xy)*(xy)'=1-y'
-sin(xy)*(y+xy')=1-y'
-ysin(xy)-xcos(xy)*y'=1-y'
y'[1-xsin(xy)]=1+ysin(xy)
y'=[1+ysin(xy)]/[1-xsin(xy)]
也可用设二元函数f(x,y)=cos(xy)-x+y
用隐函数求导法:f'x(x,y)+f,y(x,y)*y'=0
f'x(x,y)=-sin(xy)*(xy)'-1
=-ysin(xy)-1
f'y(x,y)=-sin(xy)*(xy)'+1
=-xsin(xy)+1
∴[-ysin(xy)-1]+[-xsin(xy)+1]*y'=0
y'=-[ysin(xy)-1]/[-xsin(xy)+1]
y'=[1+ysin(xy)]/[1-xsin(xy)]
-sin(xy)*(xy)'=1-y'
-sin(xy)*(y+xy')=1-y'
-ysin(xy)-xcos(xy)*y'=1-y'
y'[1-xsin(xy)]=1+ysin(xy)
y'=[1+ysin(xy)]/[1-xsin(xy)]
也可用设二元函数f(x,y)=cos(xy)-x+y
用隐函数求导法:f'x(x,y)+f,y(x,y)*y'=0
f'x(x,y)=-sin(xy)*(xy)'-1
=-ysin(xy)-1
f'y(x,y)=-sin(xy)*(xy)'+1
=-xsin(xy)+1
∴[-ysin(xy)-1]+[-xsin(xy)+1]*y'=0
y'=-[ysin(xy)-1]/[-xsin(xy)+1]
y'=[1+ysin(xy)]/[1-xsin(xy)]
cos(xy)=x-y所确定的隐函数y=y(x)的导数dy/dx
求e^x+xy=e所确定的隐函数y的导数dy/dx
求由隐函数y=ln(xy)所确定的函数y=y(x)的导数dy/dx
xy=e^x+y 确定隐函数y的导数dy/dx
求:由方程所确定的隐函数的导数dy/dx?y=cos(x+y)
求由方程所确定的隐函数的导数dy/dx? y=cos(x+y)
求由方程ysinx-cos(xy)=0所确定的隐函数y=y(x)的导数dy/dx
求隐函数导数ln(xy)=e^(x+y)所确定的隐函数y=y(x)的导数dy/dx.
求隐函数导数ln(xy)=e^x+y所确定的隐函数y=y(x)的导数dy/dx.
由方程y^x=x^y所确定的隐函数y=y(x)的导数dy/dx
高数 求助求由隐函数x^3+y^3=4xy所确定的函数y=y(x)的导数dy/dx,y'(2)
求所确定的隐函数y= y(x)的导数dy/dx