求导arctany/xIn√(x²+y²)(x²+y²)sin3/(x²
来源:学生作业帮 编辑:搜搜考试网作业帮 分类:数学作业 时间:2024/08/03 11:34:23
求导
arctany/x
In√(x²+y²)
(x²+y²)sin3/(x²+y²)
告诉我三角函数的偏导数怎么求
arctany/x
In√(x²+y²)
(x²+y²)sin3/(x²+y²)
告诉我三角函数的偏导数怎么求
![求导arctany/xIn√(x²+y²)(x²+y²)sin3/(x²](/uploads/image/z/13652368-16-8.jpg?t=%E6%B1%82%E5%AF%BCarctany%2FxIn%E2%88%9A%28x%26%23178%3B%2By%26%23178%3B%29%28x%26%23178%3B%2By%26%23178%3B%29sin3%2F%28x%26%23178)
全微分吗?
z=arctan(y/x)
∂z/∂x=1/(1+y²/x²)*y=x²y/(x²+y²)
∂z/∂y=1/(1+y²/x²)*1/x=x/(x²+y²)
dz=x²y/(x²+y²)dx+x/(x²+y²)dy
z=ln√(x²+y²)
∂z/∂x=1/√(x²+y²)*1/2√(x²+y²)*2x=x/(x²+y²)
∂z/∂y=1/√(x²+y²)*1/2√(x²+y²)*2y=y/(x²+y²)
dz=x/(x²+y²)dx+y/(x²+y²)dy
z=(x²+y²)sin[3/(x²+y²)]
∂z/∂x=2xsin[3/(x²+y²)]+(x²+y²)*cos[3/(x²+y²)]*[-6x/(x²+y²)²]=2xsin[3/(x²+y²)]-6xcos[3/(x²+y²)]*/(x²+y²)
∂z/∂y=2ysin[3/(x²+y²)]+(x²+y²)*cos[3/(x²+y²)]*[-6y/(x²+y²)²]=2ysin[3/(x²+y²)]-6ycos[3/(x²+y²)]*/(x²+y²)
dz=2xsin[3/(x²+y²)]-6xcos[3/(x²+y²)]*/(x²+y²)dx+2ysin[3/(x²+y²)]-6ycos[3/(x²+y²)]*/(x²+y²)dy
z=arctan(y/x)
∂z/∂x=1/(1+y²/x²)*y=x²y/(x²+y²)
∂z/∂y=1/(1+y²/x²)*1/x=x/(x²+y²)
dz=x²y/(x²+y²)dx+x/(x²+y²)dy
z=ln√(x²+y²)
∂z/∂x=1/√(x²+y²)*1/2√(x²+y²)*2x=x/(x²+y²)
∂z/∂y=1/√(x²+y²)*1/2√(x²+y²)*2y=y/(x²+y²)
dz=x/(x²+y²)dx+y/(x²+y²)dy
z=(x²+y²)sin[3/(x²+y²)]
∂z/∂x=2xsin[3/(x²+y²)]+(x²+y²)*cos[3/(x²+y²)]*[-6x/(x²+y²)²]=2xsin[3/(x²+y²)]-6xcos[3/(x²+y²)]*/(x²+y²)
∂z/∂y=2ysin[3/(x²+y²)]+(x²+y²)*cos[3/(x²+y²)]*[-6y/(x²+y²)²]=2ysin[3/(x²+y²)]-6ycos[3/(x²+y²)]*/(x²+y²)
dz=2xsin[3/(x²+y²)]-6xcos[3/(x²+y²)]*/(x²+y²)dx+2ysin[3/(x²+y²)]-6ycos[3/(x²+y²)]*/(x²+y²)dy