Technically, this is not correct. Although you're capturing all the values of f by just looking at the x component, a function comes equipped with three pieces of data: first, the domain D (in ...

Assuming you mean your tangent plane should be normal to the given line, you are looking for a point where the normal to the surface (i.e., the gradient) is parallel to the direction vector of the ...

This is intended as a complement to Alex Bartel's answer. (1) Consider the 2D case given by x = x(t), y = y(t). Here is a graph of a parametrized function with (x(t_0),y(t_0)) (in red) and (x(t_0 + \delta), y(t_0 + \delta)) ...

In general, such a line will be parametrized by x = az + 2, y = bz + 5 unless the line lies on the plane z = 0, which is easy to see not to be the case. In a more general case, the linear ...

the gradient is indeed the solution. Take a curve, \gamma that lies in S. Then F\circ \gamma is zero everywhere. So its derivative is zero. But its derivative is just \nabla F(\gamma(s)). \gamma'(s) ...

What you actually want here is the point-line distance formula for three dimensions . However, the cylinder equation you did get is correct. Using formula 10 in the link I gave, we have r^2=\frac{\|\langle x,y,z\rangle\times(\langle x,y,z\rangle-\langle 1,1,1\rangle)\|^2}{1^2+1^2+1^2}=\frac{(z-y)^2+(x-z)^2+(y-x)^2}{1^2+1^2+1^2} ...