Two tangent vectors at a point on a surface are $T_1 = 4i + 2j + 3k$ and $T_2 = -2i - 3j + 1k$
Using the property of the dot product of two normal vectors, determine the unit vector normal to the surface at the point
Two tangent vectors at a point on a surface are $T_1 = 4i + 2j + 3k$ and $T_2 = -2i - 3j + 1k$
Using the property of the dot product of two normal vectors, determine the unit vector normal to the surface at the point