- Find the distance between the two points $(3,5,-2)$ and $(-1,6,4)$. Then find the distance between the points $(3,5,-2)$ and $(x,y,z)$.
- For this one, have everyone in the group use chalk at the same time. In 3D, plot the points $(1,2,0)$, $(1,0,3)$, $(0,2,3)$, $(1,2,3)$, $(-2,4,-3)$.
- Find the component form of the vector that starts at $(4,-3)$ and ends at $(2,-2)$.
- Give a unit vector that points in the same direction as the previous. Then give a vector of length 3 that points in the same direction.
- Plot the vector valued function $\vec r(t) = (-2,1)t+(4,-3)$ for $0\leq t\leq 3$.
- Give the component form of a vector that points from $(1,2,3)$ to $(-2,4,9)$.
- Give a vector equation of the line that passes through the point $(1,2,3)$ and $(-2,4,9)$.
- Use the law of cosines to find the angle between the vectors $(-2,1)$ and $(1,3)$.
|
Sun |
Mon |
Tue |
Wed |
Thu |
Fri |
Sat |