Level:
Project ID:
9000101002
Source Problem:
Accepted:
1
Clonable:
1
Find the intersection of the line \(AB\)
and the line \(p\),
where \(A = [0;1;2]\),
\(B = [4;1;-2]\) and
\[
\begin{aligned}p\colon x& = 1 + t, &
\\y & = 2 - t,
\\z & = 1 - t;\ t\in \mathbb{R}.
\\ \end{aligned}
\]
\([2;1;0]\)
\([1;2;1]\)
\([3;0;-1]\)
There is no intersection.
Fixed Answer:
Last Fixed