Finding if vector line doesn't cross 3D plane v = (2i − 3j + k) + µ(i − 2j) + ν(i + k
Hi everyone,
Let P be the plane with equationv = (2i − 3j + k) + µ(i − 2j) + ν(i + k).
(b) Where does the line with equationv = (5i + 6j) + λ(2j + k) meet the plane P?
I was facing difficulties answering this as the answer was that it did not cross anywhere. I am unsure how to show that the line does not cross the plane.
Hi everyone,
Let P be the plane with equationv = (2i − 3j + k) + µ(i − 2j) + ν(i + k).
(b) Where does the line with equationv = (5i + 6j) + λ(2j + k) meet the plane P?
I was facing difficulties answering this as the answer was that it did not cross anywhere. I am unsure how to show that the line does not cross the plane.