In this post you will learn how to find direction cosines and direction ratios of line of the vector with examples.
Letโs begin โ
Direction Cosines and Direction Ratios of Line
Direction cosines
The direction cosines of a line are defined as the direction cosines of any vector whose support is the given line.
It follows from the above definition if A and B are two points on a given line L, then the direction cosines of vectors \(\vec{AB}\) or, \(\vec{BA}\) are the direction cosines of line L. Thus, if \(\alpha\), \(\beta\), \(\gamma\) are the angles which the line L makes with the positive direction of x-axis, y-axis and z-axis respectively, then its direction cosines are either, \(cos\alpha\), \(cos\beta\), \(cos\gamma\) or โ \(cos\alpha\), โ \(cos\beta\), โ \(cos\gamma\).
Therefore, if l, m, n are direction cosines of a line, then -l, -m, -n are also its direction cosines and we always have
\(l^2 + m^2 + n^2\) = 1
If A\((x_1, y_1, z_1)\) and B\((x_2, y_2, z_2)\) are two points on a line L, then its direction cosines are
\(x_2 โ x_1\over AB\), \(y_2 โ y_1\over AB\), \(z_2 โ z_1\over AB\) or \(x_1 โ x_2\over AB\), \(y_1 โ y_2\over AB\), \(z_1 โ z_2\over AB\)
Direction Ratios
The direction ratios of a line are proportional to the direction ratios of any vector whose support is the given line.
If A\((x_1, y_1, z_1)\) and B\((x_2, y_2, z_2)\) are two points on a line L, then its direction ratios are proportional to
\(x_2 โ x_1\), \(y_2 โ y_1\), \(z_2 โ z_1\)
Example : Find the direction cosines and direction ratios of the line whose end points are A(1, 2, 3) and B(5, 8, 11).
Solution : We have, A(1, 2, 3) and B(5, 8, 11)
Direction ratios = (4, 6, 8)
AB = \(\sqrt{16 + 36 + 64}\) = \(\sqrt{116}\)
Direction Cosines = (\(4\over \sqrt{116}\), \(6\over \sqrt{116}\), \(8\over \sqrt{116}\)).
