Answer:
The angle between given vectors is 58 degrees.
Step-by-step explanation:
We are given the following vectors in the question:
[tex]a = 6i- 9j + k\\b = 8i - k[/tex]
We have to find the angle between the two vectors.
Formula:
[tex]\cos \theta = \displaystyle\frac{a.b}{|a||b|}[/tex]
Evaluating,
[tex]a.b\\= ( 6i- 9j + k)(8i - k)\\=6.8 -9.0 +1(-1) = 47\\|a| = \sqrt{6^2 + (-9)^2+1^2} = \sqrt{118}\\|b| = \sqrt{8^2 + (-1)^2} = \sqrt{65}\\\text{Putting values}\\\\\cos \theta = \displaystyle\frac{a.b}{|a||b|}\\\\\cos \theta = \frac{47}{\sqrt{118}\sqrt{65}} = \frac{47}{\sqrt{7670}}\\\\\theta = \arccos \frac{47}{\sqrt{7670}}\\\\\theta = 57.54336^\circ \approx 58\text{ degrees}[/tex]
The angle between given vectors is 58 degrees.
