If #A = <7 ,9 ,4 >#, #B = <6 ,-9 ,-3 ># and #C=A-B#, what is the angle between A and C?

1 Answer
Jan 27, 2018

#theta = cos^-1((197)/(sqrt(146) sqrt(374))) approx 0.568# radians or #32.54^circ#

Explanation:

#vec c = [7-6, 9-(-9), 4-(-3)] = [1, 18, 7]#

The angle between vectors is given by:

#theta =cos^-1((vec a cdot vec c)/(||vec a|| ||vec c||))#

Calculating individual parts:
#vec a cdot vec c = 7*1 + 9*18 + 4*7=197#
#||vec a || = sqrt(7^2 +9^2 + 4^2) = sqrt(146)#
#||vec c || = sqrt(1^2 +18^2 + 7^2) = sqrt(374)#

So:

#theta =cos^-1((197)/(sqrt(146) sqrt(374)))#, which is about as good as it gets, but approximations are:

#theta approx 0.568# radians or #approx 32.54^circ#