Let the angle between two non zero vectors A and B be `120^@` and its resultant be C.

Let the angle between two nonzero vector vecA and vecB is 120^@ and its resultant be vecC .

Let the angle between two nonzero vector vecA and vecB is 120^@ and its resultant be vecC .

If the angle between two vectors A and B is 120^(@) , then its resultant C will be

What should be the the angle theta between two vectors vec A and vec B for their resultant vec R to be (i) maximum (ii) minimum ? Give their resultant value.

The angle between two vector A and B is theta . Vector R is the resultant of the two vectors. If R makes an angle (theta)/(2) with A, then

What is the angle between two vector forces of equal magnitude such that their resultant is one-third of either of the original forces?

Let A= [[1,4],[3,2]] If theta is the angle between the two non- zero column vectors X such that AX = lambda X for some scalar lambda then tan theta is equal to

Is it possible that two non - zero vectors multiply and give a zero result ?

Two vectors A and B are such that A+B = C and A^2 +B^2 = C^2 . If theta is the angle between positive direction of A and B , then the correct statement is

Two vectors A and B are such that A+B = C and A^2 +B^2 = C^2 . If theta is the angle between positive direction of A and B , then the correct statement is