Assertion: The angle between the two vec...

Assertion: The angle between the two vectors `(hati+hatj)` and `(hatj_hatk)` is `(pi)/(3)` radian.
Reason: Angle between two vectors `vecA` and `vecB` is given by `theta=cos^(-1)((vecA.vecB)/(AB))`

Similar Questions

Explore conceptually related problems

Statement-1 : The angle between the two vectors (hatI + hatJ) and (hatk) is pi/2 radian. Statement - 2 : Angle between two vectors vecA and vecB is given by theta = cos^(-1)((A.B)/(AB))

Statement I: The angle between the vectors vecA=hati +hatj and vecB=hatj+hatk is (pi)/3 . Statement II: The angle between vector vecA and vecB is theta =cos ^(-1) ((vecA*vecB)/(AB)) .

The angle between the two vectors vecA=5hati+5hatj and vecB=5hati-5hatj will be

The angle between the two vectors vecA=hati+2hatj-hatk and vecB=-hati+hatj-2hatk

Find the angle between the vectors veca=hati-hatj+hatk and vecb=hati+hatj-hatk .

Find the angle between the vectors veca=hati+hatj-hatk and vecb=hati-hatj+hatk

Find the angle between the vectors : veca=hati+hatj-hatk and vecb=hati-hatj+hatk .

Assertion: The angle between the two vectors `(hati+hatj)` and `(hatj_hatk)` is `(pi)/(3)` radian. Reason: Angle between two vectors `vecA` and `vecB` is given by `theta=cos^(-1)((vecA.vecB)/(AB))`

Similar Questions

Recommended Questions

Assertion: The angle between the two vectors `(hati+hatj)` and `(hatj_hatk)` is `(pi)/(3)` radian.
Reason: Angle between two vectors `vecA` and `vecB` is given by `theta=cos^(-1)((vecA.vecB)/(AB))`