Calculate the dot and cross product of `vecA=30` units along east and `vecB=10` units due north east.

Explain the dot product and cross product of unit vectors.

Explain the dot product and cross product of unit vectors.

The vectors vecA has a magnitude of 5 unit vecB has a magnitude of 6 unit and the cross product of vecA and vecB has a magnitude of 15 unit. Find the angle between vecA and vecB .

The vectors vecA has a magnitude of 5 unit vecB has a magnitude of 6 unit and the cross product of vecA and vecB has a magnitude of 15 unit. Find the angle between vecA and vecB .

The vectors vecA has a magnitude of 5 unit vecB has a magnitude of 6 unit and the cross product of vecA and vecB has a magnitude of 15 unit. Find the angle between vecA and vecB .

Find the resultant of the following two vector vecA and vecB . vec(A):40 units due east and , vec(B):25 units 37^(@) north of west

Find the resultant of the following two vector vecA and vecB . vec(A):40 units due east and , vec(B):25 units 37^(@) north of west

Magnitude of the cross product of the two vectors (vecA and vecB) is equal to the dot product of the two . Magnitude of their resultant can be written as

vec(a)=5 units due South West vec(b)=5 units due 53^(@) North of East. vec(c)=10 units due 37^@ South of East. Then which of the following is incorrect.

vec(a)=5 units due South West vec(b)=5 units due 53^(@) North of East. vec(c)=10 units due 37^@ South of East. Then which of the following is incorrect.