Add vectors `vecA,vecB and vecC` each having magnitude of 100 unit and inclined to the X-axis at angles `45^@, 135^@ and 315^@` respectively.

Add vectors vecA,vecB and vecC which have equal magnitude s of 50 unit and are inclined at angles of 45^(@), 135^(@) and 315^(@) respectively from x-axos.

Let vecA and vecB be the two vectors of magnitude 10 unit each. If they are inclined to the X-axis at angles 30^@ and 60^@ respectively, find the resultant.

Two vectors ( veca and vecb ) have equal magnitudes of 12 units. These vectors are making angles 30^(@) and 120^(@) with the x-axis respectively. Their sum is vec r .Then the x and y components of r are

If veca and vecb are unit vectors inclined to x-axis at angle 30^(@) and 120^(@) then |veca +vecb| equals

The vector sum of three vectors vecA, vecB and vecC is zero . If hati and hatj are the unit vectores in the vectors in the directions of vecA and vecB respectively , them :

A magnitude of vector vecA,vecB and vecC are respectively 12, 5 and 13 units and vecA+vecB=vecC then the angle between vecA and vecB is

vecA,vecB,vecC,vecD,vecE and vecF are coplanar vectors having the same magnitude each of 10 units and angle between successive vectors is 60^(@) If vecA,vecB & vecC is reversed the magnitude of resultant is

Three vectors vecA,vecB and vecC are such that vecA=vecB+vecC and their magnitudes are in ratio 5:4:3 respectively. Find angle between vector vecA and vecC

The magnitudes of vectors vecA.vecB and vecC are respectively 12,5 and 13 unira and vecA+vecB=vecC , then the angle between vecA and vecB is :