Final answer:
The moment of the force F about the origin, calculated using the cross-product of the position vector r and force vector F, is (i+2j+k)Nm, corresponding to option d.
Step-by-step explanation:
The question refers to the concept of moment of a force, also known as torque in physics. To find the moment of force F about the origin, we use the cross-product of the position vector (r) with the force vector (F). In this case, the position vector is r = -j + k and the force vector is F = i - 2j. The moment (torque) M is given by the cross product r × F.
M = r × F = | i j k |
0 -1 1
1 -2 0 |
Calculating the determinant, we find:
M = -(i (0) - k (2)) - j (0 - k (1)) + k (i (-1) - j (1))
M = i +(2j) + kNm
So the correct answer is option d) (i+2)+kNm.