5. Determine the moment of the force F about an axis extending between A and C....
Determine the moment of the force F about an axis extending
between A and C. Express the result as a Cartesian vector.
(Figure 1)
Express your answer in terms of the unit vectors i, j, and k
using three significant figures.
3 L F = [4i + 12j - 3k lb
Question 1 options:
Determine the moment of force F about an axis
extending between A and C. Express the result as
a Cartesian vector. Use F = {5i +
10j - 4k} kN, L1 = 5 m, L2 = 4 m,
and L3 = 3 m for your calculations.
Your answer:
x-component of the resultant moment in kNm (round the
result to 1 decimal place):
y-component of the resultant moment in kNm (round the
result to 1 decimal place):
z-component...
Determine the moment of force F about point O . Express the
result as a Cartesian vector. (Figure 1). Assume F= 570
4 m 3
Name Lecture 8 Assignment Problem 1 Determine the moment of the force F about the aa axis. Express the result as a Cartesian vector. Given: F 600 lb a=5ft b 3 ft c-2 ft d 4 ft e 4 ft f 2 ft ca
To 130 16 MA=TABX FC Determine the Moment et a force about Point A. Express the result in cartesian vector form. To 130 16 MA=TABX FC Determine the Moment et a force about Point A. Express the result in cartesian vector form. F-150 lb
Determine the moment
of this force about point B using the scalar formulation. (Without
using cross products) Express the result as a Cartesian
vector.
300 min 200 mm 250 mm 401 30° F 80 N
The space structure is subjected to a force F = -5i + 3j – 7k
(kips) applied at joint H.
1- Determine the moment of the force about line CG.
2- Determine the moment of the force about line DE.
3- Express the moments in Cartesian coordinates.
8 ft
8 ft
ROYG Last Name First Name Class Roster Number 2. Determine the moment produced by the force F about point O. Express the result as a Cartesian Vector 25 Points F 1000 NB
determine the moment of force f=[-1.5i + 2.25j -3.0k] kN about the
longitudinal axis of the rod AC
. Determine the moment of the force F [-1.5 2.25j -3.0k] kN about the longitudinal axis of the rod AC.