metre
The force is said to be "equilibrant" when acting with other forces it would keep the body at rest ie in equilibrium. Hence equilibrant would be equal in magnitude but opposite in direction to the resultant of all the forces acting on the body.
equilibriant force
equilibrant
To solve for the equilibrant, first identify all the forces acting on an object and represent them as vectors. Calculate the resultant force by summing these vectors using vector addition. The equilibrant is then the vector that balances this resultant force, which is equal in magnitude but opposite in direction. Thus, it can be found by taking the negative of the resultant vector.
Resultant force is a system of forces in the single force equivalent to the system, whilst equilibrant force is a force capable of balancing another force to achieve equilibrium.
To solve for the equilibrant force in a system of forces, you must first determine the resultant force by adding all the individual forces acting on an object using vector addition. The equilibrant force is equal in magnitude but opposite in direction to the resultant force. Mathematically, you can find the equilibrant force by multiplying the magnitude of the resultant force by -1 and finding the vector in the opposite direction.
Resultant force is a system of forces in the single force equivalent to the system, whilst equilibrant force is a force capable of balancing another force to achieve equilibrium.
vector equal in magnitude and opposite direction
The resultant is a trigonometric function, usually using the Law of Cosines in two dimensional solution by vector resolution, of two or more known forces while equilibrant is equal in magnitude to the resultant, it is in the opposite direction because it balances the resultant.Therefore, the equilibrant is the negative of the resultant.
A resultant vector is the single vector that represents the combined effect of multiple vectors. It is obtained by adding together all the individual vectors. An equilibrant vector is a single vector that, when added to the other vectors in the system, produces a net result of zero, effectively balancing out the other vectors.
the answer is 13lb south of west since the resultant is 13lb north of east. in getting the equilibrant force, just copy the resultant and reverse the direction. then that's it. .