Work.
It can't be calculated with the information given.Work is defined as (force) multiplied by (distance).The mass can be moved fast, by pushing it hard, or slowly through the same distance,by pushing it with less force. The work is different in each case, since it depends on theforce and the distance.Notice that the work doesn't depend on the mass, only on the force used to move it.
force x perpendicular distance from a specific, defined point
Work is defined as the dot product of force times distance, or W = F * d = Fd cos (theta) where theta is the angle in between the force and distance vectors (if you are doing two dimensions). In three dimensions, use the standard definition for the dot product (using the component form of the vectors).
That's the definition of "work" ... (force exerted) times (distance through which the force acts). If you push against the end of a lever with a force 'F' and move it through a distance 'D', then (F x D) is the work you put into the lever.
No. Work is transferred energy. When you do work, you are transferring energy. If the force is constant over time: Work = F*d*cos(theta) where F = force d = distance object travels over the time the force is applied theta = angle between force and the displacement of the object The only component of the force that can do work is the component of the force that is parallel to the displacement.
work
work work
In Physics, work is defined as (force) multiplied by (distance). According to that definition, if either force or distance is zero, then work is zero. That means that no matter how hard you push on a brick wall, no work is done, because your force acts through zero distance.
Work W. The dot product of Force and Distance through which the force acts is called Work . W=F.d
Physics definition of work: (force applied ) multiplied by (distance through which the force acts).
Torque is defined as force multiplied by the distance, from the axis of rotation, at which such as force is applied.In the case of an engine, I believe the torque would have to be measured.
WORK as is scientifically defined.
Work is defined as force times distance.
We're not sure what the question means when it says "into" displacement.For that matter, we're not absolutely sure what 'W' stands for.Plus, to be honest, we don't see a question here.But "... into ..." is still troubling us.Perhaps this will help:Work is defined as (force) multiplied by (distance through which the force acts)
Energy can be transferred to material things by pushing or pulling AND moving it through a distance. The push or pull is a force, and the amount of energy is the magnitude of the force multiplied by the distance through which it acts. No matter how hard you push or pull, if your force doesn't move through any distance, then no energy is transferred to the thing you're pushing or pulling.
F = ma, W = Fd Or in words: force is mass multiplied by acceleration; work is force multiplied by distance.
It can't be calculated with the information given.Work is defined as (force) multiplied by (distance).The mass can be moved fast, by pushing it hard, or slowly through the same distance,by pushing it with less force. The work is different in each case, since it depends on theforce and the distance.Notice that the work doesn't depend on the mass, only on the force used to move it.