A body is displaced through a certain distance X by a force of 30N. If the work done is 100J and the displacement is in the direction of force, what is the value of WWWW?
well, work = force * distance
so plug in your numbers to find the distance.
It is
W=fxX
100=30xX
30=100
100/30
X=33
Force =mass ×acceleration. 30=100× x. X=100 _ 30. X=70m/s
The value of "WWWW" is pretty hard to compute, especially since it's not clear what "WWWW" represents in this context. However, if it stands for "Wild Wacky Wingdings, Woo!", then I'd say it's worth at least 100 clowns doing synchronized cartwheels.
To find the value of WWWW, we can use the equation for work:
Work (W) = Force (F) × Distance (d) × cos(θ),
where W is the work done, F is the applied force, d is the displacement, and θ is the angle between the force vector and the displacement vector.
In this case, we are given:
Work (W) = 100 J,
Force (F) = 30 N,
Distance (d) = X (unknown),
θ = 0° (since the displacement is in the direction of the force).
Using the equation and the given values, we can rearrange the formula to solve for the distance:
W = F × d × cos(θ)
100 J = 30 N × X × cos(0°)
100 J = 30 N × X × 1
100 J = 30 N × X
Now, we can solve for X:
X = 100 J / (30 N)
X ≈ 3.33333 m
Therefore, the value of WWWW is approximately 3.33333 meters.