1. 294 N
The weight of an object is given by:
[tex]W=mg[/tex]
where
m is the mass of the object
g = 9.8 m/s^2 is the acceleration of gravity
For the sled in the problem,
m = 30.0 kg
So its weight is
[tex]W=(30.0 kg)(9.8 m/s^2)=294 N[/tex]
2. 285 N
In order to find the normal force on the sled, we need to analyze the forces acting along the vertical direction.
We have:
- Weight of the sled: W=294 N, downward
- Normal reaction: N=?, upward
- Vertical component of the pull of the child, which is given by
[tex]F_{1y} = (12.0 N)sin 45^{\circ}=8.5 N[/tex] (upward)
So the equation of the forces is
[tex]W=N+F_{1y}[/tex]
And substituting the values we can find the magnitude of the normal force:
[tex]N=W-F_{1y}=294 N -8.5 N=285.5 N\sim 285 N[/tex]
3. [tex]0.38 m/s^2[/tex]
In order to find the acceleration of the sled, we need to analyze the forces acting along the horizontal direction. Here I assume that the two children are pulling and pushing the sled both forward, since it is not specified. We have:
- Horizontal component of the child pulling the sled:
[tex]F_{1x} = (12.0 N)cos 45^{\circ}=8.5 N[/tex] (forward)
- Force of the child pushing the sled:
[tex]F_2 = 8.0 N[/tex] (forward)
- Force of friction:
[tex]F_f = 5.0 N[/tex] (backward)
So the net force along the horizontal direction is
[tex]F=F_{1x}+F_2-F_f = 8.5 N +8.0 N -5.0 N =11.5 N[/tex]
And given Newton's second law:
F = ma
where F is the net force, m the mass and a the acceleration of the sled, we can now find the acceleration:
[tex]a=\frac{F}{m}=\frac{11.5 N}{30.0 kg}=0.38 m/s^2[/tex]
