(a) The child + the wagon
Explanation:
Newton's second law states that the net force applied on a system is equal to the mass of the system times its acceleration:
[tex]\sum F = ma[/tex] (1)
Here we are interested in calculating the acceleration of the child, a. However, the child moves together with the wagon - this means that we can consider the child+wagon as a single system, moving with an acceleration of a, under a net force of F, which is the result of all the forces applied to the child+wagon.
(b) See attachment
There are 5 forces in total acting on the child+wagon system:
- The force exerted by the first child, 75.0 N, here to the left
- The force exerted by the second child, 90.0 N, here to the right
- The frictional force of 12.0 N, to the left (the direction of the frictional force is opposite to the direction of motion; since the larger force is the one exerted to the right, the system would move to the right, so the frictional force acts to the left)
- The weight of the child+wagon system, downward, which is equal to
W = mg
where m=23.0 kg is the total mass and g=9.8 m/s^2 is the acceleration due to gravity
- The normal reaction of the surface, upward, equal in magnitude to the weight
(c) 0.13 m/s^2
We are only interested in the forces acting along the horizontal direction, since the two forces in the vertical direction are in equilibrium.
The resultant force along the horizontal direction is
[tex]\sum F = 90.0 N - 75.0 N - 12.0 N =3.0 N[/tex]
By using Newton's second law (eq. 1), we can find the acceleration:
[tex]a=\frac{\sum F}{m}[/tex]
where
m = 23.0 kg is the mass of the child+wagon
Substituting,
[tex]a=\frac{3.0 N}{23.0 kg}=0.13 m/s^2[/tex]
(d) 0
In this case, the magnitude of the friction is 15.0 N. This means that the net force acting on the system is
[tex]\sum F = 90.0 N -75.0 N -15.0 N =0[/tex]
So, the forces along the horizontal direction are balanced as well. According to eq.(1), this also means that the acceleration along the horizontal axis will also be zero:
[tex]a=\frac{0}{23.0 kg}=0[/tex]
a) Child plus wagon
b) Refer the attached diagram.
c) [tex]\rm a = 0.13 \; m/sec^2[/tex]
d) a = 0
Given :
The first child exerts a force of 75 N, the second a force of 90 N.
Friction = 12N
Mass of the third child plus wagon is 23 kg.
Solution :
a) According to Newton's second law,
F = ma
Here we are interested in calculating the acceleration (a) of the child. However, the child moves together with the wagon - this means that we can consider the child plus wagon as a single system, moving with an acceleration of a, under a net force of F, which is the result of all the forces applied to the child plus wagon.
b) Refer the attached Diagram.
c) F = ma
90 - 75 - 12 = 23a
[tex]\rm a = \dfrac{3}{23}= 0.13\;m/sec^2[/tex]
d) F = ma
90 - 75 - 15 = 23a
a = 0
For more information, refer the link given below
https://brainly.com/question/18754956?referrer=searchResults
