1) 12.5 N east
There are two forces acting on the box along the horizontal direction:
- The applied force of 15 N east, we indicate it with F
- The force of friction of 2.5 N west, we indicate it with [tex]F_f[/tex]
Taking east as positive direction, we can write the two forces has
[tex]F=+15 N\\F_f = -2.5 N[/tex]
Therefore, the net force on the box will be:
[tex]F_{net} = F + F_f = 15 + (-2.5) = +12.5 N[/tex]
And the positive sign means the direction is east.
2) [tex]2.5 m/s^2[/tex]
We can solve this part by using Newton's second law:
[tex]F_{net}=ma[/tex]
where
[tex]F_{net}[/tex] is the net force on the box
m is its mass
a is the acceleration
For the box in this problem,
[tex]F_{net} = 12.5 m/s^2[/tex] (east)
m = 5.0 kg
Solving for a, we find the acceleration:
[tex]a=\frac{F_{net}}{m}=\frac{12.5}{5.0}=2.5 m/s^2[/tex]
And the direction is the same as the net force (east)
