A truck pulls boxes up an incline plane. The truck can exert a maximum force of 3,500 N3,500N. If the plane's incline is (5 pi )/8 5π8 and the coefficient of friction is 3/7 37, what is the maximum mass that can be pulled up at one time?
1 Answer
Explanation:
We're asked to find the maximum mass the truck can pull up the incline at a time.
NOTE: The friction force in this situation actually acts DOWN the incline, because the object (the boxes) is being moved upward.
I'd also like to point out that the incline ideally should have an angle of inclination between
00 andpi/2π2 , so I'll choose the corresponding first-quadrant angle oful((3pi)/8 .
Becuase the maximum mass allowed to pul would give a net force of zero, the equation for the net horizontal force
ul(sumF_x = F_"truck" - mgsintheta - f_s = 0
where
f is the static friction force, equal to
f_s = mu_sncolor(white)(aa) (maximum static friction force)
f_s = mu_smgcostheta
Plugging this into the above equation, we have
ul(sumF_x = F_"truck" - mgsintheta - mu_smgcostheta = 0
Now what we do is solve for the mass,
F_"truck" = mgsintheta + mu_smgcostheta
Divide all terms by
(F_"truck")/color(red)(m) = color(green)(gsintheta + mu_sgcostheta)
Swap the terms
ulbar(|stackrel(" ")(" "m = (F_"truck")/(g(sintheta + mu_scostheta))" ")|)
We now plug in the variables
-
F_"truck" = 3500color(white)(l)"N" -
mu_s = 3/7 -
theta = (3pi)/8 :
m = (3500color(white)(l)"N")/((9.81color(white)(l)"m/s"^2)[sin((3pi)/8) + 3/7cos((3pi)/8)]) = color(blue)(ulbar(|stackrel(" ")(" "328color(white)(l)"kg"" ")|)
