8.4. Applications of Equilibrium Conditions http://www.ck12.org
Answer:The distance of the tank from ScaleBcan be expressed asL−x, where,x=vt. Thus,
FAL=mbg(L−x)+mpgL
2
→mbg(L−vt)+mpgL
2
→FA=
( 40 )( 3 − 0. 5 t)+ 60( 3
2)
3
→
FA= 40 −
20 t
3+ 30 →FA= 70 −
20 t
3Does the result satisfy the conditiont=0 in part 1b? How about when the books are on ScaleBat timet= 6 s?
http://demonstrations.wolfram.com/EquilibriumOfARigidBar/
Illustrative Example 4: A Sign of the Times
A sign of weight 100.0 N hangs from a rod of weight 80.0 N and length 1.2 m. A cable with unknown tensionTat
an angle of 60◦from the horizontal and a hingeHsupports the sign and rod. SeeFigure8.15 andFigure8.16.
FIGURE 8.15
Find the components of the forceFHthat the hinge places upon the rod.
Answer:
The equations for thexandyforces in translational equilibrium are (seeFigure8.16):
Equation 1:∑Fx= 0 →Hx−Tx= 0
Equation 2:∑Fy= 0 →Hy+Ty−Ws−Wr
We can also write the equation for rotational equilibrium:
Equation 3:∑τ= 0 →TyL−WrL 2 −WsL= 0
It will be more efficient to work with Equation 3 first since the only unknown in the equation isTy. Solving forTy,
we have∑τ= 0 →Ty= ( 80. 0 )
( 1. 20
2)
+ 100. 0 ( 1. 20 ) = 168 N→Ty= 168 N.