http://www.ck12.org Chapter 8. Angular Motion and Statics
FIGURE 8.16
Using Equation 2, we can useTyto solve forHy
→Hy+Ty−Ws−Wr= 0 →Hy=− 168 N+ 100 N+ 80 N= 12 N
Using Equation 1 we can solve forHxby findingTx.
Let us resolve the components of the tensionT:
Ty=TsinθandTx=TcosθorTy=Tsin 60◦andTx=Tcos 60◦
SinceTy= 168 N, we can solve forT→ 168 =Tsin 60◦→T=sin 60^168 N◦= 193. 99 → 194 N
Finally, using Equation 1 we haveTx=Hx→Tcos 60◦=Hx→( 194 N)( 0. 50 ) = 97 N
Thus(Hx,Hy) = ( 97 N, 194 N)
http://demonstrations.wolfram.com/ForcesActingOnALadder/
- Angular momentum is defined as the product of rotational inertia and angular velocity.
- Torque is defined asτ=rFsinθ, where the angleθis the angle between the lever armrand forceF. The
symbol for torque is the Greek letter tau(τ) - By definition a counterclockwise torque is positive and a clockwise torque is negative.
- Two conditions of equilibrium:
i. Translational equilibrium:∑F=Fnet= 0
ii. Rotational equilibrium:∑τ=τnet= 0