T=F=mv²/R=mω²R
ω=sqrt(T/mR)
ω = εt
t=ω / ε
2πN= εt²/2
N= εt²/4π
There is a mass at the end of a 0.6 m string, being swung around overhead at constant acceleration of(3/4)pi rad/sec^2. mass is 39.84 G. Tensile strength is 12.4 newtons
need to find how many revolutions there will be before the string breaks, and the time before that happens. What equations do I need?
1 answer