Centripetal Force Minimum Period Question

AI Thread Summary
A boy spins a 3.00 kg rock tied to a 0.70 m string, with the string breaking at a tension greater than 80.0 N. To find the minimum period for the rock's circular motion, the relevant equation is T = 2π√(r/g), which relates tension, mass, radius, and period. The calculations yield a minimum period of approximately 1.02 seconds, though slight variations in results are noted. The relationship between maximum tension and minimum period is explained by the need for maximum speed to cover the circular distance in the shortest time. Understanding this connection clarifies the dynamics of centripetal force in circular motion.
Lax0
Messages
2
Reaction score
0

Homework Statement


A boy ties a 3.00kg rock to a 0.70 m string and begins spinning it around in a horizontal circle at a constant speed. If the string will break if the tension is greater than 80.0 N, what is the minimum period for the rock to spinning in a circle. How do i solve this?


Homework Equations



m4∏^(2 ) r/T^2

The Attempt at a Solution


80.0= (3.00)4∏^(2)(0.70)/T^2
T= 1.02
 
Physics news on Phys.org
Welcome to PF!
Looks good. I get a very slightly larger answer; might be worth running it through the calculator again.
 
Your equations written as pie squared r instead of pie r squared, i think you did it right but it looks weird
 
anaximenes said:
Your equations written as pie squared r instead of pie r squared, i think you did it right but it looks weird

its the equation in the textbook. So can you explain how max tension gets minimum period?
 
Lax0 said:
its the equation in the textbook.
Yes, the equation is correct, though it does look odd at first sight.
So can you explain how max tension gets minimum period?
The stone has a certain distance to cover, 2πr, in one period. So minimum period means maximum speed, and that means maximum tension.
 
Sorry your right, its so weird seeing pie digitally
 

Thread 'Errors and significant figures'

I multiplied the values first without the error limit. Got 19.38. rounded it off to 2 significant figures since the given data has 2 significant figures. So = 19. For error I used the above formula. It comes out about 1.48. Now my question is. Should I write the answer as 19±1.5 (rounding 1.48 to 2 significant figures) OR should I write it as 19±1. So in short, should the error have same number of significant figures as the mean value or should it have the same number of decimal places as...
View full post »
Thread 'A cylinder connected to a hanging mass'

Thread 'A cylinder connected to a hanging mass'

Let's declare that for the cylinder, mass = M = 10 kg Radius = R = 4 m For the wall and the floor, Friction coeff = ##\mu## = 0.5 For the hanging mass, mass = m = 11 kg First, we divide the force according to their respective plane (x and y thing, correct me if I'm wrong) and according to which, cylinder or the hanging mass, they're working on. Force on the hanging mass $$mg - T = ma$$ Force(Cylinder) on y $$N_f + f_w - Mg = 0$$ Force(Cylinder) on x $$T + f_f - N_w = Ma$$ There's also...
View full post »

Similar threads

Centripetal Force / circular motion question
Replies
7
Views
3K
Need help with a centripetal force question
Replies
4
Views
1K
Circular Motion Question searching for Centripetal force
Replies
1
Views
1K
Need help explaining this Centripetal force problem
Replies
5
Views
2K
Why is the force of the spring equal to the centripetal force?
Replies
8
Views
4K
Centripetal motion, the tension at the bottom of a circle
Replies
7
Views
4K
Work Check - Centripetal force - Finding Tension in a Rope
Replies
8
Views
2K
Three conceptual questions on centripetal acceleration in a cone
Replies
5
Views
2K
Tension and Centripetal Force in Circular Motion
Replies
2
Views
2K
Centripetal Lab- finding the mass from the slope
Replies
1
Views
3K

Hot Threads

Recent Insights

Back
Top