Max Acceleration for Car w/o Cup Sliding: 2.35 m/s^2

AI Thread Summary
The discussion focuses on calculating the maximum acceleration of a car without causing a coffee cup to slide, given a static friction coefficient of 0.24. The formula used is Fs = (ms)(N), where N represents the normal force. The user correctly calculates the maximum acceleration as 2.35 m/s^2 by multiplying the friction coefficient by the acceleration due to gravity. There is a mention of needing the mass of the cup for a complete understanding, but the calculation is confirmed to be correct without it. The conversation emphasizes the importance of understanding the normal force in friction calculations.
dg_5021
Messages
80
Reaction score
0
Problem-
If the coefficient of static friction between the coffee cup and the roof of the car is 0.24, What is the maximum acceleration the car can have without causing the cup to slide? Ignore the effects of air resistance.

Answer-
i know the formula is: Fs= (ms) (N)
i multipy 0.24 x 9.81m/s^2
and got =2.35 m/s^2

Did i do it right? Is my work correct? please help
 
Physics news on Phys.org
There is a rather important piece of information missing here! Remember what "N" is?

Don't you think a coffee cup made of lead would be less likely to slide than one made of fine china?
 
i know N= (m)(g)
but the question never gives me the kg and i know gravity =9.81m/s^2

am i suppose to find kg?
 
oh wait i got it ms= Fs/N
ms=m(ax)/m(g)
ms=ax/g
ms x g=ax
.24x 9.81 = 2.35m/s^2

thanks
 

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

Final Velocity of a car with a opposing decreasing drag force
2
Replies
57
Views
2K
Maximum Acceleration of sliding crates
Replies
6
Views
2K
Calculating the frictional forces on a sliding box on a ramp
Replies
2
Views
3K
Kinematics car braking scenario
Replies
8
Views
3K
Car Crash Analysis: Analyzing Friction & Speed
Replies
9
Views
4K
Maximum speed of car on downhill
Replies
1
Views
2K
Radial & Tangential Acceleration of a Car at Indianapolis 500 | Physics Solution
Replies
7
Views
4K
Distance an object travels after sliding and falling from roof
Replies
8
Views
3K
Can the max friction be determined in B-ii?
Replies
10
Views
1K
Car acceleration kinematics give average power
Replies
5
Views
2K

Hot Threads

Recent Insights

Back
Top