Stopping a Muon: Solving the Equations

  • Thread starter Thread starter lauriecherie
  • Start date Start date
  • Tags Tags
    Muon
AI Thread Summary
A muon with an initial speed of 4.20 x 10^6 m/s is decelerated at 1.10 x 10^14 m/s², prompting a discussion on how to calculate the distance it travels before stopping. Participants clarify the correct kinematic equations to use, emphasizing the importance of correctly applying signs for acceleration and velocity. Miscalculations are identified, particularly in squaring the initial velocity and maintaining the negative sign for acceleration. After corrections, the final distance calculation is confirmed to be approximately +0.0802 m. The conversation highlights the significance of careful equation application in physics problems.
lauriecherie
Messages
44
Reaction score
0

Homework Statement



A muon (an elementary particle) enters a region with a speed of 4.20 106 m/s and then is slowed at the rate of 1.10 1014 m/s2.
(a) How far does the muon take to stop?
________ m


Homework Equations



x(t)= initial position + final velocity * time

v(t)= (acceleration * time) + initial velocity

x(t)= .5 * (acceleration * (time^2)) + (initial velocity * time) + inital position

x= initial position * (average velocity * time)

average velocity= (final velocity - initial velocity) / (2)

(final velocity^2) - (initial velocity^2) = 2 * acceleration * change in position




The Attempt at a Solution



I came out with this as my seconds, t, .00000003818181818. Is this correct for the t value and where should I put this in at?
 
Physics news on Phys.org
Your time looks to be about correct. You can substitute it into your equation number three.

Alternatively, you can solve this one without time with another one of the equations you mentioned =)
 
Some of the equations you typed are wrong. Acceleration and initial velocity are given. What is the final velocity of the particle (hint: read the problem)? Which kinematical equation should be used to calculate the distance traveled when acceleration and the velocities are known?
 
By using the last equation I listed, I came out with -1.90909091 x 10^-8. This doesn't seem correct? Is this value correct and should it be a positive number?
 
Umm, no that is not correct. Perhaps you substituted something in wrong?

As far as signs are concerned remember acceleration opposes the velocity, so its sign is negative.
 
Hummm... this is what I did:

0^2 - (4.20 x 10^6)^2 = 2 * (-1.1 x 10^14)* change in X

{4200000/((-1.4 x 10^14) * 2)}

Change in X = -1.90909091 x 10^ -8.

Maybe I entered it into my calculator incorrectly?
 
Looks like you forgot to square the initial velocity. You have the ^2 written in your first step, but you drop it in the 2nd. Also, you dropped the - sign from steps 1 to 2.

Looks like those are your problems,
Cheers!
 
Let's try this again...


-.0801818182?
 
Again, you forgot the sign, but yes.
 
  • #10
+.0801818182 m Thanks so much for your help!
 

Similar threads

How does relativity affect the detection of atmospheric muons?
Replies
11
Views
2K
Solving for Work Done When Accelerating a Mass
Replies
3
Views
786
Will The Cars Stop In Time? - Check My Work Please :)
Replies
13
Views
1K
Truck accelerating down a ramp
Replies
10
Views
1K
Solve Angular Velocity & Acceleration - Dimensional Analysis
Replies
3
Views
2K
Block on a Spring, Nonconstant Net Force
Replies
6
Views
2K
Relating acceleration to distance and time
Replies
5
Views
3K
A little annoying doubt -- Initial vertical speed of a jumping flea
Replies
5
Views
753
Using Momentum Principle to Find Ratio of Speeds?
Replies
4
Views
1K
Why do I keep getting friction coefficient as a negative?
Replies
17
Views
3K

Hot Threads

Recent Insights

Back
Top