Announcements 11/30/11

advertisement
Announcements 11/30/11






Prayer
Henry Lorentz
Exam 3 ongoing…
Project Show & Tell. Email me by tonight (midnight). I will
pick people tomorrow and let you know who the winners
are. Reminder: +3 pts for volunteering, +6 more if selected
All late homework & extra credit papers due Fri, Dec 10.
Earlier if possible!
Office hours:
a. Today: Colton none; Chris 5-7 pm
b. Friday: Colton none; Chris 2:30-5 pm
c. Monday: Colton regular; Chris regular
d. Wed: Colton none; Chris 5-7 pm
 Find me in my lab if needed, U130
Frank &
Ernest
Space-time diagrams

Example: me slamming the book on the table

Example: me slamming the book on the table again

Example: measuring the time between book slams

Example: measuring the length of the book

“World lines” for Dr. Colton, book, & for space traveler
passing by earth
a. When/where do these events occur?
t vs. ct
Quick Writing


Back to Dr. Colton’s trip to Zyzyx: Dr. Colton travels
at 0.9 c to Zyzyx, 1 light year away. Draw, as
accurately as you can, these four world-lines:
a. The planet Earth
b. The planet Zyzyx
c. Dr Colton, as he travels to Zyzyx
d. Leaving from the Earth at the same time/place, a
light beam that travels to Zyzyx
Draw, as accurately as possible, the same four
world-lines, from Dr. Colton’s point of view.
Light cones





Present
Possible futures
Possible pasts
“Elsewhere”
Terminology: “timelike” vs “spacelike”
Example

Dr. Colton, on a fast train, turns on a
flashlight at x=0, ct=1. People on the ground
watch. Draw worldlines for Dr. Colton and
the people on the ground. Draw the light
from the flashlight. Mark the “flashlight
turned on” event.

Do this for both frames of reference.
Reading Quiz

The Lorentz transformation equations in the
book assume objects only have relative
motion in the +x or –x directions
a. True
b. False

The Lorentz transformation equations in the
book given for y and z are more complicated
than the equations for x and t.
a. True
b. False
Lorentz Transformations, derived

Not in this class! :-)

Can be done by using properties we’ve
discussed: length contraction, time dilation,
gamma factor, basic worldline transformations
The Lorentz Transformations

As regular equations:
xframe2   xframe1   (ct )frame1
(ct )frame2   xframe1   (ct )frame1

In matrix form:
x
 

 
 ct  frame 2  
  x 
 
  ct 
frame1
Differences between my equations & book’s equations
Disclaimer: I often reverse order of x and ct in matrix eqn. That’s OK.
Lorentz transformations, graphically



Lee’s program
Similarity with rotations
How to choose + vs –
Note: for HW problems, you
can use Lee’s program to
check your answers—but not to
DO your problems.
Download