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Mylo, Nic Fanciulli, Steve Lawler, Danny Howells........... come and get it! (pg. 2)
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| montie |
awsome awsome
thanks man |
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| lex400sc |
| oh man, i wanna go to coachella soooo bad... dm, tool, mylo, infusion... gahhhh! |
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| ivanbee |
| good lookin' out d00d |
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| ivanbee |
| quote: | Originally posted by dj_bas
First track in the Mylo set sounds like the Futurama theme song :haha: |
i still owe u a shirt |
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| Protege |
| With the exception of the first song, the Mylo set is the same from back in August on Lamacq Live. I wish there was some new stuff from him out there. |
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| |Thrax| |
| quote: | Originally posted by fahrenheights
tell me somethin i don' know ;) |
umm i don't know you. ;)
how about....
The Snooker Table of Doom
A 'snooker' table (measuring 8 metres by 4m) with 4 'pockets' (measuring 0.5m and placed at diagonal slants in all 4 corners) contains 10 balls (each with a diameter of 0.25m) placed at the following coords:
2m,1m...(white ball)
...and red balls...
1m,5m... 2m,5m... 3m,5m
1m,6m... 2m,6m... 3m,6m
1m,7m... 2m,7m... 3m,7m
The white ball is then shot at a particular angle from 0 to 360 degrees (0 being north, and going clockwise).
Just to make it clear, a ball is 'potted' if at least half of the ball is in area of the 'pocket'
Assuming the balls travel indefinitely (i.e. no loss of energy via friction, air resistance or collisions), answer the following:
a: What exact angle/s should you choose to ensure that all the balls are potted the quickest?
b: What is the minimum amount of contacts the balls can make with each other before they are all knocked in?
c: Same as b, except that each ball - just before it is knocked in - must not have hit the white ball on its previous contact (must be a red instead of course).
d: What proportion of angles will leave the white ball the last on the table to be potted?
:) |
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| gypsygirl |
:haha:
chris you have way too much time on your hands! |
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| lex400sc |
| quote: | Originally posted by Protege
With the exception of the first song, the Mylo set is the same from back in August on Lamacq Live. I wish there was some new stuff from him out there. |
what's the second track on the mylo set? i've heard it at the club a bunch of times, most recently at tenaglia. it's sick... |
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| fahrenheights |
| quote: | Originally posted by |Thrax|
umm i don't know you. ;)
how about....
The Snooker Table of Doom
A 'snooker' table (measuring 8 metres by 4m) with 4 'pockets' (measuring 0.5m and placed at diagonal slants in all 4 corners) contains 10 balls (each with a diameter of 0.25m) placed at the following coords:
2m,1m...(white ball)
...and red balls...
1m,5m... 2m,5m... 3m,5m
1m,6m... 2m,6m... 3m,6m
1m,7m... 2m,7m... 3m,7m
The white ball is then shot at a particular angle from 0 to 360 degrees (0 being north, and going clockwise).
Just to make it clear, a ball is 'potted' if at least half of the ball is in area of the 'pocket'
Assuming the balls travel indefinitely (i.e. no loss of energy via friction, air resistance or collisions), answer the following:
a: What exact angle/s should you choose to ensure that all the balls are potted the quickest?
b: What is the minimum amount of contacts the balls can make with each other before they are all knocked in?
c: Same as b, except that each ball - just before it is knocked in - must not have hit the white ball on its previous contact (must be a red instead of course).
d: What proportion of angles will leave the white ball the last on the table to be potted?
:) |
wtf!?
:eyespop:
you're still not telling me anything, now your asking me somethin |
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| |Thrax| |
i
am
bored.
I wish I could crank this lawler @ work. |
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| HotDogWater |
| quote: | Originally posted by |Thrax|
umm i don't know you. ;)
how about....
The Snooker Table of Doom
A 'snooker' table (measuring 8 metres by 4m) with 4 'pockets' (measuring 0.5m and placed at diagonal slants in all 4 corners) contains 10 balls (each with a diameter of 0.25m) placed at the following coords:
2m,1m...(white ball)
...and red balls...
1m,5m... 2m,5m... 3m,5m
1m,6m... 2m,6m... 3m,6m
1m,7m... 2m,7m... 3m,7m
The white ball is then shot at a particular angle from 0 to 360 degrees (0 being north, and going clockwise).
Just to make it clear, a ball is 'potted' if at least half of the ball is in area of the 'pocket'
Assuming the balls travel indefinitely (i.e. no loss of energy via friction, air resistance or collisions), answer the following:
a: What exact angle/s should you choose to ensure that all the balls are potted the quickest?
b: What is the minimum amount of contacts the balls can make with each other before they are all knocked in?
c: Same as b, except that each ball - just before it is knocked in - must not have hit the white ball on its previous contact (must be a red instead of course).
d: What proportion of angles will leave the white ball the last on the table to be potted?
:) |
a: 64.2382742342384 degrees
b: approaches approximately 47 times
c: nearly double the amount
d: 42.2378950382739 degrees from the horizontal. |
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