00.464
----- Original Message -----
From: "Kall, Mogens" <mogenskall@ikke.til.raadighed.dk>
Newsgroups:
News:se.vetenskap.astronomi
Sent: Thursday, March 27, 2003, CET 10:11, GMT 09:11
Subject: Re: Open letter to Dr. David P. Anderson, Project Director - suggest (0371)
0464 news:LoKga.1187$mI2.227902@news000.worldonline.dk
http://groups.google.com/group/se.vetenskap.astronomi/msg/bf6f8e4f9b8a3c99
______________________ the message _________________________________________________
Update 3:
1 bit/day = 5104 days = 13,97 years
1 bit/week = 35728 days = 97,82 years
This will take too long time!
Bit-compression:
-----------------
Suggest
bit 1 = + 001 minute (0h01m00s)
bit 2 = + 002 minute (0h02m00s)
bit 3 = + 004 minute (0h04m00s)
bit 4 = + 008 minute (0h08m00s)
bit 5 = + 016 minute (0h16m00s)
bit 6 = + 032 minute (0h32m00s)
bit 7 = + 064 minute (1h04m00s)
bit 8 = + 128 minute (2h08m00s)
The result wil then be:
1 byte/day = 638 days = 1,75 years
1 byte/week = 4466 days = 13,97 years
2 years !!! - That's fine - very good !!!
-
By this we will get (which also will help to understand the code):
Input "The Song of the Bride", (5104 bits)
(an time-example):
y=year
d=day
h=hour
m=minute
s=second
START:
Time=0000y000d00h00m00s000 - 0001 inpulse - 0
Time=0000y000d00h00m10s000 - 0002 inpulse - 1
Time=0000y000d00h00m31s416 - 0003 inpulse - Phi (22/7)
Byte 001 (out of 638 bytes)
10000000 = 1 (out of 256 possible, 0-255)
Time=0000y001d00h01m00s000 - 0004 inpulse - 0
Time=0000y001d00h01m10s000 - 0005 inpulse - 1
Time=0000y001d00h01m31s416 - 0006 inpulse - Phi (22/7)
Byte 002
01000000 = 2
Time=0000y002d00h02m00s000 - 0000 inpulse - 0
Time=0000y002d00h02m10s000 - 0000 inpulse - 1
Time=0000y002d00h02m31s416 - 0000 inpulse - Phi (22/7)
Byte 003
11000000 = 3
Time=0000y003d00h03m00s000 - 0000 inpulse - 0
Time=0000y003d00h03m10s000 - 0000 inpulse - 1
Time=0000y003d00h03m31s416 - 0000 inpulse - Phi (22/7)
Byte 004
00100000 = 4
Time=0000y004d00h04m00s000 - 0000 inpulse - 0
Time=0000y004d00h04m10s000 - 0000 inpulse - 1
Time=0000y004d00h04m31s416 - 0000 inpulse - Phi (22/7)
Byte 005
10100000 = 5
Time=0000y005d00h05m00s000 - 0000 inpulse - 0
Time=0000y005d00h05m10s000 - 0000 inpulse - 1
Time=0000y005d00h05m31s416 - 0000 inpulse - Phi (22/7)
Byte 006
01100000 = 6
Time=0000y006d00h06m00s000 - 0000 inpulse - 0
Time=0000y006d00h06m10s000 - 0000 inpulse - 1
Time=0000y006d00h06m31s416 - 0000 inpulse - Phi (22/7)
Byte 007
11100000 = 7
Time=0000y007d00h07m00s000 - 0000 inpulse - 0
Time=0000y007d00h07m10s000 - 0000 inpulse - 1
Time=0000y007d00h07m31s416 - 0000 inpulse - Phi (22/7)
Byte 008
00000000 = 0
Time=0000y008d00h00m00s000 - 0000 inpulse - 0
Time=0000y008d00h00m10s000 - 0000 inpulse - 1
Time=0000y008d00h00m31s416 - 0000 inpulse - Phi (22/7)
(on this position they will be enable to understand the byte-syntax)
Byte 009
00000000 = 0
Time=0000y009d00h00m00s000 - 0000 inpulse - 0
Time=0000y009d00h00m10s000 - 0000 inpulse - 1
Time=0000y009d00h00m31s416 - 0000 inpulse - Phi (22/7)
Byte 010
10000000 = 1
Time=0000y010d00h01m00s000 - 0000 inpulse - 0
Time=0000y010d00h01m10s000 - 0000 inpulse - 1
Time=0000y010d00h01m31s416 - 0000 inpulse - Phi (22/7)
Byte 011
01100000 = 6
Time=0000y011d00h06m00s000 - 0000 inpulse - 0
Time=0000y011d00h06m10s000 - 0000 inpulse - 1
Time=0000y011d00h06m31s416 - 0000 inpulse - Phi (22/7)
Byte 012
11100000 = 7
Time=0000y012d00h07m00s000 - 0000 inpulse - 0
Time=0000y012d00h07m10s000 - 0000 inpulse - 1
Time=0000y012d00h07m31s416 - 0000 inpulse - Phi (22/7)
Byte 013
00010000 = 8
Time=0000y013d00h08m00s000 - 0000 inpulse - 0
Time=0000y013d00h08m10s000 - 0000 inpulse - 1
Time=0000y013d00h08m31s416 - 0000 inpulse - Phi (22/7)
Byte 014
11110000 = 15
Time=0000y014d00h15m00s000 - 0000 inpulse - 0
Time=0000y014d00h15m10s000 - 0000 inpulse - 1
Time=0000y014d00h15m31s416 - 0000 inpulse - Phi (22/7)
Byte 015
00001000 = 16
Time=0000y015d00h16m00s000 - 0000 inpulse - 0
Time=0000y015d00h16m10s000 - 0000 inpulse - 1
Time=0000y015d00h16m31s416 - 0000 inpulse - Phi (22/7)
Byte 016
00000000 = 0
Time=0000y016d00h00m00s000 - 0000 inpulse - 0
Time=0000y016d00h00m10s000 - 0000 inpulse - 1
Time=0000y016d00h00m31s416 - 0000 inpulse - Phi (22/7)
Byte 017
10000010 = 65
Time=0000y017d01h05m00s000 - 0000 inpulse - 0
Time=0000y017d01h05m10s000 - 0000 inpulse - 1
Time=0000y017d01h05m31s416 - 0000 inpulse - Phi (22/7)
Byte 018
01100010 = 70
Time=0000y018d01h10m00s000 - 0000 inpulse - 0
Time=0000y018d01h10m10s000 - 0000 inpulse - 1
Time=0000y018d01h10m31s416 - 0000 inpulse - Phi (22/7)
Byte 019
11100010 = 71
Time=0000y019d01h11m00s000 - 0000 inpulse - 0
Time=0000y019d01h11m10s000 - 0000 inpulse - 1
Time=0000y019d01h11m31s416 - 0000 inpulse - Phi (22/7)
Byte 020
00010010 = 72
Time=0000y020d01h12m00s000 - 0000 inpulse - 0
Time=0000y020d01h12m10s000 - 0000 inpulse - 1
Time=0000y020d01h12m31s416 - 0000 inpulse - Phi (22/7)
Byte 021
11110010 = 79
Time=0000y021d01h19m00s000 - 0000 inpulse - 0
Time=0000y021d01h19m10s000 - 0000 inpulse - 1
Time=0000y021d01h19m31s416 - 0000 inpulse - Phi (22/7)
Byte 022
00001010 = 80
Time=0000y022d01h20m00s000 - 0000 inpulse - 0
Time=0000y022d01h20m10s000 - 0000 inpulse - 1
Time=0000y022d01h20m31s416 - 0000 inpulse - Phi (22/7)
Byte 023
00000000 = 0
Time=0000y023d00h00m00s000 - 0000 inpulse - 0
Time=0000y023d00h00m10s000 - 0000 inpulse - 1
Time=0000y023d00h00m31s416 - 0000 inpulse - Phi (22/7)
und-so-weither.
Some of the bytes in "The Song of the Bride", (5104 bits) can be cut-off.
The Practical way:
------------------
To send out such a message can be done possible by using a parabolic
reflector (in space), when it is turns around (circumvolve) the Galactic
Northpol. Message will then be send to all "members" on the Galactic
Latitude 2 (perhaps5)°N to 2 (perhaps 5)°S.
Each circumvolve-frekvency must be lower than (an example:) 24hour minus
bit=255 (2h08s) minus Phi (31s416) = 21h51m.
Start position can be Galactic Langitude 180° (low "members")
Stop position will then be Gal.Lang. 179,999° or 180,001°
Wait-time (synkroniserüng 0-2h09m).
"Customers" around Gal.latitude 180° will get a dobble-signal
(1,1,2,2,3,3,4,4 ...), but they will soon find out the answer to this
problem.
If we have more than óne parabolic reflector (in space), we can use one to
the area around Galactic Latitude +2 to -2, another +4 to +2 and-so-on. This
will also give some "customers" (around +1,9 to +2,1) dobble-signal.
The 3-impulse (position 0,1 and Phi) can be done practical possible by
using 3 stationary radio-transmitters inside the reflector (maybe we have to
chance the time a little, 31s416).
-
Wish You all good hunting!
Interrupt H-2304 over-and-out.
Regards,
Mogens Kall
The servant of Michael
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Re: Open letter to Dr. David P. Anderson, Project Director - suggest (0371)
0464
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alt.astronomy ....................... file 0456
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de.sci.astronomie ................. file 0458
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it.scienza.astronomia.seti ....... file 0460
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Time for OUTPUT:
2003-03-27, Thursday, CET 10:11