Difference between revisions of "Channel 4√4"
Jump to navigation
Jump to search
(4√4=8 for me!) |
|||
(5 intermediate revisions by 3 users not shown) | |||
Line 1: | Line 1: | ||
{{DISPLAYTITLE:Channel <sup>4</sup>√4}} | |||
{{group infobox | {{group infobox | ||
|name=Channel | |name=Channel <sup>4</sup>√4 | ||
|image=[[File:Channel 4.png|225px]] | |image=[[File:Channel 4.png|225px]] | ||
|image text=The Channel | |image text=The Channel <sup>4</sup>√4 van next to the Channel √2 van. | ||
|location=Probably [[Los Angeles]] | |location=Probably [[Los Angeles]] | ||
|first appear={{e|6ACV11}} | |first appear={{e|6ACV11}} | ||
}} | }} | ||
{{confused|Channel 4}} | |||
'''Channel | '''Channel <sup>4</sup>√4''' is a fictional [[Earth|Earthican]] [[Television|TV]] station, and likely a parody of [[Channel √2]]. A van with its logo appeared in a [[3010]] episode of ''[[The Scary Door]]'' {{et|6ACV11}}. | ||
== Additional Info == | == Additional Info == | ||
=== Trivia === | === Trivia === | ||
*The fourth root of four is | *The fourth root of four is approximately 1.41421356, so Channel <sup>4</sup>√4 could be called '''Channel 1.41421356'''. | ||
*Channel <sup>4</sup>√4 being a parody of Channel √2 is likely considering <sup>4</sup>√4 and √2 are equal numbers. | |||
=== Appearances === | === Appearances === | ||
*{{e|6ACV11}} | *{{e|6ACV11}} {{cameo}} | ||
[[Category:Television]] | [[Category:Organizations]] | ||
[[Category:Television channels]] | |||
[[Category:The Scary Door]] | [[Category:The Scary Door]] |
Latest revision as of 05:48, 26 November 2014
Channel 4√4 | |
---|---|
Location | Probably Los Angeles |
First appearance | "Lrrreconcilable Ndndifferences" (6ACV11) |
- Not to be confused with Channel 4.
Channel 4√4 is a fictional Earthican TV station, and likely a parody of Channel √2. A van with its logo appeared in a 3010 episode of The Scary Door (6ACV11).
Additional Info
Trivia
- The fourth root of four is approximately 1.41421356, so Channel 4√4 could be called Channel 1.41421356.
- Channel 4√4 being a parody of Channel √2 is likely considering 4√4 and √2 are equal numbers.