Ircher decided that the universe could use a number. He applied the secret power of base conversion to form the next number.
17 (in decimal) converted to octal = 21
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Day 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Among the Greek letters that existed, there were pi and tau. Now there would be zeta(2), though that being a function with a number Coug had already created as a sole argument, he couldn't directly use the function. However, he knew what the function would output:
Fun Fact: You can construct any square root of a rational length using just a compass and a straightedge. Speaking of square roots...
sqrt(15) = sqrt(15)
Last edited by Ircher on Tue Sep 01, 2020 7:57 pm, edited 1 time in total.
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Day 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
No, it would only require one compass and one straightedge. You would just have to do the process twice.
sqrt(sqrt(sqrt(15)) = sqrt(sqrt(sqrt(15)))
(Because why not?)
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Day 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
"Square roots of square roots?" Coug asked. He saw that, by simplification, the square root of the square root was the fourth root, and the square root of the square root of the square root was the eighth root. But why did the root have to be a power of two? Odd roots had the power that taking one of a negative real number gave another negative real number.
For computer scientists, log always indicates the base-2 log. That allows us to say things like binary search is O(log(N)). So yeah, log depends on context and who you are talking to.
1023 + 1 = 1024
Links: User Page | Player Ratings Hosting: Level Up 2 - Active [14/4+] Ongoing: Grand Idea UPick: Awakening. [Day 4] [Replacements Welcome!] Theorem of the Week: The Fundamental Theorem of Calculus, Part 2: The sum of all the "little changes" is equal to the net change on an interval. (In symbols, the definite integral from a to b of f'(x)dx is equal to f(b) - f(a).)
Last edited by Sirius9121 on Thu Sep 03, 2020 3:27 am, edited 1 time in total.
If you ask Rick Astley for his copy of the movie 'Up', he can not give it to you as he will never give you up. However, by refusing to do so, he lets you down. Thus creating the Astley Paradox. *glares at Sirius*Well played my friend, well played. - Aristophanes
Ah, e and pi. Hmm pi+e=pi+e (5.85987448205) 'True pie', said the Growlithe
If you ask Rick Astley for his copy of the movie 'Up', he can not give it to you as he will never give you up. However, by refusing to do so, he lets you down. Thus creating the Astley Paradox. *glares at Sirius*Well played my friend, well played. - Aristophanes
If you ask Rick Astley for his copy of the movie 'Up', he can not give it to you as he will never give you up. However, by refusing to do so, he lets you down. Thus creating the Astley Paradox. *glares at Sirius*Well played my friend, well played. - Aristophanes
If you ask Rick Astley for his copy of the movie 'Up', he can not give it to you as he will never give you up. However, by refusing to do so, he lets you down. Thus creating the Astley Paradox. *glares at Sirius*Well played my friend, well played. - Aristophanes