Difference between revisions of "AoPS Wiki:Sandbox"
Fiftykliks (talk | contribs) (→Test 7) |
(→Test 7) |
||
Line 258: | Line 258: | ||
<math>\text{Use a calculator:}</math> | <math>\text{Use a calculator:}</math> | ||
− | + | <math>\int_{-\frac{877\pi}{7e^{e^{e^e}}}}^{1492.558} \sum^{9000!}_{k=0} \left(\cfrac{k^{kx+e}-\cfrac{1}{x^e-\cfrac{k-x}{k^{1337^e}+\cfrac{1}{k-x+\pi-42}}}}{x^{122.8}+\cfrac{71^k}{k+x+\cfrac{\sqrt{\sqrt{\pi^{12000.4x}}}}{94.5^{89x}}}-k^{100}100^xx^k}+2\right)\frac{d}{dx}+10^{10^{76}}</math>! | |
silentazn's trillion dollar question | silentazn's trillion dollar question |
Revision as of 14:40, 14 June 2013
Welcome to the sandbox, a location to test your newfound wiki-editing abilities.
Please note that all contributions here may be deleted periodically and without warning.
In the computer world, a sandbox is a place to test and experiment -- essentially, it's a place to play.
This is the AoPSWiki Sandbox. Feel free to experiment here.
Warning: anything you place here is subject to deletion without notice.
[This was deleted due to its inappropriateness.]
Test 1
Hi there yall
Test 2
Test
This is what epicness looks like.
BUT JEFFCHEN WOULDN'T KNOW
Test 3
Test 4.0000000000000000000000000000000000000000000000000000000000000000000
Test 5
n1000 is editing this. yay! (Made better by AoPS)
Who loves me?
only
Test 6
NeoMathematicalKid was here. And he broke the line of asy diagrams.
$\begin{align*}\sum^4_{k=1}\left(\sum^k_{j=1}kj\right)&=\sum^4_{k=1}\left(k\sum^k_{j=1}j\right)\\ &=\sum^4_{k=1}\left(k(1+2+\cdots +k)\right)\\ &=\sum^4_{k=1}(k+2k+\cdots +k^2)\\ &=(1)+(2+4)+(3+6+9)+(4+8+12+16)\\ &=1+6+18+40\\ &=\boxed{65} \end{align*}$ (Error compiling LaTeX. Unknown error_msg) notice how the square root signs are becoming progressively less slanted... What is $\sqrt{\sqrt{\sqrt{\sqrt{\sqrt{e^{1\pi\pi\sqrtpi}}}}}}+\cfrac{1}{1+\cfrac{1}{1+\cfrac{1}{1+\cfrac{1}{1+\cfrac{1}{1+\cfrac{1}{20}}}}}}$ (Error compiling LaTeX. Unknown error_msg)?!?! I got carried away.
Test 7
!
silentazn's trillion dollar question
bobthesmartypants's answer: There is not enough space in the observable universe to write this number down, so there s no valid answer. my answer: There's not enough matter in the observable universe to store this number in memory, so you don't know the valid answer.