User:Cloudy176/Department of bubbly negative numberbottles/SpongeTechX's old googology

This will be my fictional number list, and how the numbers are created.

Heptacontarex
$$2^2=a1=4$$

Okay, so two times two equals four, right? Very puny number. This will be called a1.

$$a1^2=b1=8$$

Eight. Still a simple number. Let's keep going, and do the same thing we did to a1.

$$b1^2=c1=64$$

Now we are starting to get somewhere. Sixty-four still really isn't that big, let's keep going.

$$c1^2=d1=4,096$$

Wow! We're already at four thousand ninety-six! Big, number, right? no.

$$d1^2=e1=16,777,216$$

Whoa, now we are REALLY starting to get somewhere. Let's see what happens when we take e1 to the power of two. $$e1^2=f1=281,474,976,710,656$$

My gosh, that's a big number! We can keep doing this over and over again until we get all the way to z1. It's amazing to see that powering the number two only a few times can give us such a big number. You know what? Let's keep expanding.

$$f1^2=g1=79,228,162,514,264,337,593,543,950,336$$

You see that? That's 79 octillion. Let's keep going, this is fun. >:)

$$g1^2=h1=6,277,101,735,386,680,763,835,789,423,207,666,416,102,355,444,464,034,512,896$$

o_o

$$h1^2=i1=39,402,006,196,394,479,212,279,040,100,143,613,805,079,739,270,465,446,667,948,293,404,245,721,771,497,210,611,414,266,254,884,915,640,806,627,990,306,816$$

O_O

$$i1^2=j1=1,552,518,092,300,708,935,148,979,488,462,502,555,256,886,017,116,696,611,139,052,038,026,050,952,686,376,886,330,878,408,828,646,477,950,487,730,697,131,073,206,171,580,044,114,814,391,444,287,275,041,181,139,204,454,976,020,849,905,550,265,285,631,598,444,825,262,999,193,716,468,750,892,846,853,816,057,856$$

Is your brain melting yet?