September 4, 20XX

As Mario and Sonic joined forces to combat the growing threat of King Bowser and Dr. Eggman, they found themselves facing a formidable alliance of criminal organizations led by Koopas, Goombas, and other dark carnivorous creatures. These sinister groups were well-organized and posed a significant challenge to our heroes.

The battles between Mario and Bowser were intense, with fiery attacks lighting up the battlefield. Mario's signature move, the Fireball, was met with Bowser's fierce fire breath, creating a spectacular clash of flames that threatened to engulf everything around them. The ground shook as the two powerful adversaries clashed, each determined to prove their dominance.

Young Mario and Sonic have teamed up against early forces of King Bowser and Dr Eggman.

Amidst the chaos and fiery showdowns, Mario and Sonic knew that teamwork was their key to success. They combined their unique abilities, with Sonic using his speed to create openings for Mario's devastating fire attacks. The dynamic duo was determined to put an end to the reign of terrors brought about by King Bowser and Dr. Eggman's alliance of villains, even if it meant facing even more formidable challenges ahead.


Math Notes: (filled with academic musings)

● The building is 80 meter tall

● The pumpkin will be used as an example of throwing something that smacks out the big, huge, and tall building.

○ 80 is the time equals zero. Pumpkin has not dropped yet.

● The pumpkin just hit the ground in four seconds at the 80-meter building.

· Problem 1:

o Equation 1:

· X = 0.001/0.001

o Solve the Problem:

· X = 0.001/0.001

· X = 100

o Equation 2:

· X = 0.0001/0.0001

o Solve the problem:

· X = 0.0001/0.0001

· X = 1000

· Asymptotes

o continually approaches a given curve but does not meet any finite distance.

o A value that you get closer, and closer.

o A horizontal, vertical, or slanted line that approaches a graph but never touches.

· 4 Basic rules of Asymptotes

o Function of y = f(x)

· Horizontal Asymptotes y = k where x→∞ or x→-∞

· Vertical Asymptotes x = k where y→∞ or y→-∞

· Slant Asymptotes form y = mx + b where m ≠ o.