Calculus Midoriさんのイラストまとめ

>Specific values asides from the zeros and y-intercept won't matter. You could draw your curves as loooong as you want just as how Sara can leave Nao on her very strange weight loss program as looong as she wants.
>I think that's all for now.

>A negative times a positive times a negative is a positive. The much very useless conclusion we've come to: the graph as x approaches negative infinity will be positive infinity.
>Now, we have all the information to draw ourselves a relatively accurate sketch.

>It's needless to try it out for negative infinity since the end behaviors are going to end up the same, but playing with negatives is a little bit more tricky.
>(-∞)(-∞)^2(-∞)^3...
>(-∞)^2 gives us ∞^2, (-∞)^3 gives us -∞^3
>(-∞)(∞^2)((-∞^3)

>For me, it was some silly typo, for someone else, it may be the guilty conscience of murder.
>Diversity is treasured!

>We live with our mistakes, as crosses on our backs.
>They're there both physically and in thought, haunting us in both our sleeping and waking hours.
>That's being human. That, is being alive.
>And it varies from person to person.

>That was a mouthful... and I still need to finish it.
>I also made a grave typo of not putting PART 3 at the very beginning... so I can't really fix that unless I redo the entire thread.
>Is it worth it? Of course it isn't!

>(∞)(∞)^2(∞)^3...
>When determining end behaviors, we just need to see the signs, for now, at least. Positive infinity times positive infinity times positive infinity is.... positive infinity! That means the graph as x approaches positive infinity will be, positive infinity!

>(∞+3)(∞-2)^2(∞+1)^3...
>A constant added to infinity is negligible, we just need to pay attention to the powers and how the infinity interacts. I mean, adding 1 to ∞ isn't a deal, right? Maybe for Shin, adding 1% to anything is something, but not in this example it isn't.

>I'm not joking. Do I look like I'm joking. This is serious.
>To find the end behavior as x approaches positive infinity, we plug in positive infinity. To find the end behavior as x approaches negative infinity, we plug in negative infinity.

>As much as I'd love to play Eeny, meeny, miny, moe, we're going to have to determine end behaviors to figure which one's the real Sou, and which one's the fake!
>To do that, we have to simply plug in...
>Infinity.