thank god, an indepth proof, all the other videos I was watching were glossing over what was going on with creating the integral from the rieman sum, usually you get a definite integral and I didnt understand why we were getting an indefinite integral untill seeing the L to infinity and bounds of BOTH integrals like you have here, thank you much
At no point was Jeter's average higher than Justice's. Never. How do more at-bats change that? I could understand it if at any point Justice had a higher average (scratches head)....
NM, figured it out, you have to compare cross-season. Cross-season 96 Jeter to 95 Justice, Jeter did have a higher average and it was heavily weighted. Thanks for posting the vid.
This game is always a win for wolves with perfect play. There are ways to force setup the situations that you went through as the wolves. So there is no way as the hare to stall out the game unless the wolves make a mistake. The website you use to showcase the game doesn't have perfect AI on the wolves' side, so if you play as the hare, the wolves can make mistakes.
Hi.... Thanks for the video, of the whole that I watched it was the best in explanation. Additionally, good reference of Haberman's book, it is a concise explanation of the method of characteristics.
If the lines you can draw are infinite until the triangle is full, in the first fractal triangle, how come to draw other triangles/ polygons with definite lines and claim the Fibonacci sequence is not met. It doesn't prove your point. Will fractals prove Fibonacci sequence within them then? Depending on the sequence of fractals you can draw... and see with your naked eye.
hey girl, you dont know what you are talking about right? In your example, the right side is a group with respect to multiplication.....take a class on abstract algebra please
Thank you, as someone studying mathematics I was curious how one would go about deriving the Fourier transform and you have done an excellent job explaining this.