Not sure if anyone cares but if you guys are bored like me during the covid times you can watch pretty much all of the latest movies on Instaflixxer. Have been watching with my gf during the lockdown =)
Holy shit that was.....just pure melody. What a beautiful integration. Lovely solution too. The best part about flammable maths is that he doesn't underestimate his viewers' intelligence, yet still makes it convenient to understand. Best channel evar.
Loving the transcription error where the t^2 becomes t magically getting fixed when moving from one scene to the next with no comment. Papa Flammy, you sneaky boi.
"Don't worry, it won't be that hard to integrate this..." *Looking at time*: 12 minutes left. Papa, I thought the first 8 minutes were difficult. Stop joking like this. Kek Also, happy birthday Flammable Maths.
Damn, ABSOLUTE MADLAD 💯💯💯 The integral made me cry at first, now it's crying in the toilet. This is exactly what I subscribed for. Happy birthday Fappable Maths
@@PapaFlammy69 You cannot know that v=arctan(x/sqrt(x^2+2)), this is not a standard integral so you have to do the integral where x=sqrt(2)*tan(u) then dx=sqrt(2)*sec^2(u)*du. The answer you'll get is: (pi/2)*arctan(x/sqrt(x^2+2)) between the limits which is pi^2/12.
@@PapaFlammy69 seriously, he's tenure track and taken charge of departmental hiring, and he can't take d/dx of c^x. And I can't name and shame til I get into grad school.
