do you plan on making similar videos for Leibnitz's calculus? The beauty of Newton's approach to solving the differential equations is that we only need one rule for the anti-derivative of x^n. Rest is just plug-and-chug.
The power series method of solving the differential equations usually taught in calculus; but I am taken aback by how efficiently Newton does this thing. I remember learning this method and how cumbersome it felt trying to track all the indices using the summation notation. the tableau method is so much easier to do by hand.
I need more videos of this, this series is fantastic
Are you planning to continue this series?
I sure hope so
do you plan on making similar videos for Leibnitz's calculus? The beauty of Newton's approach to solving the differential equations is that we only need one rule for the anti-derivative of x^n. Rest is just plug-and-chug.
The power series method of solving the differential equations usually taught in calculus; but I am taken aback by how efficiently Newton does this thing. I remember learning this method and how cumbersome it felt trying to track all the indices using the summation notation. the tableau method is so much easier to do by hand.
+st105900
I'll likely finish the series on Newton first, then present Leibniz. I actually haven't read his original texts, so I still have to do that.
would be a treat to watch those video on Leibniz
Good series.