@@sphakamisozondi yes, you’re right

@@SobTim-eu3xu we are glad that you liked it!

@@dibeos like I amazed by animations, and animation of drawing line, like its not straight but wobbly, I love that one

@@rewixx69420 😎😎😎😎😎

​@@dibeosseria bueno, si lo podrían traducir a español 👍🏻

@@renengan25 ¡Nuestro objetivo futuro es hacer todos estos videos en español, ya que es el segundo idioma más hablado en el mundo!

@@pandabers no, the area is the projection of g(x) under f(x) on the f-g plane

@@apolloandartemis4605 The intuition behind the RS integral relates to how the increments of the function g weight the values of f as you sum over intervals. This can be connected to u-substitution, because the change in variables modifies the integration scale, which is how the differential dg changes in the RS sum, which “re-weights” contributions at different points. Both involve adjusting the way we sum contributions to account for a variable transformation

​@@dibeosthank you so much! Love the videos by the way.

@@apolloandartemis4605 thanksssss 😎

@@randomdude8171 Yes, if g is a parameterization of a curve, the RS integral becomes a line integral. In fact, line integrals can be considered as special cases of the RS integral, where g describes the path and f represents a scalar field evaluated along the curve. So, it’s not incorrect to interpret the line integral this way. The RS integral is very flexible, and different interpretations depend on how g is chosen.

@@JOHN-ex8rb you can do it. I believe in you 😎