AM-GM (arithmetic mean -- geometric mean inequality) is easy to prove if you know this "precursor" theorem, which is an interesting theorem in its own right.
If we looks at the geometrical approach, the minimum value of x+1/x is 2 (considering first quandrant) which also sits with the relationship between AM and GM... Very good video 👏🏼
Would this not be the underlying essence of calculus, related via the mean value theorem? Proably I simply am thinking along the wrong lines, but worth asking.
![The most beautiful equation in math, explained visually [Euler’s Formula]](/img/n.gif)
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If we looks at the geometrical approach, the minimum value of x+1/x is 2 (considering first quandrant) which also sits with the relationship between AM and GM... Very good video 👏🏼
Thank you. You're idea is right, and it shows that there are so many fascinating facets and points of view to these mathematical topics.
Estupenda la explicación precioso teorema
Gracias!
Nice video
Thank you!
Would this not be the underlying essence of calculus, related via the mean value theorem? Proably I simply am thinking along the wrong lines, but worth asking.
In a sense, analysis can be imagined as flowing from the distinction between < (less than) and