In this video, I explained the concept of Mean Value Theorem using a Polynomial. The instantaneous rate of change at 'c' is equal to the average rate of change.
Пікірлер: 18
@anonymous-ui7il Жыл бұрын
I have learnt my entire university module through you. Your passion for mathematics/calculus is infectious. Thank you so much
@PrimeNewtons Жыл бұрын
Thank you for this comment. It's encouraging. Never Stop Learning.
@Sarah._.s889Ай бұрын
If you could only be our calculus 1 lecturer, then we will give you distinction. Thank you for the videos they are really helpful 🙏❤️
@risanarehma4789 Жыл бұрын
Thank you sooo much. Your explanations are spot on. Keep up the great work. ❤
@surendrakverma5553 ай бұрын
Very good. Thanks 🙏
@LenchoGebisa-yv6fd26 күн бұрын
Very good
@ArdaBatinTank2 жыл бұрын
thank you a lot, it is a great video. greetings from Turkey!
@PrimeNewtons2 жыл бұрын
Thank you.
@davidbrisbane72063 күн бұрын
The MVT, or as some of like to call it, _The really mean value theorem_
@user-qv9jt9md8o Жыл бұрын
Sir please can you use the mean value theorem if the theorem does not holds
@PrimeNewtons Жыл бұрын
No! You can only use it if the conditions are met.
@naturalsustainable61166 ай бұрын
How do we apply this mean value theorem?
@awrRoman255 ай бұрын
This mean value theorem (Lagrange's mean value theorem) is used to prove Cauchy's mean value theorem, which is used to prove L'Hopital rule.
@user-qv9jt9md8o Жыл бұрын
i mean if the rolls theorem does not holds
@EE-Spectrum3 жыл бұрын
Is it possible that the two points could be so close that there's no point (c) between them with the same gradient of the line joining the points? I am not certain that there should always be such a point (c).
@PrimeNewtons3 жыл бұрын
As long b is not equal to a , there will always be a c between. You might think the points are close but when you zoom in , there are infinitely many points between two boundary points. As long as the function is continuous and differentiable over the interval.
@EE-Spectrum3 жыл бұрын
I now understand that once there's a difference between "b" and "a", no matter how small, there will always be a "c" between them.