Starting a new Lecture Notes Series on Calculus - Application of Differentiation
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Calculus - Application of Differentiation
By Lecture Notes together!
Lecture 1: Max/Min Values: Introduction
Lecture 2: Max/Min Values: Example 1
Lecture 3: Max/Min Values: Ex. 2 f(x)=x^2-5x+6
Lecture 4: Max/Min Values: Ex. 3 f(x)=x^3+3x^2-9x+1
Lecture 5: Max/Min Values: Ex. 4 f(x)=3x^4-4x^3
Lecture 6: Max/Min Values: Ex. 5 f(x)=x/(x^2+2)
Lecture 7: Max/Min Values: Ex. 6 f(x)=cos^2(x)
Lecture 9: Max/Min Values: Ex. 8 f(x)=xe^(-x), [0,2]
Lecture 10: Fermat's Theorem Explained
Lecture 11: Roll's Theorem Explained
Lecture 12: The Mean Value Theorem Explained
Lecture 13: Mean Value Theorem Ex. 1 f(x)=x^2-x-2, [0, 2]
Lecture 14: Mean Value Th. Ex. 2 f(x)=3x^2+2x+ 5, [-1, 1]
Lecture 15: Show There Is Only 1 Root f(x)=x^5+6x-1
Lecture 16: How to Graph Using 1st & 2nd Derivatives
Lecture 17: Graph f(x)=x^4-4x^3 Using 1st & 2nd Derivatives
Lecture 18: Graph f(x)=2x^3-3x^2-12x Using Derivatives
Lecture 19: L'Hospital's Rule Explained: Part 1
Lecture 20: L'Hospital's Rule Explained: Part 2
Lecture 21: L'Hospital's Rule Example 1
Lecture 22: L'Hospital's Rule Example 2
Lecture 23: L'Hospital's Rule Example 3
Lecture 24: L'Hospital's Rule Example 4
Lecture 25: L'Hospital's Rule Example 5