POPULARITY
7 episodes with quotient rule
4 episodes with quotient rule
2 episodes with quotient rule
10 episodes with quotient rule
10 episodes with quotient rule
The quotient rule for differentiation is proved from first principles.
Introduces how to use implicit differentiation to find dy/dx for an example where the use of the quotient rule is also required
Calculus is about change. One function tells how quickly another function is changing. Professor Strang shows how calculus applies to ordinary life situations.
This calculus course covers differentiation and integration of functions of one variable, and concludes with a brief discussion of infinite series. Calculus is fundamental to many scientific disciplines including physics, engineering, and economics.
Chapter 3.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 3.6: The Chain Rule
Chapter 3.5: Derivative Rules 2
Chapter 3.5: Derivative Rules 2
Chapter 2.6: The Chain Rule
Chapter 2.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 2.5: Derivative Rules 2
Chapter 2.6: The Chain Rule
Chapter 2.5: Derivative Rules 2
Chapter 3.6: The Chain Rule
Explore the use of product and quotient rules for derivatives
Simple political analogies are used with the intention of aiding the memory on the form of the product and quotient rules.
Further example of how to apply the Quotient rule. Recapped on the steps involved also. Practice questions at the end with solutions for students to try themselves
Introduction to the Quotient rule, outlining when and how to apply it with one example. Steps involved are outlined also.
The quotient rule is reviewed and then demonstrated for an example involving calculation of partial derivatives.
This screencast explains how differentiation requiring combinations (or multiple uses) of the product, chain and quotient rules can be made simpler by using logarithmic differentiation. This method relies on log rules to simplify a function before taking a derivative. This particular screencast shows handwritten step by step explanations. Please compare to the other screencast going through the same example but with typed explanations, and send us feedback on which explains this concept better.
Math 110 Applied Calculus for Business
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