How to Solve Instantaneous Rates of Change

How to use derivatives to solve problems that involve the rate of change of a function.  Why the derivative of a function can be understood as the slope of a tangent line to the graph of a function, why it can be interpreted as an instantaneous rate of change, and how derivatives can be used to solve problems that involve rates of change will be demonstrated. 

Video Length: 00:18:33


Target Audience: Calculus students

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  • Course: Calculus in Plain English
  • Description
  • This high school calculus course is presented with the same level of depth and rigor as an entry-level college or university course, offering a thorough examination of both defferential and integral calculus.


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