Massachusetts Institute of Technology
Sign in

Derivatives of ln y and sin ^-1 (y)

Calculus is about change. One function tells how quickly another function is changing. Professor Strang shows how calculus applies to ordinary life situations.

Comments (0)

It looks like no one has posted a comment yet. You can be the first!

You need to log in, in order to post comments.

Highlights of Calculus

Highlights of Calculus

Category: Education | Updated almost 7 years ago

Created
September 28, 2010 11:08
Category
Tags
License
Creative Commons Attribution-NonCommercial-ShareAlike (What is this?)
Additional Files


Viewed
12149 times

More from Highlights of Calculus

Power Series/Euler's Great Formula

Power Series/Euler's Great Formula

Added 7 years ago | 00:30:49 | 17650 views |

Differential Equations of Growth

Differential Equations of Growth

Added 7 years ago | 00:34:20 | 9921 views |

Limits and Continuous Functions

Limits and Continuous Functions

Added 7 years ago | 00:36:26 | 11308 views |

Derivative of sin x and cos x

Derivative of sin x and cos x

Added 7 years ago | 00:34:38 | 10472 views |

Big Picture: Derivatives

Big Picture: Derivatives

Added over 7 years ago | 00:30:04 | 7459 views |

Chains f(g(x)) and the Chain Rule

Chains f(g(x)) and the Chain Rule

Added 7 years ago | 00:35:20 | 12526 views |