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Description
This programme looks at the logarithmic function and its inverse the exponential function. This leads to the ability to express all power functions in the form E(x) and simplifies many operations i...n the calculus.
Metadata describing this Open University video programme
Module code and title: MS283, An introduction to calculus
Item code: MS283; 12
First transmission date: 01-08-1979
Published: 1979
Rights Statement:
Restrictions on use:
Duration: 00:24:04
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Producer: John Jaworski
Contributors: A. Daniel Lunn; Anne Walton
Publisher: BBC Open University
Keyword(s): Computer animation; Power series
Footage description: Daniel Lunn introduces the programme. Pointing to a graph of the area function, he explains that he suspects that this is in fact a log function. He labels it as a mystery function L(x). With the aid of computer animations, Lunn looks at the graph of the function L(x) and its derivative. Anne Walton plots the graph for the inverse of L(x) by reflecting the L(x) graph along the line y = x. She labels this inverse function E(x). With the aid of a computer animation, Walton then looks at the graph of the derivative of E(x) and points out that it is the same as the graph of E(x). She writes on a board the proof that E(x) is its own derivative. Daniel Lunn looks back at the function L(x) and points out its various log-like properties. He goes on to show these properties graphically with the aid of a computer animation. Anne Walton writing on a drawing board and pointing to graphs, relates the log-like properties of L(x) to those of E(x). She points out, particularly, that E(x) is the power function of e. Daniel Lunn and Anne Walton demonstrate, with the aid of still and computer animated graphics, that all power functions are represented in the form E(x). Daniel Lunn sums up the programme.
Master spool number: 6HT/72941
Production number: 00525_4307
Videofinder number: 498
Available to public: no