Encyclopedia > Thomas Babington Macaulay

  Article Content

Thomas Macaulay

Redirected from Thomas Babington Macaulay

Thomas Babington Macaulay (or Thomas Babbington Macaulay) (October 25, 1800 - December 28, 1859) was a nineteenth century English poet and politician.

His middle name is spelt "Babington" in History of England and "Babbington" in the Lays of Ancient Rome.

His works include:

  • Lays of Ancient Rome[?]; available from Project Gutenberg; [1] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=847)
  • The History of England from the Accession of James II[?]; available in five volumes from Project Gutenberg; [2] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=1468), [3] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2439), [4] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2612), [5] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2613), [6] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2614)
  • Critical and Historical Essays, edited by Alexander James Grieve[?]; available in two volumes from Project Gutenberg; [7] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2332), [8] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2333)
  • The Miscellaneous Writings and Speeches of Lord Macaulay, available in four volumes from Project Gutenberg; [9] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2167), [10] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2168), [11] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2169), [12] (http://digital.library.upenn.edu/webbin/gutbook/lookup?num=2170)
  • Machiavelli; online at bartleby.com; [13] (http://www.bartleby.com/27/24)

External links:



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Quadratic formula

... that the parabola described by the quadratic equation touches the x-axis in a single point.) If the discriminant is positive, then there are two different solutions x, ...

 
 
 
This page was created in 32 ms