- Colin Maclaurin - Wikipedia
Independently from Euler and using the same methods, Maclaurin discovered the Euler–Maclaurin formula He used it to sum powers of arithmetic progressions, derive Stirling's formula, and to derive the Newton–Cotes numerical integration formulas which includes Simpson's rule as a special case
- Colin Maclaurin | Scottish Mathematician Physicist | Britannica
Colin Maclaurin (born February 1698, Kilmodan, Argyllshire, Scotland—died June 14, 1746, Edinburgh) was a Scottish mathematician who developed and extended Sir Isaac Newton ’s work in calculus, geometry, and gravitation
- 5. 3: Taylor and Maclaurin Series - Mathematics LibreTexts
We now show how to find Maclaurin polynomials for \ (e^x, \sin x,\) and \ (\cos x\) As stated above, Maclaurin polynomials are Taylor polynomials centered at zero
- Colin Maclaurin - 1746) - Biography - MacTutor History of Mathematics
Colin Maclaurin was a Scottish mathematician who published the first systematic exposition of Newton's methods, written as a reply to Berkeley's attack on the calculus for its lack of rigorous foundations
- Maclaurin Series
Revision notes on Maclaurin Series for the Edexcel A Level Further Maths syllabus, written by the Further Maths experts at Save My Exams
- Learn the Formula of Maclaurin Series - Cuemath
The Maclaurin series formula is a special case of the Taylor series formula It is obtained by substituting a = 0 in the Taylor series formula
|