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Definition of Suffix notation
1. Noun. A parenthesis-free notation for forming mathematical expressions in which each operator follows its operands.
Generic synonyms: Parenthesis-free Notation
Lexicographical Neighbors of Suffix Notation
Literary usage of Suffix notation
Below you will find example usage of this term as found in modern and/or classical literature:
1. Examples of the Processes of the Differential and Integral Calculus by Duncan Farquharson Gregory, William Walton (1846)
"it appears to be abandoned as an exclusive system by those who introduced it :
but as the use of the suffix notation for integrals has been sanctioned by ..."
2. Examples of the Processes of the Differential and Integral Calculus by Duncan Farquharson Gregory, William Walton (1846)
"it appears to be abandoned as an exclusive system by those who introduced it :
but as the use of the suffix notation for integrals has been sanctioned by ..."
3. A History of the Theory of Elasticity and of the Strength of Materials: From by Isaac Todhunter (1886)
"... are not very suggestive, Lame's has obvious advantages, but for a single-suffix
notation is inferior to Kirchhoff's. Klein and Beer do not much improve ..."
4. An Introduction to Determinants, with Numerous Examples, for the Use of by William Thomson (1882)
"In this notation a determinant of the nth order would be represented thus, an'l
an-2 • • • an"n = 2 ± Several varieties of the double suffix notation are in ..."
5. The Control of Water as Applied to Irrigation, Power and Town Water Supply by Philip à Morley Parker (1913)
"NOTATION The various cross-sections of the path of the water through the turbine
are defined by a suffix notation (see p. 879). Suffix o, refers to entry ..."
6. Proceedings of the London Mathematical Society by London Mathematical Society (1894)
"The points thus proceeding from a given point I' may be conveniently denoted by
a suffix notation ..."
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