¹ Source: wiktionary.com
Definition of Theorems
1. theorem [n] - See also: theorem
Lexicographical Neighbors of Theorems
Literary usage of Theorems
Below you will find example usage of this term as found in modern and/or classical literature:
1. Projective Geometry by Oswald Veblen, John Wesley Young (1918)
"CHAPTER IX theorems ON SENSE AND SEPARATION 147. Plan of the chapter. The theorems
and definitions of Chapter II are for the most part special cases of more ..."
2. Projective Geometry by Oswald Veblen, John Wesley Young (1918)
"CHAPTER IX theorems ON SENSE AND SEPARATION 147. Plan of the chapter. The theorems
and definitions of Chapter II are for the most part special cases of more ..."
3. The Integration of Functions of a Single Variable by Godfrey Harold Hardy (1916)
"The general theorems which we shall prove concerning the summation of series by
... There are, in the first place, theorems the validity of which does not ..."
4. Transactions of the Royal Society of Edinburgh.. by Robert Adam, Royal Society of Edinburgh (1790)
"ART'S GENERAL theorems. ... his book of General theorems, all of them, ...
have been introduced that arc not among Dr STEWART'S theorems, and which are ..."
5. The Encyclopædia Britannica: A Dictionary of Arts, Sciences, Literature and by Hugh Chisholm (1910)
"We state the theorems in the pencil reciprocal to the last, without proving ...
~Of theorems about cones of second order and cones of second class we shall ..."
6. Differential and Integral Calculus by Clyde Elton Love (1916)
"theorems on limits. We shall have occasion to use the following theorems on limits,
... In theorems I, II, III it is of course implied that the ..."
7. Differential and Integral Calculus by Clyde Elton Love (1916)
"theorems on limits. We shall have occasion to use the following theorems on ...
In theorems I, II, III it is of course implied that the limits of the two ..."
8. Abstracts of the Papers Printed in the Philosophical Transactions of the by Royal Society (Great Britain) (1833)
"On the Developement of Exponential Functions ; together with several new theorems
relating to finite Differences. By John Frederick W. Herschel, ..."