The elements of arithmeticke most methodically deliuered. Written in Latine by C. Vrstitius professor of the mathematickes in the Vniuersitie of Basill. And translated by Thomas Hood, Doctor in Physicke, and well-willer of them which delight in the mathematicall sciences
- Title
- The elements of arithmeticke most methodically deliuered. Written in Latine by C. Vrstitius professor of the mathematickes in the Vniuersitie of Basill. And translated by Thomas Hood, Doctor in Physicke, and well-willer of them which delight in the mathematicall sciences
- Author
- Wurstisen, Christian, 1544-1588.
- Publication
- London :: Printed by Richard Field,
- 1596.
- Rights/Permissions
-
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- Subject terms
- Arithmetic -- Early works to 1900.
- Link to this Item
-
https://name.umdl.umich.edu/A14226.0001.001
- Cite this Item
-
"The elements of arithmeticke most methodically deliuered. Written in Latine by C. Vrstitius professor of the mathematickes in the Vniuersitie of Basill. And translated by Thomas Hood, Doctor in Physicke, and well-willer of them which delight in the mathematicall sciences." In the digital collection Early English Books Online 2. https://name.umdl.umich.edu/A14226.0001.001. University of Michigan Library Digital Collections. Accessed May 5, 2024.
Contents
- title page
-
TO THE RIGHT WORSHIPFVL S
r CONIER CLIFFORD KNIGHT. health and felicitie. -
THE ELEMENTS OF ARITHMETICKE MOST METHODICAL LIE DELIVERED.
- CHAP. I. The definition and subiect of Arithmeticke.
- CHAP. II. Of Notation, and of the first part thereof.
- CHAP. III. Of the other part of Notation.
- CHAP. IIII. Of Numeration, the other part of simple Arithmeticke, and of the first kind thereof.
- CHAP. V. Of the second kind of Numeration.
- CHAP. VI. Of the double diuision of numbers.
- CHAP. VII. Of the greatest common Diuisor, and the least common diuidend.
- CHAP. VIII. Of the Accidentall numeration of partes which commonly they call Reduction.
- CHAP. IX. Of the Essentiall numeration of parts.
- CHAP. X. Of mixt numeration.
-
THE SECOND PART OF
ARITHMETICKE. - CHAP. XI. Of the kindes of proportionalitie or reason.
- CHAP. XII. Of Notation and Numeration of proportions.
- CHAP. XIII. Of proportion and the kinds thereof, but especially of Arithmeticall proportion.
- CHAP. XIIII. Of Geometricall proportion, and of the golden rule belonging thereunto.
- CHAP. XV. Of examples of the rule of proportion, re∣quiring some kinde of simple nume∣ration before them.
- CHAP. XVI. Of examples of the golden Rule, vvherein there is required some numeration of broken or mixt numbers.
- CHAP. XVII. Of examples of the golden Rule requiring proportion before them.
- CHAP. XVIII. Of reciprocall proportion.
- CHAP. XIX. Of manifold proportion, and first of that which is compound by Addition commonly called the rule of Fellowshippe.
- CHAP. XX. Of multiplied proportion compound by multi∣plication, vvhich commonly is called the double Rule.
- CHAP. XXI. Of manifold proportion compounded by mul∣tiplication and addition.
- CHAP. XXII. A treatise of Alligation, vvhereof B. SALIGNA∣CVS vvas the Author.
- CHAP. XXIII. Of Prime Alligation, and the pro∣pertie thereof.
- CHAP. XXIIII. Concerning the first kinde of prime Alligation.
- CHAP. XXV. Of the second kind of prime Alligation.
- CHAP. XXVI. Of second Alligation.
- CHAP. XXVII. Of Manifolde proportion continued in the termes.
- CHAP. XXVIII. Of continuall proportion.
- A BRIEFE TREA∣TISE ADDED CON∣CERNING THE RESO∣lution of the Square and Cube in numbers, whereby the side of them may be found.