Jonathan Frederick Pollock
1783 - 1870

- Born
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23 September 1783
Parish of St Martin's-in-the-Fields, London, England
- Died
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23 August 1870
His seat of Hatton, Middlesex
- Nationality
- British
- Gender
- Male
- Date of election for Royal Society fellowship
- 29/02/1816
- Relationships
- Son of David Pollock, sadler, of Charing Cross, London, and his wife Sarah; younger brother of Sir David Pollock (FRS 1829); married 1) (1813) Frances Rivers of Spring Gardens (died 1827); 2) (1834) Sarah Anne Amowah, daughter of Richard Langslow of Hatton, Middlesex; his granddaughter Marion Amelia married 1) Charles Vernon Boys (FRS 1888) (divorced) and 2) Andrew Russell Forsuth (FRS 1886)
- Catalogue
- View catalogue entry
Author of
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Unpublished paper, 'A method of proving the three leading properties of the ellipse and hyperbola from a well known property of the circle' by Sir Frederick Pollock
Creator: Jonathan Frederick Pollock Reference number: AP/26/11 -
Unpublished paper, 'On certain properties of prime numbers' by Jonathan Frederick Pollock
Creator: Jonathan Frederick Pollock Reference number: AP/29/13 -
Unpublished paper, 'Certain properties of the arithmetical series, whose 1st, 2nd etc differences are constant; including Fermat's theorem of the polygonal numbers, and some other properties of numbers' by Sir Frederick Pollock
Creator: Jonathan Frederick Pollock Reference number: AP/31/12 -
Unpublished paper, 'On the extension of the principle of Fermat's theorem (of the polygonal numbers) to the higher orders of series whose ultimate differences are constant - with a new theorem proposed, applicable to all the orders' by Frederick Pollock
Creator: Jonathan Frederick Pollock Reference number: AP/32/15 -
Unpublished paper, 'On the mysteries of numbers alluded to by Fermat' by [Jonathan] Frederick Pollock
Creator: Jonathan Frederick Pollock Reference number: AP/48/7 -
Paper, 'On certain properties of square numbers and other quadratic forms with a table of odd numbers from 1 to 191 divided into 4, 3 or 2 square numbers, the algebraic sum of whose roots (positive or negative) may equal 1 - by means of which table all the odd numbers up to 9503 may be resolved into not exceeding 4 square numbers' by Sir [Jonathan] Fred [Frederick] Pollock
Creator: Jonathan Frederick Pollock Reference number: PT/49/7