Euclid, book v. proved algebraically, so far as it relates to commensurable magnitudes. To which is prefixed a summary of all the necessary algebraical operations. [2 other copies, in unbound sheets]. |
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... it with the addition of algebraical symbols for the magnitudes , as given in the small - type Enunciation . Sixthly , to learn Euclid's Definitions and Axioms , given at p . 53 . PAGE 1 · 19 49 53 59 60 PRELIMINARY ALGEBRA vi PREFACE .
... it with the addition of algebraical symbols for the magnitudes , as given in the small - type Enunciation . Sixthly , to learn Euclid's Definitions and Axioms , given at p . 53 . PAGE 1 · 19 49 53 59 60 PRELIMINARY ALGEBRA vi PREFACE .
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Charles Lutwidge Dodgson. PAGE 1 · 19 49 53 59 60 PRELIMINARY ALGEBRA . 1 . 1. Given a ; multiply. PRELIMINARY ALGEBRA PROPOSITIONS , BOOK V ENUNCIATIONS " " DEFINITIONS " " AXIOMS " " APPENDIX CONTENTS . 5. Resolve into factors , ma + mb m ...
Charles Lutwidge Dodgson. PAGE 1 · 19 49 53 59 60 PRELIMINARY ALGEBRA . 1 . 1. Given a ; multiply. PRELIMINARY ALGEBRA PROPOSITIONS , BOOK V ENUNCIATIONS " " DEFINITIONS " " AXIOMS " " APPENDIX CONTENTS . 5. Resolve into factors , ma + mb m ...
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... it with the addition of algebraical symbols for the magnitudes , as given in the small - type Enunciation . Sixthly , to learn Euclid's Definitions and Axioms , given at p . 53 . PAGE 1 19 · 49 53 59 € 60 PRELIMINARY vi PREFA CСЕ .
... it with the addition of algebraical symbols for the magnitudes , as given in the small - type Enunciation . Sixthly , to learn Euclid's Definitions and Axioms , given at p . 53 . PAGE 1 19 · 49 53 59 € 60 PRELIMINARY vi PREFA CСЕ .
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Charles Lutwidge Dodgson. PAGE 1 19 · 49 53 59 € 60 PRELIMINARY ALGEBRA . 1. Given a ; 1 . multiply. CONTENTS . PRELIMINARY ALGEBRA PROPOSITIONS , Book V • ENUNCIATIONS " " DEFINITIONS 22 AXIOMS APPENDIX 5. Resolve into factors , ma + mb ma ...
Charles Lutwidge Dodgson. PAGE 1 19 · 49 53 59 € 60 PRELIMINARY ALGEBRA . 1. Given a ; 1 . multiply. CONTENTS . PRELIMINARY ALGEBRA PROPOSITIONS , Book V • ENUNCIATIONS " " DEFINITIONS 22 AXIOMS APPENDIX 5. Resolve into factors , ma + mb ma ...
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... definition of ratio • When it measures each of them . When they have a common mea- sure . First , that a measure of it has been agreed on ; secondly , that the number denotes what mul- tiple it is of that measure . First , that they are ...
... definition of ratio • When it measures each of them . When they have a common mea- sure . First , that a measure of it has been agreed on ; secondly , that the number denotes what mul- tiple it is of that measure . First , that they are ...
Common terms and phrases
A+B+C+ a+b+c+&c a+bb::c+d a+c+e+&c a=bk A=mX abcd b+d+f+&c B=mb B=nX c=dk C=mc c=md C=rX clearing of fractions clusion Let common measure conclusion thence deduce Convertendo cross order deduce equation thence divide e=nb equal equation required equation thence deduce equimultiples EUCLID excess Express enunciation Express first enuncia Express second enun fifth four magnitudes greater ratio hypothesis Taking given inequality less Let A=ma Let a>b Let ab::c:d magnitude taken magnitudes be proportionals multiple multiply by ab multiply corresponding sides number denotes number of magnitudes Preliminary Algebra process will prove proportionals when taken Q. E. D. COROLLARY Q. E. D. PROP remainder required for conclusion right-hand column second a greater second rank Simplify terms single magnitude Taking given inequa Taking given propor thence deduce con thence deduce equa thence prove three magnitudes tion deduce equation tion required tiple unequal ratios Universal Proposition vinculum σα
Popular passages
Page 30 - If there be any number of magnitudes, and as many others, which, taken two and two in order, have the same ratio ; the first shall have to the last of the first magnitudes, the same ratio which the first of the others has to the last. NB This is usually cited by the words "ex sequali,
Page 30 - Next, let there be four magnitudes A, B, C, D, and other four E, F, G, H, which, taken two and two in a cross order, have the same ratio, viz.: A...
Page 27 - If there be three magnitudes, and other three, which, taken two and two, have the same ratio; then if the first be greater than the third, the fourth shall be greater than the sixth; and if equal, equal; and if less, less.
Page 2 - In a direct proportion, the first term has the same ratio to the second, as the third has to the fourth.
Page 40 - Magnitudes are said to have a ratio to one another, when the less can be multiplied so as to exceed the other.
Page 26 - THEOB.—If four magnitudes be proportionals, they are also proportionals by conversion; that is, the first is to its excess above the second, as the third to its excess above the fourth. Let AB be to BE, as CD to DF: then BA shall be to AE, as DC to CF.
Page 43 - Dividendo, by division ; when there are four proportionals, and it is inferred, that the excess of the first above the second, is to the second, as the excess of the third above the fourth, is to the fourth.
Page 42 - ... compounded of the ratio which the first has to the second, and of the ratio which the second has to the third, and of the ratio which the third has to the fourth, and so on unto the last magnitude.
Page 45 - Those magnitudes of- which the same, or equal magnitudes, are equimultiples, are equal to one another. 3. A multiple of a greater magnitude is greater than the same multiple of a less. 4. That magnitude of which a multiple is greater than the same multiple of another, is greater than that other magnitude.