The Young Gentleman's Arithmetick, and Geometry: Containing Such Elements of the Said Arts Or Sciences as are Most Useful and Easy to be KnownJ. Knapton, 1723 - 294 sider |
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Side 174
... Surface ; or laftly , as to all its three Dimensions jointly , under which Confideration it is call'd a Solid or Body : Hence Geometry is diftinguishable into three general Parts , whereof the first treats of Lines , the fecond of Surfaces ...
... Surface ; or laftly , as to all its three Dimensions jointly , under which Confideration it is call'd a Solid or Body : Hence Geometry is diftinguishable into three general Parts , whereof the first treats of Lines , the fecond of Surfaces ...
Side 177
... Surfaces . To which are premis'd fuch Definitions and Axioms , as are requifite to the Demonftration of the Said Theo- rems . ( * ) DEFINITIONS . Chap . I. A int Α what . Mathematical ( † ) Point is conceiv'd Def . 1 . to have neither ...
... Surfaces . To which are premis'd fuch Definitions and Axioms , as are requifite to the Demonftration of the Said Theo- rems . ( * ) DEFINITIONS . Chap . I. A int Α what . Mathematical ( † ) Point is conceiv'd Def . 1 . to have neither ...
Side 178
... Surface ABCD , is conceiv'd to be defcrib'd by the Motion of the Line AB , from AB to CD . Def . 5. If the Surface ABCD lies where every A Plane , exactly even with the Lines AB and CD , which bound it ; then it is call'd a plain what ...
... Surface ABCD , is conceiv'd to be defcrib'd by the Motion of the Line AB , from AB to CD . Def . 5. If the Surface ABCD lies where every A Plane , exactly even with the Lines AB and CD , which bound it ; then it is call'd a plain what ...
Side 179
... Surface , which being confider'd as to its rifing Side , is call'd a convex Surface ; being confider'd as to its other Side , is call'd a concave Surface . what . The mathematical Term ( ) or Bound Def . 6 . of any Thing is its ...
... Surface , which being confider'd as to its rifing Side , is call'd a convex Surface ; being confider'd as to its other Side , is call'd a concave Surface . what . The mathematical Term ( ) or Bound Def . 6 . of any Thing is its ...
Side 196
... it were fundamental Ufe in demonftrating other Propofitions , but also of great Ufe in Practice . For Inftance , by Corol . 4. is known , what regular Surfaces ( whether of of common Stone , or Marble , or Wood , 196 The Young Gentleman's.
... it were fundamental Ufe in demonftrating other Propofitions , but also of great Ufe in Practice . For Inftance , by Corol . 4. is known , what regular Surfaces ( whether of of common Stone , or Marble , or Wood , 196 The Young Gentleman's.
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The Young Gentleman's Arithmetick, and Geometry: Containing Such Elements of ... Edward Wells Uten tilgangsbegrensning - 1714 |
The Young Gentleman's Arithmetick, and Geometry: Containing Such Elements of ... Edward Wells Ingen forhåndsvisning tilgjengelig - 2016 |
The Young Gentleman's Arithmetick, and Geometry: Containing Such Elements of ... Edward Wells Ingen forhåndsvisning tilgjengelig - 2015 |
Vanlige uttrykk og setninger
ABCD alfo Algebraical alſo Altitude Anfwer Arch arifing Arithmetick Axiom Bafes Bafis becauſe bifect CABDE Cafe call'd Chap Circle common Fractions confequently confifts Corol Corollary Cube Cypher Deci decimal Fractions Decimals defcrib'd denominative Value denote Diſtance divided Dividend Divifion Divifor draw equilateral eſteem'd EXAMPLE faid fecond Feet feve feveral fhall fhew fhewn fignifies Figure fimilar firft firſt folid fome forafmuch fore fought four fquare ftands fuch fuppofing Geometrical gures hence Hundred Twenty-two illuftrated Inches Inftance Integers laft lefs likewife Logarithm Mathematicks Meaſure multiplied muſt Namely Numbers given obferv'd orem Parallelepiped Parallelogram Parallelogram ABCD Pence perform'd Perpendicular Place Poles Length Price Priſms Product Proportion Quantity Quotient Reaſon Rectangle reduc'd refpective requir'd Rhombus right Angles right Line Root Rule Shillings Sides Square ABCD Subftraction Term Theorem ther theſe tion Trapezium Treatife Triangle ABC Uſe Wherefore
Populære avsnitt
Side 145 - If the errors are alike, divide the difference of the products by the difference of the errors, and the quotient will be the answer.
Side 211 - Therefore all the interior angles of the figure, together with four right angles, are equal to twice as many right angles as the figure has sides.
Side 8 - Los números cardinales 0: zero 1: one 2: two 3: three 4: four 5: five 6: six 7: seven 8: eight 9: nine 10: ten 11: eleven 12: twelve 13: thirteen 14: fourteen 15: fifteen 16: sixteen 17: seventeen 18: eighteen 19: nineteen 20: twenty...
Side 60 - That is, ten units make one ten, ten tens make one hundred, ten hundreds make one thousand, and so on.
Side 209 - Cwol. 2. If one angle in one triangle be equal to one angle in another, the sums of the remaining angles will also be equal (ax.
Side 184 - ... center of the same circle, subtend equal arcs ; by bisecting the angles at the center, the arcs which are subtended by them are also bisected, and hence, a sixth, eighth, tenth, twelfth, &c. part of the circumference of a circle may be found. If the right angle be considered as divided into 90 degrees, each degree into 60 minutes, and each minute into 60 seconds, and so on, according to the sexagesimal division of a degree ; by the aid of the first corollary to Prop. 32, Book i., may be found...