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B00B04KFM8 Used good or better, we ship best copy available! May have signs of use, may be ex library copy. Book Only. Expedited shipping is 2-6 business days after shipment, standard is 4-14 business days after shipment. Used items do not include access codes, cd's or other accessories, regardless of what is stated in item title. If you need to guarantee that these items are included, please purchase a brand new copy. Bookseller Inventory #

Title: **Geometry, Plane, Solid, and Spherical. to ...**

Publisher: **Ulan Press**

Book Condition: **Good**

Published by
Palala Press
(2016)

ISBN 10: 1341434869
ISBN 13: 9781341434860

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**Book Description **Palala Press, 2016. Paperback. Book Condition: New. PRINT ON DEMAND Book; New; Publication Year 2016; Not Signed; Fast Shipping from the UK. No. book. Bookseller Inventory # ria9781341434860_lsuk

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Published by
Palala Press, United States
(2015)

ISBN 10: 1341434869
ISBN 13: 9781341434860

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**Book Description **Palala Press, United States, 2015. Hardback. Book Condition: New. 234 x 156 mm. Language: N/A. Brand New Book ***** Print on Demand *****. Bookseller Inventory # APC9781341434860

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Published by
Rarebooksclub.com, United States
(2012)

ISBN 10: 1130550281
ISBN 13: 9781130550283

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**Book Description **Rarebooksclub.com, United States, 2012. Paperback. Book Condition: New. 246 x 189 mm. Language: English . Brand New Book ***** Print on Demand *****. This historic book may have numerous typos and missing text. Purchasers can download a free scanned copy of the original book (without typos) from the publisher. Not indexed. Not illustrated. 1830 Excerpt: .If one plane be perpendicular to another, any straight line which is drawn in the first plane at right angles to their common section shall be perpendicular to the other plane: and, conversely, if a straight line be perpendicular to aplane, any plane which passes through it shall be perpendicular to the same plane. It being: provided also, that Die parallel planes lie, each pair, upon the same side, or each pair upon opposite sides of the plane which passes through the common sections (A B, C D in the figure of 12. Cor.); for, if one pair lie towards the same parts, and the other pair towards opposite parts of that plane, the dihedral angles will be supplementary, not equal, to one another. See tie note at Prop. 15. Let the plane ABC be perpendicular to DBC, and let any straight line A B be drawn in the plane ABCperpendicular to the common section B C: the straight line AB shall be perpendicular to the plane DBC. From the point B, in the plane DB C, let BD be drawn at right angles to BC. Then, because the planes are at right angles to one another, the angle A B D is a right angle (17. Cor.): but ABC is likewise a right angle; therefore (3.) A B is perpendicular to the plane DBC. Next, let the straight line AB be perpendicular to the plane BCD; and let A B C be any plane passing through AB: the plane ABC shall be perpendicular to B C D. Let BC be the common section of the two planes; and, from the point B, in the plane BCD, draw BD at right angles to BC. Then, because AB meets the line BD drawn in the plane to which A B is perpendicular, the angle ABD is a right angle (def. 1.). But the angle AB D is contained by straight lines drawn in the two planes perpendicular to their common section B C. Therefore (17. Cor.) the dihedral angle A B C D is likewise a rig. Bookseller Inventory # APC9781130550283

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Published by
RareBooksClub

ISBN 10: 1130550281
ISBN 13: 9781130550283

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**Book Description **RareBooksClub. Paperback. Book Condition: New. This item is printed on demand. Paperback. 180 pages. Dimensions: 9.7in. x 7.4in. x 0.4in.This historic book may have numerous typos and missing text. Purchasers can download a free scanned copy of the original book (without typos) from the publisher. Not indexed. Not illustrated. 1830 Excerpt: . . . If one plane be perpendicular to another, any straight line which is drawn in the first plane at right angles to their common section shall be perpendicular to the other plane: and, conversely, if a straight line be perpendicular to aplane, any plane which passes through it shall be perpendicular to the same plane. It being: provided also, that Die parallel planes lie, each pair, upon the same side, or each pair upon opposite sides of the plane which passes through the common sections (A B, C D in the figure of 12. Cor. ); for, if one pair lie towards the same parts, and the other pair towards opposite parts of that plane, the dihedral angles will be supplementary, not equal, to one another. See tie note at Prop. 15. Let the plane ABC be perpendicular to DBC, and let any straight line A B be drawn in the plane ABCperpendicular to the common section B C: the straight line AB shall be perpendicular to the plane DBC. From the point B, in the plane DB C, let BD be drawn at right angles to BC. Then, because the planes are at right angles to one another, the angle A B D is a right angle (17. Cor. ): but ABC is likewise a right angle; therefore (3. ) A B is perpendicular to the plane DBC. Next, let the straight line AB be perpendicular to the plane BCD; and let A B C be any plane passing through AB: the plane ABC shall be perpendicular to B C D. Let BC be the common section of the two planes; and, from the point B, in the plane BCD, draw BD at right angles to BC. Then, because AB meets the line BD drawn in the plane to which A B is perpendicular, the angle ABD is a right angle (def. 1. ). But the angle AB D is contained by straight lines drawn in the two planes perpendicular to their common section B C. Therefore (17. Cor. ) the dihedral angle A B C D is likewise a rig. . . This item ships from La Vergne,TN. Paperback. Bookseller Inventory # 9781130550283

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Published by
Book on Demand, Miami
(2016)

ISBN 10: 5879243931
ISBN 13: 9785879243932

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**Book Description **Book on Demand, Miami, 2016. Perfect binding. Book Condition: NEW. Dust Jacket Condition: NEW. 5.8" x 8.3". In English language. This book, "Geometry, Plane, Solid, and Spherical. to Which Is Added, in an Appendix, the Theory of Projection &c. by P. Morton.", by Pierce Morton, is a replication. It has been restored by human beings, page by page, so that you may enjoy it in a form as close to the original as possible. This item is printed on demand. Thank you for supporting classic literature. SOFT COVER. Bookseller Inventory # 1698713

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Published by
Rarebooksclub.com, United States
(2012)

ISBN 10: 1130550281
ISBN 13: 9781130550283

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Quantity Available: 10

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**Book Description **Rarebooksclub.com, United States, 2012. Paperback. Book Condition: New. 246 x 189 mm. Language: English . Brand New Book ***** Print on Demand *****.This historic book may have numerous typos and missing text. Purchasers can download a free scanned copy of the original book (without typos) from the publisher. Not indexed. Not illustrated. 1830 Excerpt: .If one plane be perpendicular to another, any straight line which is drawn in the first plane at right angles to their common section shall be perpendicular to the other plane: and, conversely, if a straight line be perpendicular to aplane, any plane which passes through it shall be perpendicular to the same plane. It being: provided also, that Die parallel planes lie, each pair, upon the same side, or each pair upon opposite sides of the plane which passes through the common sections (A B, C D in the figure of 12. Cor.); for, if one pair lie towards the same parts, and the other pair towards opposite parts of that plane, the dihedral angles will be supplementary, not equal, to one another. See tie note at Prop. 15. Let the plane ABC be perpendicular to DBC, and let any straight line A B be drawn in the plane ABCperpendicular to the common section B C: the straight line AB shall be perpendicular to the plane DBC. From the point B, in the plane DB C, let BD be drawn at right angles to BC. Then, because the planes are at right angles to one another, the angle A B D is a right angle (17. Cor.): but ABC is likewise a right angle; therefore (3.) A B is perpendicular to the plane DBC. Next, let the straight line AB be perpendicular to the plane BCD; and let A B C be any plane passing through AB: the plane ABC shall be perpendicular to B C D. Let BC be the common section of the two planes; and, from the point B, in the plane BCD, draw BD at right angles to BC. Then, because AB meets the line BD drawn in the plane to which A B is perpendicular, the angle ABD is a right angle (def. 1.). But the angle AB D is contained by straight lines drawn in the two planes perpendicular to their common section B C. Therefore (17. Cor.) the dihedral angle A B C D is likewise a rig. Bookseller Inventory # APC9781130550283

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ISBN 10: 1148364838
ISBN 13: 9781148364834

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**Book Description **Book Condition: Brand New. * This item is printed on demand * Book Condition: Brand New. Bookseller Inventory # 97811483648341.0

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