ISBN: 1130908828

[EAN: 9781130908824], Neubuch, [PU: RareBooksClub], THOMAS LEYBOURN,WORLD, This item is printed on demand. Paperback. 148 pages. Dimensions: 9.7in. x 7.4in. x 0.3in.This historic book may… Plus…

[EAN: 9781130908824], Neubuch, [PU: RareBooksClub], THOMAS LEYBOURN,WORLD, This item is printed on demand. Paperback. 148 pages. Dimensions: 9.7in. x 7.4in. x 0.3in.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. 1835 Excerpt: . . . it must, elegant as it is, be omitted here. Theor. 5. We can exactly determine the volume contained bu portion of the surface of a auadrilalire gauche Abcd, by planes drawn in any manner through its four sides, avrf by any fifth plane whatever. --For forming the conoide ABDrfCA, it is Dic X (by a 2 Thor. 2. ); but whatever be the inclination of the planes drawn by the four sides, they only increase or diminish (he conoide by solids whose faces are plane, and therefore whose volumes are rigorously cubable. Hence, and c. Theor. 6. We can exactly determine the position of the centre of gravity of the same figure as above, viz. Theor. 5. and its demonstration is of the same kind. It is worthy of remark that though one of the lines of the Second order is quadrable, --that though arcs of two of them can be It is easily dediioiblc from this, that if another line Nm be drawn from N to meet the plane in M, and Mi be joined; then M, P, M arc in one straight line. Euc. 14. I. t Archimedes first squared the parabola. Arch. Op. Oxon. pp. t6-34. Fig. 12. assigned whose difference reckoned from given points ii reciifiable--that though one surface of the second order is capable of cylindrical or conical perforation, so as to leave quadrabie and cubable remainders: --yet no one seemi to have noticed that cubable portions can tic cut by planes from a surface of the second order, except MM. Tinseau and Mauduit in the case before us. Nor is it less remarkable that no subsequent writer has taken the slightest notice either of this property or of the memoires which contain it. M. Tinseau proceeds: -- I have expanded my enquiries upon this last species of surfaces gauches, both because it is the most simple, and because it enters as an e. . . This item ships from La Vergne,TN.<

2012, ISBN: 1130908828

[EAN: 9781130908824], Neubuch, [PU: Rarebooksclub.com, United States], Language: English Brand New Book ***** Print on Demand *****.This historic book may have numerous typos and missing … Plus…

[EAN: 9781130908824], Neubuch, [PU: Rarebooksclub.com, United States], 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. 1835 Excerpt: .it must, elegant as it is, be omitted here. Theor. 5. We can exactly determine the volume contained bu portion of the surface of a auadrilalire gauche Abcd, by planes drawn in any manner through its four sides, avrf by any fifth plane whatever.--For forming the conoide ABDrfCA, it is = D-ic X - (by a 2 Thor. 2.); but whatever be the inclination of the planes drawn by the four sides, they only increase or diminish (he conoide by solids whose faces are plane, and therefore whose volumes are rigorously cubable. Hence, c. Theor. 6. We can exactly determine the position of the centre of gravity of the same figure as above, viz. Theor. 5. and its demonstration is of the same kind. It is worthy of remark that though one of the lines of the Second order is quadrable, +--that though arcs of two of them can be It is easily dediioiblc from this, that if another line Nm be drawn from N to meet the plane in M , and M i be joined; then M, P, M arc in one straight line. Euc. 14. I. t Archimedes first squared the parabola. Arch. Op. Oxon. pp. t6-34. Fig. 12. assigned whose difference reckoned from given points ii reciifiable--that though one surface of the second order is capable of cylindrical or conical perforation, so as to leave quadrabie and cubable remainders: ?--yet no one seemi to have noticed that cubable portions can tic cut by planes from a surface of the second order, except MM. Tinseau and Mauduit in the case before us. Nor is it less remarkable that no subsequent writer has taken the slightest notice either of this property or of the memoires which contain it. M. Tinseau proceeds: -- I have expanded my enquiries upon this last species of surfaces gauches, both because it is the most simple, and because it enters as an e.<