The first and second books of Euclid explained to beginners, by C.P. Mason |
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Σελίδα 8
... in the proof of which we have to make use of the truth that two equal straight lines will coincide throughout their entire length . { two figures must intersect one another in two points at 8 THE FIRST BOOK OF EUCLID.
... in the proof of which we have to make use of the truth that two equal straight lines will coincide throughout their entire length . { two figures must intersect one another in two points at 8 THE FIRST BOOK OF EUCLID.
Σελίδα 9
Euclid, Charles Peter Mason. two figures must intersect one another in two points at least . That all right angles are equal , is a proposition that admits of being proved . THE NAMING OF ANGLES . An angle is named either by a letter ...
Euclid, Charles Peter Mason. two figures must intersect one another in two points at least . That all right angles are equal , is a proposition that admits of being proved . THE NAMING OF ANGLES . An angle is named either by a letter ...
Σελίδα 15
... intersect one another in two points at least . 5. Definition F. All radii of the same circle are equal to one another . Let A B be the given finite right line . With the centre A , and at the distance A B , describe the circle CB E ...
... intersect one another in two points at least . 5. Definition F. All radii of the same circle are equal to one another . Let A B be the given finite right line . With the centre A , and at the distance A B , describe the circle CB E ...
Σελίδα 43
... intersecting A B in the point D. A B is bisected at the point D. A E B For if we suppose the △ CBE to be applied to the △ CA E in such a manner that , C E remaining common to the two △ s , CB and BE may lie on the same side of EC as ...
... intersecting A B in the point D. A B is bisected at the point D. A E B For if we suppose the △ CBE to be applied to the △ CA E in such a manner that , C E remaining common to the two △ s , CB and BE may lie on the same side of EC as ...
Σελίδα 50
... intersecting in the point E. We have to prove A E -D that the B AED is equal to the ZCE B , and the AE C to the Z DEB . Proof . A E is a straight line meeting the line C D in the point E , and forming adjacent s A E C and A E D ...
... intersecting in the point E. We have to prove A E -D that the B AED is equal to the ZCE B , and the AE C to the Z DEB . Proof . A E is a straight line meeting the line C D in the point E , and forming adjacent s A E C and A E D ...
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The First and Second Books of Euclid Explained to Beginners, by C.P. Mason Euclides Δεν υπάρχει διαθέσιμη προεπισκόπηση - 2016 |
Συχνά εμφανιζόμενοι όροι και φράσεις
A B and CD A B is equal AC and CB Æneid axiom beginner bisected centre Consequently diagonal draw a straight Edition equal in area equal respectively equal to twice equilateral Euclid exterior exterior angle Fcap figure finite right line follows formed fourth proposition given finite right given line given point given rectilineal given straight line gnomon Grammar greater half a right hypotenuse interior and opposite isosceles Join the points join two given Latin length less line A B line CB linear units lines are parallel magnitudes meeting the line opposite sides parallelogram point F proof Prop proposition prove this proposition rectangle contained right angles side A C straight line meets suppose three sides triangle unequal