 | Robert Simson - 1806 - 546 pàgines
...BC shall coincide with the base EF^ because the point B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would inclose a space, which is impossible». Therefore a 10. Ax. the base BC shall coincide with the base EF, and be equal... | |
 | Euclides - 1816 - 588 pàgines
...BC shall coincide with the base EF, because the pqint B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would inclose a space, which is impossible*. Therefore the baseBC'ioAx shall coincide with the base EF, and be equal to it.... | |
 | Peter Nicholson - 1825 - 1046 pàgines
...coincide with the base EF, because the point В coinciding with É, and С with F, if the base БС does not coincide with the base EF, two straight lines Would inclose a space, which is impossible. (10 Ax.) Therefore the base BC shall coincide with the base EF, and be equal to... | |
 | Robert Simson - 1827 - 546 pàgines
...shall coincide with the base EF; because, the point B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would inrlose a space, which is impossible*. There- * 10 Ax. fore the base BC coincides with the buseEF,... | |
 | Euclid, Robert Simson - 1829 - 548 pàgines
...coincide with the base EF, because the point B coinciding with E, and C with F, if the base BC docs not coincide with the base EF, two straight lines would inclose a space, which is impossible. (10. Ax.) Therefore the base BC shall coincide with the base EF, and be equal... | |
 | Robert Simson - 1835 - 544 pàgines
...BC shall coincide with the base EF, because the point B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would enclose a space, which is a 10. Ax. impossible a. Therefore the base BC shall coincide with the base... | |
 | Euclid - 1835 - 540 pàgines
...BC shall coincide with the base EF, because the point B coi ciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would enclose a space, which is a 10. Ax. impossible *. Therefore the base BC shall coincide with the base... | |
 | Alexander Bryan Johnson - 1836 - 290 pàgines
...with the point E, the base BC shall coincide with the base EF. Why ? Because, says Euclid, if the base BC does not coincide with the base EF, two straight...cannot. Two straight lines, says the axiom, cannot inclose a space. § 28.— In this theorem, then, the proofs are effected by showing that the points... | |
 | Robert Simson - 1838 - 434 pàgines
...BC shall coincide with the base EF, because the point B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would inclose a space, which is impossible. (10. Ax.) Therefore the base BC shall coincide with the base EF, and be equal... | |
 | Euclides - 1842 - 316 pàgines
...shall coincide with the base EF, because the point B coinciding with E, and c with F, if the base вc does not coincide with the base EF, two straight lines would inclose a space, which is impossible (10. Ax.) Therefore the bases c coincides with the base EF, and therefore is equal... | |
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DF : but the point B coincides with the point E ; wherefore the base BC shall coincide with the base EF^ because the point B coinciding with E, and C with F, if the base BC does not coincide with the base EF, two straight lines would inclose a space,... 
