The Elements of EuclidA. Foulis, 1838 - 466 sider |
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Side 246
... ABCD , EFGH be two circles , and BD , FH their diame- ters . as the fquare of BD to the fquare of FH , fo is the circle ABCD to the circle EFGH . For , if it be not fo , the fquare of BD fhall be to the fquare of FH , as the circle ABCD ...
... ABCD , EFGH be two circles , and BD , FH their diame- ters . as the fquare of BD to the fquare of FH , fo is the circle ABCD to the circle EFGH . For , if it be not fo , the fquare of BD fhall be to the fquare of FH , as the circle ABCD ...
Side 248
... circle ABCD is to the space S , fo is the polygon AXBOCPDR to the polygon EKFLGMHN . but the circle ABCD is greater than the polygon contained in it ; where- fore the space S is greater than the polygon EKFLGMHN . but it is likewife ...
... circle ABCD is to the space S , fo is the polygon AXBOCPDR to the polygon EKFLGMHN . but the circle ABCD is greater than the polygon contained in it ; where- fore the space S is greater than the polygon EKFLGMHN . but it is likewife ...
Side 249
... circle ABCD to any space lefs than the circle EFGH . wherefore as the square of BD to the fquare of FH , fo is the circle ABCD to the circle EFGH ‡ . Circles , therefore , are , & c . Q. E. D. PROP . III . THEOR . EVERY pyramid having a ...
... circle ABCD to any space lefs than the circle EFGH . wherefore as the square of BD to the fquare of FH , fo is the circle ABCD to the circle EFGH ‡ . Circles , therefore , are , & c . Q. E. D. PROP . III . THEOR . EVERY pyramid having a ...
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