. . . Ah, here it is! 'I think we do know the sweet Roman hand.' Here's the Proposition, as large as life, and proved by I. 19. 'Now, infidel, I have thee on the hip!' You shall have such a sweet thing to do in vivâ-voce, my very dear friend! You shall have the two Propositions together, and take them in any order you like. It's my profound conviction that you don't know how to prove either of them without the other. They'll have to introduce each other, like Messrs. Pyke and Pluck. But what fearful confusion the whole subject is getting into! (Knocking heard.) Come in!
Enter Rhadamanthus.
Rhad. I say! Are we bound to mark an answer that's a clear logical fallacy?
Min. Of course you are—with that peculiar mark which cricketers call 'a duck's egg,' and thermometers 'zero.'
Rhad. Well, just listen to this proof of I. 29.
Reads.
'Let EF meet the two parallel Lines AB, CD, in the points GH. The alternate angles AGH, GHD, shall be equal.
