| Table of Contents | Words: Alphabetical - Frequency - Inverse - Length - Statistics | Help | IntraText Library | ||
| Alphabetical [« »] overthrow 1 owed 1 own 3 p 30 pair 2 pairs 2 pale 3 | Frequency [« »] 30 contraries 30 further 30 indefinite 30 p 29 above 29 per 29 positive | Aristotle Prior Analytics IntraText - Concordances p |
Book, Paragraph
1 I, 6| universal, whenever both P and R belong to S, it follows 2 I, 6| belong to S, it follows that P will necessarily belong 3 I, 6| some R: consequently since P belongs to all S, and S 4 I, 6| all S, and S to some R, P must belong to some R: for 5 I, 6| exposition. For if both P and R belong to all S, should 6 I, 6| e.g. N, be taken, both P and R will belong to this, 7 I, 6| belong to this, and thus P will belong to some R.~If 8 I, 6| R belongs to all S, and P to no S, there will be a 9 I, 6| syllogism to prove that P will necessarily not belong 10 I, 6| But if R belongs to no S, P to all S, there will be 11 I, 6| For if R belongs to all S, P to some S, P must belong 12 I, 6| belongs to all S, P to some S, P must belong to some R. For 13 I, 6| convertible S will belong to some P: consequently since R belongs 14 I, 6| to all S, and S to some P, R must also belong to some 15 I, 6| must also belong to some P: therefore P must belong 16 I, 6| belong to some P: therefore P must belong to some R.~Again 17 I, 6| R belongs to some S, and P to all S, P must belong 18 I, 6| some S, and P to all S, P must belong to some R. This 19 I, 6| R belongs to all S, but P does not belong to some 20 I, 6| S, it is necessary that P does not belong to some 21 I, 6| belong to some R. For if P belongs to all R, and R 22 I, 6| R belongs to all S, then P will belong to all S: but 23 I, 6| the Ss be taken to which P does not belong.~But whenever 24 I, 6| will be possible, e.g. if P belongs to all S and R does 25 I, 6| belong to some S. For if P belongs to all S, and R 26 I, 6| S, and R to some S, then P will belong to some R: but 27 I, 6| will be a syllogism. For if P belongs to no S, and R belongs 28 I, 6| and R belongs to some S, P will not belong to some 29 I, 6| belong to some S. For if P belongs to all R, and R 30 I, 6| R, and R to some S, then P belongs to some S: but we