Tags
Language
Tags
<<
April 2024
Su Mo Tu We Th Fr Sa
31 1 2 3 4 5 6
7 8 9 10 11 12 13
14 15 16 17 18 19 20
21 22 23 24 25 26 27
28 29 30 1 2 3 4
  1. Home
  2. eBooks & eLearning
  3. symbolic logic
https://canv.ai/
The picture is generated by canv.ai

We are excited to announce that Canv.ai now features a built-in translator, allowing you to communicate in your native language. You can write prompts in your language, and they will be automatically translated into English, facilitating communication and the exchange of ideas!

We value freedom of speech and guarantee the absence of censorship on Canv.ai. At the same time, we hope and believe in the high moral standards of our users, which will help maintain a respectful and constructive atmosphere.

👉 Check for yourself!

Heidegger: The Critique of Logic

Posted By: AvaxGenius
Date: 9 Jul 2022 02:51:24
Heidegger: The Critique of Logic

Heidegger: The Critique of Logic by Thomas A. Fay
English | PDF | 1977 | 144 Pages | ISBN : 9024719313 | 13.4 MB

Since his inaugural lecture at Freiburg in 1929 in which Heidegger delivered his most celebrated salvo against logic, he has frequently been portrayed as an anti-logician, a classic example of the obscurity resultant upon a rejection of the discipline of logic, a champion of the irrational, and a variety of similar things.
Details

Systems of Formal Logic

Posted By: AvaxGenius
Date: 9 Jul 2022 02:39:15
Systems of Formal Logic

Systems of Formal Logic by L. H. Hackstaff
English | PDF | 1966 | 367 Pages | ISBN : 902770077X | 23.4 MB

The present work constitutes an effort to approach the subject of symbol­ ic logic at the elementary to intermediate level in a novel way. The book is a study of a number of systems, their methods, their rela­ tions, their differences. In pursuit of this goal, a chapter explaining basic concepts of modern logic together with the truth-table techniques of definition and proof is first set out. In Chapter 2 a kind of ur-Iogic is built up and deductions are made on the basis of its axioms and rules. This axiom system, resembling a propositional system of Hilbert and Ber­ nays, is called P +, since it is a positive logic, i. e. , a logic devoid of nega­tion.
Details
UPWARDS