Any Category

Any License

- Any License
- Commercial Use
- Downloadable
- Cloneable
- All Rights Reserved
- Creative Commons Attribution Non-commercial No Derivatives
- Creative Commons Attribution Non-commercial Share Alike
- Creative Commons Attribution Non-commercial
- Creative Commons Attribution No Derivatives
- Creative Commons Attribution Share Alike
- Creative Commons Attribution
- FontStruct Non-Commercial License
- FontStruct License
- Creative Commons CC0 Public Domain Dedication
- Open Font License

Sort: Sharing Date

Show:

- All (2)

8.50
Click on the stars to rate this FontStruction.

Balanced Rating:**8.50**

Average Rating:**9.33**

Click for more information about this rating. 3 votes You voted**?** for this FontStruction. You may change your vote at any time.

Balanced Rating:

Average Rating:

Click for more information about this rating. 3 votes You voted

151873
Published: **22nd January, 2016**

Last edited:**21st January, 2016**

Created:**19th September, 2015**

**clone** of Avantesk

Last edited:

Created:

Clone of Avantesk. In my symbolic logic class, when I was typing out my homework, there wasn't any font that had logic symbols, I thus had to copy-paste each individual symbol from a wiki article. It was very tedious. So I decided to make a logic font. This is "my" second logic font and as you can see, this font was created by Eskema. If you like the way it looks, you can thank/credit Eskema (though Eskema seems to have been gone for 5 years now. All of its appearance is not due to me, I merely repurposed a few of the symbols to make it a logic font. But when I saw "Avantesk" I simply knew I had to revive "my" logic series.

The ! is the "not", @is "all since its like an A. # is the "some" since its like 3, $ is the "therefore" since FOUR, % is the "if then", ^ is the "or" since the symbol is so similar, & is the "and" because DUH!! * is the "if and only if"/mutual biconditional.

This is a8.59
Click on the stars to rate this FontStruction.

Balanced Rating:**8.59**

Average Rating:**10.00**

Click for more information about this rating. 2 votes You voted**?** for this FontStruction. You may change your vote at any time.

Balanced Rating:

Average Rating:

Click for more information about this rating. 2 votes You voted

304853
Published: **6th October, 2014**

Last edited:**12th May, 2015**

Created:**6th October, 2014**

**clone** of Motorik NBP

Last edited:

Created:

Clone of Motorik NBP. In my symbolic logic class, when I was typing out my homework, there wasn't any font that had logic symbols, I thus had to copy-paste each individual symbol from a wiki article. It was very tedious. Hence for the first time in Fontstruct (I checked) I present The Logic font. For this "project" I needed a good, clean font with a "type 1" filter. Thus my thanks goes out to Perjys547 who doesn't seem to be an active Fontstructor anymore. I want to emphasize that absolutely all of this is his work minus the !@#$%^&*, which I put into logic symbols. That's all I did. ! is the "not" @ is the "all" since its like an A # is the "some" since its like a 3 $ is the "therefore" since FOUR % is the "if then" ^ is the "or" since the symbol is similar & is the "and" because duh!!!! * is the "if and only if" /mutual biconditional.

This is a- Logic (29)
- Not (18)
- All (35)
- Some (4)
- Therefore (2)
- If (6)
- Then (2)
- If Then (2)
- Or (4)
- And (26)
- If And Only If (1)
- Mutual Biconditional (1)
- Logic Symbols (1)
- Deductive (2)
- Inductive (1)
- Valid (1)
- Invalid (1)
- Sound (23)
- Unsound (1)
- Consistent (7)
- Inconsistent (10)
- Infer (1)
- Inference (1)
- Modus Ponens (2)
- Modus Tolens (1)
- Hypothetical Syllogism (1)
- Disjunctive Syllogism (1)
- Constructive Dilemma (1)
- Absorption (1)
- Simplification (7)
- Conjunction (1)
- Addition (2)
- De Morgans Theorem (1)
- Commutation (1)
- Association (1)
- Distribution (1)
- Double Negation (1)
- Exportation (1)
- Tautology (1)
- Premise (2)
- Conclusion (2)
- Universal Generalization (1)
- Universal Instantiation (1)
- Existential Instantiation (1)
- Existential Generalization (1)
- Sufficient Condition (1)
- Necessary Condition (1)
- 18 Rules Of Logic (2)