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8.52
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Balanced Rating:**8.52**

Average Rating:**9.00**

Click for more information about this rating. 9 votes You voted**?** for this FontStruction. You may change your vote at any time.

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42154414
Published: **6th May, 2013**

Last edited:**6th May, 2013**

Created:**6th May, 2013**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 211 available gives a total possible combinations of 22155 (211C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 2211 (67C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 211P2 gives 44310 permutations and a 67P2 gives 4422 permutations.

So, at a minimum, 4422 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.

—Updated May 6, 2013

-----

This new version is not strictly a permutation of the previous set. This B set uses one brick for the background and three, sometimes four, bricks for the letters. Let's see what new permutations are possible out of this one. This is a**clone** of fs Permutation XII

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 211 available gives a total possible combinations of 22155 (211C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 2211 (67C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 211P2 gives 44310 permutations and a 67P2 gives 4422 permutations.

So, at a minimum, 4422 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.

—Updated May 6, 2013

-----

This new version is not strictly a permutation of the previous set. This B set uses one brick for the background and three, sometimes four, bricks for the letters. Let's see what new permutations are possible out of this one. This is a

8.23
Click on the stars to rate this FontStruction.

Balanced Rating:**8.23**

Average Rating:**8.46**

Click for more information about this rating. 13 votes You voted**?** for this FontStruction. You may change your vote at any time.

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566449
Published: **15th September, 2011**

Last edited:**15th September, 2011**

Created:**13th September, 2011**

Permutation IX: octahedral totem emboss on raised text achieved through 1/4 brick stagger of similar custom composite.

Last edited:

Created:

Permutation IX: octahedral totem emboss on raised text achieved through 1/4 brick stagger of similar custom composite.

*>> thalamic’s description (with edit)*

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.
This whole **permuatation** thing is so fun and easy to play around with. The original fs Permutation series worked with just the bricks that were available by default. Since then, the FontStructor has evolved, allowing for, in part, custom bricks. This new *permutation* was not possible before. This one is created just to show that custom bricks can be dragged and dropped on top of the existing ones replacing the standard bricks. The bricks used here are **[edit:**1/4 brick staggered identical custom composites] .

Clone it and play around.**Instructions**

1. Select a brick from the standard bricks or create your own custom brick.

2. Click and drag it to the brick in the first position in **My Bricks** until that brick turns gray.

3. Release.

4. Repeat steps 1-3 for the brick in the second position in **My Bricks**.**Learn. Enjoy. Share your permutation.**

This is a **clone** of fs Permutation VIII

8.54
Click on the stars to rate this FontStruction.

Balanced Rating:**8.54**

Average Rating:**10.00**

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

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

243446
Published: **12th September, 2011**

Last edited:**12th September, 2011**

Created:**12th September, 2011**

Permutation VIII: dual weave pattern + character stroke via composite bricks, 2:2 advanced filtering.

Last edited:

Created:

Permutation VIII: dual weave pattern + character stroke via composite bricks, 2:2 advanced filtering.

*>> thalamic’s description (with edit)*

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.
This whole **permuatation** thing is so fun and easy to play around with. The original fs Permutation series worked with just the bricks that were available by default. Since then, the FontStructor has evolved, allowing for, in part, custom bricks. This new *permutation* was not possible before. This one is created just to show that custom bricks can be dragged and dropped on top of the existing ones replacing the standard bricks. The bricks used here are **[edit:** custom composites] .

Clone it and play around.**Instructions**

1. Select a brick from the standard bricks or create your own custom brick.

2. Click and drag it to the brick in the first position in **My Bricks** until that brick turns gray.

3. Release.

4. Repeat steps 1-3 for the brick in the second position in **My Bricks**.**Learn. Enjoy. Share your permutation.**

This is a **clone**

8.44
Click on the stars to rate this FontStruction.

Balanced Rating:**8.44**

Average Rating:**8.71**

Click for more information about this rating. 14 votes You voted**?** for this FontStruction. You may change your vote at any time.

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Click for more information about this rating. 14 votes You voted

5644410
Published: **11th September, 2011**

Last edited:**10th September, 2011**

Created:**10th September, 2011**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a**clone** of fs Permutation I

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a

8.35
Click on the stars to rate this FontStruction.

Balanced Rating:**8.35**

Average Rating:**8.52**

Click for more information about this rating. 21 votes You voted**?** for this FontStruction. You may change your vote at any time.

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Click for more information about this rating. 21 votes You voted

12054419
Published: **27th March, 2009**

Last edited:**19th June, 2009**

Created:**27th March, 2009**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a**clone** of fs Permutation I

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a

8.20
Click on the stars to rate this FontStruction.

Balanced Rating:**8.20**

Average Rating:**8.38**

Click for more information about this rating. 16 votes You voted**?** for this FontStruction. You may change your vote at any time.

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Click for more information about this rating. 16 votes You voted

7734410
Published: **27th March, 2009**

Last edited:**24th June, 2009**

Created:**27th March, 2009**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a**clone** of fs Permutation I

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a

8.09
Click on the stars to rate this FontStruction.

Balanced Rating:**8.09**

Average Rating:**8.22**

Click for more information about this rating. 18 votes You voted**?** for this FontStruction. You may change your vote at any time.

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Click for more information about this rating. 18 votes You voted

6354413
Published: **27th March, 2009**

Last edited:**13th May, 2009**

Created:**27th March, 2009**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a**clone** of fs Permutation I

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a

Some fonts you just can’t FontStruct.

Buy & download premium fonts on MyFonts.com

Buy & download premium fonts on MyFonts.com

7.11
Click on the stars to rate this FontStruction.

Balanced Rating:**7.11**

Average Rating:**5.00**

Click for more information about this rating. 1 vote You voted**?** for this FontStruction. You may change your vote at any time.

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Click for more information about this rating. 1 vote You voted

8.29
Click on the stars to rate this FontStruction.

Balanced Rating:**8.29**

Average Rating:**8.83**

Click for more information about this rating. 6 votes You voted**?** for this FontStruction. You may change your vote at any time.

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286444
Published: **22nd June, 2008**

Last edited:**7th September, 2011**

Created:**22nd June, 2008**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.

8.54
Click on the stars to rate this FontStruction.

Balanced Rating:**8.54**

Average Rating:**10.00**

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

274442
Published: **17th November, 2019**

Last edited:**10th September, 2011**

Created:**10th September, 2011**

This whole**permuatation** thing is so fun and easy to play around with. The original fs Permutation series worked with just the bricks that were available by default. Since then, the FontStructor has evolved, allowing for, in part, custom bricks. This new *permutation* was not possible before. This one is created just to show that custom bricks can be dragged and dropped on top of the existing ones replacing the standard bricks. The bricks used here are half high and half tall square bricks, centered.

Clone it and play around.

**Instructions**

1. Select a brick from the standard bricks or create your own custom brick.

2. Click and drag it to the brick in the first position in**My Bricks**until that brick turns gray.

3. Release.

4. Repeat steps 1-3 for the brick in the second position in**My Bricks**.

**Learn. Enjoy. Share your permutation.**

This is a**clone** of fs Permutation IV

Last edited:

Created:

This whole

Clone it and play around.

1. Select a brick from the standard bricks or create your own custom brick.

2. Click and drag it to the brick in the first position in

3. Release.

4. Repeat steps 1-3 for the brick in the second position in

This is a

8.41
Click on the stars to rate this FontStruction.

Balanced Rating:**8.41**

Average Rating:**9.67**

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

Balanced Rating:

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

180446
Published: **17th November, 2019**

Last edited:**26th April, 2013**

Created:**26th April, 2013**

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a**clone** of fs Permutation III

Last edited:

Created:

Permutation: The act of changing the arrangement of a given number of elements.

One font, two different brick combinations.

Picking any two bricks from the 169 available gives a total possible combinations of 14196 (169C2) different fonts. Counting a certain kinds of bricks as one--all four 45degree, for instance--gives 36 unique bricks, resulting in 630 (36C2) unique combinations or fonts.

In this font, if the bricks are swapped with each other, the result will be a different font. Hence order of the bricks matter. In which case, nCr (combinations) is not the right choice. What's needed is nPr (permutations). 169P2 gives 28392 permutations and a 36P2 gives 1260 permutations.

So, at a minimum, 1260 fonts are possible with the current implementation of FontStruct, with just this particular layout of bricks.

Staggering.This is a