Basic maths... 54 tiles in total !
You would need a total of 36 tiles to cover that area.
To calculate the total number of tiles needed to make a rectangle that is 4 tiles wide, you would need to consider the length of the rectangle as well. If the length of the rectangle is x tiles, then the total number of tiles needed would be 4 times x, which simplifies to 4x. Therefore, the number of tiles needed to make a rectangle that is 4 tiles wide would be 4 times the length of the rectangle.
You'll need a total of 192 16-inch tiles and have 3/4 of one tile left over.
The answer depends on how many letter tiles you have and which letters are on those tiles.
The word uses eight scrabble tiles.
[[[Same as Scrabble but the point values are different]]] The above statement appears incorrect. For instance Scrabble has four "S" tiles while Lexulous has only three, at least in the games I've played. Strangely, the answer doesn't appear anywhere on the Lexulous website and I've not taken the time to figure out the remainder of letters, so I cannot say anything more.
Lexulous was created on 2006-07-05.
100 total letter tiles.
You would need a total of 89 tiles (88.88 tiles exactly) with those measurements to cover that area.
Basic maths... 54 tiles in total !
12 tiles by 18 tiles or 216 tiles total
You would need a total of 36 tiles to cover that area.
I'm going to assume you mean "What is the total score of all scrabble tiles?" As there are 100 tiles in the bag. If you add up the value of all the tiles (12 E tiles, 9 A tiles, 9 I tiles... etc etc) you get a total of 187 points.
It would be 9 tiles wide by 12 tiles long. That gives you a total of 108 tiles.
57-60 ceiling tiles measuring 2'x4 would cover a 15'x30' ceiling. For the least amount of trimming, place 4 tiles at 4' (trimming 1') for a total of 15'. For the 30' side, it would take 15 tiles at 2' each for a total of 30'. 4 tiles wide x 15 tiles long = a total of 60 tiles. To use the minimum number of tiles, one could run the tiles the opposite direction, although this would involve more trimming. In this case, place 8 tiles at 4' (trimming 2' total) for a total of 30'. For the 15' side, place 8 tiles at 2' (trimming 1' total) for a total of 15'. If the cuts were precise, the end tiles (cut in half) could each be figured as 1/2, for a total of 57 pieces with no waste/scrap. A total of 64 tiles would be an ample amount to cover any miscuts, in most situations.
scrabble