If 12x12 is 144... There would be 144 tiles in a box right?
4*11=44 44 tiles
If 12x12 is 144... There would be 144 tiles in a box right?
Your answer depends on how many tiles come in each box. All brands of tile are different - your boxes may contain 5, 7, 10, 12, 15, or 18 tiles in each box. Do you mean to say your room is 117 SQUARE feet? If each tile measures 12" x 12" (or one foot by one foot), then each tile is one square foot. With this size of tile, the math is easy. You'd need 117 tiles. Check the labeling on your boxes, and do the math: 117 square feet divided by the number of tiles in each box. The result is the number of boxes you'll need.
It works with the removing of tiles in the box. Three to be exact. The tiles will then fit and the box is solved. That seems to be the best answer that can be found.
4*11=44 44 tiles
You need 27 Box of 9 tiles
You can fit four tiles exactly on each layer - so it depends on the height of the box and the height of the tiles !
Type your answer here... The sentence PROBABILITY IS FASCINATING is spelled out with Scrabble® tiles. The tiles are then scrambled and put into a box. You choose one at random. What is the probability that you'll draw out the letter A?
If the tiles are 12x12" you need 640 of them...if not, on the tile box it will tell you how many ft. you can do per box.
The number of boxes required is575/number of square feet covered by the tiles in one box .
According to the Junior Scrabble box - there are 101 letter tiles and 44 scoring chips and a 2 sided gameboard.
Depends on how many are in each box?
If these are one inch tiles you need 2160. If the tiles are 12 inch tiles you need 180.
* Calculate how many tiles you need to place for the required width. (Divide width of sideway by width of tile; round up if necessary.)* Calculate how many tiles you need to place for the required length. (Divide length of sideway by length of tile; round up if necessary.) * Multiply the number of tiles long, times the number of tiles wide. This gives you the number of required tiles. (Some additional adjustments may be required; not relevant for this problem.) Divide that by the number of tiles per box, to get the required number of boxes.
Depends on the size of the tiles.
If you can make a word, you can play all seven of your tiles in one turn.