Yes, yo mama can
Yes, all you do is put them together and then the surrounding pieces will make the other side!
It appears to have 5 squares on one side. Each of the squares has 5 dots, like a dice. The 5 squares form a cross. Around the edge of the coin, it says 'REPVBLICA- PORTVGVESA' (Republic of Portugal), with the date at the bottom. The other side of the coin has 5 wheat bushels, with ' 1 ESCVDO' above them. The coin is bronze and roughly the size of a quarter.
You arrange 12 toothpicks into a large square, subdivided into four squares : 2 toothpicks on each side and four more, one each from the middle of the sides to the center of the large square. Now you have four (small) squares. Take away 2 adjacent toothpicks from the ones in the center, and you have 2 squares : one remaining small one and the large one that has the small one inside it. (see related link)
So whats the question? If i had 5 squares remove 3 lines to make 4 squares but keep the 3 lines within the 4 squares what?
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It can be any rectangle having a combination of width and length that, when multiplied together, yield a product of 100 squares. The rectangle could be 1 square wide and 100 squares long, or 5 squares wide and 20 squares long, or it could be a plane square with 10 squares wide on each side.
You could make 5 rectangles with 10 squares
There are 204 squares on a traditional checker. There are 64, 1 by 1 squares There are 49, 2 by 2 squares There are 36, 3 by 3 squares There are 25, 4 by 4 squares There are 16, 5 by 5 squares There are 9, 6 by 6 squares There are 4, 7 by 7 squares There is 1, 8 by 8 square To get this all you do is take the center of each square and count down on the board that many squares you can make. The number will be the same for the other side. then you multiply those numbers to get that many squares for that size square.
It depends on the 5 shapes. If they are all identical squares (with sides of length s), then simply lay them side by side and you will get a (s by 5s) rectangle.
You can make 12 different shapes (counting flips) with 5 squares set orthogonally (not diagonally). These are called pentominos.
To find the area of joined squares, add up the area of each individual square. For instance, I have a square with a side length of 5 attached to another square with a side length of 2 A = 52 + 22 = 25 + 4 = 29 units2
The numbers to the side and top indicate how many black squares there are in the row. Each number has at least one white space in between it and the next number. For instance, if the numbers are 3, 5, and 7, you will first have a group of three black squares, one or more white squares, next a group of 5 black squares, one or more white squares, and 7 black squares. The black squares can be right next to the edge or there can be several white squares between the edge and the first or last set of black squares. I hope this helps!