Use them to form the edges of a cube.
12 signs of the zodiac
It begins in 12/8, switches to 6/8, back to 12/8, then 6/8, back to 12/8, then to 6/8 again, and ends in 12/8. The majority of the song is in the 12/8 time signature.
who is the famous author in region 12?
12?
12/7/1961
You can arrange them to make a cube.12 edges, 6 faces.
A square has 4 sides therefore 3 squares from 12 toothpicks will simply be three unconnected squares
7 squares is forty nine so you remove two toothpicks to make the digits 49
You make 3-D! Look... 6 squares in one cube and you can do that with toothpicks too!
bend 2 toothpicks at 90 degree angles and put them cornor to cornor
You can arrange them into a cube to make the 6 faces of the cube, and the 12 toothpicks making up the 12 edges of the cube.
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)
There are 12 ways to arrange 5 squares however i want to know what are the ways to do that! Can anybody help me too!!
Is this question supposed to have 12 toothpicks to make 4 squares and then move 3 toothpicks to make 3 equal sized squares? Answer depends on the restrictions. Just move 3 sticks from any square to form a straight vertical or horizontal line up of squares is one option if there is no restrictions other than the three resulting squares are equal sizes.
The net of a Platonic solid is a plane shape consisting of set of identical triangles, identical squares or identical pentagons - all of them regular - which can be folded into one of the five Platonic solids.Tetrahedron = 4 trianglesHexahedron = 6 squaresOctahedron = 8 trianglesDodecahedron = 12 pentagonsIcosahedron = 20 triangles.The net of a Platonic solid is a plane shape consisting of set of identical triangles, identical squares or identical pentagons - all of them regular - which can be folded into one of the five Platonic solids.Tetrahedron = 4 trianglesHexahedron = 6 squaresOctahedron = 8 trianglesDodecahedron = 12 pentagonsIcosahedron = 20 triangles.The net of a Platonic solid is a plane shape consisting of set of identical triangles, identical squares or identical pentagons - all of them regular - which can be folded into one of the five Platonic solids.Tetrahedron = 4 trianglesHexahedron = 6 squaresOctahedron = 8 trianglesDodecahedron = 12 pentagonsIcosahedron = 20 triangles.The net of a Platonic solid is a plane shape consisting of set of identical triangles, identical squares or identical pentagons - all of them regular - which can be folded into one of the five Platonic solids.Tetrahedron = 4 trianglesHexahedron = 6 squaresOctahedron = 8 trianglesDodecahedron = 12 pentagonsIcosahedron = 20 triangles.
Take two toothpicks that create an outside corner. Cross them like a + inside one of the remaining boxes. Count the new four smaller boxes inside it as 4, the one they are formed in as 5, and the two untouched boxes as 6 and 7. (The trick is to remember to count the larger box the 4 are formed in.)
Fuor toothpicks from 16 leave 12 which, by coincidence (?) is exactly enough for four equilateral triangles!