Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Why did Archimedes carve a serious pompon on his tombstone? This is because among his many scientific discoveries, the help to the pompom shop is the most satisfactory. For example, a cylindrical fluffy ball is a small ball placed in a cylindrical container and covered with a cover. The ball is closely connected with the upper and lower surfaces and sides of the language column. Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Why did Archimedes carve a serious pompon on his tombstone? This is because among his many scientific discoveries, he is most satisfied with helping the pompom shop. As shown in the figure, the cylindrical velvet ball is a ball, which is placed in a cylindrical container and covered with a cover, and the ball is just in close contact with the upper and lower bottom surfaces and sides of the language column. As the picture shows, Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Why did Archimedes want to carve a serious pompon on his tombstone? This is because among his many scientific discoveries, he is most satisfied with helping the pompom shop. As shown in the figure, the cylindrical velvet ball is a ball, which is placed in a cylindrical container and covered with a cover, and the ball is just in close contact with the upper and lower bottom surfaces and sides of the language column. As the picture shows, Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Why did Archimedes carve a serious pompon on his tombstone? This is because among his many scientific discoveries, he is most satisfied with helping the pompom shop. As shown in the figure, the cylindrical velvet ball is a ball, which is placed in a cylindrical container and covered with a cover, and the ball is in close contact with the upper and lower bottom surfaces and sides of the language column. As shown in the figure, when the diameter of the auxiliary ball is equal to the height and bottom diameter of the cylinder, assuming that the radius of the bottom surface of the cylinder is two, the serious volume is that the note is equal to the square of two beats, and r is equal to the square of two factions. Archimedes discovered and proved that the volume formula of the ball is that the microsphere is equal to four-thirds of the cube of the two factions, so the unpaid ball is equal to two-thirds to enclose several units. The volume of the ball is just R. Archimedes, a famous mathematician in ancient Greece, is one of the most outstanding mathematicians in history. According to his last wish, people carved a geometric figure of a cylindrical pompon on his tombstone. Why did Archimedes carve a serious pompon on his tombstone? This is because among his many scientific discoveries, he is most satisfied with helping the pompom shop. As shown in the figure, the cylindrical velvet ball is a ball, which is placed in a cylindrical container and covered with a cover, and the ball is just in close contact with the upper and lower bottom surfaces and sides of the language column. As shown in the figure, when the cylinder holds a ball, the diameter of the ball is equal to the height of the cylinder and the diameter of the bottom surface. Assuming that the radius of the bottom of the cylinder is two, then the serious volume is that the note is equal to the square of pie 2 multiplied by 2r, which is equal to the square of pie 2. Archimedes discovered and proved that the volume formula of the sphere is that the microsphere is equal to 4/3 of pie 2, so the microsphere is equal to 2/3, that is to say, the volume of the sphere is exactly 2/3 of the cylinder. Archimedes also found it wrong to be a hostess.