![]() ![]() G of regular shaped bodies than the complicated or multi-shaped bodies.Īlthough this experiment concentrated on regular shapes, it is suggested that even the centre of gravity of irregular bodies can be determined in the same way only that more tasks are carried out. Gs.įrom the above observations it is clear that it is very easy to determine the centre of gravity of any given body of any shape. of each rectangle an extra point is determined by bisecting the point between the C. This required more mathematical calculation since apart from getting the C. of this circle.Ī different scenario involved a T-shaped shape involving two rectangles. The interception of these two diameters will form the C. G of a circle you just need to draw two diameters from two different points of the circle. G it was much easier than a combination of two shapes. It was indentified that, when a single shape is used to determine its’ C. This will be shown in the diagrams above. Similarly or the other shapes employed this method of bisecting and finding the point of interception of the bisectors. The point of inception, halfway of the two 14.5 cm diagonals formed the point of equilibrium of this rectangle. To determine the point of equilibrium of rectangle measuring 12 cm by 8 cm, two diagonals were drawn from vertices of the rectangle. Where these two diameters intercepted it was regarded the point of equilibrium. G of a circle, two diameters were drawn from different points of the circle. G points.įor instance, to determine the C. ![]() Calculations were carried out to determine the C. It was observed that, Centre of gravity of these shapes laid a point midway the objects.
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