Draw a straight line from opposite corners. Where the lines cross is the centre.
In both cases, because of their symmetry, the center of gravity is in the geometric center.
centre it and that is the answer
You either need to find the area of the triangle and subtract it from that of the rectangle OR you find the areas of the bits of the rectangle that are outside the triangle and add them together. Without more details of the triangle, it is not possible to give a more detailed answer.
Just draw the two diagonals of the rectangle,the point of intersection you will get5,is the centre of gravityof rectangle
In the center, behind the rim.
In both cases, because of their symmetry, the center of gravity is in the geometric center.
Assume the room to be square or rectangle. The intersection of two lines from opposite corners is your center.
centre it and that is the answer
You either need to find the area of the triangle and subtract it from that of the rectangle OR you find the areas of the bits of the rectangle that are outside the triangle and add them together. Without more details of the triangle, it is not possible to give a more detailed answer.
Just draw the two diagonals of the rectangle,the point of intersection you will get5,is the centre of gravityof rectangle
Yes. In 3 dimensions, a rectangle has 3 C2 axes perpendicular to each other and an inversion center at the center of the rectangle. There are also reflection planes along each of the C2 axes; this makes the point group of the rectangle D2h.
The length of a rectangle is twice its width. If the perimeter of the rectangle is , find its area.
all are unsatisfied
In the center, behind the rim.
the length of a rectangle is 5 more then the width. Find the perimeter and the area of the rectangle
To find a Square in a rectangle first you have to:Make sure the rectangle is Flat.Draw a line straight and exactly in the middle.There you have your two squares in your Rectangle!So just cut a Rectangle in half!
yes the centroid of the rectangle coincide with the intersection of the diagonals with the center of mass