D2=l2+w2
Diagonal of a rectangle or square = square root of ( length2 + width2 )
You can't. Suppose for instance your rectangle is 1xA, then the diagonal length is sqrt(1+A**2). But if your rectangle is sqrt(A)xsqrt(A) then your diagonal length is sqrt(2*A). The only thing one can say for sure is that the diagonal length is at least sqrt(2*A).
a swimming pool is 60 ft x 170 ft x 40 ft x 150 ft; what is the distance to swim across the pool from one corner to the other corner?
you find the length and width by counting the numbers on the side to find the width and counting the numbers going across to find the length
"Perimeter" means the distance around something. Just add the four sides of the rectangle.
pi is the ratio of a circle's diameter (the distance across it) to its circumference (the distance around it).
Measure the rectangle, multiply the sides. Measure the hole, find the area. Subtract circle from rectangle.# 5x6 rectangle. 5*6 = 30 # Circle is 3 inches across, 3.14*(3/2)2 = 7.065 # 30-7.065 = 22.935
The length of a rectangle is twice its width. If the perimeter of the rectangle is , find its area.
the length of a rectangle is 5 more then the width. Find the perimeter and the area of the rectangle
The land you are measuring is probably a rectangle, find the length of 2 sides (that are not directly across from each other) and then multiply them.
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!
In order to answer that, you would need to know the configuration of the path, that is, where it goes. Does it provide a route down the center of the lawn's length ? Does it cut across the lawn's breadth ? Does it connect one corner of the lawn diagonally to the opposite corner ? Perhaps the path is immediately adjacent to the outline of the lawn, and takes you completely around it. In that case, the path is simply a long rectangle that has been bent into four straight segments and laid along the lawn's outer edge. If the rectangle were reassembled by laying the four segments straight in line again, it would be 2m wide, and equal in length to the distance around the lawn (the perimeter). Surely you would have no trouble calculating the area of that long narrow rectangle, if that were the path's configuration.