ABCD is a square and E is the midpoint of CD. Find the ratio of unshaded point to that of shaded region.
1:3
3:1
2:1
1:2
1:4
Let the side length of square be `x'. Area of ΔBEC =x24 Area of unshaded region = 34x2 Ratio = 3:1
ABCD is a square. E, F, G, H are the midpoints of their respective sides. Find the ratio of shaded region to that unshaded region.
If ABCD is a square and E is the midpoint of BC, then find the ratio of area of △ ABE to that of ABCD.