# Solution to the A Pattern of Squares Puzzle +-- {.image} [[APatternofSquares.png:pic]] > A pattern of squares. All six coloured areas are equal. What fraction is shaded? =-- ## Solution by [[Area of a Square]] and [[Dissection]] +-- {.image} [[APatternofSquaresLabelled.png:pic]] =-- As every basic shape in the diagram is a square, the points labelled $A$, $B$, $C$, and $D$ where the re square meets the corner squares are the midpoints of the sides of the red square. The triangles $D K C$ and $D O C$ are [[congruent]] so they have the same area. Following this through for the other three pairs shows that the square $A B C D$ has half the area of $I J K L$. Since this is also true for the orange square, $A B C D$ and the orange square must be [[congruent]]. This means that the outer square is divided into a $3 \times 3$ pattern of smaller squares, each of the size of the orange square. The area of the full square is therefore $9$ times that of a small square, and there are $6$ shaded regions, so $\frac{2}{3}$rds of the outer square is shaded.