The least number of squares that must be added so that the line P-Q becomes the line of symmetry is
The least number of squares that must be added so that the line P-Q becomes the line of symmetry is
Show Hint
- 4
- 3
- 6
- 7
The Correct Option is C
Solution and Explanation
Step 1: Analyze the initial figure.
The figure consists of several squares arranged around the line P-Q. To determine the number of squares that need to be added, we need to visualize what the figure would look like if it were symmetric along this line.
Step 2: Apply the concept of symmetry.
Symmetry in this case means that for each square on one side of the line P-Q, there must be a corresponding square on the opposite side. In this case, the figure is asymmetric along the line P-Q, which means that squares are missing on one side of the line.
Step 3: Determine the missing squares.
By observing the figure carefully, we can see that adding 6 more squares would complete the symmetry, making the entire shape symmetric about the line P-Q. Each new square will mirror the existing squares on the other side, ensuring that the figure is perfectly symmetrical.
Thus, the least number of squares to be added is 6.
Therefore, the correct answer is option (C).
Final Answer: 6
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