Question
Identify the image which is odd.
Hint:
A number which is not divisible by 2 is called an odd number.
The correct answer is: ![](data:image/png;base64,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)
Here, we have to select the figure which is odd.
Number of squares in the figure are 11, 4 , 18 and 2.
Clearly, 11 is not divisible by 2 i.e 1q is odd and the rest of the options have an even number of squares.
Hence, the correct option is (a) .
A number whose ones place digit is 1, 3, 5, 7 or 9 is not divisible by 2.
Related Questions to study
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