Question
Select the odd one out.
Hint:
Even numbers are numbers which have 0, 2, 4, 6 and 8 in its ones place where as odd numbers are numbers which have 1, 3, 5, 7 and 9 in its ones place. Now we can easily count the numbers in each option and check weather its odd number or even number. As only one option has odd number and rest has even number.
The correct answer is: ![](data:image/png;base64,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)
Option (B) contains 3 objects and 3 is an odd number. Rest of the options have an even number of objects.
Related Questions to study
Select the odd one out.
Select the odd one out.
Add two even numbers.
4 + 4 = ______
Add two even numbers.
4 + 4 = ______
The numbers which has 3 in their ones place is _______.
The numbers which has 3 in their ones place is _______.
Identify the image which is odd.
Identify the image which is odd.
Write the even numbers before 5.
Write the even numbers before 5.
Select the odd one out.
Select the odd one out.
Count the number of triangles present in the image and write if it is odd or even?
Count the number of triangles present in the image and write if it is odd or even?
The numbers which has 6 in their ones place is _______.
The numbers which has 6 in their ones place is _______.
Choose an even number of fruits.
Choose an even number of fruits.