Question
Choose the even number.
Hint:
In this question, we have to find the option with even number of object. As we know that even number is the number divisible by 2 i.e. has 0, 2, 4, 6 and 8 in its ones place where as odd numbers are the numbers that are not divisible by 2 i.e. has 1, 3, 5, 7 and 9 in its ones place. Further we will every option, for example, considering option (D) it has 9 objects and 9 is odd so this option is wrong. similarly we will check every other option to find which is correct.
The correct answer is: ![](data:image/png;base64,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)
Option (A) contains 4 objects and 4 is an even number. Rest of the options have an odd number of objects.
Related Questions to study
Identify the odd number in the given images.
Identify the odd number in the given images.
Count the number of butterflies present in the image and write if it is odd or even?
Count the number of butterflies present in the image and write if it is odd or even?
All even numbers end in _______, ______, _____, _______ or ______.
All even numbers end in _______, ______, _____, _______ or ______.
Add one odd number and even number.
6 + 7 = _____
Add one odd number and even number.
6 + 7 = _____
Choose the even number.
Choose the even number.
Identify the image which is even.
Identify the image which is even.
3 Choose the odd number.
3 Choose the odd number.
Write the biggest odd number from 11 to 19.
Write the biggest odd number from 11 to 19.
Select the odd one out.
Select the odd one out.
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.