Question
Identify the image which is even.
Hint:
Even numbers are those number which is divisible by 2 .
The correct answer is: ![](data:image/png;base64,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)
Here, we have to select the image which has even number of squares are present.
Number of squares in the given images are 5 , 9 , 3 , and 16 .
Clearly 16 is divisible by 2 i.e 16 is even and rest of them are odd numbers.
Hence, the correct option is (d).
A number whose ones place digit is 2 , 4 , 6 , 8 , or 0 is divisible by 2.
Related Questions to study
Choose the odd number.
A number whose ones place digit is 1, 3 , 5 , 7 , or 9 is not divisible by 2.
Choose the odd number.
A number whose ones place digit is 1, 3 , 5 , 7 , or 9 is not divisible by 2.
Write the equation for this model.
The sum of any two odd number is always an even number.
Write the equation for this model.
The sum of any two odd number is always an even number.
Select the odd one out.
A number whose ones place digit is 1, 3 , 5 , 7 or 9 is not divisible by 2.
Select the odd one out.
A number whose ones place digit is 1, 3 , 5 , 7 or 9 is not divisible by 2.
Select the image where an odd number of squares are present.
A number whose ones place digit is 1,3,5,7,or 9 is not divisible by 2.
Select the image where an odd number of squares are present.
A number whose ones place digit is 1,3,5,7,or 9 is not divisible by 2.
Add two even numbers.
6 + 6 = ______
The sum of two even number is an even number.
Add two even numbers.
6 + 6 = ______
The sum of two even number is an even number.
Write the equation for this model.
A number whose ones place digit is 2 , 4 , 6 , 8 or 0 is divisible by 2.
Write the equation for this model.
A number whose ones place digit is 2 , 4 , 6 , 8 or 0 is divisible by 2.
Identify the image which is odd.
A number whose ones place digit is 1, 3, 5, 7 or 9 is not divisible by 2.
Identify the image which is odd.
A number whose ones place digit is 1, 3, 5, 7 or 9 is not divisible by 2.
Write the number of squares present in the model.
A number whose ones place digit is 1, 3, 5, 7 or 9 is not divisible by 2.
Write the number of squares present in the model.
A number whose ones place digit is 1, 3, 5, 7 or 9 is not divisible by 2.
Select the odd one out.
A number whose ones place digit is 2,4,6,8 or 0 is divisible by 2.
Select the odd one out.
A number whose ones place digit is 2,4,6,8 or 0 is divisible by 2.
Count the number of squares present in the image and write if it is odd or an even:
A number whose ones place digit is 2,4,6,8 or 0 is divisible by 2.
Count the number of squares present in the image and write if it is odd or an even:
A number whose ones place digit is 2,4,6,8 or 0 is divisible by 2.
Write the equation for this model.
Sum of an even number and an odd number is always odd likh do.
Write the equation for this model.
Sum of an even number and an odd number is always odd likh do.
Select the even number of squares.
A number whose ones place digit is 2, 4, 6 , 8 or 0 is divisible by 2.
Select the even number of squares.
A number whose ones place digit is 2, 4, 6 , 8 or 0 is divisible by 2.
Add two odd numbers.
5 + 5 = _____
Add two odd numbers.
5 + 5 = _____
Choose the even number.
Choose the even number.
All odd numbers end in _____, _____, _____, ______ or ______.
All odd numbers end in _____, _____, _____, ______ or ______.