Question
Identify the odd number in the given images.
Hint:
All the given options show a pair of items except option d.
The correct answer is: ![](data:image/png;base64,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)
TO FIND-
Odd numbers from the given images
SOLUTION-
We observe from the given options that all the images are a set of 2 dots (options a, b and c)-
Option a: 4 pairs of 2 dots each.
Option b: 1 pair of 2 dots each
Option c: 3 pairs of 2 dots each
However, in option d-
![](data:image/png;base64,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)
There are 3 pairs of 2 shoes each and a single shoe, making the total of 7 shoes and 7 is an odd number. The rest of the options have an even number of objects.
Hence, option d is the odd one out of the given options.
FINAL ANSWER-
Option 'd' is the correct answer to the given question.
Related Questions to study
Add one even number and odd number.
6 + 7 = _____
The sum of an even number and an odd number is an odd number.
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6 + 7 = _____
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Write the number of squares present in the model.
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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.
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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.