Question
Select the odd one out.
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 one.
Number of squares in the figure are 6 , 15 , 16 and 8 .
Clearly, 15 is different i.e 15 is odd and the rest of them are even number.
Hence, the correct option is (b).
A number whose ones place digit is 1, 3 , 5 , 7 or 9 is not divisible by 2.
Related Questions to study
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 ______.
Identify the odd number in the given images.
Identify the odd number in the given images.
Choose the even number.
Choose the even number.
Rachel ate 6 cupcakes and 4 ice-creams. Find out how many cupcakes and ice-creams she ate totally.
Rachel ate 6 cupcakes and 4 ice-creams. Find out how many cupcakes and ice-creams she ate totally.