Question
Select the even number of squares.
Hint:
A number divisible by 2 is called an even number.
The correct answer is: ![](data:image/png;base64,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)
Here, we have to select the figure which has even number of squares.
Number of squares in the figure are 3,4,7 and 9 .
Clearly, only 14 is divisible by 2 i.e 14 is even
Hence, the correct option is (b).
A number whose ones place digit is 2, 4, 6 , 8 or 0 is divisible by 2.
Related Questions to study
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.
Choose the odd number from the images.
Choose the odd number from the images.
Choose one image which is odd.
Choose one image which is odd.
Choose the even number.
Choose the even number.
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.