Mathematics
Grade-1
Easy
Question
Total fingers = _____.
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)
- 60
- 40
- 30
- 20
Hint:
Multiplication is a method of finding the product of two or more numbers.
The correct answer is: 30
Here, we have to find the number of fingers.
Total number of hands = 6.
Number of fingers in a hand = 5.
So, total number of fingers = 6×5 = 30.
Hence, the correct option is C.
Multiplication is repetitive addition. So, we can also count the number of fingers in the given figure.