Mathematics
Grade-1
Easy
Question
Count the gifts by 10s.
![](data:image/png;base64,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)
- 50
- 100
- 40
- 80
Hint:
10s means adding ten to previous number or jump by 10.
The correct answer is: 50
Here, we have to count the gifts by 10s.
Number of groups = 5 .
Starting count from 10 by 10s = 10 , 20 , 30 , 40 , 50 .
So, the total number of gifts = 50.
Hence, the correct option is (c).
Counting means to indicate or name by units or groups so as to find the total number of units involved.