Mathematics
Grade-2
Easy
Question
Add using a hundred chart.
___ = 89 + 11.
- 91
- 100
- 81
- 95
Hint:
Add the numbers and try to visualize them on the hundred chart.
The correct answer is: 100
100 = 89 + 11.
![](data:image/png;base64,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)
Avoid making any calculation errors while adding.