Mathematics
Grade-2
Easy
Question
11 - 10 = _______
THINK 10 + _______ = 11
![](data:image/png;base64,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)
- 0
- 1
- 2
- 3
Hint:
Subtraction is a fundamental operation of mathematics.
The correct answer is: 1
Step 1 of 1:
We have given ![11 minus 10 equals _ _ _ _ _ _](data:image/png;base64,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)
So,
11 –10 = 1
For subtraction of two quantities, both quantities should have the same units.