Mathematics
Grade-2
Easy
Question
12 - 9 = ____
THINK 9 + ___ = 12
![](data:image/png;base64,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)
- 0
- 1
- 2
- 3
Hint:
Subtraction is a fundamental arithmetic operation of mathematics.
The correct answer is: 3
Step 1 of 1:
We have given an equation ![12 minus 9 equals _ _ _ _ _](data:image/png;base64,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)
So,
12 - 9 = 3
For subtraction of two terms, both term should belong to same unit.