Mathematics
Grade-2
Easy
Question
6 - 4 = ____
THINK 4 + ___ = 6
![](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: 2
Step 1 of 1:
We have given an equation ![6 minus 4 equals _ _ _ _ _](data:image/png;base64,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)
So,
6 - 4 = 2
For subtraction of two terms, both term should belong to same unit.