Mathematics
Grade-2
Easy
Question
7 - 4 = ____
THINK 4 + ___ = 7
![](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 expression ![7 minus 4 equals _ _ _ _ _](data:image/png;base64,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)
So,
![7 minus 4 equals 3](data:image/png;base64,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)
For subtraction of two terms, both term should belong to same unit.