Mathematics
Grade-2
Easy
Question
6 - 5 = ____
THINK 5 + ___ = 6
![](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 ![6 minus 5 equals _ _ _ _ _ _ _](data:image/png;base64,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)
So,
6 - 5 = 1
For subtraction of both quantities, both quantities should have the same unit.