Mathematics
Grade-2
Easy
Question
9 - 7 = ____
THINK 7 + ___ = 9
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)
- 0
- 1
- 2
- 3
Hint:
Subtraction is a fundamental operation of mathematics.
The correct answer is: 2
Step 1 of 1:
We have given an equation ![9 minus 7 equals _ _ _ _ _](data:image/png;base64,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)
So,
9 - 7 = 2
For subtraction of both quantities, both quantities should have the same unit.