Mathematics
Grade-2
Easy
Question
13 - 10 = ____
THINK 10 + ___ = 13
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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 ![13 minus 10 equals _ _ _ _ _](data:image/png;base64,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)
So,
13 - 10 =3
For subtraction of two terms, both terms should belong to the same unit.