Mathematics
Grade-2
Easy
Question
Make 10 to subtract.
14 - 5 = ____
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)
- 8
- 2
- 5
- 9
Hint:
Subtraction is a fundamental arithmetic operation of mathematics.
The correct answer is: 9
Step 1 of 1:
We have given an expression ![10 minus 5 equals _ _ _ _](data:image/png;base64,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)
So,
10 - 5 =5
For subtraction of two terms, both term should belong to same unit.