Mathematics
Grade-2
Easy
Question
Which subtraction fact is related to the picture?
![](data:image/png;base64,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)
- 12 - 2 = 10
- 12- 3 = 10
- 12 - 3 = 9
- 13 - 3 = 10
Hint:
Subtraction is a fundamental arithmetic operation of mathematics.
The correct answer is: 12 - 3 = 9
Step 1 of 1:
We have given a figure
![](data:image/png;base64,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)
Here, it represents
12 - 3 = 9
For subtraction of two terms, both term should belong to same unit.