Question
One number makes both the equations true. Find the missing number.
⎕ + 37 = 48
48 + ⎕ = 59
- 10
- 11
- 12
- 15
Hint:
The addition is one of the fundamental operations of Mathematics.
The correct answer is: 11
To solve it, add ones and tens.
If the missing number is 11, then it makes both the equations true.
So, 11 + 37 = 48 and 48 + 11 = 59.
For adding two terms, both terms should belong to same quantity
Related Questions to study
Find the numbers in place A, B, and C.
![](data:image/png;base64,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)
For adding two terms, both terms should belong to the same unit.
Find the numbers in place A, B, and C.
![](data:image/png;base64,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)
For adding two terms, both terms should belong to the same unit.
A new office and house were built in a town. 24 windows are needed for the office. 18 windows are needed for the house. How many windows are needed in all?
For the addition of two terms, both terms should belong to the same quantity.
A new office and house were built in a town. 24 windows are needed for the office. 18 windows are needed for the house. How many windows are needed in all?
For the addition of two terms, both terms should belong to the same quantity.
Joe has 25 apples. He buys 16 more apples. How many apples does Joe have now?
For Addition to two terms, they should belong to the same unit.
Joe has 25 apples. He buys 16 more apples. How many apples does Joe have now?
For Addition to two terms, they should belong to the same unit.
There are 38 blue fish in the pond. There are also 29 golden fish in the pond? How many fish are in the pond?
For Adding two terms, we have to check they belongs to same units or not.
There are 38 blue fish in the pond. There are also 29 golden fish in the pond? How many fish are in the pond?
For Adding two terms, we have to check they belongs to same units or not.