Mathematics
Grade-4-
Easy
Question
The factors of both 6 and 15 are _____.
- 9
- 5
- 6
- 3
Hint:
In the given question, we are required to find the factors of both 6 and 15. Factor of a number is a number that divides the given number completely without leaving any remainder. Hence, in the given question, we find the factors of 6 and 15 individually and get the common factor.
The correct answer is: 3
Step by step solution:
6 = 2 x 3 = 1 x 6
So, factors of 6 are 1, 2, 3, 6
15 = 3 x 5 = 1 x 15
So, factors of 15 are 1, 3, 5, 15
Thus, the common factor to both 6 and 15 is 3.
Hence, option(c) is the correct option.
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Identify the factor pair of 28.
![](data:image/png;base64,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)
MathematicsGrade-4-
Mathematics
________ is a factor of 12.
________ is a factor of 12.
MathematicsGrade-4-
Mathematics
Find the set of numbers that shows all the factors of 15.
Find the set of numbers that shows all the factors of 15.
MathematicsGrade-4-
Mathematics
Identify the number which is not a factor of 12.
Identify the number which is not a factor of 12.
MathematicsGrade-4-
Mathematics
Ayaan arranged 36 shells in an array. Identify the array he used.
Ayaan arranged 36 shells in an array. Identify the array he used.
MathematicsGrade-4-
Mathematics
______ is a factor of 36.
______ is a factor of 36.
MathematicsGrade-4-
Mathematics
Identify the factor pair of 48.
Identify the factor pair of 48.
MathematicsGrade-4-
Mathematics
Identify the factors pair of 6.
![](data:image/png;base64,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)
Identify the factors pair of 6.
![](data:image/png;base64,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)
MathematicsGrade-4-
Mathematics
Identify the factor of 12.
Identify the factor of 12.
MathematicsGrade-4-