sum of three consecutive multiples of 6 is 396 find the multiples of 6
Answers
Answered by
1
Answer:
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Step-by-step explanation:
Answered by
1
Answer :
The multiples are
- 126
- 132
- 138
Step-by-step explanation :
To Find,
- The multiples
Solution,
Given that,
- The sum of three consecutive multiples of 6 is 396
Let us assume,
- First multiple = x
- Second multiple = x + 6
- Third multiple = x + 12
Therefore,
➮ x + x + 6 + x + 12 = 396
➮ 3x + 18 = 396
➮ 3x = 396 - 18
➮ 3x = 378
➮ x = 378 / 3
➮ x = 126 ★
Hence, the value of x is 126.
Therefore, the multiples are,
1st multiple = x
➮ x
➮ 126 ★
2nd multiple = x + 6
➮ x + 6
➮ 126 + 6
➮ 132 ★
3rd multiple = x + 12
➮ x + 12
➮ 126 + 12
➮ 138 ★
Hence, the multiples are 126, 132 and 138.
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