Here we will use algebra to find three consecutive integers whose sum is 1998. We start by assigning X to the first integer. Since they are consecutive, it means that the 2nd number will be X + 1 and the 3rd number will be X + 2 and they should all add up to 1998. Therefore, you can write the equation as follows:
(X) + (X + 1) + (X + 2) = 1998
To solve for X, you first add the integers together and the X variables together. Then you subtract three from each side, followed by dividing by 3 on each side. Here is the work to show our math:
X + X + 1 + X + 2 = 1998
3X + 3 = 1998
3X + 3 - 3 = 1998 - 3
3X = 1995
3X/3 = 1995/3
X = 665
Which means that the first number is 665, the second number is 665 + 1 and the third number is 665 + 2. Therefore, three consecutive integers that add up to 1998 are 665, 666, and 667.
665 + 666 + 667 = 1998
We know our answer is correct because 665 + 666 + 667 equals 1998 as displayed above.
Three Consecutive Integers
Enter another number below to find what three consecutive integers add up to its sum.
What three consecutive integers have a sum of 1999?
Here is the next algebra problem we solved.
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