SOLUTION: One-sixth of the smallest of three consecutive even integers is three less than one-tenth the sum of the other even integers. Find the integers.
1/6x +3 = 1/10 (x+2)+(x+4)
1/6x
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1/6x +3 = 1/10 (x+2)+(x+4)
1/6x
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Question 214750: One-sixth of the smallest of three consecutive even integers is three less than one-tenth the sum of the other even integers. Find the integers.
1/6x +3 = 1/10 (x+2)+(x+4)
1/6x +3 = 1/10 (2x+6)
1/6x +3 -3 = 1/10 (2x+3)
here is where I lose it, do not understand what to do with the fractions. Answer by drj(1380) (Show Source):
You can put this solution on YOUR website! One-sixth of the smallest of three consecutive even integers is three less than one-tenth the sum of the other even integers. Find the integers.
Step 1. Let x be an even integer, x+2 and x+4 be the next two consecutive integers.
Step 2. x+2+x+4 is the sum of the two even integers or 2x+6
Step 3. (2x+6)/10 is one-tenth of the sum of the other even integers.
Step 4. x/6 is one-sixth of the smallest even itneger
Step 5. as given by the problem statement.
Step 6 Multiply 60 to both sides of the equation to get rid of the fractions.
Add 144-10x to both sides
Step 7. The numbers are 72, 74 and 76.
I hope the above steps were helpful.
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