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Find all pairs of consecutive even positive integers, both of which are larger than 5 such that their sum is less than 23
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Answer:
Let x be the smaller of the two consecutive even positive integers .
Then the other integer is x+2.
Since both the integers are larger than 5,x>5 ....(1)
Also the sum of the two integers is less than 23.
x+(x+2)<23
⇒2x+2<23
⇒2x<23−2
⇒2x<21
⇒x<
2
21
⇒x<10.5....(2)
From (1) and (2) we obtain 5<x<10.5.
Since x is an even number, x can take the values 6,8 and 10.
Thus the required possible pairs are (6,8),(8,10) and (10,12).
Step-by-step explanation:
:D
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