2 Answers

Manish Thakur · Answer 1 · 2022-08-07T20:09:30+0000

Answer:

11, 13, 15

B) 6x + 16 = 82

Note: I just kept my wrong approach.

Explanation:

Let first define an odd integer.

Considering
$x\in\mathbb{Z}: 2k+1$ ,
is an odd integer.

Now, three consecutive odd integers are
a_1 = 2k+1 ,
a_2 = 2k+3 and
a_3 = 2k+5

The sum of the first, two times the second and three times the third can be written as

a_1 + 2a_2 + 3a_3 = 2k+1 + 2(2k+3)+3(2k+5)

Expanding and simplifying

2k+1 + 2(2k+3)+3(2k+5) = 2k+1 +4k+6+6k+15 = 12k+22

This is what I have done initially, but considering
to be an odd integer, three consecutive integers can be written as

x, x+2, x+4 such that
$x\in\mathbb{Z}: 2k+1$

Therefore,

$x+2(x+2)+3(x+4)=82 \implies x+2x+4+3x+12 = 82 \implies 6x+16 = 82$

and
$6x+16 = 82 \implies 6x = 66 \implies x = 11$

The three consecutive odd integers such that the sum of the first, two times the second and three times the third is 82 are
11, 13, 15

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