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Solve for n. 3(n+6)≥3n+8 no solution all real numbers n≥7 n≥23

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Texv · Answer 1 · 2018-11-17T16:44:26+0000

3(n+6) ≥ 3n+8

Start by distributing....

3n + 18 ≥ 3n + 8

Subtract 3n from both sides to get the n's on the same side....

18 ≥ 8

There are no solutions because 18 is not less than or equal to 8

Muratoner · Answer 2 · 2018-11-21T02:28:04+0000

Answer:

The correct option is B) all real numbers.

Explanation:

Consider the provided inequity.

$3(n+6)\geq 3n+8$

We need to solve the inequity for n.

$3(n+6)\geq 3n+8$

$3n+18\geq 3n+8$

Subtract 3n from both sides

$3n-3n+18\geq 3n-3n+8$

$18\geq 8$

Which is true for any real number. As 18 is greater than 8.

Hence, the value of n is all real numbers.

Thus the correct option is B) all real numbers.

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