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What value of (x) makes the vertical parts of the letter N parallel? ((3x + 9)) when (x = ?)

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Final Answer:

The value of (x) that makes the vertical parts of the letter N parallel is (1).

Step-by-step explanation:

In the context of the letter N, for its vertical parts to be parallel, the angles formed by the intersecting lines must be equal.

In this case, the expression (3x + 9) represents one of the angles.

To find the value of (x) for parallel vertical lines, set the expression equal to another vertical line expression or a constant.

So, (3x + 9 = k), where (k) is a constant representing the other vertical line. By solving for (x), we get (x = frac{k - 9}{3}).

For the vertical parts to be parallel, (k - 9) must be a multiple of 3, making (x) an integer.

Setting (k - 9) equal to 0 gives us (k = 9), so the value of (x) that makes the vertical parts of the letter N parallel is (1).

In summary, the correct value of (x) is (1) to ensure the vertical parts of the letter N are parallel.

User Ivan Vovk
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