The length of a rectangle is 2 more than 3 times the width. If the perimeter is 100 meters, what is the width of the rectangle?

So lets say the width of the rectangle is "x". This would make the length "3x+2".

The perimeter formula of a rectangle is P=2Length + 2width, so applying that to the problem:

100=2(x) + 2(3x+2)

Solving for x would give you x=12.

Since x is the width, the answer would be 12.

I hope this helps!

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ColinJacobus ColinJacobus · Answer 2 · 2019-07-19T13:52:46+02:00

Answer: The required width of the given rectangle is 12 meters.

Step-by-step explanation: Given that the length of a rectangle is 2 more than three times the width and the perimeter is 100 meters.

We are to find the width of the rectangle.

Let w meters represents the width of the given rectangle.

Then, the length of the rectangle will be (3w + 2) meters.

According to the given information, we have

[tex]Perimeter=100\\\\\Rightarrow 2\{(3w+2)+w\}=100\\\\\Rightarrow 2(3w+2+w)=100\\\\\Rightarrow 4w+2=50\\\\\Rightarrow 4w=50-2\\\\\Rightarrow 4w=48\\\\\Rightarrow w=\dfrac{48}{4}\\\\\Rightarrow w=12.[/tex]

Thus, the required width of the given rectangle is 12 meters.