Rectangular Garden Dimensions: Solving for Length and Width with a 54-Meter Perimeter

Designing a rectangular garden isn’t just about aesthetics—it’s about getting precise measurements to make the most of your space. If you’re planning a garden where the length is 3 meters more than twice the width and the total perimeter is 54 meters, this SEO-friendly article explains how to calculate the exact dimensions using basic algebra and geometry.

Understanding the Relationship Between Length and Width

Understanding the Context

Let the width of the garden be represented by $ W $ (in meters). According to the problem, the length $ L $ is defined as:

$$
L = 2W + 3
$$

This relationship sets up a clear algebraic link between the two key dimensions of your rectangular garden.

Using the Perimeter Formula

Solved: The length of a rectangular garden is three feet less than ...

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SOLVED: #10. The length of a rectangular garden is 8 feet longer than ...
[Solved] The length of a rectangular garden is three feet less than ...

Key Insights

The perimeter $ P $ of a rectangle is calculated with the formula:

$$
P = 2 \ imes (\ ext{Length} + \ ext{Width})
$$

Substituting the known perimeter (54 meters) and the expression for $ L $, we get:

$$
54 = 2 \ imes (L + W)
$$

$$
54 = 2 \ imes ((2W + 3) + W)
$$

Continue Reading

A glaciologist is using remote sensing data to model glacier melt over time. The rate of change in glacier volume is represented by \( g(t) = t^3 - 4t^2 + 4t \). Determine the critical points where the volume change rate is zero.
To find the critical points, we compute the derivative \( g'(t) \) and set it to zero.
g(t) = t^3 - 4t^2 + 4t

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Final Thoughts

Simplify the expression inside the parentheses:

$$
54 = 2 \ imes (3W + 3)
$$

$$
54 = 6W + 6
$$

Solving for Width $ W $

Subtract 6 from both sides:

$$
48 = 6W
$$

Divide by 6:

$$
W = 8 \ ext{ meters}
$$

Calculating the Length $ L $

Now substitute $ W = 8 $ into the length formula: