A rectangular garden measures 30 meters by 40 meters. A path of uniform width is built around it, increasing the total area to 1,800 square meters. What is the width of the path? - Redraw
How Unity in Design Shapes Outdoor Space: The Rectangular Garden Path Puzzle
How Unity in Design Shapes Outdoor Space: The Rectangular Garden Path Puzzle
Imagine stepping into a quiet, sun-drenched garden—30 meters by 40 meters—where carefully trimmed hedges and gentle curves guide the eye. Now picture a simple yet compelling redesign: a uniform path encircling this space, expanding its footprint to 1,800 square meters. Fans of efficient outdoor planning are increasingly drawn to this question: What width should the path be to achieve exactly this total area? Far from a trivial riddle, this calculation reflects a growing trend in thoughtful residential design—balancing beauty, function, and real-world constraints. Understanding how to solve it reveals deeper insights into spatial optimization that matters to US homeowners today.
Understanding the Context
Why This Garden Equation is Gaining Ground in the US
Smartly using outdoor space has become a priority for many American households, driven by rising interest in sustainability, mental well-being, and property value. Paths and green areas are no longer just decorative—they’re functional extensions of living areas. Current trends emphasize seamless integration between nature and home, encouraging precise calculations for enhancements that maximize utility and appeal. The rectangular garden + uniform path scenario reflects this broader movement: practical people are solving real-space puzzles to improve their yards with measurable outcomes.
Today’s digital search behavior—curious, mobile-first, focused on truth and clarity—fuels demand for definitive, evidence-based answers. Users scrolling through gardening apps, home improvement sites, and lifestyle blogs are drawn to this precise problem, seeking reliable, step-by-step clarity without fluff.
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Key Insights
How a Rectangular Garden with a Uniform Path Expands Area
Start with the base: the garden measures 30 meters wide by 40 meters long. Its original area is 1,200 square meters (30 × 40). Adding a path of uniform width x meters around all four sides transforms the full layout. This increases both length and width by twice the path width—new dimensions become (30 + 2x) meters and (40 + 2x) meters.
The total area then equals:
(30 + 2x)(40 + 2x) = 1,800
Expanding the expression:
1200 + 60x + 80x + 4x² = 1,800
Combine like terms:
4x² + 140x + 1,200 = 1,800
Subtract 1,800 from both sides:
4x² + 140x – 600 = 0
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Divide entire equation by 4 to simplify:
x² + 35x – 150 = 0
Now solve this quadratic using the quadratic formula:
x = [–35 ± √(35² + 4×150)] / 2
x = [–35 ± √(1,225 + 600)] / 2
x = [–35 ± √1,825] / 2
Approximating √1,825 ≈ 42.72, we get:
x = [–35 + 42.72]/2 ≈ 7.72 / 2 ≈ 3.86 meters
Or the negative root (not physically meaningful for width)
Thus, the uniform path width is approximately 3.86 meters, nearly a 4-meter buff-zone around this classic garden shape.
Common Questions About the Path Area Puzzle
H3: Why do differing math approaches sometimes yield conflicting results?
Accuracy depends on precise expansion and translation of variables. Common mistakes include misapplying the formula or arithmetic errors in combining terms. This formulaic method eliminates guesswork, offering reliable clarity.
H3: Can the path be too wide for typical gardens?
Yes. This calculated width (around 3.86 meters) may exceed typical residential construction space or groundshell limits, requiring recalibration based on property boundaries and budget.
H3: Is this value realistic for standard garden enlargement?
While mathematically correct, net gain must align with actual site constraints—fence lines, soil depth, irrigation, and existing features often demand practical adjustments.
