A rectangular field has a length that is twice its width. If the perimeter of the field is 180 meters, what is the width of the field? - Sterling Industries
A rectangular field has a length that is twice its width. If the perimeter of the field is 180 meters, what is the width of the field?
A rectangular field has a length that is twice its width. If the perimeter of the field is 180 meters, what is the width of the field?
In a world increasingly focused on spatial design, efficient land use, and mathematical clarity, one question quietly sparks widespread interest: a rectangular field has a length that is twice its width, and the perimeter measures 180 meters. How wide is the field? This is more than a basic geometry problem—it reflects a growing trend in urban planning, agriculture, and even real estate, where precise measurements drive decisions. Whether you’re managing farm expansion, designing community spaces, or analyzing land efficiency, understanding how to calculate dimensions helps solve real-world challenges.
Why is a rectangle with length twice the width generating attention now? In an era of sustainable development and optimized land usage, such proportional relationships reveal practical insights into space efficiency and structural predictability. Modern surveys, architectural planning, and data-driven farming rely on accurate dimensions to maximize output while minimizing waste—making this simple problem a gateway to deeper understanding.
Understanding the Context
A rectangular field has a length that is twice its width. If the perimeter of the field is 180 meters, what is the width of the field? The solution combines algebra with standard geometry formulas. Start with the perimeter formula for a rectangle:
P = 2(length + width).
Since length = 2 × width, substitute:
P = 2(2w + w) = 2(3w) = 6w.
Set equal to 180 meters:
6w = 180 → w = 180 ÷ 6 = 30.
Thus, the width is 30 meters.
While the math is straightforward, real-world application requires careful consideration. A width of 30 meters with length 60 meters results in a perimeter of 180 meters, perfectly matching the given value. This kind of proportional layout is common in farm plots, sports fields, and recreational areas, where balance between width and length supports accessibility and usability.
Common questions arise: How does this relate to land pricing trends? Why do agricultural developers favor rectangular plots? Studies show uniform, rectangular fields optimize irrigation, fencing efficiency, and equipment routing—factors that reduce long-term costs. In urban environments, these proportions simplify design and maximize usable space without unnecessary fencing or pathways.
Key Insights
Opportunities and considerations lie in balancing precision with real-world variables. Actual dimensions
