A rectangle has a length that is 3 times its width. If the perimeter of the rectangle is 64 units, find the dimensions of the rectangle. - Sterling Industries

Understanding the Context

How to Find the Dimensions: A Clear, Step-by-Step Explanation

To find the length and width of a rectangle where the length is three times the width and the perimeter is 64 units, begin with the basic formula for perimeter:

P = 2(length + width)
Let width = w, then length = 3w
Substitute:
64 = 2(3w + w) = 2(4w) = 8w
Solve:
w = 64 ÷ 8 = 8 units
Thus, length = 3 × 8 = 24 units

The dimensions are 8 units wide and 24 units long—a ratio that exemplifies proportional scaling useful in proportion-based design and real-world measurements.

Key Insights

While simple, this calculation reinforces key concepts: variables, substitution, and logical simplification—core skills in STEM learning and digital literacy now emphasized in US middle and high school curricula. For mobile users, mobile-optimized calculations and clear step breakdowns boost comprehension and dwell time.

People Often Ask: Common Questions About This Rectangle Puzzle

How do you set up the formula correctly?
Start by defining the width as w and expressing length as 3w. Plug these into the perimeter formula and solve step-by-step to avoid early mistakes.

Why use variables instead of just drawing?
Variables make it easier to model unknowns, especially in widths and perimeters that change frequently. It supports reusable logic across similar problems.

Does this apply beyond math class?
Absolutely—this ratio helps architects, designers, and homebuilders estimate material needs, optimize space, and calculate boundary distances in construction.

Final Thoughts

Can this formula adapt to any rectangle?
Yes, modifying the multi