A rectangle has a length of 15 cm and a width of 10 cm. If both dimensions are increased by 20%, what is the new area? - IQnection

Understanding the Context

Why This Rectangle Matters in Everyday Life

A rectangle with these exact dimensions often appears in product design, packaging, and classroom projects—common touchstones across homes and offices in the US. Its proportions offer balance: 15 by 10 cm is a practical size for items like notebook covers, display boards, or modular furniture components. When both sides grow by 20%, the change reflects real-world growth in manufacturing, material costs, and consumer expectations—especially as users seek scalable solutions.

Even beyond its shape, this rectangle becomes a model for understanding percentage growth in tangible terms. Whether calculating space for a shelf, estimating fabric needs, or analyzing digital layouts, knowing how area evolves supports smarter decisions. With millions engaging mobile, precise answers like this empower daily problem-solving.

Key Insights

How Increasing Both Dimensions Affects Area

To understand the new area, start with the original calculation. Multiply length by width: 15 cm × 10 cm = 150 cm². When each dimension grows by 20%, their values become:

• Length: 15 × 1.2 = 18 cm
• Width: 10 × 1.2 = 12 cm

Now, compute the new area: 18 × 12 = 216 cm². This almost 45% increase from 150 cm² shows how compounding affects area—doubling one dimension alone would double area, but growing both amplifies the effect beyond linear expectations.

Final Thoughts

Common Questions and Clarifications

Q: If both dimensions increase by 20%, what exactly changes?
A: Every linear measurement grows 20%, which multiplies the area by 1.2 × 1.2 = 1.44. Thus, total area expands by 44%—a predictable yet impactful shift relevant for planning and cost estimation.

Q: Can this model apply beyond physical objects?
A: Yes. In digital design, applications, marketing spaces, and workflow layouts, growing proportional elements maintains harmony and scale. Tracking these changes helps teams align designs with evolving user needs.

Q: Does this apply only to rectangles, or can other shapes follow similar patterns?
A: While this rectangle offers a clear example, similar percentage-based area growth applies to all parallelograms and rectangular forms. Understanding spreads beyond form types.

Opportunities and Realistic Expectations