2の係数で拡大すると、各寸法が2倍になります。したがって、新しい寸法は20cm、10cm、16cmです。 - Abbey Badges
SEO-Optimized Article: Understanding How Scaling by a 2 Coefficient Doubles Each Dimension
SEO-Optimized Article: Understanding How Scaling by a 2 Coefficient Doubles Each Dimension
When working in design, architecture, or manufacturing, scaling models or designs by a coefficient of 2 is a common technique to upscale dimensions efficiently. Let’s explore how this works and why new dimensions triple in size with doubling in scale.
How Scaling with a 2 Coefficient Works
Scaling by a coefficient of 2 means every linear measurement—height, width, depth—is multiplied by 2. For example, if the original dimensions are X, Y, and Z, the new dimensions after scaling become 2X, 2Y, and 2Z. This straightforward multiplication results in each physical parameter doubling exactly.
Understanding the Context
However, a frequent misconception arises when interpreters describe how the size output is perceived: people often confuse linear scaling with areal or volumetric growth. While the actual linear dimensions double, the area increases by a factor of 4 and the volume by 8. Yet, the question focuses on linear dimensions—so scaling by 2 clearly means all measurements grow to twice their original size.
Resulting Dimensions Explained
If the original dimensions were 10 cm, 5 cm, and 8 cm, doubling each via a 2-coefficient scale yields:
- New length: 10 cm × 2 = 20 cm
- New width: 5 cm × 2 = 10 cm
- New height: 8 cm × 2 = 16 cm
These dimensions reflect the precise outcome of linear scaling: every measurement becomes double, preserving geometric relationships while enlarging the object or model uniformly.
Why This Scaling Method Matters
Scaling by a consistent coefficient is widely used in:
- Product prototyping, where scaled models help visualize size and fit
- Architectural renderings, enabling accurate predictions of real-world dimensions
- Manufacturing production, ensuring consistency across scaled parts
Key Insights
Understanding the relationship between the scaling coefficient and dimensional changes helps professionals accurately predict and communicate size transformations, avoid errors, and plan resources efficiently.
Conclusion
Scaling dimensions by a 2 coefficient reliably doubles every linear measurement. In the case of dimensions 10 cm, 5 cm, and 8 cm, scaling results in fresh measurements: 20 cm, 10 cm, and 16 cm. Recognizing this ensures precision in design, planning, and execution across diverse fields.
Keywords: scaling coefficient, double dimensions, linear scaling, dimension transformation, design scaling, size up factor 2, scaling formula, architectural scaling, manufacturing scaling
Meta Description:
Discover how scaling dimensions by a coefficient of 2 doubles every measurement—example: 10 cm → 20 cm, 5 cm → 10 cm, 8 cm → 16 cm. Learn why consistent scaling matters in design, architecture, and manufacturing.
