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Volum Expansion Coefficients Solids

Reference data and engineering information about volum expansion coefficients solids for standard organizations applications.

volumexpansioncoefficientssolidsCalculatorData Table

Overview

Engineering reference data for Volum Expansion Coefficients Solids in standard organizations.

Key Formulas

ISO Standard

ISO  9001:2015ISO \; 9001:2015

Quality management systems.

ASTM Standard

ASTM  E8ASTM \; E8

Standard test methods for tension testing.

ANSI Standard

ANSI/ASME  B16.5ANSI/ASME \; B16.5

Pipe flanges and flanged fittings.

Variables

SymbolDescriptionUnit
ISOISOInternational Organization for Standardization
ASTMASTMAmerican Society for Testing and Materials
ANSIANSIAmerican National Standards Institute

Data Table

41 rows
Volumetric (Cubic) Thermal Expansion Coefficients for Common Solids
Solid
Expansion Coefficient(10⁻⁶ 1/K)
Aluminum69
Antimony31.7
Beryl1.1
Bismuth39.5
Brass57
Carbon steel32.4
Concrete36
Copper49.9
Diamond3.5
Douglas-fir75
Emerald1.7
Galena55.8
Glass27.6
Glass, borosilicate9.9
Gold44.1
Ice112.5
Iron35.5
Lead84
Magnesium78
Molybdenum14.4
Nickel39
Paraffin590
Platinum26.5
Polypropylene, PP450
Porcelain8.1
PVC156
Quartz38.4
Rock salt121.2
Rubber487
Silicon9
Silicon Carbide8.3
Silver58.3
Sodium213
Stainless Steel30
Stearic acid810
Steel33
Sulfur223
Tin69
Titanium26
Tungsten13.5
Zinc89.3

Source: engineeringtoolbox.com

Volumetric Expansion Formula

The fundamental formula for calculating the change in volume (ΔV\Delta V) of a solid due to a temperature change (ΔT\Delta T) is:

ΔV=V0βΔT\Delta V = V_0 \cdot \beta \cdot \Delta T

Where:

  • ΔV\Delta V is the change in volume.
  • V0V_0 is the initial volume.
  • β\beta is the coefficient of volumetric (cubic) thermal expansion.
  • ΔT\Delta T is the change in temperature.

Key Property: For isotropic materials, the volumetric expansion coefficient β\beta is approximately three times the linear expansion coefficient α\alpha:

β3α\beta \approx 3\alpha

This relationship arises because expansion occurs equally in all three spatial dimensions.

References