Linear, Area & Volume Expansivity
The linear expansivity (α) of a substance is the fractional increase in its length per degree change in temperature.
α = L2 - L1/L1 ( θ2 - θ1 )
'L' denotes Length
The area expansivity (β) of a substance is the fractional increase in area per degree change in temperature.
β = A2 - A1/A1 ( θ2 - θ1 ) | β = 2α
'A' denotes Area
The volume expansivity (γ) of a substance is the fractional increase in volume per degree change in temperature.
γ = V2 - V1/V1 ( θ2 - θ1 ) | γ = 3α
'V' denotes Volume
Note: Δθ = θ2 - θ1
As the case may be, 'e' = L2 - L1 | e = Extension
As the case may be, 'e' = A2 - A1 | e = Extension
As the case may be, 'e' = V2 - V1 | e = Extension
The linear expansivity (α) of a substance is the fractional increase in its length per degree change in temperature.
α = L2 - L1/L1 ( θ2 - θ1 )
'L' denotes Length
The area expansivity (β) of a substance is the fractional increase in area per degree change in temperature.
β = A2 - A1/A1 ( θ2 - θ1 ) | β = 2α
'A' denotes Area
The volume expansivity (γ) of a substance is the fractional increase in volume per degree change in temperature.
γ = V2 - V1/V1 ( θ2 - θ1 ) | γ = 3α
'V' denotes Volume
Note: Δθ = θ2 - θ1
As the case may be, 'e' = L2 - L1 | e = Extension
As the case may be, 'e' = A2 - A1 | e = Extension
As the case may be, 'e' = V2 - V1 | e = Extension
Linear, Area & Volume Expansivity
The linear expansivity (α) of a substance is the fractional increase in its length per degree change in temperature.
α = L2 - L1/L1 ( θ2 - θ1 )
'L' denotes Length
The area expansivity (β) of a substance is the fractional increase in area per degree change in temperature.
β = A2 - A1/A1 ( θ2 - θ1 ) | β = 2α
'A' denotes Area
The volume expansivity (γ) of a substance is the fractional increase in volume per degree change in temperature.
γ = V2 - V1/V1 ( θ2 - θ1 ) | γ = 3α
'V' denotes Volume
Note: Δθ = θ2 - θ1
As the case may be, 'e' = L2 - L1 | e = Extension
As the case may be, 'e' = A2 - A1 | e = Extension
As the case may be, 'e' = V2 - V1 | e = Extension
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