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Q&A

Do "R" values add proportionally?

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For winter camping it is recommended to use a sleeping pad with an R value greater than 5.

Can you alternatively use two closed cell 2.5R pads one on top of each other?

If using an inflatable pad with an R value of 5 and a closed cell with an R value of 2.5 will you effectively have a 7.5R value set up?

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Yes, the R-value will add of your different layers. If you wear layer A with R=5 and layer B with R=2.5, the overall insulation value will be R=7.5.


To explain this a bit, we think of two layers or flat walls which interact only due to thermal conduction. This is just a model and in reality other effects will come in play. The Fourier Law for thermal conduction (relative to the surface) of one layer states:

heatFluxDensity = thermalConductivity / thickness * temperatureDifference

[W/m²]          = [W/(mK)]            / [m]       * [K]

The R-value is stated as a material property as

R = thickness / thermalConductivity

with the unit [m²K/W] which leads from Fourier law to

R = temperatureDifference / heatFluxDensity

Adding several layers, we can use the electrical analogy and are able to add the resistances of each layer to an overall resistance.

Knowing your material properties (which might be difficult in the clothing industry), assuming a temperature gradient or a heat flux, you can then evaluate the other using this equation:

heatFluxDensity = (innerTemp - outerTemp) / (R1 + R2 + ... + Rn)

More interesting links to read:

Wiki

Insulation

Relating to outdoors

Mathematical model

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According to wikipedia2

In calculating the R-value of a multi-layered installation, the R-values of the individual layers are added.

I would imagine a slight diminishing return as the r-value is a laboratory measurement in ideal condition which is not quite the same as on the field (variable temperatures, moisture, air movement, etc.).

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