During the fallingβrate period of drying, the surface of the material is already dry and moisture must migrate from the interior to the surface. This internal diffusion controls the overall drying rate, which therefore decreases with time.
The moisture content X at any time t can be described by an exponential decay law: the difference between the instantaneous moisture content and the equilibrium moisture content Xβ shrinks proportionally to eβ»α΅α΅, where k is the drying constant that reflects the materialβs diffusivity and geometry.
Differentiating the moistureβcontent expression gives the instantaneous drying rate (dX/dt). Because the rate is proportional to the remaining moisture above equilibrium, it can be expressed as a simple linear function of (XβXβ) with the same constant k.
What is the drying constant k in the exponential decay law?
How does the drying rate change during the falling-rate period?
What is the significance of equilibrium moisture content Xβ in this context?
How do I interpret the exponential decay law eβ»α΅α΅ in this calculator?
Can this calculator be used for any type of material?
What factors affect the value of k in the drying constant?
How can I use this calculator to predict the drying time of a material?
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