Relative growth rate (RGR) is growth rate relative to size - that is, a rate of growth per unit time, as a proportion of its size at that moment in time. It is also called the exponential growth rate, or the continuous growth rate.
Rationale
RGR is a concept relevant in cases where the increase in a state variable over time is proportional to the value of that state variable at the beginning of a time period. In terms of differential equations, if is the current size, and its growth rate, then relative growth rate is
- .
If the relative growth rate is constant, i.e.,
- ,
a solution to this equation is
- .
A closely related concept is doubling time.
Calculations
In the simplest case of observations at two time points, RGR is calculated using the following equation:[1]
- ,
where:
= time one (e.g. in days)
= time two (e.g. in days)
= size at time one
= size at time two
When calculating or discussing relative growth rate, it is important to pay attention to the units of time being considered.[2]
For example, if an initial population of bacteria doubles every twenty minutes, then at time interval it is given by the equation
- ,
where is the number of twenty-minute intervals that have passed. However, we usually prefer to measure time in hours or minutes, and it is not difficult to change the units of time. For example, since 1 hour is 3 twenty-minute intervals, the population in one hour is . The hourly growth factor is 8, which means that for every 1 at the beginning of the hour, there are 8 by the end. Indeed,
where is measured in hours, and the relative growth rate may be expressed as or approximately 69% per twenty minutes, and as or approximately 208% per hour.[2]
RGR of plants
In plant physiology, RGR is widely used to quantify the speed of plant growth. It is part of a set of equations and conceptual models that are commonly referred to as Plant growth analysis, and is further discussed in that section.
See also
References
- ↑ Hoffmann, W.A.; Poorter, H. (2002). "Avoiding bias in calculations of Relative Growth Rate". Annals of Botany. 90 (1): 37–42. doi:10.1093/aob/mcf140. PMC 4233846. PMID 12125771.
- 1 2 William L. Briggs; Lyle Cochran; Bernard Gillett (2011). Calculus: Early Transcendentals. Pearson Education, Limited. p. 441. ISBN 978-0-321-57056-7. Retrieved 24 September 2012.