Exponential and Logarithmic Equations

The Biophysics of Volvox

Abstract Volvox are microscopic colonial algae that are heavily studied as they are one of the simplest examples of multicellular organisms. Composed of hundreds to tens of thousands of individual cells moving in harmony, they are the source of several mesmerizing phenomena, each of them serving a purpose for the

Read More »

SHAPING SUCCESS: A MATHEMATICAL EXPLORATION OF CYANOBACTERIA ACROSS SCALES

ABSTRACT Mathematical models and functions are familiar tools used to study biological systems and interactions, in particular with the study of infectious diseases. Epidemic and pandemic dynamics, however, are only one example of their applications for adding analysis, understanding, and insight into complex topics. In this essay, cyanobacteria’s size and

Read More »

Microscopic Mathematics; Tintinnid’s Strategic Survival

In this essay, we explore tintinnids’ survival designs within the context of fundamental mathematics principles. Tintinnids use mathematics concepts for everyday functions such as swimming and self-protection. We delve into tintinnids’ various swimming patterns. We take a close look at the helical swimming motion, or more precisely how that motion…

Read More »

Mathematical Models of Diatoms: Understanding Their Complex Shape, Reproduction and Chain Formation

Apart from physical and chemical solutions used by the diatom for survival, some features of the unicellular microalgae also could be described in mathematics. For instance, the diatom morphology reveals a striking alignment with the golden ratio and fractal geometry. By examining the silica shells of these unicellular algae, we…

Read More »

Exploring Aquatic Fungi Through Mathematical Tools

 The beauty of mathematics lies in its ability to create models to simplify complex things in real life and give explanations to them. Models are a great way to study and analyze species in nature and it is the same for aquatic fungi. Mathematical models also help us predict their…

Read More »

Exploration of Mathematical Laws Governing Claws and their Applications within Flying Animals, Terrestrial Pests, and Amniotes

Claws are one of the most widely utilized tools within organisms, and for a good reason: their purposeful constructions, described by mathematical laws and correlations, allow a wide range of use. This research paper investigates these fascinating mathematical relationships, beginning with the connection between claw growth and logarithmic functions. Applying…

Read More »

Mathematical Framework for Animal Foraging Patterns and Forager Population Dynamics

The animal kingdom encompasses all kinds of animals that collect their food supplies in unique ways. Consequently, by using mathematical language to describe these systems of behaviours, one can better understand and predict the way animals proceed during their food source search. This essay examines a few mathematical models describing…

Read More »

Biological Design for Lungs and Gills: Biomechanics and Materials 

This report describes two of the most important gas exchangers for all living animals: lungs and gills. Throughout the research, cutaneous respiration will also be explained; however, the most efficient oxygen diffusing rates are obtained through lungs and gills, which are our main concern. The purpose of this biological design…

Read More »