A study of inverse relationships is one of a very large number of uses for rational functions. Only a rational function of a very special kind will be of any use.
yes
True
A rational group is a mathematical concept in group theory that refers to a group whose elements can be expressed in terms of rational numbers or, more generally, in terms of a rational field. Specifically, it often pertains to the study of algebraic groups and their rational points, where the group operations can be defined using rational coefficients. In this context, a group is considered rational if it has a set of generators and relations that can be defined over a rational field, making it possible to analyze its structure within the realm of rational numbers.
Because understanding rational and whole numbers and in particular prime numbers it is useful when finding the lowest common multiple or the highest common factor of numbers.
A study of inverse relationships is one of a very large number of uses for rational functions. Only a rational function of a very special kind will be of any use.
yes
yes
True
Because understanding rational and whole numbers and in particular prime numbers it is useful when finding the lowest common multiple or the highest common factor of numbers.
Rational
1.14 is rational.
4.6 is rational.
No, it is rational.
The rationale of a study refers to the underlying reasons or justification for conducting the research. It outlines the objectives, significance, and potential contributions of the study to the current body of knowledge in the field. It helps to clarify the purpose and importance of the research project.
It is a rational number
It is rational. It is rational. It is rational. It is rational.