Here is a quick definition: un-proportional is where two things cannot ever be equal or similar, for example 2 is proportional to 4, because if 2 is doubled it becomes 4, but 3 is not proportional to 5 because they can never be equal. I hope this helped
a number that is not rational real and can be used in an equatuion
No. The rectangular hyperbola does not pass through the origin but it represents inverse proportionality.
Graphs, equations, and tables all provide ways to represent linear relationships, and they can be used to determine if a relationship is proportional or nonproportional. In a proportional relationship, the graph will show a straight line passing through the origin, the equation will have the form (y = kx) (where (k) is a constant), and the table will exhibit a constant ratio between (y) and (x). Conversely, a nonproportional relationship will show a line that does not pass through the origin, have an equation in a different form (like (y = mx + b) with (b \neq 0)), and display varying ratios in the table.
It is a relationship which is non-linear. The same amount of change in the independent variable brings about different amounts of changes in the dependent variable and these differences depend on the initial values of the independent variable.
Any relationship in which at least one pair of measurements has a different ratio to that for other pairs. Equivalently, it is a relationship in which all the points cannot be plotted as a straight line through the origin.
a number that is not rational real and can be used in an equatuion
The answer is proportional.
No. The rectangular hyperbola does not pass through the origin but it represents inverse proportionality.
The relationship Y = kx is proportional, where Y is directly proportional to x with a constant of proportionality k. This means that as x increases, Y also increases in a linear fashion. In a nonproportional relationship, the ratio of Y to x would not be constant, and the relationship could be more complex, such as quadratic or exponential.
Graphs, equations, and tables all provide ways to represent linear relationships, and they can be used to determine if a relationship is proportional or nonproportional. In a proportional relationship, the graph will show a straight line passing through the origin, the equation will have the form (y = kx) (where (k) is a constant), and the table will exhibit a constant ratio between (y) and (x). Conversely, a nonproportional relationship will show a line that does not pass through the origin, have an equation in a different form (like (y = mx + b) with (b \neq 0)), and display varying ratios in the table.
It is a relationship which is non-linear. The same amount of change in the independent variable brings about different amounts of changes in the dependent variable and these differences depend on the initial values of the independent variable.
Any relationship in which at least one pair of measurements has a different ratio to that for other pairs. Equivalently, it is a relationship in which all the points cannot be plotted as a straight line through the origin.
Definition is the same as meaning.
stipulative definition is stipulative definition
Definition
There is no legal definition for pole star.There is no legal definition for pole star.There is no legal definition for pole star.There is no legal definition for pole star.
the two types of definition are the formal and informal definition.