The answer depends on the form of the expression in the denominator. For example, the graph os 1/(1 + x2) has a pretty well-behaved graph, with a maximum vaue of 1 when x = 0 and asymptotes of y = 0
Some graphs do, but some don't. It depends upon the variables.
They are hyperbolae.
graphs give a trend of variables and the trend can be studied using the the extent they usually portray and the graphs are not emperical methods they give interpolated relationships hence a reduced uncertainities
Where they all intersect.
Solve for variables using equations graphs and tables. There is also a lot of substituting
Graphs are a convenient way to display relationships between variables.
The two variables are correlated.
They are hyperbolae.
They illustrate the relationship between two (or more) variables.
Some graphs do, but some don't. It depends upon the variables.
Represent two variables on two axes.
x and y
graphs give a trend of variables and the trend can be studied using the the extent they usually portray and the graphs are not emperical methods they give interpolated relationships hence a reduced uncertainities
Where they all intersect.
The answer will depend on which functions are inverted.The answer will depend on which functions are inverted.The answer will depend on which functions are inverted.The answer will depend on which functions are inverted.
Any graph.
There are variables that have a cubic relationship: for example, the side of a cube and its mass.