Only if the two functions really represent the same function.
They are hyperbolae.
If the slopes are the same on both graphs, they are parallel, and will never touch.
Where they all intersect.
Polynomials have graphs that look like graphs of their leading terms because all other changes to polynomial functions only cause transformations of the leading term's graph.
A graphic calculator.
They are hyperbolae.
If you graph the two functions defined by the two equations of the system, and their graphs are two parallel line, then the system has no solution (there is not a point of intersection).
Equations are never parallel, but their graphs may be. -- Write both equations in "standard" form [ y = mx + b ] -- The graphs of the two equations are parallel if 'm' is the same number in both of them.
THere are infinitely many possible functions in any circle graph. Your question needs to be more specific.
If the slopes are the same on both graphs, they are parallel, and will never touch.
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.
Base on the slope of two linear equations (form: y = mx+b, where slope is m): - If slopes are equal, the 2 graphs are parallel - If the product of two slopes equals to -1, the 2 graphs are perpendicular. If none of the above, then the 2 graphs are neither parallel nor perpendicular.
Constant acceleration motion can be characterized by motion equations and by motion graphs. The graphs of distance, velocity and acceleration as functions.
Polynomials have graphs that look like graphs of their leading terms because all other changes to polynomial functions only cause transformations of the leading term's graph.
The way you can use graphs of polynomial functions to show trends in data is by comparing results between different functions. The alternation between the data will show the trends. Time can also be used to show the amount of variation.
a family function