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What are the graphs of reciprocal functions?
They are hyperbolae.
When using tables graphs and equations to compare functions why do you find the equations for tables and graphs?
Finding equations for tables and graphs allows for a more precise understanding of the relationships between variables in functions. Equations provide a mathematical representation that can be easily manipulated and analyzed, making it easier to predict values and identify trends. Additionally, they enable comparisons across different functions by highlighting their unique characteristics and behaviors in a consistent format. Overall, equations enhance the clarity and efficiency of comparing functions derived from tables and graphs.
Graphs are representations of equations.?
Line graphs may represent equations, if they are defined for all values of a variable.
The unique solution to a system is where the graphs of the functions what?
Where they all intersect.
What are graphs that have connected lines or curves?
Graphs that have connected lines or curves are typically referred to as continuous graphs. These graphs represent a function or relationship where the points are connected without any breaks, indicating that for every input within a certain range, there is a corresponding output. Examples include linear functions, polynomial functions, and trigonometric functions. Continuous graphs are important in calculus and mathematical analysis because they allow for the application of concepts such as limits, derivatives, and integrals.
What is Smart Art?
Smart Art is provides the facility to create a variety of charts, like organisational charts, flow charts etc. These charts are specialised, and customisable. So it is usually specialist users that will use a lot of them, though anyone can use them.
How can graphs of polynomial functions show trends in data?
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.
Find the amplitude and period of the functions and sketch their graphs y equals sin -x?
y = sin(-x)Amplitude = 1Period = 2 pi
What are the graphs of reciprocal functions?
They are hyperbolae.
How can you determine whether a system has no solutions by graphing?
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).
Graphs are representations of equations.?
Line graphs may represent equations, if they are defined for all values of a variable.
How are the graphs different?
Needs more information... graphs of what?
Are the graphs of the lines in the pair parallel Explain y equals 4x plus 6 -15x plus 3y equals -45?
No because the slope in both lines have different values
What are the non example for continuous?
Non-examples of continuous functions include step functions, which have abrupt jumps or breaks, and piecewise functions that are not defined at certain points. Additionally, functions like the greatest integer function (floor function) are not continuous because they have discontinuities at integer values. These functions fail to meet the criteria of having no breaks, jumps, or holes in their graphs.
How are bar graphs and line graphs and circle graphs different?
circle graphs add up to 100% , bar and line graphs don't
The unique solution to a system is where the graphs of the functions what?
Where they all intersect.
What are graphs that have connected lines or curves?
Graphs that have connected lines or curves are typically referred to as continuous graphs. These graphs represent a function or relationship where the points are connected without any breaks, indicating that for every input within a certain range, there is a corresponding output. Examples include linear functions, polynomial functions, and trigonometric functions. Continuous graphs are important in calculus and mathematical analysis because they allow for the application of concepts such as limits, derivatives, and integrals.
