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asymptote
You only connects dots an a graph when the variable is in constant movement never stopping.
It is false
it will never be a vertical line as the slope is velocity and that would be infinite speed
In this case, the discriminant is less than zero and the graph of this parabola lies above the x-axis. It never crosses.
yes, an asymptote is a curve that gets closer but never touches the x axis.
asymptote
They are called asymptotes.
A Guassian function has a top in the middle and it's ends reach until infinity but the graph never touches the x axis. The location of the top depends on the parameters used.
What is inside and outside of a house but never touches it
The graph of [ x=8 ] is a vertical line through the point 8 on the x-axis. It never touches the y-axis, and has no y-intercept.
No, a circle graph is never a function.
In geometry, an asymptote is a line that approaches the axis of a graph but does not touch or intersect. The line will continue to get closer but will never actually touch the axis. The line is said to be "asymptotic" if this occurs.
Let's say you have the quadratic equation x2 - 7x + 12 = 0. Plot the graph of y = x2 - 7x + 12. Where y = 0 (when the graph crosses the x-axis) is a solution to the equation. In this case, it crosses at the points (3,0) & (4,0) so the solutions are x = 3 and x = 4. Now if the graph never touches the x-axis, that means the solutions to the equation are complex numbers.
Never. You can use a column graph, or a scatter graph or even a superimposition of the two but there a column scatter graph does not exist.
A person levitating
Never Hahaha