Examples of 'asymptotes' in a sentence
Meaning of "asymptotes"
asymptote (noun): Asymptote refers to a straight line that a curve approaches but never quite reaches. It is commonly used in mathematics and graphing functions
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- plural of asymptote
How to use "asymptotes" in a sentence
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asymptotes
A hyperbola with given asymptotes through a point.
So these are the slopes of the two asymptotes.
What are the two asymptotes of the hyperbola.
You know that these are the asymptotes.
The two asymptotes have the equation.
Determine whether has any vertical asymptotes.
Construct the asymptotes of this conic.
A function can have two horizontal asymptotes.
Determine the asymptotes of the curve.
Now let us talk about horizontal asymptotes.
The asymptotes are given by the equations.
Let us think about the vertical asymptotes.
Finding the asymptotes of a general hyperbola.
And we have drawn our asymptotes.
The two asymptotes of a hyperbola.
See also
Cosecant only has vertical asymptotes.
And of course these asymptotes keep going on forever and forever.
Secant only has vertical asymptotes.
Horizontal asymptotes and limits at infinity always go hand in hand.
Find the equations of the asymptotes.
Vertical asymptotes are found by setting the denominator equal to zero.
Now in order to find the asymptotes of.
It has asymptotes on both axes.
The graph of has vertical asymptotes at.
Vertical asymptotes are the only asymptotes that are never crossed.
Write down the two asymptotes of.
Vertical asymptotes occur when you try to divide by zero.
Find equations for the asymptotes.
The directions of the asymptotes are the same as the asymptotic directions.
My teacher said that there are two asymptotes but.
There the asymptotes of the unit hyperbola form a light cone.
And here are the phase asymptotes.
The four asymptotes are tangent to the initial ellipse at its summits.
How to find the vertical asymptotes.
In order to find vertical asymptotes we substitute the denominator equal to zero.
You can see that there are asymptotes.
The asymptotes of this hyperbola are the lines y is equal to plus or minus b over a.
The function can have asymptotes it.
Asymptotes of functions.
And let us figure out the asymptotes of this hyperbola.
The graph of the cosecant function has vertical asymptotes.
Kiss my asymptotes.
And hopefully you learned a little bit about asymptotes.
Asymptotes is equal to.
But we still know what the asymptotes look like.
All three types of asymptotes can be present at the same time in specific examples.
Let us draw our asymptotes.
These asymptotes usually appear if there are points where the function is not defined.
We know what the asymptotes are.
Rational expressions and equations are discussed along with asymptotes.
