**What are the asymptotes of a hyperbola? Quora**

two asymptotes which are not part of the hyperbola but show where the curve would go if continued indefinitely in each of the four directions And, strictly speaking, there is also another axis of symmetry that goes down the middle and separates the two branches of the hyperbola.... Now, the standard equation of a hyperbola with a vertical transverse axis is shown along with its graph. Again, the asymptotes pass through the vertices of a rectangle of dimensions 2a by 2b.

**Finding the Asymptotes of a Hyperbola Cengage**

The asymptotes of a hyperbola are two imaginary lines that the hyperbola is bound by. It can never touch the asymptotes, thought it will get very close, just like the definition of asymptotes states. They cross and will look like an X. The dotted red line are the asymptotes.... But remember, we're doing this to figure out asymptotes of the hyperbola, just to kind of give you a sense of where we're going. Let me do it here-- actually, I want to do that other hyperbola. So a hyperbola, if that's the x, that's the y-axis, it has two asymptotes. And the asymptotes, they're these lines that the hyperbola will approach. So if those are the two asymptotes-- and they're

**How to find the asymptotes of a hyperbola? Brainly.com**

The asymptotes of a hyperbola are two imaginary lines that the hyperbola is bound by. It can never touch the asymptotes, thought it will get very close, just like the definition of asymptotes states. They cross and will look like an X. The dotted red line are the asymptotes.... 4/06/2009Â Â· Best Answer: It's actually pretty easy. Let's say you have a hyperbola in standard form like (x-3)^2/16 - (y+2)^2/49 = 1. Now the asymptotes are where x and y are both really large, and thus x-3 and y+2 are also going to be really large.

**How to find the asymptotes of a hyperbola? Brainly.com**

The asymptotes of a hyperbola are two imaginary lines that the hyperbola is bound by. It can never touch the asymptotes, thought it will get very close, just like the definition of asymptotes states. They cross and will look like an X. The dotted red line are the asymptotes.... Question 598756: Find the equation of hyperbola whose asymptotes are 5x+3y=-1 and 5x-3y=11, and which passes through (4,-2) I found the slopes of the equations -5/3 and 5/3.

## How To Find Asymptotes Of Hyperbola

### Finding the Asymptotes of a Hyperbola Cengage

- asymptotes of a hyperbola.pdf BetterLesson
- What are the asymptotes of a hyperbola? Quora
- Finding the Asymptotes of a Hyperbola Cengage
- How do you find the asymptotes of a hyperbola? Yahoo Answers

## How To Find Asymptotes Of Hyperbola

### The asymptotes of a hyperbola are two imaginary lines that the hyperbola is bound by. It can never touch the asymptotes, thought it will get very close, just like the definition of asymptotes states. They cross and will look like an X. The dotted red line are the asymptotes.

- But remember, we're doing this to figure out asymptotes of the hyperbola, just to kind of give you a sense of where we're going. Let me do it here-- actually, I want to do that other hyperbola. So a hyperbola, if that's the x, that's the y-axis, it has two asymptotes. And the asymptotes, they're these lines that the hyperbola will approach. So if those are the two asymptotes-- and they're
- But remember, we're doing this to figure out asymptotes of the hyperbola, just to kind of give you a sense of where we're going. Let me do it here-- actually, I want to do that other hyperbola. So a hyperbola, if that's the x, that's the y-axis, it has two asymptotes. And the asymptotes, they're these lines that the hyperbola will approach. So if those are the two asymptotes-- and they're
- Question 598756: Find the equation of hyperbola whose asymptotes are 5x+3y=-1 and 5x-3y=11, and which passes through (4,-2) I found the slopes of the equations -5/3 and 5/3.
- two asymptotes which are not part of the hyperbola but show where the curve would go if continued indefinitely in each of the four directions And, strictly speaking, there is also another axis of symmetry that goes down the middle and separates the two branches of the hyperbola.

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