In Exercises 1–8, find the domain of each rational function. g...

Question

In Exercises 1–8, find the domain of each rational function. g(x)=3x²/(x−5)(x+4)

Accepted Answer

considered the given rational function and find this domain dysfunction. It's equal to seven x squared over X -8 X plus two. I want to find the domain of this rational function. The final domain. We want to see where we have this continuity. We can check our discontinuities by selling our denominator equal to zero. So let's take a look here. Our denominator is X minus eight X plus two. I want to see what makes the denominator equal to zero. So I'm gonna set this equal to zero. Let's go ahead and solve for X. Now we do have our factors split up already. So I'm gonna say we have X -8 equals to zero X plus two equals to zero. We do that don't add 8 to both sides. We get x equals eight. We also get subtract two from both sides. On the other new question X equals negative two. So now We want to check to see if these are actually our restrictions. I'm gonna do that by plugging it back in to our function. We have seven 28 1st 8 sq over eight minus eight. Eight plus two. Excuse me? seven times 8 squared Over 8 -8 which is zero times 10. You know? So we're gonna get something over zero on the bottom, Which means that this is indeed its continuity because we're dividing by zero. Now we can check our negative to say we have 7 -2 squared over -2 -8. So two plus two. That will give us 28 on top decided by We have NATO to -8 which is a native 10, multiplied two plus two and zero which is 28/0. That is also discounting it would be because we're dividing by zero, which means our domain is every number except for X equals eight and X equals negative two. We can rewrite that as infinity two negative two. Now we want and simple -2 to our next discontinuity eight & 8 to Infinity. So the answer to this problem with the stomach turns out to be answer C on our answers. Okay, I hope to help you solve the problem. Thank you for watching. Goodbye.

In Exercises 1–8, find the domain of each rational function. g(x)=3x²/(x−5)(x+4)

Key Concepts

Rational Functions

Domain of a Function

Finding Zeros of the Denominator

Watch next

In Exercises 1–8, find the domain of each rational function. g(x)=3x2/(x−5)(x+4)

Key Concepts

Rational Functions

Domain of a Function

Finding Zeros of the Denominator

Watch next

In Exercises 1–8, find the domain of each rational function. g(x)=3x²/(x−5)(x+4)