horizontal asymptote

[intothevoidx]

The function y= (3x^3-2x+1)/(2x^2) has me confused. I am trying to figure out why this function has a horizontal asymptote when the degree of the numerator is larger than the denominator, which I thought was supposed to mean it has no horizontal asymptote?

 

 

Thanks

[Cap'n Refsmmat]

It doesn't have a horizontal asymptote. Try graphing it.

[intothevoidx]

Well, then my wonderful textbook(sarcasm) has an error in it....It says the answer is y=3/2*x.

[Cap'n Refsmmat]

That's roughly the slope of the line you get when you graph the original function.

 

Check the directions again to see what it's asking for.

[intothevoidx]

It says determine any horizontal, vertical or slant asymptotes. I think it may be the slant asymptote. My bad....

 

I figure I should ask my other question on this post as well.

 

This problem is from a Cliff's Book

The function (2x-5)/(x^2-4x-5) has a horizontal asymptote of y=2. This function seems like it violates the rules........When I worked it out I got that y=0 because the the numerator has a smaller power than the denominator?

[Cap'n Refsmmat]

You're right again. I graphed it and it approaches 0.

[intothevoidx]

Well then, I guess I did find an error this time. Thanks for the help.