You can
put this solution on YOUR website!Asymptotes:
Start with the given function
Looking at the numerator
, we can see that the degree is
since the highest exponent of the numerator is
. For the denominator
, we can see that the degree is
since the highest exponent of the denominator is
.
Oblique Asymptote:
Since the degree of the numerator (which is
) is greater than the degree of the denominator (which is
), there is no horizontal asymptote. In this case, there's an oblique asymptote
To find the oblique asymptote, simply use polynomial long division
So the oblique asymptote is the quotient
(ignore the remainder). So the equation of the oblique asymptote curve is
--------------------------------------------------
Vertical Asymptote:
To find the vertical asymptote, just set the denominator equal to zero and solve for x
Set the denominator equal to zero
Add 1 to both sides
Combine like terms on the right side
Take the square root of both sides
or
Simplify
So the vertical asymptotes are
or
-----------------------------------------------
Zeros:
Now let's find the zeros of the equation
Start with the given function
Plug in
Since the denominator can never be equal to zero, this means that the numerator is equal to zero
Factor the left side
Now set each factor equal to zero:
,
or
Now solve for x for each factor:
,
,
or
So the zeros of
are
,
or
So let's use this information to graph
Graph of
with the oblique asymptote
(blue curve) and the vertical asymptotes
and
(green lines)
(
