Question

Clearly sketch the graph of y=x- 2 /(x+3)^2 and label in your graph everything (intercepts, asymptotes, extrema, inflection points)

Answer #1

This function has two branches.

The function cuts the x-axis at

The function cuts the y-axis at

The function has a vertical asymptote (where we have to put denominator =0) given by .

For the extreme value

Q1: Sketch the graph of polynomial ?(?)=?3−?. Label the
coordinates of the x- and y-intercepts, stationary point, and
inflection point.

1. Graph of the function and label any intercepts and
asymptotes.
R(x)= x+5/x(x-3)

Curve Sketching Practice
Use the information to the side to sketch the graph of
f.
Label any asymptotes, local extrema, and inflection
points.
f is a polynomial function
x
—1
—6
3
—2
6
5
f is a polynomial function
x
1
—4
4
0
7
4

For the function f(x) = ? 3−1 ? 2−9 , find any slant asymptotes
and sketch the graph by finding any vertical asymptotes, horizontal
asymptotes, x intercepts, y intercept.

Sketch the graph by hand using asymptotes and intercepts, but
not derivatives. Then use your sketch as a guide to producing
graphs (with a graphing device) that display the major features of
the curve. Use these graphs to estimate the maximum and minimum
values. (Round your answers to three decimal places.)
f(x) = (2x + 3)2(x − 2)5 x3(x − 5)2
local minima (x, f(x)) = -1.5 Correct: Your answer is correct. ,
0 Correct:
Your answer is correct. (smaller...

Analyze the function f and sketch the curve of f by hand.
Identify the domain, x-intercepts, y-intercepts, asymptotes,
intervals of increasing, intervals of decreasing, local maximums,
local minimums, concavity, and inflection points. f(x) = 3x^4 −
4x^3 + 2

Find (by hand) all asymptotes and extrema, and sketch a
graph:
y=x^2/x^2-1
Please show all work needed to solve the problem with
explanations. Thank you!

For the function
f(x) =x(x−4)^3
•
Find all
x-intercepts and find the
y-intercept
•
Find all critical numbers,
•
Determine where the function is increasing and where it is
decreasing,
•
Find and classify the relative extrema,
•
Determine where the function is concave up and where it is
concave down,
•
Find any inflection points, and Use this information to sketch
the graph of the function.
•
Use this information to sketch the graph of the function.

Find the vertical asymptotes, horizontal asymptote, and x and y
intercepts of the following function and sketch a graph
f(x) = (x^2 − 4) / (x^2 − 2x − 15)

Show a step by step drawn sketch of the function below. Ensure
you are finding everything you can about the function (ie.
intercepts, increasing/decreasing intervals, positive/negative
intervals, restrictions, asymptotes, domain, range, end behaviours,
max/min values, critical points, points of inflection)
Graph the full function in as much detail as possible and show
all calculations.
y = x - 3x^(1/3)

ADVERTISEMENT

Get Answers For Free

Most questions answered within 1 hours.

ADVERTISEMENT

asked 16 minutes ago

asked 16 minutes ago

asked 34 minutes ago

asked 36 minutes ago

asked 39 minutes ago

asked 51 minutes ago

asked 52 minutes ago

asked 53 minutes ago

asked 53 minutes ago

asked 1 hour ago

asked 1 hour ago

asked 1 hour ago