/*! This file is auto-generated */ .wp-block-button__link{color:#fff;background-color:#32373c;border-radius:9999px;box-shadow:none;text-decoration:none;padding:calc(.667em + 2px) calc(1.333em + 2px);font-size:1.125em}.wp-block-file__button{background:#32373c;color:#fff;text-decoration:none} Problem 32 Sketch the graph of a function \... [FREE SOLUTION] | 91Ó°ÊÓ

91Ó°ÊÓ

Log out

Learning Materials

Features

Discover

Chapter 4: Problem 32

Sketch the graph of a function \(f\) that has the following properties: (a) \(f\) is everywhere continuous; (b) \(f(-4)=-3, f(0)=0, f(3)=2\); (c) \(f^{\prime}(-4)=0, f^{\prime}(3)=0, f^{\prime}(x)>0\) for \(x<-4, f^{\prime}(x)>0\) for \(-43\) (d) \(f^{\prime \prime}(-4)=0, f^{\prime \prime}(0)=0, f^{\prime \prime}(x)<0\) for \(x<-4, f^{\prime \prime}(x)>0\) for \(-40\)

Short Answer

Expert verified
Graph is a smooth curve passing through (-4, -3), (0, 0), and (3, 2), increasing and concave changes at specified intervals.

Step by step solution

01

Understand the Problem

We need to sketch a graph that fulfills four conditions related to continuity, specific values, and slopes/concavities at given points.
02

Define Continuity

Since the function is everywhere continuous, it should have no jumps or breaks for any value of \(x\). Thus, our sketch can be a smooth curve.
03

Plot Key Points

The function passes through three points: \((-4, -3)\), \((0, 0)\), and \((3, 2)\). These should be placed on the graph accurately.
04

Calculate Derivative Information

From the derivative conditions, \(f'(x)>0\) implies the function is increasing, while \(f'(x)<0\) implies it is decreasing. Therefore, sketch the graph based on the following: increasing for \((-fty, -4), (-4, 3)\) and decreasing for \((3, fty)\). At \(-4\) and \(3\), the derivative is zero, suggesting a potential horizontal tangent or peak/trough.
05

Incorporate Second Derivative Information

The second derivative, \(f''(x)\), indicates concavity: \(f''(x) < 0\) implies concave down, while \(f''(x) > 0\) implies concave up. Apply concave down for \((-fty,-4)\) and \((0, fty)\), and concave up for \((-4,0)\). At \(-4\) and \(0\), \(f''(x) = 0\), indicating possible inflection points.
06

Sketch the Graph

Start at \((-4, -3)\) with a horizontal tangent (\(f'(-4)=0\)), increasing and concave down. At \(-4\) to \(0\), transition to concave up, passing through \((0, 0)\) with another tangent slope (\(f'(0)=0\)). From \(0\) to \(3, f(x)\) is still growing and changes concavity again, and at \(3\), there's a horizontal tangent. After \(3\), the curve decreases and remains concave down.

Unlock Step-by-Step Solutions & Ace Your Exams!

  • Full Textbook Solutions

    Get detailed explanations and key concepts

  • Unlimited Al creation

    Al flashcards, explanations, exams and more...

  • Ads-free access

    To over 500 millions flashcards

  • Money-back guarantee

    We refund you if you fail your exam.

Over 30 million students worldwide already upgrade their learning with 91Ó°ÊÓ!

Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Derivatives
Derivatives provide key information about the behavior and direction of a function. They tell us where a function is increasing or decreasing. For a given function \( f(x) \), the first derivative, \( f'(x) \), reveals the rate of change or slope of the tangent.

If \( f'(x) > 0 \), the function is increasing; if \( f'(x) < 0 \), it's decreasing.

In this exercise, we have derivative conditions:
  • \( f'(-4)=0 \) and \( f'(3)=0 \): these points hint at potential horizontal tangents or peaks and troughs, similar to tops of hills or bottoms of valleys.
  • For \( x < -4 \): \( f'(x) > 0 \), indicating the function increases
  • From between \( -4 < x < 3 \): \( f'(x) > 0 \), the function continuously rises
  • For \( x > 3 \): \( f'(x) < 0 \), implying the function decreases
Understanding derivatives is crucial for sketching the function's general direction and identifying where changes in its growth occur.
Concavity
Concavity describes the "bending" nature of a function. It helps determine how the slope changes as you move along the curve. The second derivative, \( f''(x) \), informs us about concavity:
  • If \( f''(x) > 0 \), the function is concave up, like a cup, and the curve shapes upwards.
  • If \( f''(x) < 0 \), it is concave down, resembles an upside-down cup, and the curve shapes downwards.
In our problem:
  • \( f''(x) < 0 \) for \( x < -4 \), indicating a concave down behavior at the beginning
  • \( -4 < x < 0 \) shows \( f''(x) > 0 \), creating a concave up section
  • Lastly, \( f''(x) < 0 \) for \( x > 0 \), bringing back the concave down bending.
The changes in concavity at key points signal potential inflection points where the curvature changes direction.
Critical Points
Critical points involve any place where the first derivative is zero or undefined, providing potential shifts in the direction of a function's graph. In a continuous function like the one in this exercise, critical points often correspond to turning points, peaks, or troughs. Here are the critical features:
  • At \( x = -4 \) and \( x = 3 \), \( f'(x) = 0 \), marking spots for horizontal tangents.
  • These points are crucial as they signal transitions in the graph's rise and fall behavior
In the given function, the critical points coincide with its conditions for increasing and then decreasing. The knowledge of critical points supports us in mapping out where the curve peaks or dips. Hence, they become essential in graph sketching.
Graph Sketching
Graph sketching is visually representing the function's behavior based on its derivatives and other properties. This process combines all the insights gained from derivatives, concavity, and critical points.
  • Start by plotting key points: \((-4, -3)\), \((0, 0)\), and \((3, 2)\), mapping where the curve should pass through.
  • Apply the increase or decrease information from \( f'(x) \) to draw the direction of the curve.
  • Incorporate \( f''(x) \) insights to adjust the curve for concavity. For example, early sections need to be sketched concave down before transitioning to a concave-up section, as the exercise guides.
Remember, a correctly sketched graph fulfills the continuity condition provided, having smooth and unbroken curves without jumps. This comprehensive approach ensures the graph accurately reflects the function's behavior.

One App. One Place for Learning.

All the tools & learning materials you need for study success - in one app.

Get started for free

Most popular questions from this chapter

A ball is thrown upward from the surface of a planet where the acceleration of gravity is \(k\) (a negative constant) feet per second per second. If the initial velocity is \(v_{0}\), show that the maximum height is \(-v_{0}^{2} / 2 k\).

The rate of change of volume \(V\) of a melting snowball is proportional to the surface area \(S\) of the ball; that is, \(d V / d t=-k S\), where \(k\) is a positive constant. If the radius of the ball at \(t=0\) is \(r=2\) and at \(t=10\) is \(r=0.5\), show that \(r=-\frac{3}{20} t+2 .\)

The ZEE Company makes zingos, which it markets at a price of \(p(x)=10-0.001 x\) dollars, where \(x\) is the number produced each month. Its total monthly cost is \(C(x)=200+4 x-0.01 x^{2} .\) At peak production, it can make 300 units. What is its maximum monthly profit and what level of production gives this profit?

First find the general solution (involving a constant \(\mathrm{C}\) ) for the given differential equation. Then find the particular solution that satisfies the indicated condition. $$ \frac{d y}{d t}=y^{4} ; y=1 \text { at } t=0 $$

An object is taken from an oven at \(300^{\circ} \mathrm{F}\) and left to cool in a room at \(75^{\circ} \mathrm{F}\). If the temperature fell to \(200^{\circ} \mathrm{F}\) in \(\frac{1}{2}\) hour, what will it be after 3 hours?
See all solutions

Recommended explanations on Math Textbooks

Discrete Mathematics

Read Explanation

Geometry

Read Explanation

Statistics

Read Explanation

Calculus

Read Explanation

Mechanics Maths

Read Explanation

Pure Maths

Read Explanation
View all explanations

What do you think about this solution?

We value your feedback to improve our textbook solutions.

Study anywhere. Anytime. Across all devices.