Applied CALC 2nd edition

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Frank Wilson
Publisher: Cengage Learning

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  • Chapter 1: Functions and Models
    • 1.1: Functions (28)
    • 1.2: Linear Functions (29)
    • 1.3: Quadratic Functions (52)
    • 1.4: Polynomial and Rational Functions (14)
    • 1.5: Exponential Functions and Logarithms (38)
    • 1.6: Function Modeling and Combining Functions (20)

  • Chapter 2: The Derivative
    • 2.1: Average Rate of Change (32)
    • 2.2: Limits and Instantaneous Rates of Change (33)
    • 2.3: The Derivative as a Slope: Graphical Methods (20)
    • 2.4: The Derivative as a Function: Algebraic Method (32)
    • 2.5: Interpreting the Derivative (51)

  • Chapter 3: Differentiation Techniques
    • 3.1: Basic Derivative Rules (27)
    • 3.2: The Product and Quotient Rules (23)
    • 3.3: The Chain Rule (24)
    • 3.4: Exponential and Logarithmic Rules (26)
    • 3.5: Implicit Differentiation (20)

  • Chapter 4: Derivative Applications
    • 4.1: Maxima and Minima (29)
    • 4.2: Applications of Maxima and Minima (30)
    • 4.3: Concavity and the Second Derivative (32)
    • 4.4: Related Rates (20)

  • Chapter 5: The Integral
    • 5.1: Indefinite Integrals (22)
    • 5.2: Integration by Substitution (22)
    • 5.3: Using Sums to Approximate Area (22)
    • 5.4: The Definite Integral (28)
    • 5.5: The Fundamental Theorem of Calculus (23)

  • Chapter 6: Advanced Integration Techniques and Applications
    • 6.1: Integration by Parts (24)
    • 6.2: Area Between Two Curves (31)
    • 6.3: Differential Equations and Applications (20)
    • 6.4: Differential Equations: Limited Growth and Logistic Growth Models (20)

  • Chapter 7: Multivariable Functions and Partial Derivatives
    • 7.1: Multivariable Functions (21)
    • 7.2: Partial Derivatives (22)
    • 7.3: Multivariable Maxima and Minima (22)
    • 7.4: Constrained Maxima and Minima and Applications (15)

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XP - Extra Problem
SBS - Step by Step


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Group Quantity Questions
Chapter 1: Functions and Models
1.1 28 001 002 003 004.SBS 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP
1.2 29 001 002 003.SBS 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP
1.3 52 001 002 003 004 005 006 008 009 010 012 014 017 019 020 021 023 025 026 027 028 029 030 501.XP 502.XP.SBS 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP 513.XP 514.XP 515.XP 516.XP 517.XP 518.XP 519.XP 520.XP 521.XP 522.XP 523.XP 524.XP 525.XP 526.XP 527.XP 528.XP 529.XP 530.XP
1.4 14 002 004 006 008 009 010 012 014 016 018 019 021 024 026
1.5 38 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 021 022 023 024 025 026 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP
1.6 20 001 002 003 004 005 006 007 008 009 012 013 015 017 019 023 025 027 032 034 036
Chapter 2: The Derivative
2.1 32 001.SBS 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP
2.2 33 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 021 022 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP
2.3 20 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020
2.4 32 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP.SBS 511.XP 512.XP 513.XP
2.5 51 001.SBS 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP 513.XP 514.XP 515.XP 516.XP 517.XP 518.XP 519.XP 520.XP 521.XP 522.XP 523.XP 524.XP 525.XP 526.XP 527.XP 528.XP 529.XP 530.XP 531.XP
Chapter 3: Differentiation Techniques
3.1 27 001 002.SBS 003 004 005 006 007 008 009 010 011 012 013 014 015 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP
3.2 23 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP
3.3 24 001 002 003 004.SBS 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 021 022 023 501.XP
3.4 26 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP.SBS
3.5 20 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018.SBS 019 020
Chapter 4: Derivative Applications
4.1 29 001.SBS 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 021 022 023 024 025 501.XP 502.XP 503.XP 504.XP
4.2 30 001 002 003 004 005 006 007 009.SBS 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP
4.3 32 001.SBS 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP 509.XP 510.XP 511.XP 512.XP
4.4 20 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015.SBS 016 017 018 019 020
Chapter 5: The Integral
5.1 22 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020.SBS 501.XP 502.XP
5.2 22 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019.SBS 020 501.XP 502.XP
5.3 22 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP.SBS 502.XP
5.4 28 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP 507.XP 508.XP.SBS
5.5 23 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP.SBS
Chapter 6: Advanced Integration Techniques and Applications
6.1 24 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 501.XP 502.XP 503.XP 504.XP
6.2 31 001 002 003.SBS 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020 021 022 023 024 025 501.XP 502.XP 503.XP 504.XP 505.XP 506.XP
6.3 20 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 020
6.4 20 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015.SBS 016 017 018 019 020
Chapter 7: Multivariable Functions and Partial Derivatives
7.1 21 001 002 003 004 005 006 007 008 009 010 011 012 013 014 015.SBS 017 018 019 020 501.XP 502.XP
7.2 22 001 002 003 004 005 006 007 008 009 010 011 012 013.SBS 014 015 016 017 018 019 020 501.XP 502.XP
7.3 22 001.SBS 002 003 004 005 006 007 008 009 010 011 012 013 014 015 016 017 018 019 501.XP 502.XP 503.XP
7.4 15 001 002 003 004 005 006 007 008 009 010 011 012 013 014.SBS 015
Total 872