Difference between revisions of "MATH 2551"

From Georgia Tech Student Wiki
m (Wording change in single variable calculus section)
 
(26 intermediate revisions by one other user not shown)
Line 1: Line 1:
  +
{{DISPLAYTITLE:MATH 2551 - Multivariable Calculus}}
'''MATH 2551''' is a 4 credit core [[Mathematics|math]] class in multivariable calculus. MATH 2551 covers all topics in [[MATH 2550]] and includes an extra unit on vector fields and integration.
 
  +
'''MATH 2551''' covers limits, differentiation, and integration of functions with more than one input and/or output. It is a requirement for engineering majors.
   
== Content and Structure ==
+
== Topic List ==
  +
* 3D Coordinates and Vectors
  +
** 3D Coordinates
  +
** Vectors
  +
** The Dot Product
  +
** The Cross Product
  +
** Lines and Planes
  +
** Cylinders and Quadric Surfaces
   
  +
* Vector Functions
=== Topic List ===
 
  +
** Domain, Limits, and Continuity
# 3D Coordinates and Vectors
 
  +
** Derivatives
## 3D Coordinates
 
  +
** Integrals and Projectile Motion
## Vectors
 
  +
** Arc Length
## The Dot Product
 
  +
** Curvature and Normal Vectors
## The Cross Product
 
  +
** Tangential and Normal Components of Acceleration
## Lines and Planes
 
  +
** Velocity and Acceleration in Polar Coordinates
## Cylinders and Quadric Surfaces
 
# Vector Functions
 
## Domain, Limits, and Continuity
 
## Derivatives
 
## Integrals and Projectile Motion
 
## Arc Length
 
## Curvature and Normal Vectors
 
## Tangential and Normal Components of Acceleration
 
## Velocity and Acceleration in Polar Coordinates
 
# Multivariable Functions and Partial Derivatives
 
## Multivariable Functions
 
## Limits and Continuity
 
## Partial Derivatives
 
## Chain Rule
 
## Directional Derivatives and Gradient
 
## Tangent Planes and Differentials
 
## Extreme Values
 
## Lagrange Multipliers
 
## Taylor Polynomials
 
## Partial Derivatives with Constrained Variables
 
# Double and Triple Integrals
 
## Double Integrals
 
## Double Integrals in Polar Coordinates
 
## Triple Integrals
 
## Applications
 
## Triple Integrals in Cylindrical and Spherical Coordinates
 
## Integral by Substitution
 
# Vector Fields and Integration*
 
## Line Integrals of Scalar Fields
 
## Line Integrals of Vector Fields
 
## Conservative Vector Fields and Potential Functions
 
## Green's Theorem
 
## Parametric Surfaces
 
## Surface Integrals
 
## Stokes' Theorem and Divergence Theorem
 
<nowiki>*</nowiki> Vector Fields and Integration is not covered in MATH 2550
 
   
  +
* Multivariable Functions and Partial Derivatives
=== Prerequisite Knowledge ===
 
  +
** Multivariable Functions
  +
** Limits and Continuity
  +
** Partial Derivatives
  +
** Chain Rule
  +
** Directional Derivatives and Gradient
  +
** Tangent Planes and Differentials
  +
** Extreme Values
  +
** Lagrange Multipliers
  +
** Taylor Polynomials
  +
** Partial Derivatives with Constrained Variables
   
  +
* Double and Triple Integrals
==== Single Variable Calculus ====
 
  +
** Double Integrals
Single variable calculus, covered in [[MATH 1551]], [[MATH 1552|1552]], and AP Calculus, is an important prerequisite for MATH 2551. Multivariable calculus applies single variable calculus concepts such as limits, derivatives, and integrals to functions with more than one input and/or output. Multivariable calculus should not be seen as the next course in a linear sequence of calculus courses; rather, it should be seen as an outward expansion of all single variable calculus topics. For example, although no new integration techniques are introduced in multivariable calculus, with the exception of the Jacobian, the concept of integration is extended in multivariable calculus by applying it to 2D and 3D regions in a couple new coordinate systems.
 
  +
** Double Integrals in Polar Coordinates
  +
** Triple Integrals
  +
** Applications
  +
** Triple Integrals in Cylindrical and Spherical Coordinates
  +
** Integration by Substitution
   
  +
* Vector Fields and Integration*
==== Linear Algebra ====
 
  +
** Line Integrals of Scalar Fields*
While linear algebra, covered in [[MATH 1553]], [[MATH 1554|1554]], and [[MATH 1564|1564]], is listed as a prerequisite for MATH 2551, topics that require ''prior'' knowledge of linear algebra are rarely seen in MATH 2551. For example, while multiple topics in MATH 2551 use vectors extensively, vectors are reviewed at the beginning of the course, making prior knowledge of vectors supplementary rather than required. However, linear algebra does provide a more theoretical background for concepts such as the dot product and matrix determinant.
 
  +
** Line Integrals of Vector Fields*
  +
** Conservative Vector Fields and Potential Functions*
  +
** Green's Theorem*
  +
** Parametric Surfaces*
  +
** Surface Integrals*
  +
** Stokes' Theorem and Divergence Theorem*
   
  +
<nowiki>*</nowiki> Topic not covered in [[MATH 2550]]
===Relation to the Overall Curriculum===
 
MATH 2551 is generally taken sometime between late freshmen year and early sophomore year due to it having a couple prerequisites. Furthermore, MATH 2551 itself is an important requirement and prerequisite for all engineering majors, with the exception of [[Computer Engineering|computer engineering]].
 
   
===Workload===
+
==Class Structure==
  +
MATH 2551 is a core math class focused more on computation than pure theory. Typical problems can be quite lengthy, especially towards the end of the course.
Content in MATH 2551 is typically assessed through homework, quizzes, and exams. Homework tends to very time-consuming and focuses heavily on computation. Quizzes and exams also focus more on computation but do contain a couple theoretical questions, often presented in a true/false format. Exam problems are usually shorter than homework problems due to time constraints.
 
   
  +
== Prerequisite Knowledge ==
=== Resources ===
 
   
  +
=== Single Variable Calculus ===
*
 
  +
[[Single Variable Calculus|Single variable calculus]] is an important prerequisite for MATH 2551. Multivariable calculus applies single variable calculus concepts such as limits, derivatives, and integrals to functions with more than one input and/or output. Multivariable calculus should not be seen as the next course in a linear sequence of calculus courses; rather, it should be seen as an outward expansion of all single variable calculus topics. For example, while no new integration techniques are introduced in multivariable calculus, with the exception of the Jacobian, the concept of integration is extended in multivariable calculus by applying it to 2D and 3D regions in new coordinate systems.
   
== Registration ==
+
=== Linear Algebra ===
  +
Although [[Linear Algebra|linear algebra]] is listed as a prerequisite for MATH 2551, topics that require ''prior'' knowledge of linear algebra are rarely seen in MATH 2551. For example, while multiple topics in MATH 2551 use vectors extensively, vectors are reviewed at the beginning of the course, making prior knowledge of vectors unrequired. However, linear algebra does provide a more theoretical background for concepts such as the dot product and matrix determinant, which may be helpful for MATH 2551.
MATH 2551 is a [[linked course]], as it has a studio. You must register for a lecture section (marked with a single letter A, B, C, etc.), and its corresponding studio section (e.g. if you are in Section C, you must register for studio sections that start with C, like C01, C04, etc.). You must register for both of these at the same time.
 
   
  +
== Scheduling ==
And while it isn't a prerequisite, you will use some Multivariable Calculus concepts (such as vector valued functions and Green's theorem) in [[PHYS 2212]].
 
  +
MATH 2551 is required by most engineering and science majors. It is also a prerequisite itself for many classes required by engineering and science majors. Due to its prerequisites, MATH 2551 is generally taken sometime between late freshmen year and early sophomore year.
   
===Prerequisites===
+
=== Equivalent Courses ===
All of the Following<ref>https://oscar.gatech.edu/bprod/bwckctlg.p_disp_course_detail?cat_term_in=202108&subj_code_in=MATH&crse_numb_in=2551</ref><ref>https://math.gatech.edu/courses/math/2551</ref>:
 
   
  +
* [[MATH 2550]] is the introduction equivalent, which does not cover the final unit of MATH 2551, vector fields and integration.
* D or higher in MATH 1552 or a 4+ on AP Calculus BC.
 
  +
*[[MATH 2561]] is the honors equivalent, which includes additional topics and goes into more depth in general.
* D or higher in MATH 1553, MATH 1554, or MATH 1564.
 
===Equivalent Courses===
 
[[MATH 2561]] is an honors version, and goes over the topics in MATH 2551 at a much higher level (along with a few extra topics).
 
 
===Majors That Require This Class===
 
 
* All College of Engineering Majors except Computer Engineering
 
* Applied Physics
 
* Biochemistry
 
* Chemistry
 
* Earth and Atmospheric Sciences
 
* Physics
 
 
[[Category:Courses|^MATH^MATH]]
 
[[Category:Courses|^MATH^MATH]]
  +
<references />

Latest revision as of 14:13, 6 February 2022

MATH 2551 covers limits, differentiation, and integration of functions with more than one input and/or output. It is a requirement for engineering majors.

Topic List[edit | edit source]

  • 3D Coordinates and Vectors
    • 3D Coordinates
    • Vectors
    • The Dot Product
    • The Cross Product
    • Lines and Planes
    • Cylinders and Quadric Surfaces
  • Vector Functions
    • Domain, Limits, and Continuity
    • Derivatives
    • Integrals and Projectile Motion
    • Arc Length
    • Curvature and Normal Vectors
    • Tangential and Normal Components of Acceleration
    • Velocity and Acceleration in Polar Coordinates
  • Multivariable Functions and Partial Derivatives
    • Multivariable Functions
    • Limits and Continuity
    • Partial Derivatives
    • Chain Rule
    • Directional Derivatives and Gradient
    • Tangent Planes and Differentials
    • Extreme Values
    • Lagrange Multipliers
    • Taylor Polynomials
    • Partial Derivatives with Constrained Variables
  • Double and Triple Integrals
    • Double Integrals
    • Double Integrals in Polar Coordinates
    • Triple Integrals
    • Applications
    • Triple Integrals in Cylindrical and Spherical Coordinates
    • Integration by Substitution
  • Vector Fields and Integration*
    • Line Integrals of Scalar Fields*
    • Line Integrals of Vector Fields*
    • Conservative Vector Fields and Potential Functions*
    • Green's Theorem*
    • Parametric Surfaces*
    • Surface Integrals*
    • Stokes' Theorem and Divergence Theorem*

* Topic not covered in MATH 2550

Class Structure[edit | edit source]

MATH 2551 is a core math class focused more on computation than pure theory. Typical problems can be quite lengthy, especially towards the end of the course.

Prerequisite Knowledge[edit | edit source]

Single Variable Calculus[edit | edit source]

Single variable calculus is an important prerequisite for MATH 2551. Multivariable calculus applies single variable calculus concepts such as limits, derivatives, and integrals to functions with more than one input and/or output. Multivariable calculus should not be seen as the next course in a linear sequence of calculus courses; rather, it should be seen as an outward expansion of all single variable calculus topics. For example, while no new integration techniques are introduced in multivariable calculus, with the exception of the Jacobian, the concept of integration is extended in multivariable calculus by applying it to 2D and 3D regions in new coordinate systems.

Linear Algebra[edit | edit source]

Although linear algebra is listed as a prerequisite for MATH 2551, topics that require prior knowledge of linear algebra are rarely seen in MATH 2551. For example, while multiple topics in MATH 2551 use vectors extensively, vectors are reviewed at the beginning of the course, making prior knowledge of vectors unrequired. However, linear algebra does provide a more theoretical background for concepts such as the dot product and matrix determinant, which may be helpful for MATH 2551.

Scheduling[edit | edit source]

MATH 2551 is required by most engineering and science majors. It is also a prerequisite itself for many classes required by engineering and science majors. Due to its prerequisites, MATH 2551 is generally taken sometime between late freshmen year and early sophomore year.

Equivalent Courses[edit | edit source]

  • MATH 2550 is the introduction equivalent, which does not cover the final unit of MATH 2551, vector fields and integration.
  • MATH 2561 is the honors equivalent, which includes additional topics and goes into more depth in general.