Difference between revisions of "MAT1223"

Integration by Substitution

• Differentiation Rules
• Differentials
• Antiderivatives
• The Definite Integral
• The Fundamental Theorem of Calculus

• Recognize when to use integration by substitution.
• Use substitution to evaluate indefinite integrals.
• Use substitution to evaluate definite integrals.

Area between Curves

• Graphing Elementary Functions
• The Definite Integral
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Determine the area of a region between two curves by integrating with respect to the independent variable.
• Find the area of a compound region.
• Determine the area of a region between two curves by integrating with respect to the dependent variable.

Determining Volumes by Slicing

• Areas of basic shapes
• Volume of a cylinder
• Graphing elementary functions
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Determine the volume of a solid by integrating a cross-section (the slicing method).
• Find the volume of a solid of revolution using the disk method.
• Find the volume of a solid of revolution with a cavity using the washer method.

Volumes of Revolution, Cylindrical Shells

• Graphing elementary functions
• Determining Volumes by Slicing
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Calculate the volume of a solid of revolution by using the method of cylindrical shells.
• Compare the different methods for calculating a volume of revolution.

Arc Length and Surface Area

• Differentiation Rules
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Determine the length of a plane curve between two points.
• Find the surface area of a solid of revolution.

Physical Applications

• Areas of basic shapes
• Volume of a cylinder
• Basic Physics (Mass, Force, Work, Newton's Second Law, Hooke's Law)
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Determine the mass of a one-dimensional object from its linear density function.
• Determine the mass of a two-dimensional circular object from its radial density function.
• Calculate the work done by a variable force acting along a line.
• Calculate the work done in stretching/compressing a spring.
• Calculate the work done in lifting a rope/cable.
• Calculate the work done in pumping a liquid from one height to another.
• Find the hydrostatic force against a submerged vertical plate.

Integration by Parts

• Differentiation Rules
• Differentials
• The Fundamental Theorem of Calculus
• Integration by Substitution

• Recognize when to use integration by parts.
• Use the integration-by-parts formula to evaluate indefinite integrals.
• Use the integration-by-parts formula to evaluate definite integrals.
• Use the tabular method to perform integration by parts.
• Solve problems involving applications of integration using integration by parts.

Trigonometric Integrals

• Trigonometric Functions
• Trigonometric Identities
• The Fundamental Theorem of Calculus
• Integration by Substitution
• Integration by Parts

• Evaluate integrals involving products and powers of sin(x) and cos(x).
• Evaluate integrals involving products and powers of sec(x) and tan(x).
• Evaluate integrals involving products of sin(ax), sin(bx), cos(ax), and cos(bx).
• Solve problems involving applications of integration using trigonometric integrals.

Trigonometric Substitution

• Completing the Square
• Trigonometric Functions
• Trigonometric Identities
• Integration by Substitution
• Integration by Parts
• Trigonometric Integrals

• Evaluate integrals involving the square root of a sum or difference of two squares.
• Solve problems involving applications of integration using trigonometric substitution.

Partial Fractions

• Factoring Polynomials
• Completing the Square
• Long Division of Polynomials
• Systems of Linear Equations
• Antiderivatives
• Integration by Substitution

• Integrate a rational function whose denominator is a product of linear and quadratic polynomials.
• Recognize distinct linear factors in a rational function.
• Recognize repeated linear factors in a rational function.
• Recognize distinct irreducible quadratic factors in a rational function.
• Recognize repeated irreducible quadratic factors in a rational function.
• Solve problems involving applications of integration using partial fractions.

Improper Integrals

• The Fundamental Theorem of Calculus
• Integration by Substitution
• Integration by Parts
• Trigonometric Integrals
• Trigonometric Substitution
• Partial Fractions
• The Limit Laws
• Limits at Infinity
• L’Hôpital’s Rule

• Recognize improper integrals and determine their convergence or divergence.
• Evaluate an integral over an infinite interval.
• Evaluate an integral over a closed interval with an infinite discontinuity within the interval.
• Use the comparison theorem to determine whether an improper integral is convergent or divergent.

Sequences

• The Limit Laws and Squeeze Theorem
• Limits at Infinity
• L’Hôpital’s Rule
• Increasing and Decreasing Functions

• Find a formula for the general term of a sequence.
• Find a recursive definition of a sequence.
• Determine the convergence or divergence of a given sequence.
• Find the limit of a convergent sequence.
• Determine whether a sequence is bounded and/or monotone.
• Apply the Monotone Convergence Theorem.

Infinite Series

• Sigma notation
• Sequences
• Partial Fractions

• Write an infinite series using sigma notation.
• Find the nth partial sum of an infinite series.
• Define the convergence or divergence of an infinite series.
• Identify a geometric series.
• Apply the Geometric Series Test.
• Find the sum of a convergent geometric series.
• Identify a telescoping series.
• Find the sum of a telescoping series.

The Divergence and Integral Tests

• The Limit Laws
• Limits at Infinity
• Continuity
• Increasing and Decreasing Functions
• L’Hôpital’s Rule
• Improper Integrals

• Use the Divergence Test to determine whether a series diverges.
• Use the Integral Test to determine whether a series converges or diverges.
• Use the p-Series Test to determine whether a series converges or diverges.
• Estimate the sum of a series by finding bounds on its remainder term.

Comparison Tests

• Limits at Infinity
• Increasing and Decreasing Functions
• L’Hôpital’s Rule
• The Geometric Series Test
• The p-Series Test

• Use the Direct Comparison Test to determine whether a series converges or diverges.
• Use the Limit Comparison Test to determine whether a series converges or diverges.

Alternating Series

• Limits at Infinity
• Increasing and Decreasing Functions
• L’Hôpital’s Rule
• The Geometric Series Test
• The p-Series Test
• Comparison Tests

• Use the Alternating Series Test to determine the convergence of an alternating series.
• Estimate the sum of an alternating series.
• Explain the meaning of absolute convergence and conditional convergence.

Ratio and Root Tests

• Factorials
• Limits at Infinity
• L’Hôpital’s Rule

• Use the Ratio Test to determine absolute convergence or divergence of a series.
• Use the Root Test to determine absolute convergence or divergence of a series.
• Describe a strategy for testing the convergence or divergence of a series.

Power Series and Functions

• The Geometric Series Test
• The Divergence and Integral Tests
• Comparison Tests
• Alternating Series
• Ratio and Root Tests

• Identify a power series.
• Determine the interval of convergence and radius of convergence of a power series.
• Use a power series to represent certain functions.

Properties of Power Series

• Differentiation Rules
• Antiderivatives
• The Fundamental Theorem of Calculus
• Power Series and Functions

• Combine power series by addition or subtraction.
• Multiply two power series together.
• Differentiate and integrate power series term-by-term.
• Use differentiation and integration of power series to represent certain functions as power series.

Taylor and Maclaurin Series

• Higher-Order Derivatives
• Power Series and Functions
• Properties of Power Series

• Find a Taylor or Maclaurin series representation of a function.
• Find the radius of convergence of a Taylor Series or Maclaurin series.
• Finding a Taylor polynomial of a given order for a function.
• Use Taylor's Theorem to estimate the remainder for a Taylor series approximation of a given function.