MATH 250, Study Guide for Midterm Test 2
6/26/2012
Test coverage
- Derivative for functions of several variables (Chapter 14)
- Functions of several variables, domains, ranges, graphs (14.1)
- Limits and Continuity (14.2)
- Partial Derivatives (14.3)
- Tangent Planes and Linear Approximations. Differentials (14.4)
- The Chain Rule (14.5)
- Directional Derivatives and the Gradient Vector (14.6)
- Maximum and Minimum Values (14.7)
- Method of Lagrange Multipliers (14.8)
- Multiple Integrals (Chapter 15)
- Double Integrals over Rectangles (15.1)
- Iterated Integrals (15.2)
- Double Integrals over General Regions (15.3)
Key concepts (review from your lecture notes or the textbook)
- Domains for functions of two and three variables, interior, exterior and boundary points
- Graphs and level sets (level curves in 2D, level surfaces in 3D). Contour maps
- Limits: ε-δ-definition, squeezing principle, limits along different paths
- Definition of continuity in the case of two and three variables; examples of
continuous and discontinuous functions
- Partial derivatives, slopes of tangent lines to the graph
- Equation of the tangent plane. Linear approximation L(x,y), differential df(x,y)
- Chain rule in the case of several variables
- Directional derivatives. Computing directional derivatives using the
chain rule (the dot product formula)
- Gradient vector. Geometric significance of the gradient vector
- Tangent plane and normal line to a surface
- Local extrema (maxima and minima). Critical points
- Second Derivative Test for local extrema and saddle points
- Absolute maxima and minima in domains with boundaries
- Lagrange multiplier method for solving problems with constraints: cases of one and two constraints
- Double integrals over rectangles: Geometric and Algebraic (Riemann sum) definitions.
- Computing double integrals in simple examples (prisms, cylinders, spheres) using geometric definition
- Computing double integrals using iterated integrals
- Regions of Type I (vertically simple) and Type II (horizontally simple)
- Change of order of integration for general shape (Type I and Type II) regions
Basic types of questions (the list is not all-inclusive, but
it covers most of typical midterm questions)
- Find the domain of a function and sketch a few level curves/surfaces (14.1)
- Compute a limit using the squeezing principle or show that limit does not exist(14.2)
- Check the continuity of a function or find out how to define the function at a point not in the domain so that the result is a continuous function (14.2)
- Compute partial derivatives, verify that partial derivatives satisfy a given relation (Laplace's equation
is a typical example) (14.3)
- Find the equation of a tangent plane to a graph (14.4)
- Find the linear approximation or a differential of a function at a given point (14.4)
- Use differentials to estimate increments of functions (14.4)
- Compute derivatives of composite functions using the chain rule (14.5)
- Applied problems on chain rule: examples from geometry and physics/other sciences (14.5: Example 2, problems 35-44)
- Find all points in the domain of a function where a directional derivative or the gradient satisfy certain conditions (14.6)
- Find a tangent plane and/or normal line to a surface (14.6)
- Find all critical points of a function and determine their type (apply second derivative test) (14.7)
- Find the global maximum and minimum of a function in a closed bounded region (14.7)
- Solve a constraint optimization problem using Lagrange's method (one or two constraints) (14.8)
- Evaluate a double integral by using volumes of elementary figures (cylinders, prisms or spheres) (15.1)
- Use a double integral to compute the volume (15.2,3)
- Given a description of a plane region (between the curves 'one' and 'two') set up a double integral and solve it (15.3)
- Given an iterated integral change the order of integration and evaluate the integral (15.3)
Homework problems are the primary source of problems on the midterm; solve as many as you can (ideally, all) and review solutions
before the test.
Practice tests (for ~60 minutes):
Test 1: 14.3: 77, 14.2: 13, 14.6: 28, 14.7: 29, 14.8: 3, 14.R*: 29, 15.1: 13, 15.3: 19
Test 2: 14.3: 76(d), 14.2: 38, 14.4: 14, 14.5: 38, 14.7: 12, 14.8: 16, 15.1: 14, 15.3: 24, 52
(* 14.R is Chapter 14, Review Problems.)
Solutions to most even problems are available on the main page (see under homework solutions).
Good luck on the exam!