🏷️ LIMITED TIME OFFER: GET 20% OFF GRADE+ YEARLY SUBSCRIPTION →
Log in

Verified Documents at University of Connecticut

Browse the full collection of course materials, past exams, study guides and class notes for MATH 2110Q - Multivariable Calculus at University of Connecticut verified by our …
Get Access
PROFESSORS
All Professors
All semesters
Myron Minn-Thu-Aye
fall
28

Verified Documents for Myron Minn-Thu-Aye

Class Notes

Taken by our most diligent verified note takers in class covering the entire semester.
MATH 2110Q Lecture 1: calc 3 notes page 3
130
MATH 2110Q Lecture 1: calc 3 notes page 1
149
MATH 2110Q Lecture 1: calc 3 notes page 2
130
MATH 2110Q Lecture Notes - Lecture 1: Pythagorean Theorem, Horizontal Plane, Hyperbola
Other notes: this week and next week we will focus on chapter 12, take time to learn new things. Helpful tips for learning: stick with things, some thi
640
MATH 2110Q Lecture 2: MATH 2110Q Lecture 2 - Three Dimensional Surfaces
Math 2110q lecture 2 three dimensional surfaces. A circular cylinder, r = 2: r3 extends parallel to the x axis since x is not in the equation, extends
545
MATH 2110Q Lecture Notes - Lecture 3: Parametric Equation
258
MATH 2110Q Lecture Notes - Lecture 4: Quadric, Ellipse, Paraboloid
Math 2110q lecture 4 cylinders and quadric cylinders. If we graph a two variable equation in r3, the absent variable can take on any value, and the sur
566
MATH 2110Q Lecture Notes - Lecture 5: Directional Derivative, Tangent Space, Dot Product
236
MATH 2110Q Lecture Notes - Lecture 6: Multiple Integral, Riemann Sum
237
MATH 2110Q Lecture Notes - Lecture 7: Integral, Arc Length, Polar Coordinate System
Math 2110q lecture 7 double integrals in polar coordinates. A reminder of polar coordinates: x + y = r . Evaluate (cid:1517) (cid:1876)(cid:2870)+(cid:
358
MATH 2110Q Lecture Notes - Fall 2018 Lecture 8 - Integral, Cylindrical coordinate system
232
MATH 2110Q Lecture Notes - Lecture 9: Spherical Coordinate System
What are spherical coordinates (cid:4666),, (cid:4667): (cid:2025) (rho) to the distance from the origin to the point, still measures counterclockwise
434
MATH 2110Q Lecture Notes - Lecture 10: Product Rule, Unit Vector
Math 2110q lecture 10 vector valued functions. How do define a curve (a one-dimensional object) in three-dimensional space: we"ve already done this: li
333
MATH 2110Q Lecture 12: MATH 2110Q Lecture 12 - Vector Valued Functions cont.
234
MATH 2110Q Lecture Notes - Lecture 13: Cylindrical Coordinate System
228
MATH 2110Q Lecture Notes - Lecture 14: Spherical Coordinate System
240
MATH 2110Q Lecture Notes - Lecture 15: Order Type
230
MATH 2110Q Lecture Notes - Lecture 16: Unit Vector, Product Rule
Math 2110q lecture 16 - vector valued functions cont. Example: a unit vector parallel to the curve, the unit vector in the direction of (cid:1870) (cid
238
MATH 2110Q Lecture 17: MATH 2110Q Lecture 17 - Vector Fields
251
MATH 2110Q Lecture Notes - Lecture 18: Multiple Integral, Unit Vector
Math 2110q lecture 18 line integrals of scalar functions: warm up on arc length: the vector function (cid:1870) (t) = (cid:1855)(cid:1867)(cid:1871)(ci
229
MATH 2110Q Lecture Notes - Lecture 19: Vector Field, Parametrization
2107
MATH 2110Q Lecture 20: MATH 2110Q Lecture 20 - Green's Theorem
Green"s theorem: = line integral above why, let c be one simple closed curve traced counterclockwise that encloses the region d in, = [(cid:884)(cid:18
255
MATH 2110Q Lecture 22: Curl and Divergence
Find div ( ) for = (cid:1766)(cid:1876)(cid:1877),(cid:1877)(cid:1878),(cid:1876)+(cid:1878)(cid:1767: divergence is always a scalar function. Example:
485
MATH 2110Q Lecture Notes - Lecture 23: Cylindrical Coordinate System, Tangent Space
248
MATH 2110Q Lecture Notes - Lecture 24: Multiple Integral
252
MATH 2110Q Lecture Notes - Lecture 27: Surface Integral, Cross Product, Multiple Integral
275
MATH 2110Q Lecture Notes - Lecture 28: Surface Integral, Correlation Does Not Imply Causation
364
MATH 2110Q Lecture Notes - Lecture 29: Divergence Theorem, Regions Of Johannesburg
282