## Fall Term 2023 (1850)

### MATH 134 - Calculus for the Life Sciences I

★ 3 (fi 6)(EITHER, 3-0-0)

The derivative as a rate of change. Differentiation of elementary, trigonometric, exponential, and logarithmic functions. The definite integral as a summation. Integration. The Fundamental Theorem of Calculus. Applications in the context of the life sciences. Prerequisite: Mathematics 30-1. Note: Credit can be obtained in at most one of MATH 100, 113, 114, 117, 134, 144, 154 or SCI 100.

LECTURE D1 (85113)

2023-09-05 - 2023-12-08

TR 14:00 - 15:20 (VVC 2-215)

### MATH 209 - Calculus for Engineering III

★ 3 (fi 6)(EITHER, 3-0-1)

Partial differentiation, derivatives of integrals. Multiple integration using rectangular, cylindrical, and spherical coordinates. Vector Field Theory. Prerequisite: MATH 101. Prerequisite or corequisite: MATH 102. Notes: (1) This course may not be taken for credit if credit has already been obtained in MATH 215 or 317. (2) Students in all sections of this course will write a common final examination. (3) Restricted to Engineering students. Non-Engineering students who take this course will receive *3.0.

LECTURE EA1 (82086)

2023-09-05 - 2023-12-08

MWF 09:00 - 09:50 (ETLC E1-017)

## Winter Term 2024 (1860)

### MATH 101 - Calculus for Engineering II

★ 3 (fi 6)(EITHER, 3-0-1)

Area between curves, techniques of integration. Applications of integration to planar areas and lengths, volumes and masses. First order ordinary differential equations: separable, linear, direction fields, Euler's method, applications. Infinite series, power series, Taylor expansions with remainder terms. Polar coordinates. Rectangular, spherical and cylindrical coordinates in 3-dimensional space. Parametric curves in the plane and space: graphing, arc length, curvature; normal binormal, tangent plane in 3- dimensional space. Volumes and surface areas of rotation. Prerequisite: MATH 100. Notes: (1) Credit can be obtained in at most one of MATH 101, 115, 118, 136, 146, 156 or SCI 100. (2) Students in all sections of this course will write a common final examination. (3) Restricted to Engineering students. Non-Engineering students who take this course will receive *3.0.

LECTURE ER1 (13757)

2024-01-08 - 2024-04-12

MWF 10:00 - 10:50 (HC L1-L1)

LECTURE EU1 (13773)

2024-01-08 - 2024-04-12

MWF 14:00 - 14:50 (ETLC E1-013)

### MATH 209 - Calculus for Engineering III

★ 3 (fi 6)(EITHER, 3-0-1)

Partial differentiation, derivatives of integrals. Multiple integration using rectangular, cylindrical, and spherical coordinates. Vector Field Theory. Prerequisite: MATH 101. Prerequisite or corequisite: MATH 102. Notes: (1) This course may not be taken for credit if credit has already been obtained in MATH 215 or 317. (2) Students in all sections of this course will write a common final examination. (3) Restricted to Engineering students. Non-Engineering students who take this course will receive *3.0.

LECTURE EQ1 (13819)

2024-01-08 - 2024-04-12

MWF 12:00 - 12:50 (CAB 243)