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MATH 25B Spring 2017-2018 / Section: 001 / Class number: 12203

Honors Linear Algebra and Real Analysis II
Science Ctr 507 (FAS)
Monday 10:00 AM - 10:59 AM; Wednesday 10:00 AM - 10:59 AM; Friday 10:00 AM - 10:59 AM

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

MATH 25B Spring 2016-2017 / Section: 001 / Class number: 10450

Honors Linear Algebra and Real Analysis II
Sever 213 (FAS)
Friday 10:00-10:59; Wednesday 10:00-10:59; Monday 10:00-10:59

Course website Warning! This Canvas course has been concluded. Only prior members of the course can access the site.

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

MATH 25B Spring 2015-2016 / Section: 001 / Class number: 11038

Honors Linear Algebra and Real Analysis II
Emerson 101 (FAS)
Monday, Wednesday, Friday 10:00am - 10:59am

Course website Warning! This Canvas course has been concluded. Only prior members of the course can access the site.

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

Mathematics 25b Spring 2014-2015

Honors Linear Algebra and Real Analysis II
Daniel Anthony Cristofaro-Gardiner
Sever Hall 202
M., W., F., at 10

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

Mathematics 25b Spring 2013-2014

Honors Linear Algebra and Real Analysis II
Noam D. Elkies
Monday, Wednesday, Friday 11:00am - 12:00pm

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

Mathematics 25b Spring 2012-2013

Honors Linear Algebra and Real Analysis II
Benedict H. Gross
Monday, Wednesday, Friday 10:00am - 11:00am

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

Mathematics 25b Spring 2011-2012

Honors Linear Algebra and Real Analysis II
Sarah Colleen Koch
Tuesday, Thursday 10:00am - 11:30am

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.

Mathematics 25b Spring 2010-2011

Honors Linear Algebra and Real Analysis II
Benedict H. Gross
Science Center 507
M., W., F., at 11

Course website

A rigorous treatment of basic analysis. Topics include: convergence, continuity, differentiation, the Riemann integral, uniform convergence, the Stone-Weierstrass theorem, Fourier series, differentiation in several variables. Additional topics, including the classical results of vector calculus in two and three dimensions, as time allows.