Minnesota State University Moorhead


 My Plan for Spring 2020
 Wish List:  

Login to view your plan.

 Wait List:  

View/Modify Schedule  Registered:  Expand My Plan  
Remove from Wait List

< New Search Continue to Review My Plan >

MATH 676 - Abstract Algebra & Galois Theory [MN 18 Online Program]
Spring 2020, Section 01

search actionsID #Subj#SecTitleDatesDaysTimeCrdsStatusInstructorDelivery MethodLoc
Add to Wish List Find Equivalent Courses Add To Waitlist (Disabled)
001383 MATH 676 01 Abstract Algebra & Galois Theory [MN 18 Online Program]
01/13 - 05/13
n/a
n/a
3.0 Open Fulghesu, Damiano
Completely Online-Asynchronous Location: Minnesota State University Moorhead
Building/Room: ON LINE


Meeting Details
DatesDaysTimeBuilding/RoomInstructor
1/13/2020 - 5/13/2020 n/a n/a ON LINE Fulghesu, Damiano

Notes
  • Online Course
  • Restricted to students in the MN 18 Online Program. Be enrolled in a Masters program or have a prior Masters degree and have at least 15 credits of undergraduate mathematics with a course grades of C- or better.

Location Details
Offered through: Minnesota State University Moorhead.
Campus: Minnesota State University Moorhead. Location: Minnesota State University Moorhead.

Seat Availability
Status: Open Size: 19 Enrolled: 7 Seats Remaining: 12

Restrictions
  • Restricted to program(s): 18 On-Line, 18 On-Line Greater MN
  • Requires students to be admitted.

Add/Drop/Withdraw
Full refund is available until January 17, 2020, 11:59PM CST.
Adding course is closed. Dropping course is closed.
The last day to withdraw from this course is May 1, 2020.

Tuition and Fees (Approximate)

Tuition and Fees (approximate):

Tuition -resident: $433.17
Tuition -nonresident: $433.17
Approximate Course Fees: $166.83

Course Level
Graduate

Description
The main goal of this course is to provide an introduction to advanced theory of polynomials and their roots. This course will also establish basic elements on algebraic structures such as groups, rings, and fields. Special attention will be given to polynomial rings and their quotients, extension fields, and the solution of polynomial equations via radicals.

Add To Wait List