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In mathematics, the limit of a sequence is the value that the terms of a sequence "tend to", and is often denoted using the symbol (e.g., ). [1] If such a limit exists and is finite, the sequence is called convergent . [ 2 ]
Delta Sigma Epsilon was a national collegiate social sorority founded at Miami University, operating in the United States from 1914 to 1956. [1] [2] [3] The sorority was absorbed by Delta Zeta sorority on August 21, 1956. [2] [3] Delta Sigma Epsilon chapters were traditionally located on the campuses of normal schools or teachers' colleges. [3]
Chapter Charter date and range Institution ... Delta Omega: Georgia: Active [37] Iota Nu: July 22, 2023 ... Epsilon Sigma: North Manchester, Indiana: Indiana:
Delta Delta: March 16, 1912 – January 1, 1915 College of Wooster: Wooster: Ohio: Inactive [23] [z] Delta Epsilon: May 25, 1912 Millikin University: Decatur: Illinois: Active [24] [aa] Delta Zeta: August 28, 1912 Franklin College: Franklin: Indiana: Active [ab] Delta Eta: September 19, 1912 Coe College: Cedar Rapids: Iowa: Active [ac] Omega ...
Omega Epsilon Sigma was founded as Omicron Epsilon Sigma on January 3, 1925, at Central Missouri State Teachers College (now University of Central Missouri).The 1925 edition of the Sunflower Yearbook described the sorority's membership policy as "eligibility to membership in this organization is based upon affiliation with the Order of the Eastern Star."
Chi Omega's first series chapters (single-letter) are named for 24 of the Greek letters and assigned in an order customized to Chi Omega, approximating a reverse alphabetical order. The Omega chapter is reserved as a memorial designation; subsequent chapters have likewise not been assigned using the letter Omega in their names.
In the following chapter list, ... Epsilon Delta: Penn State Berks: Spring Township, Pennsylvania ... Chi Omega Sigma: Southern University at Shreveport:
The standard definition of ordinal exponentiation with base α is: =, =, when has an immediate predecessor . = {< <}, whenever is a limit ordinal. From this definition, it follows that for any fixed ordinal α > 1, the mapping is a normal function, so it has arbitrarily large fixed points by the fixed-point lemma for normal functions.