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With a legacy of more than 100 years, the Better Business Bureau (BBB) is the go-to watchdog for evaluating businesses and charities. The nonprofit organization maintains a massive database of ...
The Better Business Bureau (BBB) is an American private, 501(c)(6) nonprofit organization founded in 1912. BBB's self-described mission is to focus on advancing marketplace trust, [2] consisting of 92 independently incorporated local BBB organizations in the United States and Canada, coordinated under the International Association of Better Business Bureaus (IABBB) in Arlington, Virginia.
BBB National Programs, an independent non-profit organization that oversees more than a dozen national industry self-regulation programs that provide third-party accountability and dispute resolution services to companies, including outside and in-house counsel, consumers, and others in arenas such as privacy, advertising, data collection, child-directed marketing, and more.
The Complaint tablet to Ea-nāṣir may be the oldest known written customer complaint. [1] A consumer complaint or customer complaint is "an expression of dissatisfaction on a consumer's behalf to a responsible party" (London, 1980). It can also be described in a positive sense as a report from a consumer providing documentation about a ...
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Dorrance Publishing does not attempt to hide its charges and makes no claims of selecting clients based on potential for commercial success. [9] [10]As of May 2022, Dorrance Publishing has an A− rating with the Better Business Bureau with 70 complaints filed against them.
Given a point A 0 in a Euclidean space and a translation S, define the point A i to be the point obtained from i applications of the translation S to A 0, so A i = S i (A 0).The set of vertices A i with i any integer, together with edges connecting adjacent vertices, is a sequence of equal-length segments of a line, and is called the regular apeirogon as defined by H. S. M. Coxeter.
Can someone add some explicit information about the symmetry groups of the regular apeirogon and the irregular apeirogons. It seems to me that the symmetry groups for all of them would be isomorphic to the dihedral group of infinite order, but for the irregular apeirogons, the "rotations" and "reflections" would be twice as far apart when compared to the regular apeirogon.