Rozonda Thomas

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Rozonda Ocelean "Chilli" Thomas (born February 27, 1971) is an American dancer, singer-songwriter, actress, and television personality who rose to fame in the early 1990s as a member of group TLC, one of the best-selling girl groups of all time.

Early life

Thomas was born in Atlanta, Georgia and graduated from Benjamin E. Mays High School in 1989. Her father, Abdul Ali, is of Middle Eastern and East Indian descent and her mother, Ava Thomas, is of African American, Native American and Tongan descent. Thomas, who had been raised by her mother, later allowed the Sally Jessy Raphael television talk show to air footage of her meeting her father for the first time in 1996.

Music career

1991–present: TLC

Thomas was first a dancer for Damian Dame. In 1991, she joined TLC, replacing founding member Crystal Jones, and was nicknamed "Chilli" by Lisa Lopes so that the group could retain the name TLC. The group went on to sell over 65 million records worldwide and became the second best selling group in the world and first in the US girl groups of all-time. Chilli has won four Grammy Awards for her work with TLC.

Tranquillity

Tranquillity (also spelled tranquility) is the quality or state of being tranquil; that is, calm, serene, and worry-free. The word tranquillity appears in numerous texts ranging from the religious writings of Buddhism, where the term passaddhi refers to tranquillity of the body, thoughts and consciousness on the path to enlightenment, to an assortment of policy and planning guidance documents, where interpretation of the word is typically linked to engagement with the natural environment.

Benefits

Psychological Being in a tranquil or ‘restorative’ environment allows individuals to take respite from the periods of sustained ‘directed attention’ that characterise modern living. In developing their Attention Restoration Theory (ART), Kaplan and Kaplan proposed that recovery from cognitive overload could most effectively be achieved by engaging with natural restorative environments, that are away from daily distractions and have the extent and mystery that allows the imagination to wander, thereby enabling individuals to engage effortlessly with their surroundings. The theory works on the principle that the amount of reflection possible within such an environment depends upon the type of cognitive engagement, i.e. fascination; that the environment holds. ‘Soft fascination’ is deemed to occur when there is enough interest in the surroundings to hold attention but not so much that it compromises the ability to reflect. In essence, soft fascination, which has been taken by Herzog and Pheasant as a reasonable term to describe tranquillity, provides a pleasing level of sensory input that involves no cognitive effort other than removing oneself from an overcrowded mental space.

Tranquility (disambiguation)

Tranquility or tranquillity may refer to:

Tranquility (album)

Tranquility is an album by American jazz pianist Ahmad Jamal featuring performances recorded in 1968 and originally released on ABC-Paramount and subsequently rereleased on the Impulse! label in 1973.

Reception

The Allmusic review awarded the album 3 stars stating "While not to be ranked amongst his greatest works, Tranquility is a very fine recording and any opportunity to hear this master should not be missed".

Track listing

Personnel

Factor

Factor, a Latin word meaning "who/which acts", may refer to:

Commerce

Science and technology

Biology

Computer science and information technology

Factoring (finance)

Factoring is a financial transaction and a type of debtor finance in which a business sells its accounts receivable (i.e., invoices) to a third party (called a factor) at a discount. A business will sometimes factor its receivable assets to meet its present and immediate cash needs.Forfaiting is a factoring arrangement used in international trade finance by exporters who wish to sell their receivables to a forfaiter. Factoring is commonly referred to as accounts receivable factoring, invoice factoring, and sometimes accounts receivable financing. Accounts receivable financing is a term more accurately used to describe a form of asset based lending against accounts receivable.

Factoring is not the same as invoice discounting (which is called an "Assignment of Accounts Receivable" in American accounting – as propagated by FASB within GAAP). Factoring is the sale of receivables, whereas invoice discounting ("assignment of accounts receivable" in American accounting) is a borrowing that involves the use of the accounts receivable assets as collateral for the loan. However, in some other markets, such as the UK, invoice discounting is considered to be a form of factoring, involving the "assignment of receivables", that is included in official factoring statistics. It is therefore also not considered to be borrowing in the UK. In the UK the arrangement is usually confidential in that the debtor is not notified of the assignment of the receivable and the seller of the receivable collects the debt on behalf of the factor. In the UK, the main difference between factoring and invoice discounting is confidentiality.

Von Neumann algebra

In mathematics, a von Neumann algebra or W*-algebra is a *-algebra of bounded operators on a Hilbert space that is closed in the weak operator topology and contains the identity operator. They were originally introduced by John von Neumann, motivated by his study of single operators, group representations, ergodic theory and quantum mechanics. His double commutant theorem shows that the analytic definition is equivalent to a purely algebraic definition as an algebra of symmetries.

Two basic examples of von Neumann algebras are as follows. The ring L^∞(R) of essentially bounded measurable functions on the real line is a commutative von Neumann algebra, which acts by pointwise multiplication on the Hilbert space L²(R) of square integrable functions. The algebra B(H) of all bounded operators on a Hilbert space H is a von Neumann algebra, non-commutative if the Hilbert space has dimension at least 2.

Von Neumann algebras were first studied by von Neumann (1930) in 1929; he and Francis Murray developed the basic theory, under the original name of rings of operators, in a series of papers written in the 1930s and 1940s (F.J. Murray & J. von Neumann 1936, 1937, 1943; J. von Neumann 1938, 1940, 1943, 1949), reprinted in the collected works of von Neumann (1961).