’bits’ of information in messages
(Shannon & Weaver model of communication)
History and Orientation
One of the first designs of the information theory is the model of communication by Shannon and Weaver. Claude Shannon, an engineer at Bell Telephone Laboratories, worked with Warren Weaver on the classic book ‘The mathematical theory of communication’. In this work Shannon and Weaver sought to identify the quickest and most efficient way to get a message from one point to another. Their goal was to discover how communication messages could be converted into electronic signals most efficiently, and how those signals could be transmitted with a minimum of error. In studying this, Shannon and Weaver developed a mechanical and mathematical model of communication, known as the “Shannon and Weaver model of communication”.
Core Assumptions and Statements
According to the theory, transmission of the message involved sending information through electronic signals. “Information” in the information theory sense of the word, should not be confused with ‘information’ as we commonly understand it. According to Shannon and Weaver, information is defined as “a measure of one’s freedom of choice when one selects a message”. In information theory, information and uncertainty are closely related. Information refers to the degree of uncertainty present in a situation. The larger the uncertainty removed by a message, the stronger the correlation between the input and output of a communication channel, the more detailed particular instructions are the more information is transmitted. Uncertainty also relates to the concept of predictability. When something is completely predictable, it is completely certain. Therefore, it contains very little, if any, information. A related term, entropy, is also important in information theory. Entropy refers to the degree of randomness, lack of organization, or disorder in a situation. Information theory measures the quantities of all kinds of information in terms of bits (binary digit). Redundancy is another concept which has emerged from the information theory to communication. Redundancy is the opposite of information. Something that is redundant adds little, if any, information to a message. Redundancy is important because it helps combat noise in a communicating system (e.g. in repeating the message). Noise is any factor in the process that works against the predictability of the outcome of the communication process. Information theory has contributed to the clarification of certain concepts such as noise, redundancy and entropy. These concepts are inherently part of the communication process.
Shannon and Weaver broadly defined communication as “all of the procedures by which one mind may affect another”. Their communication model consisted of an information source: the source’s message, a transmitter, a signal, and a receiver: the receiver’s message, and a destination. Eventually, the standard communication model featured the source or encoder, who encodes a message by translating an idea into a code in terms of bits. A code is a language or other set of symbols or signs that can be used to transmit a thought through one or more channels to elicit a response in a receiver or decoder. Shannon and Weaver also included the factor noise into the model. The study conducted by Shannon and Weaver was motivated by the desire to increase the efficiency and accuracy or fidelity of transmission and reception. Efficiency refers to the bits of information per second that can be sent and received. Accuracy is the extent to which signals of information can be understood. In this sense, accuracy refers more to clear reception than to the meaning of message. This engineering model asks quite different questions than do other approaches to human communication research.
Mathematical (information) model of communication.
Source: Shannon & Weaver (1949)
To be added.
Scope and Application
Studies on the model of Shannon and Weaver takes two major orientations. One stresses the engineering principles of transmission and perception (in the electronic sciences). The other orientation considers how people are able or unable to communicate accurately because they have different experiences and attitudes (in the social sciences).
To be added.
- Shannon, C.E., & Weaver, W. (1949). The mathematical theory of communication. Urbana: University of Illinois Press.
- Hawes, L.C. (1975). Pragmatics of analoguing: Theory and model construction in communication. Reading, MA: Addison-Wesley.