Final answer:
The Mathematical Model of Communication, also known as the Shannon-Weaver Model, does emphasize sender-receiver interaction and includes considerations of noise and the processes of encoding and decoding. However, feedback is not a crucial component in the original model, although it has been included in later adaptations of the model.
Step-by-step explanation:
The question asks which statement is true of the Mathematical Model of Communication. The correct answer is not provided in the options above because all the options listed represent what are generally considered to be inaccuracies or aspects not featured in this model. The model was originally developed by Claude Shannon and Warren Weaver and is also known as the Shannon-Weaver Model. In this model:
- It emphasizes sender-receiver interaction, identified as the source and destination.
- Noise is indeed considered in the model and is one of its components. It represents any interference that might affect the message being sent.
- Feedback is not typically a crucial component in the original concept of this model, which primarily focused on how messages are transmitted, not on the interaction or response from the receiver.
- The process of encoding and decoding a message is a fundamental part of the model, representing how information is prepared for transmission and then interpreted by the receiver.
To answer the question correctly, we would have to say that feedback is not a crucial component of the original Shannon-Weaver Mathematical Model of Communication. However, it is important to note that feedback has been acknowledged in later adaptations and discussions of communication models.