What is the maximum number of shades of gray represented by a 4-bit binary number?

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Prepare for the Medical Dosimetry Certification Test with comprehensive flashcards and multiple choice questions, complete with hints and explanations. Ensure your success by studying key topics covered in the exam!

A 4-bit binary number consists of 4 bits, each of which can be either a 0 or a 1. Therefore, each bit doubles the number of possible combinations that can be formed. The total number of unique combinations that can be represented by a 4-bit binary number is calculated using the formula (2^n), where (n) is the number of bits.

In this case, since (n) is 4, the calculation is:

[

2^4 = 16

]

This means there are a total of 16 unique combinations that can represent different shades of gray. In digital imaging, each combination can be assigned a specific shade, ranging from black (0) to white (the maximum value represented by all bits being 1). Thus, the maximum number of shades of gray represented by a 4-bit binary number is 16.

What is the maximum number of shades of gray represented by a 4-bit binary number?

Prepare for the Medical Dosimetry Certification Test with comprehensive flashcards and multiple choice questions, complete with hints and explanations. Ensure your success by studying key topics covered in the exam!

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