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== Can Bob decrypt the message? ==
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Yes, Bob can in fact decode the hidden message if he is given an identity matrix.
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The way he can do this is that he first needs to take the inverse of the matrix. From this he can take the first row and its three column entries as the first matrix to be multiplied by the inverse of the matrix, this will give him the first entry in the Alphabet for the secret message. This process is to be repeated using the next row of the same amount of columns until the message has been decoded.
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It has also been told that a zero counts as a space.
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== Can Eve decode the secret message without finding the inverse of the matrix? ==
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Yes, Eve can find out what the secret message is saying, but she will have to use a different way to find it.
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She knows the original message that is the output when it is passed through the encoder.
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The answer ends up being, referencing Max Paganini's source to input a matrix,
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<math>\begin{matrix} - \frac{2}{3} & 0 & \frac{2}{3} \\ 0 & 1 & 0 \\ 4 &0 & -1 \end{matrix} </math>
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== What is the encoded message for (2, 23, 3)? ==
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Using the first part of Part C's answer to identify the encoded message it is easy to figure out the new encoded message:
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<math> (2, 23, 3) - > Matrix^-1 - > B W E </math>

Latest revision as of 14:07, 18 September 2008

Can Bob decrypt the message?

Yes, Bob can in fact decode the hidden message if he is given an identity matrix.

The way he can do this is that he first needs to take the inverse of the matrix. From this he can take the first row and its three column entries as the first matrix to be multiplied by the inverse of the matrix, this will give him the first entry in the Alphabet for the secret message. This process is to be repeated using the next row of the same amount of columns until the message has been decoded.

It has also been told that a zero counts as a space.


Can Eve decode the secret message without finding the inverse of the matrix?

Yes, Eve can find out what the secret message is saying, but she will have to use a different way to find it.

She knows the original message that is the output when it is passed through the encoder.

The answer ends up being, referencing Max Paganini's source to input a matrix,

$ \begin{matrix} - \frac{2}{3} & 0 & \frac{2}{3} \\ 0 & 1 & 0 \\ 4 &0 & -1 \end{matrix} $


What is the encoded message for (2, 23, 3)?

Using the first part of Part C's answer to identify the encoded message it is easy to figure out the new encoded message:

$ (2, 23, 3) - > Matrix^-1 - > B W E $

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang