A Logician, three students and three initials

Question

A logician decides to test three students named Rich, Ken and Rob. He said:

I am thinking of the initials of a full name. First, middle and last. On three separate blank cards I have written those initials. Rich gets the initial for the first name, Ken gets the initial for the middle name and Rob gets the initial of the last name.

Then on the board he shows them a table of the three initials. He tells them that the name's initials is one of these 10 choices.

RICH	KEN	ROB
FIRST INITIAL	MIDDLE INITIAL	LAST INITIAL
B	D	W
C	D	H
C	G	M
C	F	W
C	J	S
E	G	W
E	G	S
E	J	M
N	D	H
N	J	M

He asks, "Can you guess the correct combination?"

Rich looks at his card and says, “I cannot logically guess the combination.”

Ken looks at his card and says, "I also cannot guess the combination."

Rob looks at his card and says, "I know the combination!"

Rich says, "OK. So I know the combination also."

Ken after thinking a bit says, "I definitely know the combination but the other two are wrong!"

The logician asks them to write down their guesses and sure enough Ken was right. Explain what must have happened assuming nobody lied. What was the correct combination?

Answer 1

I think the correct combination is

EJM

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If we go through the conversation:

Rich cannot guess it, so it has to have multiple options on the board - so the first initial is not B.

As Ken cannot guess either, it also has to be an initial that appears multiple times - so it is not CFW.

Rob says they can guess the combination. So with BDW and CFW ruled out, the last initial must be unique. So Rob has W and the match is EGW.

So that’s it right?

Well Rich has followed and also believes the answer is EGW - as the combination matches his first initial E.

But Ken has also followed - but is confused as his middle initial is J. He thinks for a second and realises Rob is looking at his initial upside down - his initial is actually an M not a W, and the correct combination is actually EJM!