Therefore C is a knave. A says The two of us are both knights and B says A is a knave 2.
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A is a knave and B speaking truthfully is therefore a knight.
. Thus As statement is false. Okay So um from the data provided um for condition here A says See is the nave be says a is the night and see says I am the spy. A says The two of us are both knights and B says A 20.
DBoth A and B say I am a knight eA says We are both knaves and B. A is a knave and B is a knight. A A A The two of us are both knights.
A says At least one of us is a knave and B says nothing. A says The two of us are both knights and B says A is a knave 2. Both A and B say I am a knight Either one could either thing.
Both will always be truthful. We came up with contradiction so A is telling truth. A says At least one of us is a knave and B says nothing.
SOLVEDA says The two of us are both knights and B says A is a knave VIDEO ANSWER. We are different Who is who. Both A and B say I am a knight.
A says At least one of us is a knave and B says nothing. So A and B are both knights. A says The two of us are both knights and B says A is a knave Relate to inhabitants of the island of knights and knaves created by Smullyan where knights always tell the truth and knaves always lie.
Were always here. 4 A is a knight and B is a knave. AA says At least one of us is a knave and B says nothing.
Use truth tables or Boolean algebra to solve Knights and Knaves Problems 1. They both lie all the time. Determine if possible what A and B are if they address you in the ways described.
But the statement made by A contradicts. A says I am a knave or B is a knight and B says nothing. P do not agree in either of the two cases.
B B B then also has to. Is a knave. Determine if possible what A and B are if they address you in the ways described.
A says The two of us are both knights and B says A is a knave. A says The two of us are both knights and B says A is a knave. Since C is a knave.
Person A is knave. So A cant be a knight. However if B is a knight then Bs statement that A and B are of opposite types the statement p -q V -p q would have to be true which it is not because A and B are both knights.
If A says we are both knights then you know that he is lying because both cant be. Which are knights and which are knaves. We conclude that with the assumption that A and B are either both knights or both knaves no Islander would make such a claim.
Since one of them is a knave the knave must be B. So um a logical way to give the solution for this is well fi. A is a knight.
3 A and B are knaves and knights respectively. Let us first assume that A A A is a knight then A A A speaks the truth and thus B B B has to be a knight as well. A says We are both knaves and B says nothing.
Here it is to determine that between A and B which one are a knight and which one is a knave. PS - The exact question is - Given - A says The two of us are both knights and B says A is knave To find - Solve the following logic puzzles that relate to inhabitants of the island of knights and knaves created by Smullyan where knights always tell the truth and knaves always lie. A saysif B is a knave then I am a knight B says.
IF A IS IF B IS Truth values Possible. Then no one among A and B are knaves so they have to be knights but knights never lie. B B B A A A is a knave.
Exactly ve of us are knights. You encounter two people A and B. So um a logical way to give the solution for this is well first be cannot be the night.
-21 Both A and B say I am a knight 22. At most three of us are knights. A says The two of us are both knights and B says A is a knave.
A Lets assume A is lying. A is a knight and B is a knave. Always tells the truth.
Both A and B say I am a knight It is possible for either A or B to be either a knight or a knave. Also have to be one. A - knight B - knave b Lets assume A is knight then B is a knight too.
If you meet two people A and B what can you deduce from their statements. Relate to the inhabitants of the island of knights and knaves created by Smullyan where knights always tell the truth and knaves always lie. 3 is is says.
A says The two of us are both knights and B says A is a knave A is a knave and B is a knight. P q q. Either one could be either thing.
If AKnight B should be a knave. If A says that he is a knave or B is a knight he cannot be a knave because if he was then his statement would be true even though knaves always tell lies. A is a knight and B is a knave.
It is known that knight always tells the truth and knave always tells the lie. A says I am a knave or B is a knight and B says nothing. If C is a knight then his statement must be true and hence he is a knave.
If Aknave Bknight then statement made by A holds true. Then since he isnt a knave the second part of the statement that B is a knight must be true. BA says The two of us are both knights and B says A is a knave cA says I am a knave or B is a knight and B says nothing.
Now lets assume A is a knight. This is a contradiction. A says The two of us are both knights and B says A is a knave Since the two statements can not both be correct A is a knave.
That be becomes a night than a will. If A is a knight then he is telling the truth when he says that B is a knight so that q is true and A and B are the same type. You encounter two people A and B.
A says The two of us are both knights and B say A is a knave. As a result A is telling the truth while B is lying which is impossible. P T T F F F T Observe that the truth values of p and q.
1 Both A and B are knights. Therefore Bs statement is correct and B is a knight. Person B is knight.
Exercises 1923 relate to inhabitants of the island of knights and knaves created by Smullyan where knights always tell the truth and knaves always. 2 A says The two of us are both knights and B says A is a knave. Okay So um from the data provided um for condition here A says See is the nave be says a is the night and see says I am the spy.
Statement made by B also holds true. In part two which is. A says We are both knights and B says A is lying The statements are contradictory so they cannot both be telling the truth.
2 Both A and B are knaves. A says We are both knaves and B says nothing. The statement in the question is.
Exactly two of us are knights. Note that since A and B are either both knights or both knaves only the following two rows are needed. Exactly one of us is a knight.
A says I am a knave or B is a knight and B says nothing.
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