Answer
The provided statement does not makes sense.
Work Step by Step
The provided compound statement can be written in simple statements as\[p\text{ and }q\].Here, \[p\text{ and }q\]represent two simple statements.
\[p\]: You ask me.
\[q\] : I know.
The given compound statement can be written in the symbolic form as
\[\left( \sim p\to q \right)\wedge \left( p\to \sim q \right)\]
In case of a conditional statement, it is false only when the antecedent is true and the consequent is false. For all other combinations of truth values, conditional statements will be true.The conjunction is true when all the simple statements are true.
Determine the truth table for the symbolic form \[\left( \sim p\to q \right)\wedge \left( p\to \sim q \right)\] can be written as follows:
