Let p: The question paper is eassy. Q: we will pass. Then the symbolic statement (~P`rarr`~q) means.

To solve the problem, we need to interpret the symbolic statement \( \neg P \rightarrow \neg Q \) where: - \( P \): The question paper is easy. - \( Q \): We will pass. ### Step-by-step Solution: 1. **Identify the Negations**: - The negation of \( P \) (not easy) is \( \neg P \): "The question paper is not easy." - The negation of \( Q \) (not passing) is \( \neg Q \): "We will not pass." 2. **Interpret the Implication**: - The statement \( \neg P \rightarrow \neg Q \) translates to: "If the question paper is not easy, then we will not pass." 3. **Conclusion**: - Therefore, the symbolic statement \( \neg P \rightarrow \neg Q \) means: "If the question paper is not easy, then we will not pass." ### Final Answer: The symbolic statement \( \neg P \rightarrow \neg Q \) means: "If the question paper is not easy, then we will not pass." ---