Wright Alexander
01/16/2023 · Senior High School
Consider the following simple statements. \( t \) : The radial tires are included. \( s \) : The sunroof is extra. \( w \) : Wi-Fi is optional. Translate the following symbolic compound statement into words: \( \sim s \wedge \sim w \) The sunroof is extra or \( \mathrm{Wi}-\mathrm{Fi} \) is optional. The sunroof is extra and \( \mathrm{Wi}-\mathrm{Fi} \) is optional. Thot extra, or \( \mathrm{Wi}-\mathrm{Fi} \) is not optional.
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Step-by-step Solution
To translate the symbolic compound statement \( \sim s \wedge \sim w \) into words, we first need to understand the symbols:
- \( \sim s \) means "not \( s \)", which translates to "the sunroof is not extra."
- \( \sim w \) means "not \( w \)", which translates to "Wi-Fi is not optional."
- The symbol \( \wedge \) represents "and."
Putting it all together, the statement \( \sim s \wedge \sim w \) translates to:
"The sunroof is not extra and Wi-Fi is not optional."
So, the correct translation is:
**The sunroof is not extra and Wi-Fi is not optional.**
Quick Answer
The sunroof is not extra and Wi-Fi is not optional.
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