b. Let $$ \mathrm{p}: $$ I am stressed. Let $$ \mathrm{q}: $$ I went to yoga. Let r : I meditated. Given the statement "If I am not stressed, then I went to yoga or I meditated." The conditional statement is Op $$ \rightarrow \sim(q \vee r) $$ $$ O \sim p \rightarrow \sim(q \vee r) $$ $$ O \sim p \rightarrow(q \vee r) $$ $$ O p \rightarrow(q \vee r) $$

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To analyze the given statement "If I am not stressed, then I went to yoga or I meditated," we need to break it down into its logical components using the provided symbols:

- Let $$ p $$: I am stressed.
- Let $$ q $$: I went to yoga.
- Let $$ r $$: I meditated.

The statement can be interpreted as follows:

1. "I am not stressed" translates to $$ \sim p $$.
2. "I went to yoga or I meditated" translates to $$ q \vee r $$.

Now, the entire statement "If I am not stressed, then I went to yoga or I meditated" can be expressed in logical form as:

$$
\sim p \rightarrow (q \vee r)
$$

This means that if I am not stressed ($$ \sim p $$), then it follows that I either went to yoga ($$ q $$) or I meditated ($$ r $$).

Now, let's evaluate the options provided:

1. $$ O p \rightarrow \sim(q \vee r) $$ - This is incorrect because it suggests that if I am stressed, then I did not go to yoga and did not meditate.
2. $$ O \sim p \rightarrow \sim(q \vee r) $$ - This is incorrect because it suggests that if I am not stressed, then I did not go to yoga and did not meditate.
3. $$ O \sim p \rightarrow (q \vee r) $$ - This is correct as it matches our derived logical expression.
4. $$ O p \rightarrow (q \vee r) $$ - This is incorrect because it suggests that if I am stressed, then I went to yoga or I meditated.

Thus, the correct conditional statement is:

$$
O \sim p \rightarrow (q \vee r)
$$
The correct conditional statement is $$ \sim p \rightarrow (q \vee r) $$.

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