Question 1167569
```python?code_reference&code_event_index=2
# Data provided in the table for Female superheroes
female_flying = 98
female_telepathy = 58
female_super_strength = 49

# 1. Calculate the Total Number of Female Superheroes
total_female = female_flying + female_telepathy + female_super_strength

# 2. Identify the Number of Female Superheroes with Super Strength
female_super_strength_count = female_super_strength

# 3. Calculate the Empirical Conditional Probability: P(Super Strength | Female)
probability = female_super_strength_count / total_female

# Print results
print(f"Total Female Superheroes: {total_female}")
print(f"Female Super Strength Count: {female_super_strength_count}")
print(f"Probability (decimal): {probability}")
print(f"Probability (rounded to 3 decimal places): {probability:.3f}")

```

```text?code_stdout&code_event_index=2
Total Female Superheroes: 205
Female Super Strength Count: 49
Probability (decimal): 0.23902439024390243
Probability (rounded to 3 decimal places): 0.239

```

The empirical probability that a randomly selected **female** superhero will have **Super Strength** is **0.239**.

This is a **conditional probability** calculated as the ratio of female superheroes with Super Strength to the total number of female superheroes.

### Calculation Steps

1.  **Total Number of Female Superheroes (Sample Space):**
    $$\text{Total Female} = 98 (\text{Flying}) + 58 (\text{Telepathy}) + 49 (\text{Super Strength}) = 205$$

2.  **Number of Female Superheroes with Super Strength (Event Count):**
    $$\text{Female Super Strength} = 49$$

3.  **Empirical Probability:**
    $$P(\text{Super Strength} | \text{Female}) = \frac{\text{Female Super Strength}}{\text{Total Female}} = \frac{49}{205} \approx 0.23902...$$

Rounding to 3 decimal places gives **0.239**.