# Nakafa Framework: LLM URL: https://nakafa.com/en/exercises/high-school/snbt/quantitative-knowledge/try-out/set-10/17 Exercises: Try Out - Set 10: Real exam simulation to sharpen your skills and build confidence. - Broken Egg Probability --- ## Exercise 17 ### Question export const metadata = { title: "Broken Egg Probability", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/27/2025", }; A basket contains duck eggs and chicken eggs. Half of the duck eggs are broken, and one-fourth of the chicken eggs are broken. If one egg is taken from the basket, what is the probability that the taken egg is a duck egg or a broken egg? ### Choices - [ ] $$\frac{1}{3}$$ - [ ] $$\frac{2}{3}$$ - [x] $$0.5$$ - [ ] $$0.333$$ - [ ] $$\frac{1}{4}$$ ### Answer & Explanation export const metadata = { title: "Egg Probability Explanation", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/27/2025", }; Let's define the events as follows: - = Sample space (total eggs) - = Event of picking a duck egg - = Event of picking a chicken egg - = Event of picking a broken egg First, we calculate the total number of eggs in the basket: Next, we calculate the number of broken eggs: - Broken duck eggs: - Broken chicken eggs: The total number of broken eggs () is: We are asked to find the probability of picking a duck egg **or** a broken egg (). The formula for the probability of the union of two events is: Where can be calculated using the inclusion-exclusion principle: - (number of duck eggs) - (total number of broken eggs) - is the number of eggs that are both duck eggs **and** broken. From the calculation above, there are broken duck eggs. Thus: So the probability is: Therefore, the probability of picking a duck egg or a broken egg is . ---