Question
Which outcome does not represent a favorable outcome? (Highlight or circle the correct answer). a. making at least two free throws (the one that does not have at least two heads) \( \begin{array}{llll}\text { A. TTTH } & \text { B. HTHT } & \text { C. TTHH } & \text { D. HHTH } \\ \begin{array}{lll}\text { b. making exactly two free throws (the one that does not have exactly two heads) } \\ \begin{array}{lll}\text { A. HHHT } & \text { B. THTH } & \text { C. THHT } \\ \begin{array}{ll}\text { C. making at least two free throws in a row (the one that does not have two heads in } \\ \text { a row) } & \text { B. HHHT }\end{array} \\ \begin{array}{ll}\text { A. HHTT } & \text { C. HTHT }\end{array}\end{array}\end{array} l^{\text {B. THH }}\end{array} \)
Ask by Frazier Nguyen. in the United States
Mar 14,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
**Part (a):**
A. TTTH
**Part (b):**
A. HHHT
**Part (c):**
C. HTHT
Solution
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Extra Insights
If we're looking for the outcomes that do not represent a favorable scenario, let’s break it down to very simple terms! Starting with making at least two free throws (finding sequences without at least two heads), option A. TTTH is the odd one out since it only contains one head. Now, on to exactly two free throws (finding sequences without exactly two heads), option A. HHHT stands out, as it has three heads and is definitely not exactly two. This way, we get the not-so-favorable outcomes: A. TTTH and A. HHHT.
