QuestionWhich key would it be impossible to cut into three different figures of five shaded squares? |
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| A: A | B: B | C: C | D: D | E: E |
LLM Response: To determine which key would be impossible to cut into three different figures of five shaded squares, we need to analyze the number and arrangement of shaded squares in each option. A1: A has a single column of seven shaded squares. B2: B has two rows of five shaded squares. C3: C has three columns of six shaded squares. D4: D has one row of seven shaded squares. E5: E has one row of six shaded squares followed by four unshaded squares. Since options A1, B2, and E5 have either too many or too few shaded squares, they are not possible. The remaining options, C3 and D4, both have enough shaded squares (five) to create three different figures with five shaded squares each. Therefore, it is impossible to cut any key other than option C3 to create three different figures with five shaded squares. The answer is C3.
Final Prediction: Puzzle #23: Solve this question with explanation of the intermediate steps. Your response must end with one of the selected answer options from A1, B2, C3, D4, or E5. Which key would it be impossible to cut into three different figures of five shaded squares? Options: A1: A, B2: B, C3: C, D4: D, E5: E. Predicted Answer = K Correct Answer = B