Final answer:
To find the number of correct answers Maverick had, we use the information that he had a total mark of 59. Solving the equation x + (32 - x) = 59, we find that Maverick had 27 correct answers. Therefore, none of the options given (a) 31, b) 25, c) 33, d) 30) could be the number of correct answers.
Step-by-step explanation:
To find the number of correct answers Maverick had, we can use the information that he had a total mark of 59. Let's assume he answered x number of questions correctly. Since there are 32 questions in total, the number of incorrect answers would be 32 - x.
Each correct answer contributes 1 point, so the equation would be x + (32 - x) = 59. Simplifying this equation, we get 2x = 27, and solving for x, we find that Maverick had 27 correct answers.
Generally, in a multiple choice exam, if we know the total number of questions and how the scoring is done, we can perform a calculation to find out the number of correct answers needed for a particular overall score.
Therefore, he could not have had any of the options given (a) 31, b) 25, c) 33, d) 30) as the number of correct answers.