Dr. Virginia Apgar developed a test of infant health that is now known as the Apgar test. It evaluates an infant's health on a scale from \[0\] to \[10\] across five different indicators—the best possible overall score is \[10\] on the test. Here's the distribution of Apgar scores based on over \[50{,}000\] birth records: A histogram plots relative frequency versus Apgar score. The x axis goes from 0 to 10 and the y axis goes from 0.00 to 0.45. The distribution is left skewed between 1 and 10 with a mode of approximately 0.44 at a score of 9. Suppose that we took random samples of \[9\] infants from this population and calculated the sample mean Apgar score \[\bar x\] of the infants in each sample. Which graph shows the most reasonable approximation of the sampling distribution of \[\bar x\]? Choose 1 answer: Choose 1 answer: (Choice A) A histogram plots relative frequency versus sample mean. The x axis goes from 6.8 to 9.2 and the y axis goes from 0.00 to 0.25. The distribution is left skewed between 6.8 and 9.2, with a mode of approximately 0.23 at 8.5. A A histogram plots relative frequency versus sample mean. The x axis goes from 6.8 to 9.2 and the y axis goes from 0.00 to 0.25. The distribution is left skewed between 6.8 and 9.2, with a mode of approximately 0.23 at 8.5. (Choice B) A histogram plots relative frequency versus sample mean. The x axis goes from 6.8 to 9.2 and the y axis goes from 0.00 to 0.25. The distribution is right skewed between 6.8 and 9.2, with a mode of approximately 0.23 at 7.6. B A histogram plots relative frequency versus sample mean. The x axis goes from 6.8 to 9.2 and the y axis goes from 0.00 to 0.25. The distribution is right skewed between 6.8 and 9.2, with a mode of approximately 0.23 at 7.6. (Choice C) A histogram plots relative frequency versus sample mean. The x axis goes from 6.8 to 9.2 and the y axis goes from 0.00 to 0.25. The distribution is symmetrical with a mean of approximately 0.24 at 8.1. C A histogram plots relative frequency versus sample mean. The x axis