Use technology (calculator, Microsoft Excel, or Google Sheets) to find the following binomial probabilities. Round to the nearest thousandth. According to the Center for Disease Control, 35% of US adults are estimated to have chronic kidney disease. A random sample of 175 U.S adults are selected. What is the probability that: 1. Exactly 55 have chronic kidney disease? P(r = V 55) = 0.0394 %3D 2. No more than 15 have chronic kidney disease? P(r s v 15) 3. Sixty or more have chronic kidney disease? P(r2+ 360): 0.6064

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Binomial Distribution Use technology (calculator, Microsoft Excel, or Google Sheets) to find the following binomial probabilities. Round to the nearest thousandth. According to the Center for Disease Control, 35% of US adults are estimated to have chronic kidney disease. A random sample of 175 U.S adults are selected. What is the probability that: 1. Exactly 55 have chronic kidney disease? P(r = V 55) = 0.0394 2. No more than 15 have chronic kidney disease? P(r se V 15) = 0 3. Sixty or more have chronic kidney disease? P(r2 + V 360) = 0.6064 Empirical Rule Use the Empirical Rule to find the following probabilities. It is suggested that you draw a normal curve, label the z-values for 1, 2, and 3 standard deviations from the mean, and write in the probabilities between each standard deviation before attempting to answer the questions. The average life-span of a True Test auto battery is 42 months with a standard deviation of 4 months. Assume a normal distribution.