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Use the z-Table for the standard normal distribution [see Lecture Notes] to calculate the following probabilities: No.9-C1. At zo = -0.96; Z1 = 0.7 Probabilities Answers (see Form) P(Z < zo) P(Z > z1) P(|Z| < z1) P(z, < Z < z1) Use the z-Table for the standard normal distribution [see Lecture Notes] to find z so that 6% of the standard normal curve lies to the right of z. No.9-C2. No.9-С3. Use the z-Table for the standard normal distribution [see Lecture Notes] to find the value a for the P(-a <Z <a) = 0.6. Calculate the value of a in the standard normal distribution for which P(-4 – a <Z < 4 + a) = 0.5934. No.9-C4. No.9-C5. Let X is a normally distributed variable with mean u = 266 and standard deviation o = 16. Find а) Р(х < 250); b) Р(X > 300); c) P(240 < X < 270).

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4 X~N(µ, o²), µ = 266, o = 16 Probabilities Answers (see Form) Р(X < 250) Р(X > 300) P(240 < X < 270) No.9-C6. The length of similar components produced by a company are approximated by a normal distribution model with a mean of 5 cm and a standard deviation of 0.02 cm. If a component is chosen at random (a) what is the probability that the length of this component is between 4.98 and 5.02 cm ? (b) what is the probability that the length of this component is between 4.96 and 5.04 cm ? No.9-C7. Calculate the value of a in a normal distribution with a mean of 5 and a standard deviation of 4 for which P(5 – a <X < 5+a) = 0.8765. No.9-C8. Weights are normally distributed with a mean of 68.5 kg and a standard deviation of 3.25 kg. (a) What is the weight for which 75% of people have at least this weight ? (b) What two weights, symmetric about the mean, contain 50% of all weights ?