Area of the circle = π (18/2)^2 = 81 π cm^2
Area of the square = 4^2 = 16 cm^2
P(Square | Circle) = P(Square and Circle)/P(Circle) = P(square)/P(Circle)
= 16/(81 π) = 56/891
probability a random person will have no healur pIOD 2. A circle with a diameter equal...
Part 1. Random Events 1. A circle with a diameter equal to 20 cm has a square with a side of 5 cm within it. Find the probability of a dart hitting the square if it hits the circle.
Part 1. Random Events probability of some event in each experiment is o.009. Find the probability of exactly 3 square has a side of 21 cm and has a circle with radius equal to 7 cm within it. Find the of people attend their primary care physician regularly: 28% of those people have no 1. The successes during 340 experiments. 2. A probability of a dart hitting the circle if it hits the square 3.75% health problems crop up during...
Probability Theory and Mathematical statistics Final examination Variant 3 Part 1. Random Events 1. The probability of some event in each experiment is 0.009. Find the probability of exactly 3 successes during 340 experiments. 2. A square has a side of 21 cm and has a circle with radius equal to 7 cm within t. Find the probability of a dart hitting the circle if it hits the square. 3.75% of people attend their primary care physician regularly: 28% of...
Part 1. Random Events 1. A square has a side of 21 cm and has a circle with radius equal to 7 cm within it. Find the probability of a dart hitting the circle if it hits the square.
A target consists of a square region in which a quarter circle is drawn and shaded. The radius of the circle is equal to one side of the (T) by simulating darts being fired randomly at the target. A success is defined as a dart falling within the shaded area. If the computer obtains a value of 3.012 after 1000 shots at the target, how hitting the target is one. А square computer program calculates pi darts landed in the...
6. A paper circle of diameter 40 cm has an inner circle of diameter 20 cm. A sharp point is put onto the paper randomly. Show how to find the probability distribution of the area (inner and outer) where the sharp point hits. Also represent the distribution graphically
6. A paper circle of diameter 40 cm has an inner circle of diameter 20 cm. A sharp point is put onto the paper randomly. Show how to find the probability distribution of the area (inner and outer) where the sharp point hits. Also represent the distribution graphically.
a paper circle of dianter el. 683 ty paper circle of diameter 40 ㎝ has an inner circle of diameter 20 cm. A sharp point is put onto the paper randomly. Show how to find the probability distribution of the area 9, inner and outer) where the sharp point hits. Also represent the distribution graphically.
1. The probability that a person selected at random from a population will exhibit the classic symptom of a certain disease is 0.2, and the probability that a person selected at random has the disease is 0.23. The probability that a person who has the symptom also has the disease is .18. A person selected at random from the population does not have the symptom. What is the probability that the person has the disease? 2. In a certain population...
Question 5. (20 pts.) 1. The probability that a person selected at random from a population will exhibit the classic symptom of a certain disease is 0.2, and the probability that a person selected at random has the disease is 0.23. The probability that a person who has the symptom also has the disease is .18. A person selected at random from the population does not have the symptom. What is the probability that the person has the disease? 2....