When two unbiased dice are rolled together the probability of getting both same outcome?
Example 1An unbiased coin is tossed twice. Show
(a) List all the possible outcomes. The possible outcomes are: So there are 4 possible outcomes that are all equally likely to occur as the coin is not biased. (b) What is the probability of obtaining two heads? There is only one way of obtaining 2 heads, so: (c) What is the probability of obtaining a head and a tail in any order? There are two ways of obtaining a head and a tail, H T and T H, so:
Example 2A red dice and a blue dice, both unbiased, are rolled at the same time. The scores on the two dice are then added together. (a) Use a table to show all the possible outcomes. The following table shows all of the 36 possible outcomes: Red Dice
(b) What is the probability of obtaining:
Example 3A card is taken at random from a pack of 52 playing cards, and then replaced. A second card is then drawn at random from the pack. We first note that, for a single card drawn from the pack,
We put these probabilities on the branches of the tree diagram below: Note also that the probability for each combination, for example, two Diamonds, is determined by multiplying the probabilities along the branches. (a) both cards are Diamonds, (b) at least one card is a Diamond,
(c) exactly one card is a Diamond,
(d) neither card is a Diamond.
ExercisesQuestion 1The faces of an unbiased dice are painted so that 2 are red, 2 are blue and 2 are yellow. The dice is rolled twice. Three of the possible outcomes are listed below: (a) List all 9 possible outcomes. (b) What is the probability that:
A spinner is marked with the letters A, B, C and D, so that each letter is equally likely to be obtained. The spinner is spun twice. (a) List the 16 possible outcomes. (b) What is the probability that:
(a) Complete the following tree diagram to show the possible outcomes and probabilities if the coin is tossed twice. (b) What is the probability of obtaining:
A card is taken at random from a pack of 52 playing cards. It is replaced and a second card is then taken at random from the pack. A card is said to be a 'Royal' card if it is a King, Queen or Jack.
Use a tree diagram to calculate the probability that on two consecutive days, the bus is:
(a) Use a tree diagram to calculate the probability that at least one of these slices of bread burns in the toaster.
(b) Extend your tree diagram to include toasting 3 slices, one at a time. Calculate the probability of at least one slice burning in the toaster.
I have two fair dice. Each of the dice is numbered 1 to 6. (a) The probability that I will throw double 6 (both dice showing number 6) is What is the probability that I will not throw double 6 ? (b) I start again and throw both dice. (c) What is the probability that I will throw double 3 (both dice showing number 3) ? (d) What is the probability that I will throw a double? (It could be double 1 or double 2 or any other double.) Question 13On a road there are two sets of traffic lights. The traffic lights work independently. (a) A woman is going to drive along the road. (i) What is the probability that she will have to stop at both sets of traffic lights? 0.7 × 0.7 = 0.49 (ii) What is the probability that she will have to stop at only one of the two sets of traffic lights? (0.7 × 0.3) + (0.3 × 0.7) = 0.42 (b) In one year, a man drives 200 times along the road. Calculate an estimate of the number of times he drives through both sets of traffic lights without stopping. p(drives
through both sets of lights without stopping) = 0.3 × 0.3 = 0.09, 100 students were asked whether they studied French or German.
(a) What is the probability that a student chosen at random will study only one of the languages? Note: Write the solution as a decimal or percentage (b) What is the probability that a student who is studying German is also studying French? (c) Two of the 100 students are chosen at random. Note: Choose a calculation by clicking on it. Question 15A company makes computer disks. It tested a random sample of the disks from a large batch. The company calculated the probability of any disk being defective as 0.025. (a) Calculate the probability that both disks are defective. (b)
Calculate the probability that only one of the disks is defective. (c) The company found 3 defective disks in the sample they tested.
You may find it helpful to copy and complete the tree diagram before answering the questions. (a) What is the probability that it rains more than 10 mm on the second day, and does not rain on the first? (b) What is the probability that it has rained by the end of the second day of the rainy season? (c) Is it possible to work out the probability of rain on both days from the information given? Because we are not given the probability that it rains in the second day if it rains on the first. Question 17 Pupils at a school invented a word game called Wordo. They tried it out with a large sample of people and found that the probability of winning Wordo was 0.6. (a) What was the probability of someone from the sample winning Lango? (0.6 × 0.8) + (0.4 × 0.55) = 0.7 (b) What was the probability of someone from the sample winning only one of the two word games? (0.6 × 0.2) + (0.4 × 0.55) = 0.34 (c) The pupils also invented a dice game. They tried it out with the same sample of people who had already played Wordo and Lango. (0.6 × 0.8 × 0.1) + (0.6 × 0.2 × 0.9) + (0.4 × 0.55 × 0.9) = 0.354 (d) Calculate the probability of someone from the sample winning only one of these three games. (0.6 × 0.2 × 0.1) + (0.4 × 0.55 × 0.1) + (0.4 × 0.45 × 0.9) = 0.196 When two dice are thrown what is the probability of getting same faces?∴ The probability of getting the same number of both the dice is 1/6.
When two unbiased dice are tossed simultaneously What is the probability?What is the probability of getting at most one five in a single throw of the two dice? Answer: The required probability of getting at most one five in a single throw of the two dice is 5/18.
What is the event to get the same number for both dice?The probability of two dice being the same particular number is 1/6 x 1/6 = 1/36.
When 2 unbiased dice are rolled what is the probability that the sum on the top of the faces is greater than 10?Detailed Solution
∴ The probability that the sum on the top of the faces is greater than 10 is 1/12.
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