Describe the likelihood that matches the following situations:
Winning the lottery.
Next week will have 8 days.
Flipping tails with a coin.
Rolling a 3 on a standard die.
Describe the likelihood that matches the following probabilities:
A probability of 0.2.
A probability of 0.9.
A probability of 0.5.
A probability of 0.
A probability of \dfrac{1}{10}.
A probability of \dfrac{8}{10}.
A probability of 1.
Estimate the probability of the following events to one decimal place:
You will flip tails in a coin toss.
You will score 110\% on the next maths test.
It will rain somewhere in Australia tomorrow.
The sun will not come up tomorrow.
The sun will come up tomorrow.
You’ll fly to the moon tomorrow.
You'll fly a rocket to school.
You'll get a 5 after rolling a standard die.
You’ll pick a heart, a diamond or a club out of a deck of cards.
Consider the pizza menu from Mario’s Pizzeria:
State whether each of the following toppings is available for Ben to choose:
Seafood
Mexicana
Cheese
Satay chicken
A card is selected from a standard deck of 52 cards (no Jokers included). How many colour outcomes are there in the sample space?
List all possible outcomes when a coin is flipped.
If a marble is drawn out of the following jar without looking, list all the possible colours the marble might be.
Consider the following spinner:
If the spinner is spinned, list all the possible colours the spinner could land on.
A jar contains 3 red marbles \left(R\right) and 4 blue marbles \left(B\right).
List the sample space for the colour of one marble selected from the jar.
Irene picks a whole number at random between 3 and 7 inclusive. List the sample space of possible numbers Irene could pick.
Uther rolled a standard six-sided die.
List all the numbers that the die may land on.
Uther rolled a number less than 3. List all the numbers that he could have rolled.
A standard six-sided die is rolled.
List the sample space for rolling a number strictly less than 3.
List the sample space for rolling a number divisible by 3.
List the sample space for rolling an even number.