You win a dollar if a red marble is drawn more often than a blue one.
A box contains red and blue marbles there are more red marbles than blue ones.
Marbles are drawn one at a time from the box at random with replace ment.
Two marbles are drawn without replacement.
You win a dollar if a red one is drawn more often than a blue one.
There are 113 marbles in the bag.
Now from the last 2 restrictions these 2 w.
A box contains red and blue marbles.
A 100 draws are made from the box.
Let s put the marbles on the table then.
Let red marbles as r blue marbles as b green marbles as g given r 2b r b g 73 b g 19 2b b g 73 3b g 73 3 g 19 g 73 4g 73 57 16 g 4 b 4 19 23 r 2 23 46.
There are more red marbles than blue ones marbles are drawn one at a time from the box at random w replacement.
If there are 21 more green marbles than blue marbles find the number of green marbles and the number of blue marbles in the bag.
The rest of them are blue ok.
A box contains red and blue marbles.
Two marbles are drawn without replacement from a jar containing 4 black and 6 white marbles.
You win a dollar if a red marble is drawn more often than a blue one 6 there are two choices.
Choose one of the options below and explain your answer.
A draw the tree diagram for the experiment.
One marble is taken out of the box at random.
What is the probability that t.
Let s put these 2 marbles aside then.
5 red marbles 6 blue marbles 3 green marbles 4 black marbles 2 yellow marbles a marble will be drawn from the bag and replaced 100 times.
Ex 15 1 9 a box contains 5 red marbles 8 white marbles and 4 green marbles.
There are more red marbles than blue ones.
100 draws 200 draws.
I a gives you a better chance of winning ii b gives a better chance of winning.
From the 1st restriction we know that there are only 2 marbles which are not blue right.
There are two choices.
100 draws are made from the box.
Choose one of the four options below.
A jar contains 4 black marbles and 3 red marbles.
Take 164 and subtract 48 which gives you 116 and then divide that by two and you get 58.
B find probabilities for p bb p br p rb p ww p at least one red p exactly one red 3.
So there are 58 rd marbles and 106 blue marbles.