Finding the probabilities of getting 1 red marble means comparing the number of ways i can obtain exactly 1 red marble and 6 white marbles desirable outcome when drawing 7 marbles to all possible outcomes when drawing 7 marbles.
In a bag there are 13 red marbles.
There are red marbles and green marbles in bag b.
What percent of the marbles are green.
A jar contains 4 black marbles and 3 red marbles.
And then there s one blue marble in the bag.
One pen is 1 3 the cost of stapler.
It is denoted.
In a bag there are 13 red marbles 5 blue marbles and 7 green marbles.
9 16 4 pencils have the same value of 3 pens.
There are red blue and green marbles.
Two marbles are drawn without replacement from a jar containing 4 black and 6 white marbles.
There are red marbles and blue marbles in bag a.
In a bag with 10 white marbles and 3 red marbles i take 7 without replacement.
What percent of the marbles are green.
Two marbles are drawn without replacement.
In a bag there are 13 red marbles 5 blue marbles and 7 green marbles.
B find probabilities for p bb p br p rb p ww p at least one red p exactly one red 3.
A draw the tree diagram for the experiment.
Using the digits 1 to 9 at most one time each fill in the boxes to make the probability of drawing a red marble from either bag the same.
There are 640 marbles in a bag.
After losing a total of 47 green and blue marbles there are a total of 113 green and blue marbles left.
So i could pick that green marble or that green marble.
The percent is defined as a part of the total.
There s one blue marble.
There s two red marbles in the bag.
Assuming you still had all the marbles what are the odds of drawing a red marble two times in a row.
So this is all the possible outcomes.
So i could pick that red marble or that red marble.