Respuesta :
P( two white) = 18/40 * 17/39 = 51/260
P( black then red) = 12/40 * 10/39 = 1/13
P( two black) = 12/40 * 11/39 = 11/130
P( white then black) = 18/40 * 12/39 = 9/65
P( black then red) = 12/40 * 10/39 = 1/13
P( two black) = 12/40 * 11/39 = 11/130
P( white then black) = 18/40 * 12/39 = 9/65
Answer:
1) Probability of drawing a white, then a black marble? = 0.13
2) Probability of drawing two black marbles =0.08
3) Probability of drawing two white marbles = 0.19
4) Probability of drawing a black, then a red marble = 0.07
Step-by-step explanation:
Given : A jar contains a mixture of 12 black marbles, 10 red marbles, and 18 white marbles, all the same size. If two marbles are drawn from the jar without being replaced.
Solution :
Total number of marbles in a jar = 12+10+18=40
[tex]\text{Probability}=\frac{\text{Favorable outcome}}{\text{Total number of outcome}}[/tex]
1) To find what would the probability of drawing a white, then a black marble?
probability of getting a white marble = [tex]\frac{18}{40}=\frac{9}{20}[/tex]
Without replacement, total number is 40-1=39
probability of getting a black marble = [tex]\frac{12}{39}=\frac{4}{13}[/tex]
Probability of drawing a white, then a black marble is
[tex]P=\frac{9}{20}\times \frac{4}{13}= \frac{36}{260}=0.13[/tex]
2) To find what would the probability of drawing two black marbles?
probability of getting one black marble = [tex]\frac{12}{40}=\frac{3}{10}[/tex]
Without replacement, total number is 40-1=39
probability of getting second black marble = [tex]\frac{11}{39}[/tex]
Probability of drawing two black marbles is
[tex]P=\frac{3}{10}\times \frac{11}{39}= \frac{33}{390}=0.08[/tex]
3) To find what would the probability of drawing two white marbles?
probability of getting one white marble = [tex]\frac{18}{40}=\frac{9}{20}[/tex]
Without replacement, total number is 40-1=39
probability of getting second white marble = [tex]\frac{17}{39}[/tex]
Probability of drawing two white marbles is
[tex]P=\frac{9}{20}\times \frac{17}{39}= \frac{153}{780}=0.19[/tex]
4) To find what would the probability of drawing a black, then a red marble?
probability of getting a black marble = [tex]\frac{12}{40}=\frac{3}{10}[/tex]
Without replacement, total number is 40-1=39
probability of getting a red marble = [tex]\frac{10}{39}[/tex]
Probability of drawing a white, then a black marble is
[tex]P=\frac{3}{10}\times \frac{10}{39}= \frac{30}{390}=0.07[/tex]
