The probability of winning a race of an athlete is 5 less than the thrice the probability of losing the race Find the probability of
woning the face
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Answer:
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we have
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we havep = 2 (1 - p) - 1 / 6
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we havep = 2 (1 - p) - 1 / 6⇒ 6p = 12-12p -1
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we havep = 2 (1 - p) - 1 / 6⇒ 6p = 12-12p -1⇒ 18p = 11
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we havep = 2 (1 - p) - 1 / 6⇒ 6p = 12-12p -1⇒ 18p = 11⇒ p = 11 / 18
Answer:Let probability of winning the race be p Probability of losing the race = 1 - p According to the statement of question, we havep = 2 (1 - p) - 1 / 6⇒ 6p = 12-12p -1⇒ 18p = 11⇒ p = 11 / 18Hence, probability of winning the race is 11 / 18
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Answer:
11/18.
Step-by-step explanation:
Let the probability of not winning the race be P(E').
and probability of winning the race be P(E).
as according to question,
P(E)=2P(E')-1/6.........i
and as we know that,
=>The sum of the coming probability and not coming probability of same data is equal to 1
--> P(E) + P(E') = 1......ii
Now, putting the value of P(E)
P(E) + P(E') = 1
2P(E') - 1/6 + P(E') = 1
=> 3P(E') - 1/6 = 1
=> { 18P(E') - 1 }/6 = 1
=> 18 P(E') - 1 = 6
=> 18P(E') = 6 + 1
=> P(E') = 7/18
Now, the probability of not winning the race is 7/18
putting the value of P(E') in equation ii
P(E) + P(E') = 1
P(E) + 7/18 = 1
P(E) = 1-7/18
P(E) = ( 18 - 7 )/ 18
P(E) = 11/18
So, the probability of winning the race is = 11/18
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