3. Xis a binomial random variable with the parameters shown. Use the tables to compute the probability indicated a....
If x is a binomial random variable, use the binomial probability table to find the probabilities below. a.. P(x=2) for n=10, p=0.4 b.. P(x≤6) for n=15, p=0.3 c.. P(x>1) for n=5, p=0.1 d.. P(x<17) for n=25, p=0.9 e.. P(x≥6) for n=20, p=0.6 f.f. P(x=2) for n=20, p=0.2 a. P(x=2)=_______________-(Round to three decimal places as needed.)
(1 point) If X is a binomial random variable, compute the probabilities for each of the following cases: (a) P(X < 1), n = 7, p = 0.3 Probability = (b) P(X > 5), n = 7, p = 0.1 Probability = (C) P(X < 6), n = 8, p = 0.5 Probability = (d) P(X > 2), n = 3, p = 0.5 Probability =
f(31–43 10.320.72 543 Computing Binomial Probabilities If X is a binomial random variable with parameters n and p, the probability distribution of Xis given by f(k) = P(X=k) = (pkan* for k =0, 1. , .,where q=1-p. Example: Suppose n = 5 and p = 0.3. Then q = 1 - p = 0.7, f(k)= 10.3)* (0.75% f(0)=C6 20.3)%0.7)-1-1-(0.16807)-0.16807. f(1)=( )(0,3)(0.7) 10.3)(0.2401) - 5(0.07203)0.36015 0 0.1681 f(2)=(3 10.3)2(0.73 (0.09)(0.343) – 10(0.03087)-0.30870 1 0.3602 0.027)(0.49) =10(0.01323)-0.132302 0.3087 f(4)=( )(0.3)*(0.7) (0.0081)(0.7) -5(0.00567)=0.0284...
(1 point) If X is a binomial random variable, compute the probabilities for each of the following cases: (a) P(X < 2), n = 9, p = 0.4 Probability = (b) P(X > 3), n = 8, p = 0.35 Probability = (c) P(X < 2), n = 5, p = 0.1 Probability = (d) P(X 25), n = 9, p = 0.5 Probability =
If X is a binomial random variable with n and p as indicated, compute the probabilities for each of the following cases: P (X<3), n=8, p=.7
(1 point) If z is a binomial random variable, compute P(C) for each of the following cases: (a) Px <6), n=8, p = 0.3 P(x) = (b) P(x > 2), n = 3, p=0.5 P(x) = (c) Pa<5), n = 8, p=0.6 P(x) = (d) P(x > 2), n = 3, p = 0.7 P(x) =
A binomial probability experiment is conducted with the given parameters. Compute the probability of successes in the n independent trials of the experiment n=10, p=0.6.x=9 P(9) = _______ (Do not round until the final answer. Then round to four decimal places as needed.)
If x is a binomial random variable, use the binomial probability table to find the probabilities below. a. P(x=4) for n=10, p=0.1 b.. P(x≤5) for n=15, p=0.5 c. P(x>1) for n=5, p=0.3 d. P(x<4) for n=15, p=0.7 e. P(x≥18) for n=25, p=0.9. f. P(x=4) for n=20, p=0.2. a P(x=4)=_____________________(Round to three decimal places as needed.) b.P(x≤5)=_____________________(Round to three decimal places as needed.) c P(x>1)=___________________(Round to three decimal places as needed.) d.P(x<4)= ______________(Round to three decimal places as needed.) e. P(x≥18)=_______________________...
If x is a binomial random variable, use the binomial probability table to find the probabilities below. a.. P(x=2) for n=10, p=0.2 b. P(x≤6) for n=15, p=0.3 c.. Upper P(x>1) for n=5, p=0.5 d.d. P(x<13) for n=20, p=0.9 e. P(x≥10) for n=15, p=0.9 f.f P(x=2) for n=20, p=0.1 a. P(x=2)=__________(Round to three decimal places as needed.) b. P(x≤6)=___________(Round to three decimal places as needed.) c. P(x>1)=__________(Round to three decimal places as needed.) d. P(x<13)=___________(Round to three decimal places as needed.)...
If Y is a binomial random variable with parameters n=60 and p=0.5, estimate the probability that Y will equal or exceed 45 using the Normal approximation with a continuity correction.