Consider a binomial experiment with n = 15 and p = 0.1.
a.Compute f(0) (to 4 decimals).
b.Compute f(14) (to 4 decimals).
c.Compute P(x 3) (to 4
decimals).
d.Compute P(x 4) (to 4
decimals).
e.Compute E(x).
f.Compute Var(x) (to 1 decimal) and (to 2 decimals).
Var(x) = (to 2 decimals)
= ( to 2 decimals)
Consider a binomial experiment with n = 15 and p = 0.1. a.Compute f(0) (to 4...
Consider a binomial experiment with n=11 and p=0.3. a. Compute f(0) (to 4 decimals). f(0) = b. Compute f(6) (to 4 decimals). f(6)=1 C. Compute P(x <4) (to 4 decimals). Per < 4) = d. Compute P(x > 3) (to 4 decimals). P(x > 3) = e. Compute E(c) (to 1 decimal). E(x) = f. Compute Var(x) and o. Var(x) = (to 2 decimals) o= (to 2 decimals)
Consider a binomial experiment with n-12 and p 0.2. a. Compute f (0) (to 4 decimals). f(0) b. Compute f(8) (to 4 decimals) f(8) C. Compute P(z 〈 2) (to 4 decimals). d. Compute P(x 2 1) (to 4 decimals). P( 21) e. Compute E(x) (to 1 decimal) E(x) f. Compute Var(z) and σ. Var(x) - (to 2 decimals) (to 2 decimals)
Consider a binomial experiment with n = 9 and p = 0.2. a. Compute f(0) (to 4 decimals). f(0) = b. Compute f(7) (to 4 decimals). f(7) = c. Compute P(x < 4) (to 4 decimals). P(x < 4) = d. Compute P(x > 1) (to 4 decimals). P(x > 1) = e. Compute E(x) (to 1 decimal). E(x) = f. Compute Var(2) and o. Var(x) = (to 2 decimals) (to 2 decimals)
Consider a binomial experiment with n- 12 and p0.2 a. Compute f(0) (to 4 decimals). f(0) b. Compute f (8) (to 4 decimals). f(8) c. Compute P(x < 2) (to 4 decimals) Pa 2) d. Compute P1 (to 4 decimals). e. Compute E(z) (to 1 decimal). E(x) f. Compute Var(z) and σ. Var(x) (to 2 decimals) to 2 decimals) f. Compute the probability of six occurrences in three time periods (to 4 decimals).
Consider a binomial experiment with n = 20and p = 0.80. (Round your answers to four decimal places.)(a)Compute f(12). f(12) = (b)Compute f(16). f(16) = (c)Compute P(x ≥ 16). P(x ≥ 16) = (d)Compute P(x ≤ 15). P(x ≤ 15) = (e)Compute E(x). E(x) = (f)Compute Var(x)and σ. ...
33. Consider a binomial experiment with n 5 20 and p 5 .70. PLEASE SHOW ANSWERS AND FORMULAS IN EXCEL a. Compute f(12). b. Compute f(16). c. Compute P(x $16). d. Compute P(x #15). e. Compute E(x). f. Compute Var(x)
Consider a binomial experiment with n = 8 and P=0.30. a. Compute the probability of two successes P(2). b. Compute the probability of three successes P(3). c. Compute the probability of at least four successes P(x> 4). d. Compute the probability of two or fewer successes P(x < 2). e. Compute the mean E(x). f. Compute the variance and standard deviation Var(x) and 0.
Consider a binomial experiment withn = 20andp = 0.70.(Round your answers to four decimal places.)(a)Computev f(13).f(13) =(b)Compute f(16).f(16) = (c)Compute P(x ≥ 16).P(x ≥ 16) = (d)Compute P(x ≤ 15).P(x ≤ 15) = (e)Compute E(x).E(x) = (f)Compute Var(x) and σ.
Assume that a procedure yields a binomial distribution with a trial repeated n=5n=5 times. Use some form of technology to find the cumulative probability distribution given the probability p=0.155p=0.155 of success on a single trial. (Report answers accurate to 4 decimal places.) k P(X < k) 0 1 2 3 4 5 We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to...
Let E and F be events for which P(E) = .5, P(F)= .4, and P(E F) = .2 a) are E and F mutually exclusive or independent? (justify mathematically) b) Find P(E F) c) Find P(F') d) Find P(F l E) e) Find P(E' F) We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this image