1. Find the value of * that yields the probability shown a. P(Z <**)-0.0075 b. P(Z...
2nd photo is just clearer numbers of 1st 2. Find the value of that yields the probability shown. a. P(Z <=*)-0.2200 b. P(Z < **) -0.0001 C. P(Z > **)-0.0055 d. P(Z > **) -0.7095 • For #2: a) P(Z < z*) = 0.3300 b) P(Z <z*) = 0.9901 c) P(Z > z*) = 0.0055 d) P(Z > z*) = 0.7995
For a standard normal distribution, find: P(Z < c) = 0.2523 Find c.
For a standard normal distribution, find: P(0.61 < z < 2.92)
(1 point) Find the following probabilities for the standard normal random variable z. (a) P(-0.81 <<0.42) (b) P(-1.14 <z < 0.5) (c) P(Z < 0.69) a (d) P(Z > -0.6)
For a standard normal distribution, find: P(Z < -1.01) Express the probability as a decimal rounded to 4 decimal places. 0.8483 Question Help: Message instructor Check Answer о RI a
Question 2 2 pt Find P(z<2.35)= Round to 4 decimal places.
Question 4 2 pts Find P(-1.47< z< 1.79) = places. Round to 4 decimal
(1 point) Compute the following probabilities for the standard normal distribution Z. A P(0 < Z < 2.4) B. P(-1.85 <Z < 0.55) = c. P(Z > -1.95)
please answer its urgent. develop f(z)=(z(z-3)) into a laurent serkes valid for the following domains develop g(z)= 1/((z-1)(z-2)) into a laurent series valid for the following domains develop h(z)= z/((z+1)(z-2)) into a laurent series valid for the following domains 7) 0 < 1 2 -3/ <3 6) 1८11-4/<4 9) 0시레시 10) 0<l2-2시 ) ۵ < ( 2 + ( ( 3 (2) 02 ( 2 -2) 3.
IS Find the following probability for the standard normal random variable z. a. P(z<-1.02) b. P(z <2.03) c. P(0.68 szs2.03) d. P(-2.66szs1.56) a. P(z -1.02)(Round to four decimal places as needed.) b. Pize 2.03)=[] (Round to four decimal places as needed.) ook c. P(0.68 szs2.03) (Round to four decimal places as needed.) d.P(-2.66 s zs 1.56) = [□ (Round to four decimal places as needed.)