Q5 3 Points What is the maximum value of 22/(23 – 15) for |z< 2? O...
6. (15 points) In region I (z<0), there is a medium with o = 0 and 41,1 = 1. In region II (z>0), there is a medium with o = () and 4,2 = 1. An incident wave is in +z direction in region I. Find Er2 / €, if 10% of the energy in the incident wave is a. Reflected
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.
A) B) C) 1 Find the Laurent series for 22 +22 for 0 < 121 < 2 Find the Laurent series for (z+2)}(3-2) for 2 – 3) > 5 1 Find the Laurent series for z2(z-i) for 1 < 12 – 11 < V2
Solve: Laurent series h(z) - Z O CIZ + 11 <3 (2+1)(2-2)
Assume that z-scores are normally distributed with a mean of O and a standard deviation of 1. If P(0 < z < a) = 0.4857, find a. a = (Round to two decimal places.)
Sketch the region corresponding to the statement PC - c<z<c) = 0.6. Shade: Left of a value Click and drag the arrows to adjust the values. . +++++++++ 4 -3 0 -2 1-7 -1.5 2
Fest ALEKS Ca'p. Week 3 Homework < 17 18 19 20 21 22 23 24 Question 34 of 37 (1 point) Attempt 1 of 3 Evaluate the combination. 10 = Х 5
Solve the inequality 22 +2 - 2 22 - 5.0 + 6 <0
22.) Determine P(Z <2.37). Draw a graph and use the calculator. (2 points) 23.) Find a if P(Z2a)=0.9131. Draw a graph and use the Chart (3 points) inv Norm area: 1-0.9131 N0 -- 1.3600 94568 0.9131 -1,360 24.) Suppose that the height of UCLA female students have normal distribution with mean 62 inches and inches. Find the probability of randomly selecting a female who is more than 68 inche had to solve.
8. (1.5 points) Show that 23 << ez?.