Find the values of the variables [a+10 11z+1 6m] +[6a 6z 10m] =[31 -33 112] Finite Math
2k 2 0 12k 1 3 14 3 3
a=_____
z=______
m=______
k=_______
Find the values of the variables [a+10 11z+1 6m] +[6a 6z 10m] =[31 -33 112] Finite Math 2k 2 0 12...
Find the inverse z-transform x[n] of X(z) = (-2z+6z^2)/(-z^2+2z^3) of the first 4 values starting from 0 (z is a complex variable)
1 10 onvelge a636lutely, converges conditionally, or diverges. Justify your answer, including naming the convergence test you use. (1n(b) n7/3-4 (2k)! n-2 k-0 (-1)k 2k 4. (a) (10) Let* Find a power series for h(), and find the radius of convergence Ri for h'(x). Find the smallest reasonable positive integer n so that - (b) (10) Let A- differs from A by less than 0.01. Give reasons. 5. (a) (10) Let g(x) sin z. Write down the Taylor series for...
For the Beam shown, find the reactions 1o diagrams indicating all critical values. (1-5 points) 16. plete shear force and bending moment 2 k 2k 2k 3K 3 k lo Lo Lo (o For the Beam shown, find the reactions 1o diagrams indicating all critical values. (1-5 points) 16. plete shear force and bending moment 2 k 2k 2k 3K 3 k lo Lo Lo (o
1. Express the sum m-1 k-0 in closed form. [Hint: The sum is a finite geometric series.] 2. Find the equation of the line connecting the endpoints of the graph of sin(x) on the interval [0, π/2] 1. Express the sum m-1 k-0 in closed form. [Hint: The sum is a finite geometric series.] 2. Find the equation of the line connecting the endpoints of the graph of sin(x) on the interval [0, π/2]
Question 1 、 Let X, Y and Z be three random variables that take values in the alphabet {0,1, M-lj. We assume X and Z are independent and Y = X +2(mod M), The distribution of Z is given as P(Z 0)1 -p and P (Z =i)= , for i = 1, M-1. For question 1-3 we M-1 will assume that X is uniform on f0,1,..,M-1}. Find H(X) and H(Z) Find H(Y ) Find 1 (X; Y) and「X, YZ) and...
(1 Consider the symmetric matrix A = 2 10 2 0 2 2 1. Answer the following questions. 2 3 (1) Find the eigenvalues , , and iz (2 <, <1z) of the matrix A and their corresponding eigenvectors. (2) Find the orthogonal matrix B and its inverse matrix B' that satisfy the following equation: (4 0 0 B-'AB = 0 0 lo o 2) (3) Suppose that the real vectors y and 9 satisfy the following relationship: Show that...
12. Find the F, P, and A values for the negative cash flows shown in the diagram. - i= 14% Li-10% 0 1 2 3 -100 -100 100 100 -100 -160 -160 -160
2x-1= 0 11. Find the radius of convergence of 112. 3(x+1) (x+2 (Intllip Int 3/16 12. Find the Maclaurin series for f(x) = showing how you got it. Plx) = ax flo)=4 u
9,17,33 and ill like cos 22 14. 2+1 In Exercises 1-26 find the Taylor series for the function about the given point. In each case determine values of z for which the series converges to the function. 3 1. + about zo = 0 2. 1+2 about = 1 3. (1 - 2)2 about 20 = 0 4. e* about 20 = 1+i 5. sin z about 20 = i 6. cos z about zo = 2 - 7. sinh...
10. Find the product(s) of the following reaction: 1. NaOCH 2. H,0 3. Ethanol 2. 3 5 6 8 9 W E IR U А. S D G Н K Z С B N M