Question: If W = (-1, 2, -27 and S = span{S1 = [2,3,-1)", S2 = [-2,...
please help [-1,2,-2 and S = span{Si 12,3,-1], S2 = [-2, 2 ,3, S3 - [ 1,1,-1). Question: If W Find projsW 19 23 , 017 6 39 31 9 , 1]7 28 7 20 30 17 13 16 here to search F1 F9 F10 F8 F4 F5 F6 F7 F3 F2 z2 A # & ? $ 8 7 6
Find the first six partial sums S1, S2. S3, S4, S5, S. of the sequence. 1 1 1 1 3° 32' 33 34 3 Give your answers as fractions. S, = S2 S3 = S4= Ss = So
Let S1 = { 1, 2, 3 }, S2 = { a, b }, S3 = { 4, 5, 6 }. Show a B-tree of minimum degree t = 3 that contains the 18 tuple keys in S1 × S2 × S3, ordered by the linear order defined in (a). Assume that a <2 b in S2. please show the 18 tuple at first which is a cartesian product of s1,s2 and s3 and insert them into a B tree...
(MATLAB Question) Assume s1 = sin(2*(pi)*f1*t), s2 = sin(2*(pi)*f2*t + 0.4) and s3 = s1 + s2, where f1 = 0.2 and f2 = 0.425. Plot s1, s2 and s3 vs t with t=0:0.1:10 on the same graph (you have to use hold on command). Label the axes and create legends for each graph.
[1] Let A-11 j Let ถ be the triangle in R, with vertices (-3,-2), (2,3), (-1,1). (a) Find the area of Ω. (b) What is the shape of the image A(S2)? Find the area of A(S) c) Is the linear transformation A orientation preserving or reversing? [1] Let A-11 j Let ถ be the triangle in R, with vertices (-3,-2), (2,3), (-1,1). (a) Find the area of Ω. (b) What is the shape of the image A(S2)? Find the area...
Given the following sequence of instructions: lw $s2, 0($s1) //1 lw $s1, 40($s3) //2 sub $s3, $s1, $s2 //3 add $s3, $s2, $s2 //4 or $s4, $s3, $zero //5 sw $s3, 50($s1) //6 a. List the read after write (current instruction is reading certain registers which haven’t been written back yet) data dependencies. As an example , 3 on 1 ($s2) shows instruction 3 has data dependency on instruction 1 since it is reading register $s2. b. Assume the 5...
Question 5 pts 2 1 -1 0 Span{ Let W = }. 1 1 -1 0 1 (a) Compute the othogonal projection of onto W. 1 Write your solution here 2 1 -1 0 1 and b = (b) Find the least squares solution to Ax = b, for A = 1 1 1 -1 1 0 0 0 1 Write your solution here (c) Explain the relationship between your answers for the first two parts of the question. Write...
for the question, thanks for your help! 2. Let 2 -2 -11 1 3 S1 8 and b -2 -5 7 A= -4 5 2-9 18 Moreover, let A be the 4 x 3 matrix consisting of columns in S (a) (2.5 pt) Find an orthonormal basis for span(S). Also find the projection of b onto span(S) (b) (1.5 pt) Find the QR-decomposition of A. (c) (1 pt) Find the least square solution & such that |A - bl2 is...
Consider the subspaces U=span{[4 −2 −2],[10 1− 4]} and W=span{[3 −4 −1],[10 2 −2]}.Find a matrix X∈V such that U∩W=span{W}.
ww-{) [:]}------ Let W =Span 2 1. and suppose the vectory is in W . Find all possible values of r and y. Enter x value(s) in the first blank and y value(s) in the second blank provided. Blank # 1 Blank # 2