Let A = 30 -1 B C = D= find 9 1. A+ 3B 2. B - 2A = 3. CD= 4. DC =
Let U be as in question 6. Let D = {1, 3, 5, 7} E = {2, 4, 6, 8} and F = {1, 2, 3}. For the following questions state whether each statement is true or false a.)D and E are disjoint. b.)D and E are complimentary. c.)9 ∈ D d.)D ∩ DC = ∅
3 2 1 1 2 3 3) Let C- 2 6-1and D 0 5 6 0 09 12 0 a) Find det(C) b) Find det (D) c) Find det (CD) d) Find det(DC)
Problem 4: (20 points) Let [ 3 -6 A= 4 -8 0 1 1) Find a QR-decomposition of A. 2) Use the QR-decomposition that you found in part 1 to find the least squares solution of the system 3 -6 4 - 8
2. Let A:(-1,1,-1), B:(2,0.2), C:(4.1.-3), and D:(-3, 1, 10) be points in R. (a) Find the angles (in degrees) of the triangle with vertices A, B and C. (b) Find an equation of the plane passing through the points A, B, and C. (c) Find two unit vectors perpendicular the plane through A, B, and C. (d) Find the volume of the tetrahedron with vertices A, B, C, D. 3. (a) Find an equation of the tangent line to the...
= Multiplication of matrices: Basic Let C= 0 and D= [-3 2 4] 4 Find CD if it is defined. Otherwise, click on "Undefined". CD - [00] 금 [000) 8 Undefined X ? Explanation Check Type here to search o
Given the following matrices, find 2A + 3B. 3 2 4 7 A= 1 2 -1 B= 2 -3 a b For the resulting matrix 2 A+3B = where с d a = = C= d
Let the two vectors A=4i+5j+3k,B=-2i+3j-4k, and C=3i-5j+k find: A. S= A+3 B+6C B. (-5A .B).3C C. (3B*2A)+C D. Find the angle a between A and C Let the two vectors A=4i+5j+3k,B=-2i+3j-4k, and C=3i-5j+k find: A. S= A+3 B+6C B. (-5A .B).3C C. (3B*2A)+C D. Find the angle a between A and C
(1) Assume the axioms of metric geometry. Let A, B, C, D be
distinct collinear points. Let f : l → R be a coordinate function
for the line l that crosses all of A, B, C, D. Suppose f(A) <
f(B) < f(C) < f(D). Prove that AD = AB ∪ BC ∪ CD. (2) Assume
the axioms of metric geometry. Let A, B, C, D be distinct collinear
points. Suppose A ∗ B ∗ C and B ∗...
Part 3 of 8 - Question 3 of 8 1.0 Points Let A be a 4x5 matrix with rank 2. Then the linear system At = has A. no solution B. a unique solution C. a 1-parameter family of solutions D. a 2-parameter family of solutions E. a 3-parameter family of solutions Part 4 of 8 - Question 4 of 8 1.0 Points If the coefficient matrix of a system of linear equations is square but is not invertible (i.e....