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2. In stress tensor, the following components indicate the components of the direct stress: * (2 points) 011, 012 and 013 011, 022 and 013 012, 013, 021, 023, 031 and 032, 011, 012 and 023 011, 013 and 032 011, 022 and 033 None of the above Next
2. In the absence of body forces, do the following stress components satisfy the equations of equilibrium? 011 = a [až +v (zł – za)], 022 = a [xí +v (zá – z)] , 033 1,033 = av (2ỉ + x3) -2av2122,013 = 031 = 0,023 = 032 = 0 012 = 021 =
3.) Having a reliable forecast of national economic growth can be important in making investment decisions. The columns Month, Actualgrowth, Forecast1, Forecast2 and Forecast3 in the associated SPSS file contain actual economic figures over a 24-month period as well as the forecasted growth figures using three separate forecasting techniques. Which of the three forecasting techniques seems to be the best? Month | Actual Growth | Forecast 1 | Forecast 2 | Forecast 3 1 .023 .008 .018 .017 2 .011 ...
(1 point) Enter a 3 x 3 symmetric matrix A that has entries 211 = 2, 222 = 0, 033 = 3, 221 = 1, 031 = 4, a32 = 5. A =
2. Inverse of a square matrix: Determine the inverse matrix [A™'] of the given square matrix [A] using the Gauss-Jordan Elimination Method (GEM), and verify that [A-!] [A] = I where I is the identity matrix. A = [ 1 4 -27 0 -3 -2 | -3 4 1
Question 2 (8 pts): Will this C++ program compile, and if not why? 001 nclude estring> 002 include ccmath> 003 004 uning namespace std 005 006 007 templatesclass T> 008 T operator+ (const Telassa% t1, const Telassct 009 010 templatecclass T> 011 class Tolass( t2); 012 friend T operatort (const TelasseTs t1, const Telasscs t2) 014 Telass (const T& value) :m_value (value)t 015 T NumericValue) constt 016 017 018 private: 019 T value: 020 } ; 021 02 template<class T>...
1. On Inverting Matrices, using Gauss-Jordan (a) Consider the following matrix A. If the inverse of A exists, com- pute A-1, else say so. A 1 3 INVERSE OF MATRICES 15 (b) Consider the following matrix A. If the inverse of A exists, com- pute A-1, else say so. A-(3) 0 1 (c) Consider the following matrix A. If the inverse of A exists, com- pute A1, else say so. 0 2 (d) Consider the following matrix A. If the...
Please provide a(11) through a(49)
thank you!
Given the following maximum problem: Maximize: P=601 +502 + 4.09 Subject to the following constraints: 221 +22+ 23 < 180 201 + 32 +2:03 <300 2:01 + 2 + 2.03 < 240 21 > 0 22 > 0 23 > 0 the Initial Simplex Tableau can be formatted in this form: P 21 03 81 82 S3 RHS au a12 013 a14 015 016 017 018 021 022 023 024 025 026 a27...
The inverse of a square matrix A is denoted A-1 , such that A × A-1 = I, where I is the identity matrix with all 1s on the diagonal and 0 on all other cells. The inverse of a 2×2 matrix A can be obtained using the following formula: = c d a b A − − − = − c a d b ad bc A 1...
Please provide a(11) through a(49)
Thank you!
Given the following maximum problem: Maximize: P = 100000 x1 + 40000 32 + 18000 3 Subject to the following constraints: 20:01 +682 + 3x3 < 182 22 <10 -21-22 +33 < 0 -921 + 12 + 23 < 0 21 > 0 x2 > 0 23 0 ALAL the Initial Simplex Tableau can be formatted in this form: P C2 $1 $2 $3 $4 RHS 23 014 a11 12 013 015 (116...