Solve the following system using the Gaussian algorithm:2x1T2 +3x3-2x1+12- 23%3D33D2ERPE3x2 + 6x3=D32where r1, x2 and r3 are solutions of the system, and y be the vector y =()Let x be the vector x =1. Evaluate the scalarT3/0.product of x and y.[Please enter your answer numerically in decimal format. You will be marked correct as long as what you enter is within 0.25 of thecorrect answer. So for example, if the correct answer is 6.78 then any input that lies between between 6.53 and 7.03 will be marked ascorrect.]

First we will use gaussian algorithm to find the unknown variables and form vector x then using…

Answered: Solve the following system using the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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To found the values I1,I2,I3 of the next matrix
9. ts) Solve the system, and write the solution in vector form. Х1 — х2 + 2хз — Х4 3D 0 + 5x4 X2 = 0
Solve the following systems of equations using a valid elimination algorithm, include all the elementary line operations that you used to solve it, then check that your result is correct, using another method (it can be computational). Write the solution vector. note: Do everything that is asked above (in the image are the equations and the matrix)
Let u = = X₁ = -4 4 V= 5 x2 = (Simplify your answers.) and w= operations) to find x₁ and x₂ that satisfy the equation 0 - 41 -8 It can be shown that -5u-4v-w=0. Use this fact (and no row -4 5 5 4 4 - 3 X2 0 - 41 -8
Solve the system [(2+ +i)z₁+iz2 = 1-i 2321-322 = -1-7i
Find the solution of the following system I - 12 + 2r3 = 1 3r1 + r2 - a3 =0 Ii + 2.r2 + r3 = -1 with using Cramer's Rule.
show the complete solution
(4 no ts) Solve the system x1 x₂ X3 +S +1 4x₁3x2+2x3 -X1 3x1 3x₁3x₂ +3x4= +x2 +2x3 +2x4 = -2x2 +4x3 +5x4 = - 6x3 -6x4 = 2359
Solve the following using Matrix Inversion using elementary row operations
Supposed someone tried to solve the following system of equations (presented in the attactched image) by determining the inverse of the matrix of coefficients and then using matrix multiplication with desmos. But that person was not successful. Explain what happened incorrectly and offer a suggestion to fix the mistake.

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