Hello.
Please someone should help with the matlab code.
thanks
Use Gaussian elimination to find the complete solution to each system (X-3y + z = 1 -2x + y + 3z =-7 x-4y + 2z = 0 A ((2t + 4, t + 1, t)h 0-B. {(2t + 5, t+2,t)) OC. (1t + 3, t + 2, t) D. ((3t 3, t+ 1, t))
Find all solutions of the system of equations 2x + 2y + 2z = 4 2y + 2z = 2 3y + 32 = 3 (1, 1.01 (1.1.) (1,1-t. ) The system has no solution. 11.0.1)
12: Find a basis B for R', such that the matrix for the linear transformation T: R' R', T(x,y,z)-(2x-2z,2y-2z,3x-3z) relative to B is diagonal. 12: Find a basis B for R', such that the matrix for the linear transformation T: R' R', T(x,y,z)-(2x-2z,2y-2z,3x-3z) relative to B is diagonal.
Solve using Cramer's Rule X – 2y +z=7 2x +y – z=0 3x + 2y – 2z = -2 O (1,-2,0) O (2,-1,3) O (1,-1,1) No Solution
Find the complete solution of the system of equations below and write the solutions in the form of x = x + xn, where x, is the particular solution and xn is a solution to the homogeneous system. x – y – 2z + 3w = 4 3x + 2y – z + 2w = 5. -y – 7z + 9w = -2
1. Solve the following system of equations using Gauss-Jordan elimination. 3x - 2y +4z=3 2x +2y-2z=4 x+4y- &z=1
Solve using matrices. 2x+ 2y- 2z - 2w = -14 w + y + z + x = -7x - y + 4z + 3w = 0w - 2y + 2z + 3x = -2The solution is _______
5. Consider the system of equations: 2 - Y + 2z = 4 3x - 2y + 92 = 14 2. - 4y + az = b. Find all the values of a and b so that the system has a) no solution b) 1 solution e) exactly 3 solutions and 4) infinitely many solutions.
Solve 3x + 2y – z = 1x – 2y + z = 02x + y – 3z = -1
Given the system of equations: +y+z= -6 y - 3x = 8 2x + y + 5z = – 19 (a) Determine the type of system: O dependent inconsistent (b) If your answer is dependent, find the complete solution. Write x, y, and z as functions of t, where z = t. If your answer is inconsistent, write DNE in the box for all three variables. 2= y = 2 =