Find the fundamental system of solutions to the system. 2x1 − x2 + 3x3 + 2x4...

Linear Algebra find all the solutions of the linear system using Gaussian Elimination x1-x2+3x3+2x4=1 -x1+x2-2x3+x4=-2 2x1-2x2+7x3+7x4=1

Linear Algebra find all the solutions of the linear system using Gaussian Elimination x1-x2+3x3+2x4=1 -x1+x2-2x3+x4=-2 2x1-2x2+7x3+7x4=1

convert the following problem into matrix format. use xij as slack variables for constrains Max Z=...

convert the following problem into matrix format. use xij as slack variables for constrains Max Z= x1+ x2+ 1.2x3+ 1.2x4+ 0.8x5 subjected to 2x1+ 2x3+ x4+ x5≤ 12 2x2+ x3+ 2x4+ x5≤ 15 x1+ x2+ x5≤ 15 5x1+ 7x2+ 4x3+ 5x4+ 6x5≤ 60 x1+ x2+ x3+ x4+ x5≤ 10 x1, x2, x3, x4, x5≥ 0

Use Gaussian elimination to solve the following system of linear equations. 2x1 -2x2​​​​​​​ -x3​​​​​​​ +6x4​​​​​​​ -2x5​​​=1...

Use Gaussian elimination to solve the following system of linear equations. 2x1 -2x2​​​​​​​ -x3​​​​​​​ +6x4​​​​​​​ -2x5​​​=1 x1 ​​​​​​​- x2​​​​​​​ +x3​​​​​​​ +2x4​​​​​​​ - x5​​​= 2 4x1 ​​​​​​​-4x2​​​​​​​ -5x3​​​​​​​ +7x4​​​​​​​ -x5​​​=6

Let S be the subspace of ℝ4 consisting of the solutions to the following system of...

Let S be the subspace of ℝ4 consisting of the solutions to the following system of equations: x1−x2+x3−x4 = 0 x1+2x2−2x3−10x4 = 0 −2x1+x2−x3+5x4 = 0 Give a basis for S.

Solve for all 4-tuples (x1, x2, x3, x4) simultaneously satisfying the following equations: 8x1 −9x2 −2x3...

Solve for all 4-tuples (x1, x2, x3, x4) simultaneously satisfying the following equations: 8x1 −9x2 −2x3 −5x4 = 100 9x1 +6x2 −6x3 +9x4 = 60 −3x1 −9x2 +4x3 −2x4 = −52 −7x2 +8x3 +8x4 = −135

2X1-X2+X3+7X4=0 -1X1-2X2-3X3-11X4=0 -1X1+4X2+3X3+7X4=0 a. Find the reduced row - echelon form of the coefficient matrix b....

2X1-X2+X3+7X4=0 -1X1-2X2-3X3-11X4=0 -1X1+4X2+3X3+7X4=0 a. Find the reduced row - echelon form of the coefficient matrix b. State the solutions for variables X1,X2,X3,X4 (including parameters s and t) c. Find two solution vectors u and v such that the solution space is \ a set of all linear combinations of the form su + tv.

x1-5x2+x3+3x4=1 2x1-x2-3x3-x4=3 -3x1-3x3+7x3+5x4=k 1 ) There is exactly one real number k for which the system...

x1-5x2+x3+3x4=1 2x1-x2-3x3-x4=3 -3x1-3x3+7x3+5x4=k 1 ) There is exactly one real number k for which the system has at least one solution; determine this k and describe all solutions to the resulting system. 2 ) Do the solutions you found in the previous part form a linear subspace of R4? 3 ) Recall that a least squares solution to the system of equations Ax = b is a vector x minimizing the length |Ax=b| suppose that {x1,x2,x3,x4} = {2,1,1,1} is a...

Give augmented matrix for this system. Find all solutions to this system. Indicate all parameters. x1-x2+x3+x4=1...

Give augmented matrix for this system. Find all solutions to this system. Indicate all parameters. x1-x2+x3+x4=1 2x2+3x3+4x4=2 x1-x2+2x3+3x4=3 x1=? x2=? x3=? x4=?

Consider the following system of equations. x1- x2+ 3x3 =2 2x1+ x2+ 2x3 =2 -2x1 -2x2...

Consider the following system of equations. x1- x2+ 3x3 =2 2x1+ x2+ 2x3 =2 -2x1 -2x2 +x3 =3 Write a matrix equation that is equivalent to the system of linear equations. (b) Solve the system using the inverse of the coefficient matrix.

Consider the following system of equations. x1+2x2+2x3 − 2x4+2x5 = 5 −2x1 − 4x3+ x4 −...

Consider the following system of equations. x1+2x2+2x3 − 2x4+2x5 = 5 −2x1 − 4x3+ x4 − 10x5 = −11 x1+2x2 − x3+3x5 = 4 1. Represent the system as an augmented matrix. 2. Reduce the matrix to row reduced echelon form. (This can be accomplished by hand or by MATLAB. No need to post code.) 3. Write the set of solutions as a linear combination of vectors in R5. (This must be accomplished by hand using the rref form found...