10. Find the simetric matrix for the quadratic form Q(x1,x2,x3) = xỉ + 3x + x,x2 – x1x3

can you please answer all exercises but mostly exercises 10: 11: 12 

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1. Matrices A, B are given. A = (2 3 2 1), B = Calculate AB, BA. 1 1 = (; }), 3 = (4 3), c = ; ) 2. Matrices A,B,C are given. A = 1 2. Find productions; A * (B × CT), A-1* B * C-1 (1 2 2Y 3. Calculate the determinant of matrix, using 2 methods; A = 111 4. Prove that if we have A?=A then A-A. 1 2 2 5. Soleve the matrix equation ABX = C, where A =12 2), B = (120),C = (1 1 2 \1 3 1/ (1 0 1 1 1 1 %3D 1 1 1 1 2 1, 15 — а 2 1| 6. It is given that A = 2 1-a 0 = 0. Find a. l1 0 1- al x + 3y + 2z = 5 7. Solve the linear system using the three methods {2x + 3y + 2z = 5 3x + y + 2z = 3 8. Define the eigenvalues and eigenvectors. Find them for the matrix A = 9. For the matrix A we have k, X which are the eigenvalue and eigenvector. Find them for the matrix A?. 10. Find the simetric matrix for the quadratic form Q(x1, x2, x3) = xỉ + 3x3 + x1X2 – X1X3 11. A company sells two sorts of packages; package I contains fruits A,B,C with 2, 3, 5 kg each Package Il contains A, B, C with 2,4,6 kg each. The company has 100,180,380 kg stock for each of fruits. The revenues Am thMels 1e of 1nd O for pacOes. Find the number of packages the company has to sell in order to have the max revenue.

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10. Find the simetric matrix for the quadratic form Q(x1, x2, x3) = xỉ + 3x3 + x,x2 - X1x3 11. A company sells two sorts of packages; package I contains fruits A,B,C with 2, 3, 5 kg each Package Il contains A, B, C with 2,4,6 kg each. The company has 100,180,380 kg stock for each of fruits. The revenues from the sells are 10$ and 12 $ for the packages. Find the number of packages the company has to sell in order to have the max revenue. 12. Solve the PPL problem with graphic method 2x+ 3y < 6 (3х + 2у 2 6 dhe f: 5х + 4y maх