If π’ = π(π₯ β π¦, π¦ β π§, π§ β π₯) show that
4.B] If π’ = π(π₯ β π¦, π¦ β π§, π§ β π₯) show that ππ’/ππ₯ + ππ’/ππ¦ +ππ’/ππ§ = 0
4.B] If π’ = π(π₯ β π¦, π¦ β π§, π§ β π₯) show that ππ’/ππ₯ + ππ’/ππ¦ +ππ’/ππ§ = 0
4.A] Evaluate i) . ii)
3.C] Find the extreme values of the function π(π₯, π¦) = π₯ 3 + 3π₯π¦ 2 β 3π¦ 2 β 3π₯ 2 + 4
4 b] If Show that
10 c] Solve the system of equations by Gauss elimination method2x+y+4z = 124x+11y-z= 338x-3y+2z = 20
10 b] Test for consistencyx-2y+3z = 23x-y+4z= 42x+y-2z = 5 and hence solve
10 a] Solve the following system of equation by Gauss-Seidel method:20x+y-2z = 173x+20y-z = -182x-3y+20z = 25
9 c] Using power method, find the largest eigenvalue and corresponding eigenvector of the matrix
9 b] By Using Gauss-Jordan method.x+y+z = 92x+y-z = 02x+5y+7z= 52
9 a] Find the rank of the matrix