MTH603 Grand Quiz Solution and Discussion
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3x4−2x2−24=0 has at least−−−−complex root(s)?
1
2
3
4 -
Gauss–Seidel method is similar to ……….
Iteration’s method
Regula-Falsi method
Jacobi’s method
None of the given choices -
@zaasmi said in MTH603 Grand Quiz Solution and Discussion:
Gauss–Seidel method is similar to ……….
In numerical linear algebra, the Gauss–Seidel method, also known as the Liebmann method or the method of successive displacement, is an iterative method used to solve a linear system of equations.
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The characteristics polynomial of a 3x 3 identity matrix is __________, if x is the eigen values of the given 3 x 3 identity matrix. where symbol ^ shows power.
(x-1)^3
(x+1)^3
x^3-1
x^3+1 -
The linear equation: x+y=1 has --------- solution/solutions.
no solution
unique
infinite many
finite many -
While using the relaxation method for finding the solution of the below given system, which of the following increment will be introduced?
6x1−2x2+3x3=1
−2x1+7x2+2x3=5
x1+x2−5x3=−13 -
While using the Gauss-Seidel Method for finding the solution of the system of equation, the following system
2x+2y+z=3
x+3y+z=2
x+y+z=2
can be rewritten as -
Choleskey’s reduction method is also called
Bisection method -
The first row of the augmented matrix of the system of linear equations is:
2x+z=4
x-y+z=-3
-y+z=-5The first row of the augmented matrix of the system of linear equations is:
2x+z=4
x-y+z=-3
-y+z=-5 -
Gauss - Jordan Method is similar to ……….
Gauss–Seidel method
Iteration’s method
Relaxation Method
Gaussian elimination method -
Whileusingtherelaxationmethodforfindingthesolutionofthefollowingsystem8x1+3x2−2x3=5 4x1+7x2+2x3=9 3x1+5x2+9x3=2withtheinitialvector(0,0,0),theresidualswouldbe
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Jacobi’s Method is a/an………………
Iterative method
Direct method -
Two matrices with the _______ characteristic polynomial need not be similar.
same
differentTwo similar matrices have the same characteristic polynomial. The converse however is not true in general: two matrices with the same characteristic polynomial need not be similar.
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While using the Gauss-Seidel Method for finding the solution of the system of equation, the following system
2x+y−3z=5
x+3y+2z=7
x+2y+z=3can be rewritten as
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The dominant eigenvector of a matrix is an eigenvector corresponding to the eigenvalue of largest magnitude (for real numbers, smallest absolute value) of that matrix.
Eigenvectors of a matrix corresponding to distinct eigenvalues are linearly independent. ▫. If λ is an eigenvalue of multiplicity k of an n × n matrix A, then the number of … power method converges to the smallest eigenvalue in absolute value of A. … v2, …, vn, and that λ1 is a simple eigenvalue with the largest magnitude, i.e.,.
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While solving by Gauss-Seidel method, which of the following is the first Iterative solution for the system; x-2y =1, x+4y=4 ?
a) (1, 0.75)
b) (0.25,1)
c) (0,0)
d) (1,0.65)