Current Final Term Papers Spring 2012 Date: 16-July-2012 to 27-July-2012
Current Final Term Papers Spring 2012 Papers, July 2012, Solved Final Term Papers, Solved Papers, Solved Past Papers, Solved MCQs
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Current Final Term papers of this subject will be shared here During Exam.
plz mth501 ki final ki files dy dain
pllllllllzzzzzz
40 mcqs
2x4
3x4
5x4
mostly paper from eigenvalues and eigenvector, inner product, orthogonal and orthonormal
one 5 number Q from Basis and liner combination
one 5 # Q from Cramer's rule for det(A)
one 5 # Q from eigenvalue
MCQS also from these lacture mostly
Ihtesham gud keep it up & keep sharing
40 mcqs 2 no k 4 quiz the
1) Determine whether the set of vectors are orthogonal or not
2) Is following set of vertices is orthogonal with respect to the Euclidean inner product on ?
3) find the characteristics polynomial and all eigevalues of given matrix
4) Write a system of linear equations for given matrix 4 quiz of 3 numbers 1) Let W=span {x1,x2}, where , construct an orthogonal basis {v1,v2}for W. 2) 3) Find the characteristics polynomial and egenvalues of matrix A= 4) Sow that coefficient matrix of the following linear system is strictly diagonal dominant 5 quiz of 5 numbers 1) find an upper triangular matrix R such that A=QR 2) define T: by T(x)=A(x), find a basis B data copied from vu solutions dot com for with the property that is diagonalizable A= 3) let A be a 2*2 matrix with egenvalues 4 and 2, with corresponding eigenvectors 4) let x(t) be the position of a particle at time t, solve the initial value problem
5) let L be a linear transformation from to define by L , show that ‘L’ is inventible and also find it’s inverse?
mth501 curnt ppr 2012
) Determine whether the set of vectors are orthogonal or not
2) Is following set of vertices is orthogonal with respect to the Euclidean inner product on ?
3) find the characteristics polynomial and all eigevalues of given matrix
4) Write a system of linear equations for given matrix 4 quiz of 3 numbers 1) Let W=span {x1,x2}, where , construct an orthogonal basis {v1,v2}for W. 2) 3) Find the characteristics polynomial and egenvalues of matrix A= 4) Sow that coefficient matrix of the following linear system is strictly diagonal dominant 5 quiz of 5 numbers 1) find an upper triangular matrix R such that A=QR 2) define T: by T(x)=A(x), find a basis B data copied from vu solutions dot com for with the property that is diagonalizable A= 3) let A be a 2*2 matrix with egenvalues 4 and 2, with corresponding eigenvectors 4) let x(t) be the position of a particle at time t, solve the initial value problem
5) let L be a linear transformation from to define by L , show that ‘L’ is inventible and also find it’s inverse?
MTH501 Final Paper 21 July 2012 by SHINING STAR & MTH501_MCQs_By_$HINING $TAR
See the attached files please
Kindly upload old / current papers of "DIFFERENTIAL EQUATIONS" in Differential Equations Thread.
Thanks in advance.
yar kise nay is k paper nahe dia plz kish to shar kar do any paper
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