# MTH501 Linear Algebra GDB Solution Spring 2014

Solution: For the first one we need all 3 vectors to represent u=(4 3 6), so it doenst matter which vector of the basis you remove. For the second one we only need the first and the last vectors of the basis to represent u=(4 0 6), so removing the second basis-vector wont help. We […]

# MTH501 Linear Algebra GDB Solution Fall 2013

Topic Detail “An important in the study of heat transfer is to determine steady state temperature distribution of a thin plate when the temperature on boundary is known. Assume the plate shown in the figure (Click on Picture to see the figure) represents a cross section of a metal beam, with negligible heat flow in the direction perpendicular to the plate. Let T1, T2, T3, T4 denote […]

# MTH501 Linear Algebra Assignment 1 Solution Spring 2013

Analyze the following critical but interesting things using the following system of linear equations: Using the following system of linear equations:                1)      State the reason why the consistency and inconsistency of the given system is depending on its coefficient matrix. The reason should be very clear. 2)      Determine the value of […]

# MTH501 Linear Algebra GDB Solution Fall 2012

If the determinant of the coefficient matrix of a system of linear equations is zero, then discuss the possibilities of the solutions of this system. Support your answer with the geometrical interpretation. Solution: internet advertising

# MTH501 Linear Algebra Assignment 4 Solution Fall 2012

Question: 1 Find the first four iterations of the power method applied on the following matrix. Question: 2 If, then find a basis for the eigenspace corresponding to.

# MTH501 VU Current Midterm Fall 2012 Paper 12 December 2012

All MCQ’s are New and Not from any one of the Past papers: Subjective Questions are below: 1.If P(X) is the set of all real polynomials of the form P(X)=1+a^1 x + a^2 x^2with defined usual operation of addition and usual operation of the product of a scalar ‘k ‘ and a polynomial , then […]

# MTH501 VU Assignment No.1 Solution Fall 2012

Question: 1 Marks: 10 Solve the following system of linear equations Question: 2 Marks: 10 Let For what value(s) of is in the plane generated by and? Question: 3 Marks: 5 Find the value(s) of for which the following vectors are linearly independent.

# MTH501 Assignment No 4 Spring 2012 solution

Question: 1                                                                                                                               Marks: 10 If, then find a basis for the eigenspace corresponding to. Question: 2                                                                                                                               Marks: 10 If , then find the eigenvalues and a basis for each eigenspace in .

# MTH501 VU Midterm Papers Spring May 2012

MCQZ related from DETERMINENT, LINEAR INDEPENDENCY dependncy vector space.. 5 number ka LU decomosition ai the [2 3] [5 7] ki or 5 number ka aik matrix main sy cofector nikalna tha or us ka detrmnt 2 number ka ab+ba prove kerna tha 2 number ka AB tha 3 number ka aik Q matrix k […]

# MTH501 Fall 2011 Final Term Feb 2012 – VU Current Paper – 08 Feb 2012

90% MCQs are from 22-45 lectures 5-mark question———-> find cofector and also find determinent using cofector methode of a matrix that is 3×3 given in question then the hot topic in 5-marks and 3-mark question is orthogonal projection must prepare it fully conceptually and numerically andother hot topic saddle point attractor and repeller and in […]