JAM Question Paper 2005 CA (Computer Applications).
Joint Admission Test (JAM) This JAM CA – Computer Applications 2005 examination is the procedure to get the Admission to Integrated Ph.D. Programmes at Indian Institute of Science, Bangalore and M.Sc. (Two Year), Joint M.Sc.-Ph.D., M.Sc.-Ph.D. Dual Degree and other Post-Bachelor’s Degree Programmes at Indian Institutes of Technology
JAM CA – Computer Applications 2005 Question Paper having The questions for Biological Sciences (BL), Computer Applications (CA) and Computer Applications (CA) test papers will be fully objective type. This JAM CA – Computer Applications 2005 Question will help all the students for their exam preparation, here the question type is MCQ i.e multiple choice question answers, if this JAM CA – Computer Applications 2005 question paper in pdf file for IIT JAM CA – Computer Applications you can download it in FREE, if Joint Entrance Examination (JAM) 2005 paper in text for JAM you can download JAM 2005 page also just Go to menu bar, Click on File->then Save.
JAM Question Paper 2005 CA (Computer Applications)
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An abeliari group of order 24 has
(A) exactly one subgroup of order 3
(B) exactly two subgroups of order 3
(C) no subgroup of order 3
(D) more than two subgroups of order 3
Let A be an n x n matrix such that xTAx > 0 for every non zero vector x in R’. Which of the following is true?
(A) All eigen values of A are negative
(B) All eigen values of A are positive
(C) Exactly one eigen value of A is zero
(D) More than one eigen values of A are zero
Which of the following is not true?
(A) The order of the subgroup of a finite group divides the order of the group
(B) Every group of finite order is cyclic
(C) Every cyclic group is abelian
(D) If k is a divisor of the order of a group G, then G must have a subgroup of order k
Which of the following is true?
(A) The set of all 2×2 real matrices forms a group under matrix multiplication
(B) A finite abelian group of order 6 has exactly two non-trivial subgroups
(C) Every finite group is always cyclic
(D) The set of all 2×2 real non-singular matrices forms an abelian group under matrix multiplication
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