If A = 13121- 1301 then rank (A) is equal to from Math

Previous Year Papers

Download Solved Question Papers Free for Offline Practice and view Solutions Online.

Test Series

Take Zigya Full and Sectional Test Series. Time it out for real assessment and get your results instantly.

Test Yourself

Practice and master your preparation for a specific topic or chapter. Check you scores at the end of the test.
Advertisement

 Multiple Choice QuestionsMultiple Choice Questions

41.

Let A be a non-singular square matrix. Then,adj A is equal to

  • A

  • An - 1

  • An - 2

  • None of these


42.

If P is a 3 x 3 matrix such that PT = 2P + I, where pT is the transpose of P and I is 3 x 3 identity, then there exists a column matrix X = xyz  000 such that PX is equal to

  • 000

  • X

  • 2X

  • - X


43.

If A = 01- 1213321, then (A(adj A)A- 1) is equal to

  • 2300030003

  • 01/6- 1/62/61/63/63/62/61/6

  • - 6000- 6000- 6

  • None of these


44.

Let A = 1- 1121- 3321 and 10B = 422- 50α1- 23. If B is the inverse of A, then α is

  • 5

  • - 2

  • 1

  • - 1


Advertisement
45.

If A and B are two matrices such that rank of A = m and rank of B = n, then

  • rank (AB) rank (B)

  • rank (AB) rank (A)

  • rank (AB) min (rank A, rank B)

  • rank(AB) = mn


46.

If the matrix A = 131- 12- 3012, then adj (adj A) is equal to

  • 123612- 1224- 3601224

  • 1226- 122436- 36012- 24

  • 12- 123624- 24- 3601224

  • None of the above


Advertisement

47.

If A = 13121- 1301 then rank (A) is equal to

  • 4

  • 1

  • 2

  • 3


D.

3

Given, A = 13121- 1301              = 1310- 5- 30- 9- 2Applying R2  R2 - 2R1, R3  R3 - 3R1              = 1310- 5- 300175                                      R3  R3 - 95R2Hence, rank ( A) = 3 


Advertisement
48.

Find the value of k for which the\ simultaneous equations x + y + z = 3; x + 2 y + 3Z = 4 and x + 4 y + kz = 6 will not have a unique solution.

  • 0

  • 5

  • 6

  • 7


Advertisement
49.

If A = 3457 then A . (adj A) is equal to

  • A

  • A

  • A . I

  • None of these


50.

If the points (x1, y1), (x2, y2) and (x3, y3) are collinear, then the rank of the matrix x1y11x2y21x3y31 will always be less than

  • 3

  • 2

  • 1

  • None of these


Advertisement