Home
Class 12
MATHS
Let M be a 2xx2 symmetric matrix with in...

Let M be a `2xx2` symmetric matrix with integer entries.
Then , M is invertible, if

A

the first column of M is the transpose of the second row of
M

B

The second row of M is the transpose of the first column of
M

C

m is a diagonal matrix with non- zero entries in the main
diagonal

D

the product of entries in the main diagonal of M is not the
square of an integer

Text Solution

Verified by Experts

The correct Answer is:
C, D
Let `M= [[a,b],[c,d]]`, where `a, b, c, in I`
M is invertible if `abs((a,b),(b,c)) ne 0 rArr ac- b^(2) ne 0 `
(a) `[[a],[b]]=[[b],[c]]rArr a = b =c rArr ac-b^(2)=0`
`therefore` Option (a) is incorrect
(b) `[(b,c)]= [(a,b)] rArr a = b = c rArr ac - b^(2) = 0`
`therefore` Option (b) is incorrect
(c) `M= [[a,0],[0,c]], ` then` abs(M) = ac ne 0`
`therefore` M is invertible
`therefore` Potion ( c) is correct.
(d) As `acne"Integre """^(2)rArrac ne b^(2)`
`therefore ` Option (d)is correct.
Promotional Banner

Topper's Solved these Questions

  • MATRICES

    ARIHANT MATHS|Exercise Exercise (Subjective Type Questions)|14 Videos

  • MATHEMATICAL INDUCTION

    ARIHANT MATHS|Exercise Exercise (Questions Asked In Previous 13 Years Exam)|2 Videos

  • MONOTONICITY MAXIMA AND MINIMA

    ARIHANT MATHS|Exercise Exercise (Questions Asked In Previous 13 Years Exam)|31 Videos

Similar Questions

Explore conceptually related problems

Let a be a 2xx2 matrix with non-zero entries and let A^(2)=I , where I is a 2xx2 identity matrix. Define Tr(A)= sum of diagonal elements of A and |A| = determinant of matrix A. Statement 1 : Tr (A) = 0 Statement 2 : |A|=1

If A is a skew symmetric matrix, then A^(2) is a ……

Let A be a square symmetric matrix. Show that 1/2 (A+A') is a symmetric matrix.

Let A and B be symmetric matrices of the same order. Then show that: A +B is a symmetric matrix.

Let A be a square symmetric matrix. Show that 1/2 (A-A') is a skew-symmetric matrix.

Let A and B be symmetric matrices of the same order. Then show that: AB-BA is skew-symmetric matrix.

Let A and B be symmetric matrices of the same order. Then show that: AB+BA is a symmetric matrix.

If A is a skew-symmetric matrix and n is odd positive integer, then A^n is a skew-symmetric matrix a symmetric matrix a diagonal matrix none of these

If A is skew symmetric matrix, then A^(2) is a symmetric matrix .

Let A and B two symmetric matrices of order 3. Statement 1 : A(BA) and (AB)A are symmetric matrices. Statement 2 : AB is symmetric matrix if matrix multiplication of A with B is commutative.

ARIHANT MATHS-MATRICES -Exercise (Questions Asked In Previous 13 Years Exam)
  1. Let M be a 3xx3 matrix satisfying M[0 1 0]=M[1-1 0]=[1 1-1],a n dM[1 1...

    Text Solution

    |

  2. Let A and B two symmetric matrices of order 3. Statement 1 : A(BA) a...

    Text Solution

    |

  3. Let P=[a(i j)] be a 3xx3 matrix and let Q=[b(i j)],w h e r eb(i j)=2^(...

    Text Solution

    |

  4. If P is a 3xx3 matrix such that P^T = 2P+I, where P^T is the transpose...

    Text Solution

    |

  5. If the adjoint of a 3x3 matrix P is (1 4 4) (2 1 7) (1 1 3) , t...

    Text Solution

    |

  6. Let A=((1,0,0),(2,1,0),(3,2,1)). If u(1) and u(2) are column matrices ...

    Text Solution

    |

  7. Let P and Q be 3xx3 matrices P ne Q. If P^(3)=Q^(3) and P^(2)Q=Q^(2)P,...

    Text Solution

    |

  8. IF P=[(1,alpha,3),(1,3,3),(2,4,4)] is the adjoint of 3xx3 matrix A and...

    Text Solution

    |

  9. For 3xx3 matrices M \ a n d \ N , which of the following statement (s)...

    Text Solution

    |

  10. Let omega be a complex cube root of unity with omega!=1a n dP=[p(i j)]...

    Text Solution

    |

  11. If A is an 3xx3 non-singular matrix such that A A^T=A^TA and B=A^(-1)A...

    Text Solution

    |

  12. Let M be a 2xx2 symmetric matrix with integer entries. Then , M is i...

    Text Solution

    |

  13. Let M and N be two 3xx3 matrices such that MN=NM. Further, if M ne N^(...

    Text Solution

    |

  14. If A=[(1,2,2),(2,1,-2),(a,2,b)] is a matrix satisying the equation A A...

    Text Solution

    |

  15. Let X \ a n d \ Y be two arbitrary, 3xx3 , non-zero, skew-symmetric ma...

    Text Solution

    |

  16. If A=[(5a,-b),(3,2)] and A adj A=A A^(T), then 5a+b is equal to

    Text Solution

    |

  17. Let p=[(3,-1,-2),(2,0,alpha),(3,-5,0)], where alpha in RR. Suppose Q=[...

    Text Solution

    |

  18. Let z=(-1+sqrt(3)i)/(2), where i=sqrt(-1), and r, s in {1, 2, 3}. Let ...

    Text Solution

    |

  19. Let P=[(1,0,0),(3,1,0),(9,3,1)] and Q = [q(ij)] be two 3xx3 matrices s...

    Text Solution

    |

  20. If A=[(2,-3),(-4,1)], then adj (3A^(2)+12 A) is equal to

    Text Solution

    |