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Matrices Practice Questions - DPP for JEE
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Page 1 PART-I (Single Correct MCQs) 1. If A = then A 100 : (a) 2 100 A (b) 2 99 A (c) 2 101 A (d) None of these 2. If , then A T + A = I 2 , if (a) (b) (c) (d) None of these Page 2 PART-I (Single Correct MCQs) 1. If A = then A 100 : (a) 2 100 A (b) 2 99 A (c) 2 101 A (d) None of these 2. If , then A T + A = I 2 , if (a) (b) (c) (d) None of these 3. If , I is the unit matrix of order 2 and a, b are arbitrary constants, then (aI + bA) 2 is equal to (a) a 2 I + abA (b) a 2 I + 2abA (c) a 2 I + b 2 A (d) None of these 4. If f (a) = and if a, ß, ?, are angle of a triangle, then f (a). f (ß). f(?) equals (a) I 2 (b) –I 2 (c) 0 (d) None of these 5. If A a = , then (a) A a . A (–a) = I (b) A a . A (–a) = O (c) A a . A ß = A aß (d) A a . A ß = A a – ß 6. If A is a square matrix such that (A – 2I) (A + I) = O, then A –1 = (a) (b) (c) 2 (A – I) (d) 2A + I Page 3 PART-I (Single Correct MCQs) 1. If A = then A 100 : (a) 2 100 A (b) 2 99 A (c) 2 101 A (d) None of these 2. If , then A T + A = I 2 , if (a) (b) (c) (d) None of these 3. If , I is the unit matrix of order 2 and a, b are arbitrary constants, then (aI + bA) 2 is equal to (a) a 2 I + abA (b) a 2 I + 2abA (c) a 2 I + b 2 A (d) None of these 4. If f (a) = and if a, ß, ?, are angle of a triangle, then f (a). f (ß). f(?) equals (a) I 2 (b) –I 2 (c) 0 (d) None of these 5. If A a = , then (a) A a . A (–a) = I (b) A a . A (–a) = O (c) A a . A ß = A aß (d) A a . A ß = A a – ß 6. If A is a square matrix such that (A – 2I) (A + I) = O, then A –1 = (a) (b) (c) 2 (A – I) (d) 2A + I 7. If and Q = PAP T , then P (Q 2005 )P T equal to (a) (b) (c) (d) 8. Let and , . Then (a) there cannot exist any B such that AB = BA (b) there exist more than one but finite number of B's such that AB = BA (c) there exists exactly one B such that AB = BA (d) there exist infinitely many B's such that AB = BA 9. If A = and I is the identity matrix of order 2, then (I – A) is equal to (a) I + A (b) I – A (c) A – I (d) A 10. If A is a square matrix such that A 2 = I, then Page 4 PART-I (Single Correct MCQs) 1. If A = then A 100 : (a) 2 100 A (b) 2 99 A (c) 2 101 A (d) None of these 2. If , then A T + A = I 2 , if (a) (b) (c) (d) None of these 3. If , I is the unit matrix of order 2 and a, b are arbitrary constants, then (aI + bA) 2 is equal to (a) a 2 I + abA (b) a 2 I + 2abA (c) a 2 I + b 2 A (d) None of these 4. If f (a) = and if a, ß, ?, are angle of a triangle, then f (a). f (ß). f(?) equals (a) I 2 (b) –I 2 (c) 0 (d) None of these 5. If A a = , then (a) A a . A (–a) = I (b) A a . A (–a) = O (c) A a . A ß = A aß (d) A a . A ß = A a – ß 6. If A is a square matrix such that (A – 2I) (A + I) = O, then A –1 = (a) (b) (c) 2 (A – I) (d) 2A + I 7. If and Q = PAP T , then P (Q 2005 )P T equal to (a) (b) (c) (d) 8. Let and , . Then (a) there cannot exist any B such that AB = BA (b) there exist more than one but finite number of B's such that AB = BA (c) there exists exactly one B such that AB = BA (d) there exist infinitely many B's such that AB = BA 9. If A = and I is the identity matrix of order 2, then (I – A) is equal to (a) I + A (b) I – A (c) A – I (d) A 10. If A is a square matrix such that A 2 = I, then (A – I) 3 + (A + I) 3 – 7A is equal to (a) A (b) I – A (c) I + A (d) 3A 11. If B is an idempotent matrix, and A = I – B, then (a) A 2 = A (b) A 2 = I (c) AB = I (d) BA = I 12. Let then is equal to (a) (b) (c) (d) 13. For each real number x such that – 1 < x < 1, let A (x) be the matrix (a) A(z) = A(x) + A(y) (b) A(z) = A(x)[A(y)] –1 (c) A(z) = A(x) A(y) (d) A(z) = A(x) – A(y) 14. If , then A 16 is equal to : Page 5 PART-I (Single Correct MCQs) 1. If A = then A 100 : (a) 2 100 A (b) 2 99 A (c) 2 101 A (d) None of these 2. If , then A T + A = I 2 , if (a) (b) (c) (d) None of these 3. If , I is the unit matrix of order 2 and a, b are arbitrary constants, then (aI + bA) 2 is equal to (a) a 2 I + abA (b) a 2 I + 2abA (c) a 2 I + b 2 A (d) None of these 4. If f (a) = and if a, ß, ?, are angle of a triangle, then f (a). f (ß). f(?) equals (a) I 2 (b) –I 2 (c) 0 (d) None of these 5. If A a = , then (a) A a . A (–a) = I (b) A a . A (–a) = O (c) A a . A ß = A aß (d) A a . A ß = A a – ß 6. If A is a square matrix such that (A – 2I) (A + I) = O, then A –1 = (a) (b) (c) 2 (A – I) (d) 2A + I 7. If and Q = PAP T , then P (Q 2005 )P T equal to (a) (b) (c) (d) 8. Let and , . Then (a) there cannot exist any B such that AB = BA (b) there exist more than one but finite number of B's such that AB = BA (c) there exists exactly one B such that AB = BA (d) there exist infinitely many B's such that AB = BA 9. If A = and I is the identity matrix of order 2, then (I – A) is equal to (a) I + A (b) I – A (c) A – I (d) A 10. If A is a square matrix such that A 2 = I, then (A – I) 3 + (A + I) 3 – 7A is equal to (a) A (b) I – A (c) I + A (d) 3A 11. If B is an idempotent matrix, and A = I – B, then (a) A 2 = A (b) A 2 = I (c) AB = I (d) BA = I 12. Let then is equal to (a) (b) (c) (d) 13. For each real number x such that – 1 < x < 1, let A (x) be the matrix (a) A(z) = A(x) + A(y) (b) A(z) = A(x)[A(y)] –1 (c) A(z) = A(x) A(y) (d) A(z) = A(x) – A(y) 14. If , then A 16 is equal to : (a) (b) (c) (d) 15. If is square root of identity matrix of order 2 then – (a) 1 + a 2 + ß? = 0 (b) 1 + a 2 – ß? = 0 (c) 1 – a 2 + ß? = 0 (d) a 2 + ß? = 1 16. If A and B are matrices of same order, then is a (a) skew symmetric matrix (b) null matrix (c) symmetric matrix (d) unit matrix 17. If A is symmetric as well as skew-symmetric matrix, then A is (a) Diagonal (b) Null (c) Triangular (d) None of these 18. If A and B are two square matrices such that B = – A –1 BA, then (A + B) 2 = (a) O (b) (c) + 2 AB +Read More
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