Tamil Nadu Board of Secondary EducationHSC Commerce Class 12th

# HSC Commerce Class 12th - Tamil Nadu Board of Secondary Education Question Bank Solutions for Business Mathematics and Statistics

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Find the rank of the following matrices

((5, 6),(7, 8))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((1, -1),(3, -6))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((1, 4),(2, 8))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((2, -1, 1),(3, 1, -5),(1, 1, 1))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((-1, 2, -2),(4, -3, 4),(-2, 4, -4))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((1, 2, -1, 3),(2, 4, 1, -2),(3, 6, 3, -7))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((3, 1, -5, -1),(1, -2, 1, -5),(1, 5, -7, 2))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Find the rank of the following matrices

((1, -2, 3, 4),(-2, 4, -1, -3),(-1, 2, 7, 6))

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

If A = ((1, 1, -1),(2, -3, 4),(3, -2, 3)) and B = ((1, -2, 3),(-2, 4, -6),(5, 1, -1)), then find the rank of AB and the rank of BA

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Solve the following system of equations by rank method

x + y + z = 9, 2x + 5y + 7z = 52, 2x – y – z = 0

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Show that the equations 5x + 3y + 7z = 4, 3x + 26y + 2z = 9, 7x + 2y + 10z = 5 are consistent and solve them by rank method

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Show that the following system of equations have unique solutions: x + y + z = 3, x + 2y + 3z = 4, x + 4y + 9z = 6 by rank method

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

For what values of the parameter λ, will the following equations fail to have unique solution: 3x – y + λz = 1, 2x + y + z = 2, x + 2y – λz = – 1

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

The price of three commodities, X, Y and Z are and z respectively Mr. Anand purchases 6 units of Z and sells 2 units of X and 3 units of Y. Mr.Amar purchases a unit of Y and sells 3 units of X and 2 units of Z. Mr. Amit purchases a unit of X and sells 3 units of Y and a unit of Z. In the process they earn ₹ 5,000/-, ₹ 2,000/- and ₹ 5,500/- respectively. Find the prices per unit of three commodities by rank method

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

An amount of ₹ 5,000/- is to be deposited in three different bonds bearing 6%, 7% and 8% per year respectively. Total annual income is ₹ 358/-. If the income from the first two investments is ₹ 70/- more than the income from the third, then find the amount of investment in each bond by the rank method

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Choose the correct alternative:

A = (1, 2, 3), then the rank of AAT is

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Choose the correct alternative:

The rank of m n × matrix whose elements are unity is

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Choose the correct alternative:

If A = ((2, 0),(0, 8)), then p(A) is

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Choose the correct alternative:

The rank of the matrix ((1, 1, 1),(1, 2, 3),(1, 4, 9)) is

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix

Choose the correct alternative:

The rank of the unit matrix of order n is

[0.01] Applications of Matrices and Determinants
Chapter: [0.01] Applications of Matrices and Determinants
Concept: Rank of a Matrix
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