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Test: Rank of a Matrix & LU Decomposition - Civil Engineering (CE) MCQ


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10 Questions MCQ Test - Test: Rank of a Matrix & LU Decomposition

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Test: Rank of a Matrix & LU Decomposition - Question 1

Find the rank of the matrix 

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 1

Given:

|A| = 1 x [6 x 2 - 2 x 7] - 3 × [4 x 2 - 1 × 7] + 5 x [4 x 2 - 1 x 6]
⇒ |A| = -2 - 3 + 10 = 5
So, |A| ≠ 0
The rank of A = 3

Test: Rank of a Matrix & LU Decomposition - Question 2

If 
 then the rank of the matrix A is

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 2

R1 → -R1

R2 → R2 - 2R1; R3 → R3 - 3R1; R4 → R4 - 5R1

R4 → R4 - 2R2; R3 → R3 - 2R2

So, r[A] = 2

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Test: Rank of a Matrix & LU Decomposition - Question 3

The lower triangular matrix [L] in the [L][U] decomposition of the matrix given below

is

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 3

We must first complete the first step of forward elimination

First step: Multiply Row 1 by 10/25 = 0.4 and subtract the results from Row 2

Multiply Row 1 by 8/25 = 0.32,  and subtract the results from Row 3

To find ℓ21 and ℓ31 , what multiplier was used to make the a21 and a31 elements zero in the first step of forward elimination using the Naïve Gauss elimination method? They are
21 = 0.4
31 = 0.32
To find ℓ32, what multiplier would be used to make the a32 element zero? Remember the a32 element is made zero in the second step of forward elimination.
So

Hence

*Answer can only contain numeric values
Test: Rank of a Matrix & LU Decomposition - Question 4

Find the rank of [Adj A], if  


Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 4

Given:

Calculation of rank of the given matrix A:
Interchanging R1 and R2



The given matrix has rank 2.

∵ the matrix has a dimension of 3, and the rank is 2, therefore the rank of adjoint is 1.

Test: Rank of a Matrix & LU Decomposition - Question 5

The rank of the following matrix is

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 5

Given


Number of non-zero rows = rank of the matrix = 2

∴ The rank of the following matrix is 2.

*Answer can only contain numeric values
Test: Rank of a Matrix & LU Decomposition - Question 6

The rank of the matrix


Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 6

Given

Apply now transformation, R4 → R4 + R1, we get,

R2 ↔ R3

This matrix is in triangular form with last row = 0,
So, Rank = 4

*Answer can only contain numeric values
Test: Rank of a Matrix & LU Decomposition - Question 7

Let   be two matrices. Then the rank of P + Q is ______.


Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 7

|X| = 0 (72 – 80) – (–1) (64 – 80) – 2(64 – 72) 
∴ |X| = 0 + (–16) + 16 = 0
Determinant of 3 × 3 matrix is zero.
∴ Rank(X) ≠ 3

Determinant of 2 × 2 matrix is nonzero. So, rank of X is 2.

Test: Rank of a Matrix & LU Decomposition - Question 8

Let A and B two n × n matrices over real numbers. Let rank(M) and det(M) denote the rank and determinant of a matrix M, respectively. Consider the following statements.

I. rank(AB) = rank(A) rank(B)
II. det(AB) = det(A) det(B)
III. rank(A + B) ≤ rank(A) + rank(B)
IV. det(A + B) ≤ det(A) + det(B)

Which of the above statements are TRUE?

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 8

Concept:

Properties of Rank: Rank of a matrix is the number of independent rows in the given matrix. Given two square matrices A and B of order n × n, we have following properties:

  • 1. Rank of product of A and B i.e. Rank (AB) ≥ Rank (A) + Rank (B) – order of square matrix
  • 2. Rank of sum of A and B i.e. Rank (A + B) ≤ Rank (A) + Rank (B).

Properties of Determinant: Given two square matrices A and B of order n × n and their determinants Det(A) and Det(B) respectively, determinant of their product i.e Det( AB) = Det(A) * Det(B). However, the same does not hold for the addition of the given matrices.

Example:

Consider two square matrices A and B each of order 2×2.

Rank of B = 2
Det (B) = 1


Rank (AB) = 2
Det (AB) = 5


 

Rank of A+B = 2

Det (A+B) = 12

Statement I is FALSE.
The rank of product matrix AB is 2. Product of Rank(A) and Rank(B) is: 2*2 = 4. Therefore, the rank of the product matrix is not equal to the product of the rank of individual matrices.

Statement II is TRUE. 
Det(AB)= 5 = Det(A) * Det(B)

Statement III is TRUE.
Rank(A + B) = 2. Sum of rank of A and B is: 2 + 2 = 4. Therefore, the relation: Rank (A + B) ≤ Rank (A) + Rank (B) holds true
Therefore, the rank of the addition matrix is less than or equal to the sum of the rank of the individual matrices.

Statement IV is FALSE.  
Det(A+B)= 12, which is greater than the sum of the determinants of individual matrices.

Test: Rank of a Matrix & LU Decomposition - Question 9

The rank of the matrix  is

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 9

Given:

Replace R2 with R4 matrix becomes

Applying row transformations R3 → R3 + R1 Now the matrix becomes.

Applying Row transformation for row 4: R4 → R4 - 2 R2

Replace R3 with R4, the matrix becomes

Therefore Number of non zero rows is 3 
∴ The rank of the matrix is 3 

Test: Rank of a Matrix & LU Decomposition - Question 10

The rank of the matrix  is

Detailed Solution for Test: Rank of a Matrix & LU Decomposition - Question 10

Concept Used:

Gaussian Elimination: The process of transforming a matrix into its echelon form by applying elementary row operations. These operations include adding one row to another, multiplying a row by a scalar, and swapping rows.

The rank of the matrix is the number of non-zero rows in row echelon form.
Let the given matrix be 
R2 → R2 - 3Rand R3 → R3 - R1

Now, the matrix is in row-echelon form. We have three non-zero row, so the rank of the matrix is 3.
Therefore, the rank of the given matrix is 3.

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