77.1 Matrix Addition and Subtraction Problem Set
MATRIX ADDITION & SUBTRACTION | PRACTICE PROBLEMS Complete the following to reinforce your understanding of the concept covered in this module.
PROBLEM 1: Given the following matrices, the matrix defined by π΄ β π΅ is best represented as: 7 3 π΄=[5 9] 11 β2 10 A. [β3 14 10 B. [ 3 14 10 C. [β3 4 10 D. [11 49
β3 0 π΅=[ 8 1] β3 β4
3 8] 2 3 8] β2 3 3] 2 7 8] 2
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PROBLEM 2: Given the matrices defined below, the resultant of the π΄ + π΅, is best written as: 5 2 π΄=[4 9] 10 β3
β11 0 π΅=[ 7 1] β6 β8
β6 2 A. [ 11 10 ] 4 β11 0 2 B. [0 10] 4 11 β6 9 C. [ 0 0] 4 1 9 2 D. [1 10] 4 21
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PROBLEM 3: Carrying out the followng operatin results in: 8 [ 0
3 4 5 β2 ]+[ β1 9 6 3
1 ] 5
0 1 3 A. [ ] 6 0 14 β13 β1 4 B. [ ] 6 7 14 1 13 5 C. [ ] 5 2 4 13 1 5 D. [ ] 6 2 14
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MATRIX ADDITION & SUBTRACTION | SOLUTIONS SOLUTION 1: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. The SUBTRACTION of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]β[ π½ πΉ
π» πΎ
πΌ π΄βπΊ ]=[ πΏ π·βπ½
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π΅βπ» πΈβπΎ
πΆβπΌ ] πΉβπΏ
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To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ β π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] β [π21 π34 π31
π12 π22 π32
π13 π11 β π11 π23 ] = [π21 β π21 π34 π31 β π31
π12 β π12 π22 β π22 π32 β π32
π13 β π13 π23 β π23 ] π34 β π34
In this problem, we are given: 7 3 π΄=[5 9] 11 β2
β3 0 π΅=[ 8 1] β3 β4
Through observation, we can confirm that the DIMENSION of MATRIX A is 3x2 and the DIMENSION of MATRIX B is 3x2. The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ β π΅ = [π21 π31
π12 π11 π22 ] β [π21 π32 π31
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π12 π11 β π11 π22 ] = [π21 β π21 π32 π31 β π31
π12 β π12 π22 β π22 ] π32 β π32
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Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 7 π΄βπ΅ =[5 11
3 β3 0 9 ]β[ 8 1] β3 β4 β2
Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX SUBTRACTION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 7 π΄βπ΅ =[5 11
3 β3 0 9 ]β[ 8 1] β3 β4 β2
Which results in the OPERATION: 7 π΄βπ΅ =[5 11
7 β (β3) 3 β3 0 9 ]β[ 8 1 ]=[ β3 β4 β2
7 π΄βπ΅ =[5 11
3 β3 0 10 9 ]β[ 8 1 ]=[ β3 β4 β2
]
Or:
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Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 7 π΄βπ΅ =[5 11
3 β3 0 10 9 ]β[ 8 1 ]=[ β3 β4 β2
]
Which results in the OPERATION: 7 π΄βπ΅ =[5 11
3 β3 0 10 3 β 0 ] 9 ]β[ 8 1 ]=[ β3 β4 β2
7 π΄βπ΅ =[5 11
3 β3 0 10 ] β [ ] = [ 9 8 1 β3 β4 β2
Or: 3 ]
Now filling out the remaining ELEMENT OPERATIONS, we get: 7 π΄βπ΅ =[5 11
10 3 3 β3 0 9β1 ] 9 ]β[ 8 1 ] = [ 5β8 11 β (β3) β2 β (β4) β3 β4 β2
We conclude that: 7 π΄βπ΅ =[5 11
3 β3 0 10 3 9 ]β[ 8 1 ] = [β3 8] β3 β4 β2 14 2 Made with
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This is our new MATRIX derived from the SUBTRACTION of MATRIX A and MATRIX B. ππ The correct answer choice is A. [βπ ππ
π π] π
SOLUTION 2: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. Made with
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The ADDITION of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]+[ π½ πΉ
π» πΎ
πΌ π΄+πΊ ]=[ πΏ π·+π½
π΅+π» πΈ+πΎ
πΆ+πΌ ] πΉ+πΏ
To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ + π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] + [π21 π34 π31
π12 π22 π32
π13 π11 + π11 π23 ] = [π21 + π21 π34 π31 + π31
π12 + π12 π22 + π22 π32 + π32
π13 + π13 π23 + π23 ] π34 + π34
In this problem, we are given: 5 π΄=[4 10
2 9] β3
β11 π΅=[ 7 β6
0 1] β8
Through observation, we can confirm that the DIMENSION of MATRIX A is 3x2 and the DIMENSION of MATRIX B is 3x2.
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The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ + π΅ = [π21 π31
π12 π11 π22 ] + [π21 π32 π31
π12 π11 + π11 π22 ] = [π21 + π21 π32 π31 + π31
π12 + π12 π22 + π22 ] π32 + π32
Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 5 π΄+π΅ =[4 10
β11 0 2 9 ]+[ 7 1] β6 β8 β3
Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX ADDITION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 5 π΄+π΅ =[4 10
β11 0 2 9 ]+[ 7 1] β6 β8 β3
Which results in the OPERATION: 5 π΄+π΅ =[4 10
5 + (β11) β11 0 2 9 ]+[ 7 1 ]=[ β6 β8 β3 Made with
]
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Or: 5 π΄+π΅ =[4 10
β11 0 2 6 9 ]+[ 7 1 ]=[ β6 β8 β3
]
Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 5 π΄+π΅ =[4 10
β11 0 2 6 9 ]+[ 7 1 ]=[ β6 β8 β3
]
Which results in the OPERATION: 5 π΄+π΅ =[4 10
β11 0 6 2 9 ]+[ 7 1 ]=[ β6 β8 β3
2+0 ]
5 π΄+π΅ =[4 10
β11 0 6 2 9 ]+[ 7 1 ]=[ β6 β8 β3
2
Or:
]
Now filling out the remaining ELEMENT OPERATIONS, we get: 5 π΄+π΅ =[4 10
6 2 β11 0 2 9+1 ] 9 ]+[ 7 1 ] = [ 4+7 10 + (β6) β3 + (β4) β6 β8 β3
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We conclude that: 5 π΄+π΅ =[4 10
β11 0 β6 2 2 9 ]+[ 7 1 ] = [ 11 10 ] β6 β8 β3 4 β11
This is our new MATRIX derived from the ADDITION of MATRIX A and MATRIX B. βπ The correct answer choice is A. [ ππ π
π ππ ] βππ
SOLUTION 3: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. Made with
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The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. The addition of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]+[ π½ πΉ
π» πΎ
πΌ π΄+πΊ ]=[ πΏ π·+π½
π΅+π» πΈ+πΎ
πΆ+πΌ ] πΉ+πΏ
To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ + π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] + [π21 π34 π31
π12 π22 π32
π13 π11 + π11 π23 ] = [π21 + π21 π34 π31 + π31
π12 + π12 π22 + π22 π32 + π32
π13 + π13 π23 + π23 ] π34 + π34
In this problem, we are given: 8 3 π΄=[ 0 β1
4 ] 9
5 β2 π΅=[ 6 3
1 ] 5
Through observation, we can confirm that the DIMENSION of MATRIX A is 2x3 and the DIMENSION of MATRIX B is 2x3.
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The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ + π΅ = [π 21
π12 π22
π13 π11 ] + [ π23 π21
π12 π22
π13 π + π11 ] = [ 11 π23 π21 + π21
π12 + π12 π22 + π22
π13 + π13 ] π23 + π23
Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] 0 β1 9 6 3 5 Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX ADDITION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] 0 β1 9 6 3 5 Which results in the OPERATION: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [8 + 5 0 β1 9 6 3 5
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Or: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
]
Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
]
Which results in the OPERATION: 13 3 + (β2) 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5
]
Or: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
1
]
Now moving on to ELEMENTS π13 and π13 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
1
]
1
4+1 ]
Which results in the OPERATION: 8 3 4 13 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 Made with
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Or: 8 3 4 5 β2 1 13 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5
1
5
]
Now filling out the remaining ELEMENT OPERATIONS, we get: 8 3 4 13 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 0+6
1 β1 + 3
5 ] 9+5
And: 8 3 4 5 β2 1 13 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 6 2
5 ] 14
This is our new MATRIX derived from the ADDITION of MATRIX A and MATRIX B.
The correct answer choice is D. [
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PROBLEM 1: Given the following matrices, the matrix defined by π΄ β π΅ is best represented as: 7 3 π΄=[5 9] 11 β2 10 A. [β3 14 10 B. [ 3 14 10 C. [β3 4 10 D. [11 49
β3 0 π΅=[ 8 1] β3 β4
3 8] 2 3 8] β2 3 3] 2 7 8] 2
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PROBLEM 2: Given the matrices defined below, the resultant of the π΄ + π΅, is best written as: 5 2 π΄=[4 9] 10 β3
β11 0 π΅=[ 7 1] β6 β8
β6 2 A. [ 11 10 ] 4 β11 0 2 B. [0 10] 4 11 β6 9 C. [ 0 0] 4 1 9 2 D. [1 10] 4 21
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PROBLEM 3: Carrying out the followng operatin results in: 8 [ 0
3 4 5 β2 ]+[ β1 9 6 3
1 ] 5
0 1 3 A. [ ] 6 0 14 β13 β1 4 B. [ ] 6 7 14 1 13 5 C. [ ] 5 2 4 13 1 5 D. [ ] 6 2 14
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MATRIX ADDITION & SUBTRACTION | SOLUTIONS SOLUTION 1: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. The SUBTRACTION of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]β[ π½ πΉ
π» πΎ
πΌ π΄βπΊ ]=[ πΏ π·βπ½
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π΅βπ» πΈβπΎ
πΆβπΌ ] πΉβπΏ
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To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ β π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] β [π21 π34 π31
π12 π22 π32
π13 π11 β π11 π23 ] = [π21 β π21 π34 π31 β π31
π12 β π12 π22 β π22 π32 β π32
π13 β π13 π23 β π23 ] π34 β π34
In this problem, we are given: 7 3 π΄=[5 9] 11 β2
β3 0 π΅=[ 8 1] β3 β4
Through observation, we can confirm that the DIMENSION of MATRIX A is 3x2 and the DIMENSION of MATRIX B is 3x2. The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ β π΅ = [π21 π31
π12 π11 π22 ] β [π21 π32 π31
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π12 π11 β π11 π22 ] = [π21 β π21 π32 π31 β π31
π12 β π12 π22 β π22 ] π32 β π32
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Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 7 π΄βπ΅ =[5 11
3 β3 0 9 ]β[ 8 1] β3 β4 β2
Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX SUBTRACTION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 7 π΄βπ΅ =[5 11
3 β3 0 9 ]β[ 8 1] β3 β4 β2
Which results in the OPERATION: 7 π΄βπ΅ =[5 11
7 β (β3) 3 β3 0 9 ]β[ 8 1 ]=[ β3 β4 β2
7 π΄βπ΅ =[5 11
3 β3 0 10 9 ]β[ 8 1 ]=[ β3 β4 β2
]
Or:
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Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 7 π΄βπ΅ =[5 11
3 β3 0 10 9 ]β[ 8 1 ]=[ β3 β4 β2
]
Which results in the OPERATION: 7 π΄βπ΅ =[5 11
3 β3 0 10 3 β 0 ] 9 ]β[ 8 1 ]=[ β3 β4 β2
7 π΄βπ΅ =[5 11
3 β3 0 10 ] β [ ] = [ 9 8 1 β3 β4 β2
Or: 3 ]
Now filling out the remaining ELEMENT OPERATIONS, we get: 7 π΄βπ΅ =[5 11
10 3 3 β3 0 9β1 ] 9 ]β[ 8 1 ] = [ 5β8 11 β (β3) β2 β (β4) β3 β4 β2
We conclude that: 7 π΄βπ΅ =[5 11
3 β3 0 10 3 9 ]β[ 8 1 ] = [β3 8] β3 β4 β2 14 2 Made with
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This is our new MATRIX derived from the SUBTRACTION of MATRIX A and MATRIX B. ππ The correct answer choice is A. [βπ ππ
π π] π
SOLUTION 2: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. Made with
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The ADDITION of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]+[ π½ πΉ
π» πΎ
πΌ π΄+πΊ ]=[ πΏ π·+π½
π΅+π» πΈ+πΎ
πΆ+πΌ ] πΉ+πΏ
To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ + π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] + [π21 π34 π31
π12 π22 π32
π13 π11 + π11 π23 ] = [π21 + π21 π34 π31 + π31
π12 + π12 π22 + π22 π32 + π32
π13 + π13 π23 + π23 ] π34 + π34
In this problem, we are given: 5 π΄=[4 10
2 9] β3
β11 π΅=[ 7 β6
0 1] β8
Through observation, we can confirm that the DIMENSION of MATRIX A is 3x2 and the DIMENSION of MATRIX B is 3x2.
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The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ + π΅ = [π21 π31
π12 π11 π22 ] + [π21 π32 π31
π12 π11 + π11 π22 ] = [π21 + π21 π32 π31 + π31
π12 + π12 π22 + π22 ] π32 + π32
Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 5 π΄+π΅ =[4 10
β11 0 2 9 ]+[ 7 1] β6 β8 β3
Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX ADDITION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 5 π΄+π΅ =[4 10
β11 0 2 9 ]+[ 7 1] β6 β8 β3
Which results in the OPERATION: 5 π΄+π΅ =[4 10
5 + (β11) β11 0 2 9 ]+[ 7 1 ]=[ β6 β8 β3 Made with
]
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Or: 5 π΄+π΅ =[4 10
β11 0 2 6 9 ]+[ 7 1 ]=[ β6 β8 β3
]
Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 5 π΄+π΅ =[4 10
β11 0 2 6 9 ]+[ 7 1 ]=[ β6 β8 β3
]
Which results in the OPERATION: 5 π΄+π΅ =[4 10
β11 0 6 2 9 ]+[ 7 1 ]=[ β6 β8 β3
2+0 ]
5 π΄+π΅ =[4 10
β11 0 6 2 9 ]+[ 7 1 ]=[ β6 β8 β3
2
Or:
]
Now filling out the remaining ELEMENT OPERATIONS, we get: 5 π΄+π΅ =[4 10
6 2 β11 0 2 9+1 ] 9 ]+[ 7 1 ] = [ 4+7 10 + (β6) β3 + (β4) β6 β8 β3
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We conclude that: 5 π΄+π΅ =[4 10
β11 0 β6 2 2 9 ]+[ 7 1 ] = [ 11 10 ] β6 β8 β3 4 β11
This is our new MATRIX derived from the ADDITION of MATRIX A and MATRIX B. βπ The correct answer choice is A. [ ππ π
π ππ ] βππ
SOLUTION 3: The TOPIC of MATRIX ADDITION & SUBTRACTION can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. ADDITION and SUBTRACTION of two matrices is POSSIBLY ONLY IF both MATRICES have equivalent DIMENSIONS, meaning that they are the same shape and size, ROWS and COLUMNS. The process of ADDING or SUBTRACTING MATRICES simply comes down to taking any of the ELEMENTS in one MATRIX and ADDING of SUBTRACTING that value with the corresponding ELEMENT in another MATRIX. The result is a new ELEMENT that is then placed in to the new MATRIX in the same location of the two elements used in this operation. Made with
by Prepineer | Prepineer.com
The GENERAL FORMULA for the ADDITION of TWO MATRICES can be referenced under the topic of MATRICES on page 34 of the NCEES Supplied Reference Handbook, Version 9.4 for Computer Based Testing. The addition of matrices is represented by the general expression: π΄ [ π·
π΅ πΈ
πΊ πΆ ]+[ π½ πΉ
π» πΎ
πΌ π΄+πΊ ]=[ πΏ π·+π½
π΅+π» πΈ+πΎ
πΆ+πΌ ] πΉ+πΏ
To illustrate this further, given Matrix βπ΄β and βπ΅β defined as: π11 π΄ = [π21 π31
π12 π22 π32
π13 π23 ] π34
π11 π΅ = [π21 π31
π12 π22 π32
π13 π23 ] π34
The addition of βπ΄β and βπ΅β would be: π11 π΄ + π΅ = [π21 π31
π12 π22 π32
π13 π11 π23 ] + [π21 π34 π31
π12 π22 π32
π13 π11 + π11 π23 ] = [π21 + π21 π34 π31 + π31
π12 + π12 π22 + π22 π32 + π32
π13 + π13 π23 + π23 ] π34 + π34
In this problem, we are given: 8 3 π΄=[ 0 β1
4 ] 9
5 β2 π΅=[ 6 3
1 ] 5
Through observation, we can confirm that the DIMENSION of MATRIX A is 2x3 and the DIMENSION of MATRIX B is 2x3.
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The SOLUTION in route to creating the resulting new MATRIX will run along these lines: π11 π΄ + π΅ = [π 21
π12 π22
π13 π11 ] + [ π23 π21
π12 π22
π13 π + π11 ] = [ 11 π23 π21 + π21
π12 + π12 π22 + π22
π13 + π13 ] π23 + π23
Now itβs just a matter of matching up the ELEMENTS and carrying out the ADDITION OPERATION at each location. Doing so we get: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] 0 β1 9 6 3 5 Letβs walk through and HIGHLIGHT the first few ELEMENTS to illustrate specifically how MATRIX ADDITION is carried out. Starting with ELEMENT π11 and π11 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] 0 β1 9 6 3 5 Which results in the OPERATION: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [8 + 5 0 β1 9 6 3 5
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Or: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
]
Now moving on to ELEMENTS π12 and π12 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
]
Which results in the OPERATION: 13 3 + (β2) 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5
]
Or: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
1
]
Now moving on to ELEMENTS π13 and π13 , we will focus on the two values: 8 3 4 5 β2 1 π΄+π΅ =[ ]+[ ] = [13 0 β1 9 6 3 5
1
]
1
4+1 ]
Which results in the OPERATION: 8 3 4 13 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 Made with
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Or: 8 3 4 5 β2 1 13 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5
1
5
]
Now filling out the remaining ELEMENT OPERATIONS, we get: 8 3 4 13 5 β2 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 0+6
1 β1 + 3
5 ] 9+5
And: 8 3 4 5 β2 1 13 1 π΄+π΅ =[ ]+[ ]=[ 0 β1 9 6 3 5 6 2
5 ] 14
This is our new MATRIX derived from the ADDITION of MATRIX A and MATRIX B.
The correct answer choice is D. [
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ππ π π ] π π ππ
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