Question 1
Given matrices:
A =
[ 1 5]
[ 1 4]
B =
[ 1 5]
[ 2 1]
Compute: A + B
Matrix addition:
A + B =
[ 2 10]
[ 3 5]
A + B =
[ 2 10]
[ 3 5]
Matrix Notation - Intermediate Level: tricky scenarios handling Matrix Notation INTERMEDIATE
This expert challenge 📈 worksheet focuses on Matrix Notation - a key topic in Symbol Notation. You'll solve 20 intermediate-level problems (Worksheet 5 of 10). The primary focus is on tricky scenarios handling. Master how to solve matrix notation, matrix notation tricks, and matrix notation shortcut methods through systematic practice.
What you'll learn in this worksheet:
- Master how to solve matrix notation through focused practice
- Understand the logic behind matrix notation tricks
- Learn step-by-step approaches to tricky scenarios handling
- Improve your solving speed while maintaining accuracy
- Learn to eliminate wrong options efficiently
Your progress through Matrix Notation
Worksheet 5 of 10 (44% complete)
Question 2
Given matrices:
A =
[ 4 4]
[ 1 4]
B =
[ 4 3]
[ 4 2]
Compute: A - B
Matrix subtraction:
A - B =
[ 0 1]
[-3 2]
A - B =
[ 0 1]
[-3 2]
Question 3
Given matrices:
A =
[ 3 1]
[ 2 2]
B =
[ 1 1]
[ 1 5]
Compute: A - B
Matrix subtraction:
A - B =
[ 2 0]
[ 1 -3]
A - B =
[ 2 0]
[ 1 -3]
Question 4
Given matrices:
A =
[ 5 4]
[ 5 2]
B =
[ 3 5]
[ 1 1]
Compute: A × B
Matrix multiplication:
A × B =
[19 29]
[17 27]
A × B =
[19 29]
[17 27]
Question 5
Given matrices:
A =
[ 5 1]
[ 5 4]
B =
[ 4 5]
[ 2 4]
Compute: A × B
Matrix multiplication:
A × B =
[22 29]
[28 41]
A × B =
[22 29]
[28 41]
Question 6
Given matrices:
A =
[ 3 3]
[ 1 2]
B =
[ 3 4]
[ 1 5]
Compute: A - B
Matrix subtraction:
A - B =
[ 0 -1]
[ 0 -3]
A - B =
[ 0 -1]
[ 0 -3]
Question 7
Given matrices:
A =
[ 2 3]
[ 1 1]
B =
[ 5 1]
[ 2 5]
Compute: A - B
Matrix subtraction:
A - B =
[-3 2]
[-1 -4]
A - B =
[-3 2]
[-1 -4]
Question 8
Given matrices:
A =
[ 5 2]
[ 3 4]
B =
[ 2 1]
[ 4 5]
Compute: A - B
Matrix subtraction:
A - B =
[ 3 1]
[-1 -1]
A - B =
[ 3 1]
[-1 -1]
Question 9
Given matrices:
A =
[ 3 4]
[ 5 2]
B =
[ 5 5]
[ 2 3]
Compute: A - B
Matrix subtraction:
A - B =
[-2 -1]
[ 3 -1]
A - B =
[-2 -1]
[ 3 -1]
Question 10
Given matrices:
A =
[ 3 2]
[ 4 1]
B =
[ 3 2]
[ 5 4]
Compute: A × B
Matrix multiplication:
A × B =
[19 14]
[17 12]
A × B =
[19 14]
[17 12]
Question 11
Given matrices:
A =
[ 1 4]
[ 5 4]
B =
[ 2 3]
[ 5 3]
Compute: A × B
Matrix multiplication:
A × B =
[22 15]
[30 27]
A × B =
[22 15]
[30 27]
Question 12
Given matrices:
A =
[ 5 2]
[ 4 1]
B =
[ 5 4]
[ 3 2]
Compute: A + B
Matrix addition:
A + B =
[10 6]
[ 7 3]
A + B =
[10 6]
[ 7 3]
Question 13
Given matrices:
A =
[ 2 1]
[ 2 4]
B =
[ 2 2]
[ 5 3]
Compute: A × B
Matrix multiplication:
A × B =
[ 9 7]
[24 16]
A × B =
[ 9 7]
[24 16]
Question 14
Given matrices:
A =
[ 2 2]
[ 5 1]
B =
[ 4 2]
[ 5 4]
Compute: A + B
Matrix addition:
A + B =
[ 6 4]
[10 5]
A + B =
[ 6 4]
[10 5]
Question 15
Given matrices:
A =
[ 2 5]
[ 1 2]
B =
[ 4 5]
[ 4 5]
Compute: A × B
Matrix multiplication:
A × B =
[28 35]
[12 15]
A × B =
[28 35]
[12 15]
Question 16
Given matrices:
A =
[ 5 4]
[ 3 1]
B =
[ 1 5]
[ 5 2]
Compute: A + B
Matrix addition:
A + B =
[ 6 9]
[ 8 3]
A + B =
[ 6 9]
[ 8 3]
Question 17
Given matrices:
A =
[ 1 4]
[ 3 4]
B =
[ 5 2]
[ 1 5]
Compute: A + B
Matrix addition:
A + B =
[ 6 6]
[ 4 9]
A + B =
[ 6 6]
[ 4 9]
Question 18
Given matrices:
A =
[ 3 1]
[ 2 2]
B =
[ 2 1]
[ 1 4]
Compute: A - B
Matrix subtraction:
A - B =
[ 1 0]
[ 1 -2]
A - B =
[ 1 0]
[ 1 -2]
Question 19
Given matrices:
A =
[ 3 2]
[ 2 5]
B =
[ 4 3]
[ 2 5]
Compute: A × B
Matrix multiplication:
A × B =
[16 19]
[18 31]
A × B =
[16 19]
[18 31]
Question 20
Given matrices:
A =
[ 5 5]
[ 3 3]
B =
[ 1 2]
[ 2 2]
Compute: A + B
Matrix addition:
A + B =
[ 6 7]
[ 5 5]
A + B =
[ 6 7]
[ 5 5]
📝 Continue your Matrix Notation practice. Worksheet 5 focuses on tricky scenarios handling.