Last Updated : 07 Aug, 2024
In python matrix can be implemented as 2D list or 2D Array. Forming matrix from latter, gives the additional functionalities for performing various operations in matrix. These operations and array are defines in module "numpy".
Operation on Matrix :
Implementation:
Python
# Python code to demonstrate matrix operations
# add(), subtract() and divide()
# importing numpy for matrix operations
import numpy
# initializing matrices
x = numpy.array([[1, 2], [4, 5]])
y = numpy.array([[7, 8], [9, 10]])
# using add() to add matrices
print ("The element wise addition of matrix is : ")
print (numpy.add(x,y))
# using subtract() to subtract matrices
print ("The element wise subtraction of matrix is : ")
print (numpy.subtract(x,y))
# using divide() to divide matrices
print ("The element wise division of matrix is : ")
print (numpy.divide(x,y))
Output :
The element wise addition of matrix is :
[[ 8 10]
[13 15]]
The element wise subtraction of matrix is :
[[-6 -6]
[-5 -5]]
The element wise division of matrix is :
[[ 0.14285714 0.25 ]
[ 0.44444444 0.5 ]]
# Python code to demonstrate matrix operations
# multiply() and dot()
# importing numpy for matrix operations
import numpy
# initializing matrices
x = numpy.array([[1, 2], [4, 5]])
y = numpy.array([[7, 8], [9, 10]])
# using multiply() to multiply matrices element wise
print ("The element wise multiplication of matrix is : ")
print (numpy.multiply(x,y))
# using dot() to multiply matrices
print ("The product of matrices is : ")
print (numpy.dot(x,y))
Output :
The element wise multiplication of matrix is :
[[ 7 16]
[36 50]]
The product of matrices is :
[[25 28]
[73 82]]
Implementation:
Python
# Python code to demonstrate matrix operations
# sqrt(), sum() and "T"
# importing numpy for matrix operations
import numpy
# initializing matrices
x = numpy.array([[1, 2], [4, 5]])
y = numpy.array([[7, 8], [9, 10]])
# using sqrt() to print the square root of matrix
print ("The element wise square root is : ")
print (numpy.sqrt(x))
# using sum() to print summation of all elements of matrix
print ("The summation of all matrix element is : ")
print (numpy.sum(y))
# using sum(axis=0) print summation of each column of matrix
print ("The column wise summation of all matrix is : ")
print (numpy.sum(y,axis=0))
# using sum(axis=1) print summation of each row of matrix
print ("The row wise summation of all matrix is : ")
print (numpy.sum(y,axis=1))
# using "T" to transpose the matrix
print ("The transpose of given matrix is : ")
print (x.T)
Output :
The element wise square root is :Using nested loops:
[[ 1. 1.41421356]
[ 2. 2.23606798]]
The summation of all matrix element is :
34
The column wise summation of all matrix is :
[16 18]
The row wise summation of all matrix is :
[15 19]
The transpose of given matrix is :
[[1 4]
[2 5]]
Approach:
A = [[1,2],[4,5]]
B = [[7,8],[9,10]]
rows = len(A)
cols = len(A[0])
# Element wise addition
C = [[0 for i in range(cols)] for j in range(rows)]
for i in range(rows):
for j in range(cols):
C[i][j] = A[i][j] + B[i][j]
print("Addition of matrices: \n", C)
# Element wise subtraction
D = [[0 for i in range(cols)] for j in range(rows)]
for i in range(rows):
for j in range(cols):
D[i][j] = A[i][j] - B[i][j]
print("Subtraction of matrices: \n", D)
# Element wise division
E = [[0 for i in range(cols)] for j in range(rows)]
for i in range(rows):
for j in range(cols):
E[i][j] = A[i][j] / B[i][j]
print("Division of matrices: \n", E)
Addition of matrices: [[8, 10], [13, 15]] Subtraction of matrices: [[-6, -6], [-5, -5]] Division of matrices: [[0.14285714285714285, 0.25], [0.4444444444444444, 0.5]]
Time complexity: O(n^2)
Space complexity: O(n^2)
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