# Program to multiply matrix

Trying to make 3 x 3 matrix multiplier but it gives out wrong output. I don't know what I am doing wrong. Two problems that I am facing are:

(1) Some variables store wrong input. For example a[1][1] shows 7 although I entered 1

(2) The matrix multiplication is wrong

#include <stdio.h>
#include <conio.h>

void matrix_format(int m[2][2])
{
int i,j;
printf("\n\n");
for(i=0;i<=2;i++)
{
for(j=0;j<=2;j++)
{
if(j==0)
printf("[ %d |",m[i][j]);
else if(j==1)
printf(" %d |",m[i][j]);
else if(j==2)
printf(" %d ] \n",m[i][j]);
}
}
}

int main(void)
{
void matrix_format(int [2][2]);
int a[2][2], b[2][2], r[2][2],m,i,j;

clrscr();

for(m=1;m<=2;m++)
{

if(m==1)
{
printf("Enter values for the matrix A \n");
}
else
{
printf("\n\nEnter values for the matrix B \n");
}

for(i=0;i<=2;i++)
{
for(j=0;j<=2;j++)
{
if(m==1)
{
printf("A[%d][%d] : ",i+1,j+1);
scanf("%d",&a[i][j]);
}
else if(m==2)
{
printf("B[%d][%d] : ",i+1,j+1);
scanf("%d",&b[i][j]);
}
}
}
}

printf("\n Matrix A : \n");
matrix_format(a);

printf("\n Matrix B : \n");
matrix_format(b);

for(i=0;i<=2;i++)
{
for(j=0;j<=2;j++)
{
r[i][j]= a[i][j] * b[j][i];
}
}

printf("\n Matrix Multiplication Result : \n");
matrix_format(r);

getch();
return 0;
}

output:

-
You're doing component wise multiplication rather than what I'd normally call matrix multiplication, is that on purpose? – user786653 Oct 3 '11 at 16:33
No, that was not intentional – Failed_Noob Oct 3 '11 at 16:39

The first problem that jumps out is that all your arrays are 2x2, while they should be 3x3:

m[2][2]

m[3][3]

and so on. The number in brackets is the size of the array, not the index of the last element.

This will explain some of the weirdness, in particular why some elements get mysteriously overwritten.

As to the actual matrix multiplication, your algorithm isn't quite right (assuming what you're trying to implement is the standard linear algebra matrix product). Think about what steps are involved in multiplying two matrices, and what your code is actually doing. Since this is homework, I'll only give you a hint:

Matrix product involves summations of element products.

-
But all arrays start with 0 in C – Failed_Noob Oct 3 '11 at 16:28
@Failed_Noob: Correct. However, when declaring arrays, the number inside the brackets represents the desired size of the array, not an index in the array. – Aasmund Eldhuset Oct 3 '11 at 16:29
Yes but when declaring them, you must give them their actual size, starting from 1. When referencing them, then yes, they start at 0. – Mike S. Oct 3 '11 at 16:30
I just noticed that my formula is wrong too :( – Failed_Noob Oct 3 '11 at 16:37

There are two major problems:

First, a 3*3 matrix is represented by int matrix[3][3] not int matrix[2][2]. The reason you see strange results is that you are writing over array boundaries, effectively writing over the other matrix because their memory locations are adjacent.

Note: An array such as int a[10] can only be indexed from 0 to 9.

Another problem is your multiplication. From math, we know that if we have:

C = A x B

Then we have:

C[i][j] = sum(A[i][k]*A[k][j]) over k

C[i][j] = A[i][0]*A[0][j]+A[i][1]*A[1][j]+A[i][2]*A[2][j]

So you have to have:

for over i
for over j
C[i][j] = 0
for over k
C[i][j] += A[i][k]*B[k][j]
-

I have written a simple matrix multiplication program without using pointers. Hopefully this would work for you. I can see that you know how to use functions, so try using them more often. Also your multiplication logic was wrong. Read up on that and then see the code. (If you want to do the matrix multiplication for let's say a 5 x 5 matrix, then you should just change #define SIZE 3 to #define SIZE 5).

#include <stdio.h>
#include <stdlib.h>

#define SIZE 3

void CreateMatrix(char name, int m[SIZE][SIZE]) {
int row, col;
printf("Enter values for the matrix %c:\n", name);
for(row = 0; row < SIZE; row++) {
for(col = 0; col < SIZE; col++) {
printf("%c[%d][%d] : ", name, row + 1, col + 1);
scanf("%d", &m[row][col]);
}
}
printf("\n");
}

void PrintMatrix(char name, int m[SIZE][SIZE]) {
int row, col;
printf("Matrix %c:\n", name);
for (row = 0; row < SIZE; row++) {
printf("[ ");
for (col = 0; col < SIZE; col++) {
printf("%d ", m[row][col]);
}
printf("]\n");
}
printf("\n");
}

void MatrixMultiply(int a[SIZE][SIZE], int b[SIZE][SIZE], int mul[SIZE][SIZE]) {
int row, col, k;
for (row = 0; row < SIZE; row++) {
for (col = 0; col < SIZE; col++) {
mul[row][col] = 0;
for (k = 0; k < SIZE; k++) {
mul[row][col] += a[row][k] * b[k][col];
}
}
}
}

int main() {
int a[SIZE][SIZE];
int b[SIZE][SIZE];
int mul[SIZE][SIZE];

// Create Matrices
CreateMatrix('A', a);
CreateMatrix('B', b);

// Matrix Multiplication
MatrixMultiply(a, b, mul);

// Print Matrices
PrintMatrix('A', a);
PrintMatrix('B', b);
PrintMatrix('M', mul);
}

The output:

Enter values for the matrix A:
A[1][1] : 1
A[1][2] : 2
A[1][3] : 3
A[2][1] : 4
A[2][2] : 5
A[2][3] : 6
A[3][1] : 7
A[3][2] : 8
A[3][3] : 9

Enter values for the matrix B:
B[1][1] : 1
B[1][2] : 2
B[1][3] : 3
B[2][1] : 4
B[2][2] : 5
B[2][3] : 6
B[3][1] : 7
B[3][2] : 8
B[3][3] : 9

Matrix A:
[ 1 2 3 ]
[ 4 5 6 ]
[ 7 8 9 ]

Matrix B:
[ 1 2 3 ]
[ 4 5 6 ]
[ 7 8 9 ]

Matrix M:
[ 30 36 42 ]
[ 66 81 96 ]
[ 102 126 150 ]
-

First, see @aix' answer regarding the array sizes. Then, the reason the multiplication doesn't work is that you are using the wrong formula. The element at i,j in the result matrix is not simply the product of i,j and j,i from the two matrices being multiplied - instead, every element in row i from the left matrix must be multiplied by the corresponding element from column j from the right matrix, and all the products must be added together. See this illustration in the Wikipedia article.

-

you have define array of 2*2 i.e. it has index of 0,1.but in your FOR loop you are trying to accept 3 i.e.{0,1,2 }elements in one row. so remove = sign from all FOR loops. or just change the declaration of your Array to [3][3].Also then apply right formula for Matrix multiplication i.e r[0][0]=(a[0][0]*b[0][0])+(a[0][1]*b[1][0])+(a[0][2]*b[2][0]). for first cell so on for other cells,in your case for 3*3 matrix.

-