What are total number of possible matrices of order 3 3 with each entry 0 or 1or 2?

So, the correct answer is “512”.

What is the total number of possible matrices of order 2 3 with each entry 0 or 1?

The total number of possible matrices of order 2 × 3 with each entry 1 or 0 is 64.

What is the number of possible matrices of order 2×3 with each entry 0 1 or 2?

So,12 matrices are possible of order 2×3 and each entry with 1 or 2.

What is the number of all possible 3 * 3 matrices with entries 0 or 1?

A matrix of order 3 x 3 has 9 elements. Now each element can be 0 or 1. =512 , ∴ (D) is correct answer.

How many 3 * 3 matrices M with entries from 0 1 2 are there?

Hence, the total number of combinations ( i.e. total number of matrices with entries from {0, 1 and 2} for which the sum of diagonal entries of \[{{M}^{T}}M\]is 5) is 126+72 = 198.

How many diagonals does a 3 3 matrix have?

5.4. 2.1 Integer approximation of DCT-II matrix

What is the total number of possible matrices of order 2×3?

Each element can be replaced with either 1 or 0. Thus, there are two ways of filling each of the four spaces. Thus the total number of such matrices will be 2×2×2×2 = 2⁴ matrices. Therefore, the number of possible matrix of 2×2 order with each entry as 0 or 1 is equal to 16.

What is the number of all possible matrices of order 2×2?

81 matrices of order 2 x 2 are possible with each entry 1, 2 or 3.

How many possible matrices are there?

Also, in the question, it is given that at every place, the matrix can have either 0 or 1. So, using formula (2), the number of possible matrices is equal to ${{2}^{6}}=64$. Hence, the answer is 64.

What is the number of all possible matrices of order 2 2 with each entry 0 or 1?

Thus, total number of 2 × 2 matrices with each entry 0 or 1 is 16.