Square is the product of a number multiplied with that number itself.square of a number is its second power . 1 multiplied 1 = 1 raised 2 = 1 , 2 multiplied 2 = 2raised2=4 , 3 multiplied 3 =3raised2 =9 , 4 multiplied4 =4raised2 = 16 .

Find the other 96 digit in this way?

Sounds like a waste of time. It does not sound like geometry.

For each integer N, the square is N x N = N^2

96^2 = 9216

To find the other 96-digit number using the same pattern, we need to continue squaring consecutive numbers until we reach the desired length. However, it is important to note that a number cannot have more than 19 digits in its squared form, so we need to split it into several parts.

Let's break down the process step by step:

1. Start by squaring the number that corresponds to the desired digit position. In this case, we want to find the 96th digit, so we would be looking for the square of a 10-digit number.

2. Take that squared number and convert it to a string in order to count the number of digits it contains. If the squared number has fewer than 96 digits, we will need to square a larger starting number.

3. Keep repeating steps 1 and 2 until we have a squared number with at least 96 digits.

Let's illustrate this process with an example:

1. Start with a number like 1000000000 (consisting of 10 zeros), which will give us a squared number with 20 digits.

2. Square 1000000000: 1000000000^2 = 1000000000000000000. In this case, we have reached a 20-digit number.

3. Since we need a 96-digit number, we will need to square a larger starting number. Let's try a number like 1000000000000000000 (consisting of 19 zeros).

4. Square 1000000000000000000: 1000000000000000000^2 = 10000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000. This squared number contains 98 digits.

5. Finally, in order to find the 96th digit, we count from the right-hand side of the squared number. In this case, the 96th digit would be 9.

Therefore, the 96th digit of the number obtained by squaring a 19-digit number (e.g., 1000000000000000000) is 9.