10.0 is the only of those numbers to be after 0.9.
0.9,1,1.1,1.2
It is: 1/1000 = .001 or 0.001
100
55. 101 in binary is 5. there is a shortcut in getting the equivalent in binary. 421 if it is 1, then it's 001. if it is 2, then it's 010. if it is 3, then it's 011. if it is 4, then it's 100. if it is 5, then it's 101. see? you just have to add the numbers that you need. you'll write 1 when you used the number that is needed and 0 when not.
100000 - 1 = 99999
1/10
After the Webmineral site the cleavage is: {100} Perfect, {010} Perfect, {001} Perfect.
To convert a binary number to an octal number, you need to know how an octal number is represented in binary. It is like this: 0 = 000 4 = 100 1 = 001 5 = 101 2 = 010 6 = 110 3 = 011 7 = 111 As you can see, an octal number consists of 3 'bits' (either a 0 of a 1). Now, to convert a binary number to an octal number, you first have to group the binary digits into groups of 3 bits (starting from the right). Then, you convert every group of bits into octal numbers. This way you get your binary number into an octal one. For example: (1010100111010010)2 We group them into groups of 3 bits, starting from the right. 1 010 100 111 010 010 As you see, we have a single digit left. We must add 0's to make it a group of 3 bits. 001 010 100 111 010 010 Then we convert every group into an octal number, according to the table above. 001 = 1 010 = 2 100 = 4 111 = 7 010 = 2 010 = 2 And in this way, you converted a binary number into an octal one. (1010100111010010)2 = (124722)8
No, but it can be multiplied: The new matrix is 3x3. EG: 100100 100 200 010010 x 010 = 020 001001 001 002 100 010 001
it has cubic cleavage, means perfect in {100}, {010}, {001} planes.
The cleavage of sodium chloride crystals is {100} Perfect, {010} Perfect, {001} Perfect.
001
.001
101 is the smallest 3 digit Prime number.
input: 76543210(8) output: 111 110 101 100 011 010 001 000(2)
100 001
100billion and one of course or numerically speaking: 100, 000, 000, 001
Convert every octal digit into three binary digit: 0->000 1->001 2->010 3->011 4->100 5->101 6->110 7->111