# How do you Convert binary number 110110 to decimal?

# How do you convert decimal numbers to binary numbers?

Binary numbers start with a column with the value of 1 on the rightside. The next column, to the left, has double the value (which is2), the next left doubles again (which is 4), then 8, 16, 32, 64,128 etc. The inclusion of a number 1 in a column means that thenumber should be included in the total.… The inclusion of a zero ina column means that the number should not be counted. Using justthis combination of 1s and 0s any number can be represented. Forexample... 1 = 1 2 = 10 3 = 11 4 = 100 10 = 1010 15 = 1111 65 = 1000001 To convert the numbers from binary to decimal you can simply use acalculator and starting at the right side of the binary number ifthe first digit is 1 then add 1 to your calculator. If it is zerodon't add anything, move left to the next column, if there is a 1in this column add 2 to your total on your calculator, if it is azero don't add anything, continue doing this, doubling the valuefor each column and adding the number if there is a 1 and ignoringit if there is a zero. For example.... The binary number 1100, starting at the right has 0 in the 1column, 0 in the 2 column, 1 in the 4 column and 1 in the 8 column,so you would ignore 1 and 2 and simply add 4 + 8, giving your avalue of 12, which is correct. (MORE)

# How do you convert the decimal fraction into binary number 0.313?

If the number is less than 1/2 put a 0 in the first place tothe right of the binary point; if it is greater than or equal to1/2 (0.5) put a 1 there and subtract 1/2 from the original number._ _ 0.0 _ _0.313 remaining .
If the remainder is less than 1/4 put a 0 in the 2nd place tothe right of the bi…nary point; if it is greater than or equal to1/4 (0.25) put a 1 there and subtract 1/4 from the leftover number._ _ 0.01 _ _0.063 remaining .
If the remainder is less than 1/8 put a 0 in the 3rd place tothe right of the binary point; if it is greater than or equal to1/8 (0.125) put a 1 there and subtract 1/8 from the leftovernumber. _ _ 0.010 _ _0.063 remaining .
If the remainder is less than 1/16 (0.0625) put a 0 in the 4thplace to the right of the binary point; if it is greater than orequal to 1/16 put a 1 there and subtract 1/16 from the leftovernumber. _ _ 0.0101 _ _0.0005 remaining .
If the remainder is less than 1/32 (0.03125) put a 0 in the 5thplace to the right of the binary point; if it is greater than orequal to 1/32 put a 1 there and subtract 1/32 from the leftovernumber. _ _ 0.01010 _ _0.0005 remaining ... and so on until you have no remainder or a repeating pattern. (MORE)

# What are the rules in converting binary numbers to decimal numbers?

25 and nothing that had a decimal point well the number 369.3125 decimal. to convert to binary it worked fine the whole number 369 by justnumber by just dividing the desired base so since i wanted binary

# Coadings to convert decimal number to binary number?

Binary numbers start with a column with the value of 1 on the right side. The next column, to the left, has double the value (which is 2), the next left doubles again (which is 4), then 8, 16, 32, 64, 128 etc. The inclusion of a number 1 in a column means that the number should be included in the to…tal. The inclusion of a zero in a column means that the number should not be counted. Using just this combination of 1s and 0s any number can be represented. For example... 1 = 1 2 = 10 3 = 11 4 = 100 10 = 1010 15 = 1111 65 = 1000001 To convert the numbers from binary to decimal you can simply use a calculator and starting at the right side of the binary number if the first digit is 1 then add 1 to your calculator. If it is zero don't add anything, move left to the next column, if there is a 1 in this column add 2 to your total on your calculator, if it is a zero don't add anything, continue doing this, doubling the value for each column and adding the number if there is a 1 and ignoring it if there is a zero. For example.... The binary number 1100, starting at the right has 0 in the 1 column, 0 in the 2 column, 1 in the 4 column and 1 in the 8 column, so you would ignore 1 and 2 and simply add 4 + 8, giving your a value of 12, which is correct. (MORE)

# Algorithm to convert decimal number to binary equivalent?

In words:- All binary numbers can be found from base 10 by inserting 1 for any power of 2 and zero for any powers of two that are absent. For example:- write down the series of 2 to power n to help:- 1,2,4,8,16,32,64,128,256......... so to find 93 we have 64 + 0x32 + 16 +8 +4 + 0x2 +1 giving… 1011101 I would have to give this a bit more thought as to how to set this out as a mathematical instruction but it is easy to see the logic from the above. (MORE)

# Convert the binary number 10100111011100 to decimal number?

Starting at the right with the "ones", the value of each successive place doubles. So: 1, 2, 4, 8, 16 etc. The value of the place is either 0 x that number or 1 x that number. You figure out the value of each place and add them up. So you have: 0 x 1 =0 0 x 2 =0 1 x 4 =4 1 x 8 =8 1 x 16 …=16 0 x 32 =0 1 x 64 =64 1 x 128 =128 1 x 256 =256 0 x 512 =0 0 x 1024 =0 1 x 2048 =2048 0 x 4096 =0 1 x 8192=8192 _______+_____ 10716 (MORE)

# Convert the binary number 11110000 to decimal?

11110000 (base2) = 1 * 2^7 + 1 * 2^6 + 1 * 2^5 + 1 * 2^4 + 0 * 2^3 + 0 * 2^2 + 0 * 2^1 + 0 * 2^0 (base 10) = 2^7 + 2^6 + 2^5 + 2^4 = 128 + 64 + 32 + 16 = 240 (base 10)

# How do you Convert the binary number 10101111 to decimal?

to convert 10101111.
start from least significant digit and multiply each digit of binary number by 2^(n){where n=0,1,2,3,4.....}.
and add the number calculated. The number obtained after addition is the equivalent decimal number..
ex.- for 10101111.
1*(2^7)+0*(2^6)+1*(2^5)+0*(2^4)+1*(2^3)+1*(2^…2)+1*(2^1)+1*(2^0).
= 175 (MORE)

# Write a program to convert binary number to decimal number?

First of all we will talk about how binary number are converted back into decimal representation and later we will have program. Here is the formula of this transformation: Binary number: a 3 a 2 a 1 a 0 Decimal number a x 2 3 + a x 2 2 + a x 2 1 + a x 2 0 Example : Binary: 1101 D…ecimal: 1 x 2 3 + 1 x 2 2 + 0 x 2 1 + 1 x 2 0 = 8 + 4 + 0 + 1 = 13 And here we have our program: #include #include #include int main() { char str[100]; int ind; int sum = 0; printf("Please enter binary number: "); scanf("%s", str); for(ind = 0; ind < strlen(str); ind++) { sum += (str[ind] - 0x30) * pow(2, strlen(str) - ind - 1); } printf("Number in decimal would be %d\n", sum); return 0; } Testing : Please enter binary number: 1101 Number in decimal would be 13 Please enter binary number: 10000001 Number in decimal would be 129 Please enter binary number: 11111111 Number in decimal would be 255 Please enter binary number: 0 Number in decimal would be 0 (MORE)

# How do you convert a decimal number to a binary number?

Binary numbers start with a column with the value of 1 on the right side. The next column, to the left, has double the value (which is 2), the next left doubles again (which is 4), then 8, 16, 32, 64, 128 etc. The inclusion of a number 1 in a column means that the number should be included in the to…tal. The inclusion of a zero in a column means that the number should not be counted. Using just this combination of 1s and 0s any number can be represented. For example... 1 = 1 2 = 10 3 = 11 4 = 100 10 = 1010 15 = 1111 65 = 1000001 To convert decimals to binary numbers, a value of 1 in a digit place represents that exponential value of 2. For a four-digit binary number, these represent values of 8, 4, 2, and 1. Larger numbers will include larger values of 2. Converting decimals To convert a decimal number to a binary number, repeatedly divide by 2, rounding down in each step, remembering the remainders, until the result is zero. Write down the remainders in reverse order, and you have the binary number. Here is another easy way to do this. First make a table that represents x2 multiplier as shown. Then take number such as 194, look at the table and put a 1 under the largest number that fits into 194, which is 128. Then subtract that, so we now have 66 left, move down the line now and look at 64. This goes into 66 once so put a 1 in that column as well. Now we have only 2 left so none of the numbers in the list will work until the number 2, so put 0's in all but 2. After this the number is 0, so the rest will be zero. The binary representative for 194 is 11000010. The number 1567 is also shown for example. (1024) (512) (256) (128) (64) (32) (16) (8) (4) (2) (1) 11000010 is the value (128+64+0+0+0+2+0 = 194) 11000011111 is the value (1024+512+0+0+0+0+16+8+4+2+1 = 1567) --- Binary to Decimal To convert the numbers from binary to decimal you can simply use a calculator and starting at the right side of the binary number if the first digit is 1 then add 1 to your calculator. If it is zero don't add anything, move left to the next column, if there is a 1 in this column add 2 to your total on your calculator, if it is a zero don't add anything, continue doing this, doubling the value for each column and adding the number if there is a 1 and ignoring it if there is a zero. For example.... The binary number 1100, starting at the right has 0 in the 1 column, 0 in the 2 column, 1 in the 4 column and 1 in the 8 column, so you would ignore 1 and 2 and simply add 4 + 8, giving your a value of 12, which is correct. (MORE)

# What is the algorithm for converting binary numbers to decimal. Decimal to binary and hexadecimal to binary?

with hexidecimal you neednt use as many chartictors to represent a number. in binary 15 would be 01111 where as in hex it would be E resulting in much quicker coding times

# C program to convert decimal number into binary number?

include main() { int d,a; printf("enter the number"); scanf("%d",&a); do { d=a%2; } while(a=0); printf("binary=%d",&d); }

# Convert binary numbers into decimal numbers?

Binary numbers start with a column with the value of 1 on the right side. The next column, to the left, has double the value (which is 2), the next left doubles again (which is 4), then 8, 16, 32, 64, 128 etc. The inclusion of a number 1 in a column means that the number should be included in the to…tal. The inclusion of a zero in a column means that the number should not be counted. Using just this combination of 1s and 0s any number can be represented. For example... 1 = 1 2 = 10 3 = 11 4 = 100 10 = 1010 15 = 1111 65 = 1000001 To convert the numbers from binary to decimal you can simply use a calculator and starting at the right side of the binary number if the first digit is 1 then add 1 to your calculator. If it is zero don't add anything, move left to the next column, if there is a 1 in this column add 2 to your total on your calculator, if it is a zero don't add anything, continue doing this, doubling the value for each column and adding the number if there is a 1 and ignoring it if there is a zero. For example.... The binary number 1100, starting at the right has 0 in the 1 column, 0 in the 2 column, 1 in the 4 column and 1 in the 8 column, so you would ignore 1 and 2 and simply add 4 + 8, giving your a value of 12, which is correct. (MORE)

# Convert the decimal numbers 1987 to binary then to octal?

In binary this number is equivalent to 11111000011 .
while in octal it is 3703

# Convert binary number 11 to a decimal?

The binary number 11 represents (1 x 2) + ( 1 x 1) which equals 3.

# Convert decimal number to binary number using stack?

becomes heavy because the ang decimal number ay marami kay sa sa stack ng tsinelas

# How do you convert a binary number to a decimal number?

First, realize that instead of one's, ten's, hundred's, thousand's etc. places you find in decimal, a binary number has a one's, two's, four's, eight's, sixteen's etc. places. Start at the one's place. If there is a one here start with one. Move to the left, whenever there is a one, add the corresp…onding place value to your total until you've reached the leftmost digit. Example: Convert 1011011001 in binary to decimal: = 1 ( 1 )+ 0 ( 2 )+ 0 ( 4 )+ 1 ( 8 )+ 1 ( 16 )+ 0 ( 32 )+ 1 ( 64 )+ 1 ( 128 )+ 0 ( 256 )+ 1 ( 512 )=729 Notice the bolded digits are the same in the original from right to left. The italicized numbers are the appropriate powers of 2. Binary numbers start with a column with the value of 1 on the right side. The next column, to the left, has double the value (which is 2), the next left doubles again (which is 4), then 8, 16, 32, 64, 128 etc. The inclusion of a number 1 in a column means that the number should be included in the total. The inclusion of a zero in a column means that the number should not be counted. Using just this combination of 1s and 0s any number can be represented. For example... 1 = 1 2 = 10 3 = 11 4 = 100 10 = 1010 15 = 1111 65 = 1000001 (MORE)

# How do you Convert binary number 10000001 to decimal?

First you have to break it down into a base of 10 like so: (10000001) 2 = (1x10 7 )+(0x10 6 )+(0x10 5 )+(0x10 4 )+(0x10 3 )+(0x10 2 )+(0x10 1 )+(1x10 0 ) Next you convert the base 10 into 2 (just replacing each 10 you see above with a 2) and carry out the equation: (1x2 7 )+(0x2 6 )+…(0x2 5 )+(0x2 4 )+(0x2 3 )+(0x2 2 )+(0x2 1 )+(1x2 0 ) = (129) 10 129 should be your answer (MORE)

# Convert binary number 100110 to decimal?

42 count the zeros and use like this. 1 and 5 zeros, is 2^5 = 36 1 and 2 zeros, 4 = 40 10 is 2, so 42

# How do you convert the binary number 00001111 to a decimal number?

This is the decimal value 15. A binary number uses exponents of 2 rather than 10, and the 8 digits shown represent 128, 64, 32, 16, 8, 4, 2, and 1 00001111 (or just 1111) = 0+0+0+0+8+4+2+1 = 15 Add the values of each exponential where there is a 1 value.

# What is c program to convert decimal number to binary number?

include #include void main() { int bin[20]; int i=0,num; printf("Enter the number :"); scanf("%d",&num); while(num!=1) { bin[i]=num%2; i++; num=num/2; } bin[i]=num; for(;i>=0;i--) printf("%d",bin[i]); getch(); }

# How do you write a program that converts binary numbers to decimal numbers?

Use the following algorithm (written in pseudo-code): let string be a binary string (e.g., "10110100") let value be 1 let accumulator be 0 for all positions string.length()-1 to 0 inclusive (e.g., workbackwards through string) { if string[position] == '1' then add value to accumulator double the va…lue (e.g., left-shift value by 1 bit, or multiply by2) } end for print accumulator (e.g., prints 180) (MORE)

# How do you convert the decimal number 60 to binary?

The number 60 in binary is 111100. The digits in a binary number are exponents of 2 rather than 10, so that for a six digit number in binary, the digit places represent 32, 16, 8, 4, 2, 1 instead of increasing values of 10. 111100 = 32+16+8+4+0+0 = 60 To create a binary number, use places… for all exponent values of 2 that are less than your number. Subtract the largest digit (here 32) and see if each successive smaller digit can be subtracted. If it can, enter a 1 value and subtract again. Here, the remainder is 28, so there is a 16, leaving 12, an 8, leaving 4, and a 4, leaving 0. Write 0 values in the digit places for 2 and 1 (MORE)

# Convert the binary number 11111000 to decimal?

it depends , wether it is igned or unsigned number 2^7 +2^6 +2^5 + 2^4 + 2^3 =248 0r (-2^7) + 2^6 +2^5 + 2^4 + 2^3 = -8

# How is a binary number converted to a decimal number?

This is done in the same manner of converting a number in anynon-decimal base (not base 10) to a decimal (base 10) number: In each base system, the place value columns are the base timesbigger than the column to its right. The column before the base-point is the units or ones column. Thenext column… left is the 1 Ã base = base column, the next columnleft is the base Ã base = baseÂ² column and so on. To convert the number, sum each each digit of the base multipliedby its place value column. For base 2, the place value columns (left from just left of thebinary-point) are 1, 2, 2Â² = 4, 2Â³ = 8, 16, 32, ... As a binary number only has 1s and 0s, converting a binary numberto decimal is simply adding together the value of the place valuecolumns that have a 1. eg 101101â = 32 Ã 1 + 16 Ã 0 + 8 Ã 1 + 4 Ã 1 + 2 Ã 0 + 1 Ã 1 = 32 +8 + 4 + 1 = 45 (MORE)

# Convert 110010 binary numbers to decimals?

Just like demical numbers follow a power rule: ( 5 x 10^1)+( 0 x 10^0) = 50 Binary numbers have similar rules using 2's instead of 10's. The representation of 110010 would be ( 1 x 2^5)+( 1 x 2^4)+( 0 x 2^3)+( 0 x 2^2)+( 1 x 2^1)+( 0 x 2^0); which is 32+16+0+0+2+0=50.

# Converting decimal number system to binary number system?

this was very easy to do.but you should know how to divide a number by 2. .
Eg:- 46/2=23 -0 23/2=11 -1 11/2=5 -1 5/2=2 -1 2/2=1 -0 1/2=0 -1 Answer=101110.

# Convert binary number 111010 to decimal?

58 58 = 1 * 2^5 + 1 * 2^4 + 1 * 2^3 + 0 * 2^2 + 1 * 2^1 + 0 * 2^0

# What is the convert the decimal number 15 to binary?

Rather than tell you what the answer is, I think it better that you learn how to do this your self. By asking the question you must realize that each binary digit can have a value of one or zero. Just like with decimal numbers, the digit of lest value is on the right and has a decimal value of one. …The digit immediately to its left has a value that is twice that of it neighbor to the right and also half the value of its neighbor to the left. Here is the decimal values of 8 binary digits. [128][64][32][16][8][4][2][1] decimal value ( 8)( 7)( 6)( 5)(4)(3)(2)(1) digit place Lets convert 25 decimal into binary. The largest decimal value that can be subtracted is 16 with 3 digits to the left, write down 3 zeros as place holders for the 3 left digits. Follow by a one. 0001 25 - 16 = 9 The next binary digit to the right has a decimal value of 8 and can be subtracted from 9 so we write down another 1. 0001 1 9 - 8 = 1 Now for each binary digit that has a decimal value greater than the remainder write a zero. 00011 00 Now there is just the 1 left to deal with. Any time there is only 1 left you can just write down a 1. 0001100 1 So with that short intro to converting decimal into binary you should be dangerous enough to do your own decimal to binary conversions. (If still in doubt try, Google for an explanation that makes more sense to you). (MORE)

# Convert binary number 11111 to decimal?

31 is the correct answer. We arrive at the answer by the following process: 2 4 + 2 3 + 2 2 + 2 1 + 2 0 = 16+8+4+2+1=31 in decimal.

# How do you convert the decimal number 340 to a binary number?

The number 340 in binary is the nine-digit number 101010100. The digits in a binary number are exponents of 2 rather than 10, so that for a nine digit number in binary, the digit places represent 256, 128, 64, 32, 16, 8, 4, 2, 1 instead of increasing values of 10. 101010100 = 256+ (0x128) + …64 + (0x32) +16 + (0x8) + 4 + (0x2) + (0x1) = 340 To create a binary number, use places for all exponent values of 2 that are less than your number. Subtract the largest digit and see if each successive smaller digit can be subtracted. If it can, enter a 1 value and subtract again. When your remainder is zero, put a 0 in all the remaining digits to the right. 340 - 256 = 84 (1) no 128 (0) 84 - 64 = 20 (1) no 32 (0) 20 - 16 = 4 (1) no 8 (0) 4 - 4 = 0 (1) no 2 (0) no 1 (0) = 101010100 (MORE)

# Write the algorithm that converts binary number to decimals number?

Multiply the right-most digit by 1, the second digit from the right by 2, the next by 4, etc. and add up all the results.

# How do you convert binary number 10011110 to a decimal number?

Starting with the rightmost, multiply each binary digit by an increasing power of two, and add the results. Like this: 0 x 1 = 0 1 x 2 = 2 1 x 4 = 4 1 x 8 = 8 1 x 16 = 16 0 x 32 = 0 0 x 64 = 0 1 x 128 = 128 total = 158 ===== 158. In binary there are only 2 digits, 0 & 1. Each… digit working from right to left is a multiple of a power of 2 (starting at 0), with the power increasing by 1 as we move a digit to the left (this is the same principle as in decimal, except in decimal there are 10 digits and each digit is a multiple of a power of 10). So, in binary this number actually means (working from right to left): (0 * 2 0 ) + (1 * 2 1 ) + (1 * 2 2 ) + (1 * 2 3 ) + (1 * 2 4 ) + (0 * 2 5 ) + (0 * 2 6 ) + (1 * 2 7 ) which equals 0 + 2 + 4 + 8 + 16 + 0 + 0 + 128 which equals 158 (one hundred and fifty eight) in decimal. (MORE)

# What does binary number 1111000 convert to in decimal numbers?

11110000 2 equals 240 10 using unsigned notation. It equals -16 10 using signed notation.

# How do you convert decimal number 93 to binary?

To convert any number in any base to another base, simply iteratively divide by the second base, using the rules of arithmetic for the first base, recording the remainders in reverse order, until the quotient is zero. For example, answering the question of how to convert 93 10 to 1011101 2 ... 9…3 divided by 2 is 46 remainder 1 46 divided by 2 is 23 remainder 0 23 divided by 2 is 11 remainder 1 11 divided by 2 is 5 remainder 1 5 divided by 2 is 2 remainder 1 2 divided by 2 is 1 remainder 0 1 divided by 2 is 0 remainder 1 The answer, reading the remainders from bottom to top, is 1011101 2 . This was not a good example, because the answer is palindromic, and can be read the same way forwards and backwards. Here is another example, converting 37 10 into 100101 2 . 37 divided by 2 is 18 remainder 1 18 divided by 2 is 9 remainder 0 9 divided by 2 is 4 remainder 1 4 divided by 2 is 2 remainder 0 2 divided by 2 is 1 remainder 0 1 divided by 2 is 0 remainder 1 The answer is 100101 2 . (MORE)

# What is the binary number 11111 converted into decimal?

31 2 4 +2 3 +2 2 +2 1 +2 0 = 16+8+4+2+1 31 base 10

# What is the decimal number 36 converted into binary?

1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0, I think. * * * * * Sadly, very wrong. 36 = 32 + 4 = 1*2 5 + 0*2 4 + 0*2 3 + 1*2 2 + 0*2 1 + 0*2 0 = 100100 Yeah, never mind, I have totally forgotten binary. But, looking at your answer twigged the method, so thank you for the reminder.

# How do you convert decimal number 147 to binary?

Simply divide by two, each time recording the remainder (either 1 or 0). 147/2 = 73 r 1 73/2 = 36 r 1 36/2 = 18 r 0 18/9 = 9 r 0 9/2 = 4 r 1 4/2 = 2 r 0 2/1 = 1 r 0 1/2 = 0 r 1. Now... reading from the bottom up - the remainder digits give you the binary number. In this case... …10010011. (MORE)

# How do you convert decimal number 203 to binary?

Sequentially divide it by two, rounding down each time and recording the remainder. Read that sequence of remainders backwards, and that is your binary value. 203 / 2 = 101 R 1 101 / 2 = 50 R 1 50 / 2 = 25 R 0 25 / 2 = 12 R 1 12 / 2 = 6 R 0 6 / 2 = 3 R 0 3 / 2 = 1 R 1 1 / 2 = 0 R 1 … So 203 in decimal can be expressed as 11001011 in binary. Now we can confirm this: 1 * 128 + 1 * 64 + 0 * 32 + 0 * 16 + 1 * 8 + 0 * 4 + 1 * 2 + 1 * 1 = 128 + 64 + 8 + 2 + 1 = 203 (MORE)

# How do you convert numbers in binary to decimal form?

Converting from binary to decimal: 1. Write the binary digits in a column, least-significant bitfirst. Thus 10110100 would be written: 0 < least-significant bit 0 1 0 1 0 1 1 < most-significant bit 2. Multiply each digit by increasing powers of 2, starting with2^0: 0 x 2^0 = 0 0 x 2^1 = 0.
1 x 2…^2 = 4.
0 x 2^3 = 0.
1 x 2^4 = 16 .
0 x 2^5 = 0.
1 x 2^6 = 64.
1 x 2^7 = 128.
3. Sum the products:.
128 + 64 + 0 + 16 + 0 + 4 + 0 + 0 = 212.
Thus 10110100 binary is 212 decimal..
To reverse the process, repeatedly divide by 2 and take theremainder. Thus to convert 212 decimal to binary:.
212 / 2 = 106 r 0.
106 / 2 = 53 r 0.
53 / 2 = 26 r 1.
26 / 2 = 13 r 0.
13 / 2 = 6 r 1.
6 / 2 = 3 r 0.
3 / 2 = 1 r 1.
1 / 2 = 0 r 1.
Read the remainders in reverse order (bottom up): 11010100. (MORE)

# How do you convert fractional binary numbers in decimal?

write the binary number just below binary number digit write their place value such as 1,2,4,8,16,32,64......... starting from right to left. in case zero appears in the last position , ignore the decimal value for that position to get decimal equivalent add the remaining weights. for …example 111.101 Binary number 1 1 1 . 1 0 1 Place value of decimal position 2 2 2 1 2 0 . 2 -1 2 -2 2 -3 4 2 1 1/2 1/4 1/8 (MORE)

# How do you convert binary to decimal and decimal to binary?

Suppose abcde is a binary number. This amounts to 1e+2d+4c+8b+16a so each digit represents the next power of 2, just like in decimal 345 represents 5+4x10+3x100. To convert decimal to binary, keep dividing by 2 and writing down the remainder eg 17: divide by 2 to get 8 with remainder 1: write down 1…. Now divide the 8 by 2 to get 4, remainder 0, add that on to get 01. Divide by 2 again: 4 divided by 2 is 2, remainder 0 so you now have 001, divide the 2 by 2 and you get 1 and nothing left: result 1001. Incidentally, using the divide by ten system on 345 you construct the decimal number 345 (fortunately). Try it. (MORE)

# How do you convert Binary-to-Decimal and Decimal-to-Binary?

You can use a table to convert binary to decimal & back: .
MSB.
Binary Digit.
LSB.
2 8 .
2 7 .
2 6 .
2 5 .
2 4 .
2 3 .
2 2 .
2 1 .
2 0 .
256.
128.
64.
32.
16.
8.
4.
2.
1 .
Figure out the greatest power that will fit into the number you want to convert to binary. Move to …the next lower power of two. If you can fit into the next lower number write down a "1", if it can't put down "0". Put together the binary answer . (MORE)

# How do you convert binary number base2 to decimal base10?

Multiply the digit to the left of the "decimal" point by 2^0 = 1. Multiply the digit to the left of it by 2^1 = 2 Multiply the digit to the left of that by 2^2 = 4 and so on. Also Multiply the digit to the right of the "decimal" point by 2^(-1) = 1/2. Multiply the digit to the right of that by 2^(-2…) = 1/4 and so on. Add all these together. Example: Binary 1101.1011 1*2^3 = 1*8 = 8 1*2^2 = 1*4 = 4 0*2^1 = 0*2 =0 1*2^0 = 1*1 = 1 1*2^-1 = 1*1/2 = 0.5 0*2^-2 = 0*1/4 = 0 1*2^-3 = 1*1/8 = 0.125 1*2^-4 = 1*1/16 = 0.0625 Sum = 13.6875 (MORE)

# How do you convert negative decimal number to binary?

First forgot negative sign and convert decimal number to binary and then make it's 2's compliment. It will give you exactly binary number of that negative decimal number.

# What is the process of converting a decimal number into its binary equivalent?

Divide by the number repeatedly by two (until it is zero) and collect the remainders. For example: 13 / 2 = 6 Remainder 1 6 / 2 = 3 Remainder 0 3 / 2 = 1 Remainder 1 1 / 2 = 0 Remainder 1 Reading remainders from bottom yields: 1101

# How do you convert binary number 1100 to a decimal?

Converting binary (base 2) numbers to decimal is fairly straightforward, requiring only a series of addition operations. Keep in mind, first, the value of each digit. Remember the Powers Of Ten? In a base 10 (decimal) number, the value of each digit starts low at the right, and increases as you m…ove to each left digit: ones, tens, hundreds, thousands, and so forth. Binary numbers work the same way. However, instead of multiplying by 10 (the base or "radix"), they multiply by two: ones, twos, fours, eights, sixteens, and so forth. An 8-bit binary digit's places are assigned the following decimal values: (128) (64) (32) (16) (8) (4) (2) (1) 1100 binary would be: ( 0*128) (0*64) (0*32) (0*16) (1*8) (1*4) (0*2) (0*1) Thus it's a matter of adding up the places that have "1". So 8 plus 4 is 12. Hence, 1100 binary is 12 decimal. This works with any binary number. (MORE)

# What are the steps to convert decimal number 47 to binary number?

The places in base two (binary) are ones, twos, fours, eights,sixteens, thirty-twos and so on. There is one 32 in 47 with 15 left over. There is one 8 in 15 with7 left over. There is one 4 in 7 with 3 left over. There is one 2in 3 with 1 left over. There is one 1 in 1 with 0 left over. That leaves u…s with one 32, one 8, one 4, one 2 and one 1. 47 base 10 = 10 1111 base 2 (MORE)

# How do you convert binary number 110010 to decimal?

110010 base 2 has one 2, one 16 and one 32 32 + 16 + 2 = 50 base 10

# How do I convert Binary numbers to decimal numbers?

By adding the value of the digits. Base 10 places increase bypowers of 10. Base 2 places increase by powers of 2. 2^0 = 1 2^1 = 2 2^2 = 4 2^3 = 8 and so on. A base 2 number like 1101 would have one 1, one 4 and one 8. Thebase 10 equivalent is 13.