Convert 212 from decimal to binary
(base 2) notation:
Power Test
Raise our base of 2 to a power
Start at 0 and increasing by 1 until it is >= 212
20 = 1
21 = 2
22 = 4
23 = 8
24 = 16
25 = 32
26 = 64
27 = 128
28 = 256 <--- Stop: This is greater than 212
Since 256 is greater than 212, we use 1 power less as our starting point which equals 7
Build binary notation
Work backwards from a power of 7
We start with a total sum of 0:
27 = 128
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 128 = 128
Add our new value to our running total, we get:
0 + 128 = 128
This is <= 212, so we assign our outside coefficient of 1 for this digit.
Our new sum becomes 128
Our binary notation is now equal to 1
26 = 64
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 64 = 64
Add our new value to our running total, we get:
128 + 64 = 192
This is <= 212, so we assign our outside coefficient of 1 for this digit.
Our new sum becomes 192
Our binary notation is now equal to 11
25 = 32
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 32 = 32
Add our new value to our running total, we get:
192 + 32 = 224
This is > 212, so we assign a 0 for this digit.
Our total sum remains the same at 192
Our binary notation is now equal to 110
24 = 16
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 16 = 16
Add our new value to our running total, we get:
192 + 16 = 208
This is <= 212, so we assign our outside coefficient of 1 for this digit.
Our new sum becomes 208
Our binary notation is now equal to 1101
23 = 8
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 8 = 8
Add our new value to our running total, we get:
208 + 8 = 216
This is > 212, so we assign a 0 for this digit.
Our total sum remains the same at 208
Our binary notation is now equal to 11010
22 = 4
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 4 = 4
Add our new value to our running total, we get:
208 + 4 = 212
This = 212, so we assign our outside coefficient of 1 for this digit.
Our new sum becomes 212
Our binary notation is now equal to 110101
21 = 2
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 2 = 2
Add our new value to our running total, we get:
212 + 2 = 214
This is > 212, so we assign a 0 for this digit.
Our total sum remains the same at 212
Our binary notation is now equal to 1101010
20 = 1
The highest coefficient less than 1 we can multiply this by to stay under 212 is 1
Multiplying this coefficient by our original value, we get: 1 * 1 = 1
Add our new value to our running total, we get:
212 + 1 = 213
This is > 212, so we assign a 0 for this digit.
Our total sum remains the same at 212
Our binary notation is now equal to 11010100
