In determining the decimal value of a specific index in a word, generalized for all bases:

```
b^i*n
```

where b is the base, i is the index in the word, and n is the numeric value at the index. Remember this by remembering that b,i,n = bin = short for binary.

## Examples:

for base2 (binary) **1**000, getting the value where the 1 is located:

b = base, ie base2: **b=2**

i = 0-based index within word, ie 1000, 1 is in 3th index, **i=3**

n = number listed in index, ie 1000, 3th index is 1, **n=1**

so, 2^3*1 = 8

for base10 (decimal) **9**00, getting the value where the 9 is located:

b=10, i=2, n=9 : 10^2*9 = 100*9 =900

for base16 (hexadecimal) 0x0**f**0, getting the value where the f is located:

b=16, i=1, n=15 (0-9,a-f,f=15) : 16^1*15 = 16*15 = 240

Note that this can be used to determine the value of each index in a word, then each value can be summed to determine the full word value.

e.g. 1001, from left to right (order doesn't matter in summation):

(2^3*1=8) + (2^2*0=0) + (2^1*0=0) + (2^0*1=1) = 9