# Cache Addressing: Length of Index, Block offset, Byte offset & Tag?

Let's say I know the following values:

``````W = Word length (= 32 bits)
S = Cache size in words
B = Block size in words
M = Main memory size in words
``````

How do I calculate how many bits are needed for:

``````- Index
- Block offset
- Byte offset
- Tag
``````

a) in Direct Mapped Cache b) in Fully Associative Cache?

The address may be split up into the following parts:

``````[ tag | index | block or line offset | byte offset ]
``````

## Number of block or line offset bits

log2(words per line)

## Number of index bits

log2(CS), where CS is the number of cache sets.

• For Fully Associative, CS is 1. Since log2(1) is 0, there are no index bits.
• For Direct Mapped, CS is equal to CL, the number of cache lines, so the number of index bits is log2(CS) === log2(CL).
• For n-way Associative CS = CL ÷ n: log2(CL ÷ n) index bits.

How many cache lines you have got can be calculated by dividing the cache size by the block size = S/B (assuming they both do not include the size for tag and valid bits).

## Number of tag bits

Length of address minus number of bits used for offset(s) and index. The Length of the the addresses can be calculated using the size of the main memory, as e.g. any byte needs to be addressed, if it's a byte addressable memory.