Yes - your calculation is correct. On your machine,
sizeof(int) == 4, and
int must be 4-byte aligned.
You can find out about the padding by manually adding the sizes of the base elements and subtracting that from the size reported by sizeof(). You can predict the padding if you know the alignment requirements on your machine. Note that some machines are quite fussy and give SIGBUS errors when you access misaligned data; others are more lax but slow you down when you access misaligned data (and they might support '
#pragma packed' or something similar). Often, a basic type has a size that is a power of 2 (1, 2, 4, 8, 16) and an n-byte type like that must be n-byte aligned. Also, remember that structures have to be padded so that an array of structures will leave all elements properly aligned. That means the structure will normally be padded up to a multiple of the size of the most stringently aligned member in the structure.
Generally, a variant on the first is better; it remains correct when you change the base type of the array from a 'foo' to a 'foobar'. The macro I customarily use is:
#define DIM(x) (sizeof(x)/sizeof(*(x)))
Other people have other names for the same basic operation - and you can put the name I use down to pollution from the dim and distant past and some use of BASIC.
As usual, there are caveats. Most notably, you can't apply this meaningfully to array arguments to a function or to a dynamically allocated array (using
malloc() et al or
new); you have apply to the actual definition of an array. Normally the value is a compile-time constant. Under C99, it could be evaluated at runtime if the array is a VLA - variable-length array.
Because of the way initialization works when you don't have enough braces. Your 'foo' structure must have two elements. The 10 and the 20 are allocated to the first row; the 30 and an implicit 0 are supplied to the second row. Hence the size is two. When you supply the sub-braces, then there are 3 elements in the array, the first components of which have the values 10, 20, 30 and the second components all have zeroes.