I must say I have never had cause to use bitwise operators, but I am sure there are some operations that I have performed that would have been more efficiently done with them. How have "shifting" and "ORing" helped you solve a problem more efficiently?
See the famous Bit Twiddling Hacks But there are a bunch of, 'check/set/toggle bit N' type hacks that are very useful if you work with hardware or communications protocols. 


Using bitwise operations on strings (characters)Convert letter to lowercase:
Convert letter to uppercase:
Invert letter's case:
Letter's position in alphabet:
Get letter's position in alphabet (for Uppercase letters only):
Get letter's position in alphabet (for lowercase letters only):
Note: using anything other than the english letters will produce garbage results 


There's only three that I've ever used with any frequency:



Get the maximum integer
Get the minimum integer
Get the maximum long
Multiplied by 2
Divided by 2
Multiplied by the mth power of 2
Divided by the mth power of 2
Check odd number
Exchange two values
Get absolute value
Get the max of two values
Get the min of two values
Check whether both have the same sign
Calculate 2^n
Whether is factorial of 2
Modulo 2^n against m
Get the average
Get the mth bit of n (from low to high)
Set the mth bit of n to 0 (from low to high)
n + 1
n  1
Get the contrast number
if (x==a) x=b; if (x==b) x=a;



I have not read the book (yet), but I have been told that the Book Hacker's Delight shows a number of tricks in working with bits. 


You can compress data, e.g. a collection of integers:



Counting set bits, finding lowest/highest set bit, finding nthfromtop/bottom set bit and others can be useful, and it's worth looking at the bittwiddling hacks site. That said, this kind of thing isn't daytoday important. Useful to have a library, but even then the most common uses are indirect (e.g. using a bitset container). Also, ideally, these would be standard library functions  a lot of them are better handled using specialise CPU instructions on some platforms. 


Matters Computational: Ideas, Algorithms, Source Code, by Jorg Arndt (PDF). This book contains tons of stuff, I found it via a link at http://www.hackersdelight.org/



1) Divide/Multiply by a power of 2
2) Swap



While multiplying/dividing by shifting seems nifty, the only thing I needed once in a while was compressing booleans into bits. For that you need bitwise AND/OR, and probably bit shifting/inversion. 


I wanted a function to round numbers to the next highest power of two, so I visited the Bit Twiddling website that's been brought up several times and came up with this:
I use it on a 


I used bitwise operators to efficiently implement distance calculations for bitstrings. In my application bitstrings were used to represent positions in a discretised space (an octree, if you're interested, encoded with Morton ordering). The distance calculations were needed to know whether points on the grid fell within a particular radius. 

