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1.
Let 
and 
be two functions such that 
is one-one and is onto. Then, is
and be two functions such that is one-one and is onto. Then, is
2.
Let 
and 
for 
is equal to
and for is equal to
3.
If the function 
be such that 
where 
denotes the greatest integer less than or equal to 
then 
is
be such that where denotes the greatest integer less than or equal to then is
4.
Let 
and 
be two integers such that 
and 
. The integer 
such that 
is
and be two integers such that and . The integer such that is
5.
The unction 
defined by 
is
defined by is
6.
Let 
be a function defined by 
Then, 
is
be a function defined by Then, is
7.
If 
where 
and 
then 
is equal to
where and then is equal to
8.
The domain of definition of 
is
is
9.
Let 
be two functions given by 
Then, 
is equal to
be two functions given by Then, is equal to
10.
If is defined by 
, then
is defined by , then