Let I1 = and I2 = , where [x] and {x} are integral and fractional parts of x and n N - {1}. Then, I1/I2 is equal to
n
n - 1
The value of
is less than 1
is greater than 1
is less than or equal to 1
lies in the closed interval [1, e]
Solution of ( 'a' being a constant) is
, C is an arbitrary
, C is an arbitrary
, C is an arbitrary
, C is an arbitrary
Let I = , then
I = 0
I = 200
I =
I = 100
B.
I = 200
We have,
I =
=
=
=
=
=
=
=
= 200