SECTION-III15.Sol: So g x cos 2 sin xvanishes only
when 2 sin x is an odd multiple of
2
, i.e.2 sin xis an odd multiple of1
2, i.e. whensinx is an odd multiple of1
4. For this to
be possible,1
sin
4x or3
sin
4x . So (U)fails since1
sin
6 2
is an even and not anodd multiple of1
4. That rules out both (A)
and (C), without bothering to check anything
else.
Now the choice of the correct option is
narrowed down to (B) and (D), both of which
are about W i.e. the set of zeros of g x' .
By a direct calculation
g x' 2 sin 2 sin cos x xHence for g x' to vanish, either cosx 0 orsin2 sin x 0. The first possibility givesxas an odd multiple of
2. The second gives
2 sin xas in integral multiple of , i.e.
2sinx as an integer, which is possible onlywhen1
sin 0, , 1
2x . Hence x is an oddmultiple of
2
which is already included (in thezeros of cosx ), or xis an angle of the formk, or k 6
for some integer k. AllAllpossibilities put together show that (P) and (S)hold for W. But
3W
. So W is not an A.P..Hence (Q) is false and (R) is true. So (B) is
the only correct option.
16.Sol: Clearly, f x sin cos x 0 if and
only if cosxis an integral multiple of ,
which can happen only when cosx 0 or 1.Hence X consists of all multiples of
2. Hence
only (P_) and (Q) are correct. That rules out
the options (A) and (C). To choose between
(B) and (D), we need to identify Y, the set of
zeros of f'. Since f x' cos cos xsinx, f x' can vanish only when sinx 0or cos cos x 0. the first possibility gives
all integral multiples of . The second gives
all values of x for which cosx is an oddmultiple of
2
, i.e. cosxis an odd multiple of1
2. This is possible only when
cos^1
2
x , thatis when^2
3x k
or2
2
3x k
forsome integer k. Combined with all integral
multiples of , the set Y is now all integralmultiples of
3. These for an A.P. Hence (Q)
is true and (R) false. So withoutany further
checking, (B), if all, must be true. Still, it iseasy to verify that Y containSECTION-III15.Sol:
16.Sol:
17,18.Sol:2
,
3 3
and .
So (T) is true too.
17,18.Sol: c to d