The present study’s intention is to produce exact estimations of some problems involving logarithmic coefficients for functions belonging to the considered subcollection
B
T
sin
of the bounded turning class. Furthermore, for the class
B
T
sin
, we look into the accurate bounds of the Zalcman inequality, Fekete-Szegö inequality along with
D
2
,
1
G
g
/
2
and
D
2
,
2
G
g
/
2
. Importantly, all of these bounds are shown to be sharp.