“…Remark 3 (i) If we consider λ � 0 in (52), then eorem 3.4 in [32] can be obtained (ii) If we consider ϕ(t) � t α and g(x) � x in (52), then eorem 6 in [31] can be obtained (iii) If we consider s � m � 1 in the result of (ii), then Corollary 13 in [31] can be obtained (iv) If we consider α � β in the result of (ii), then Corollary 11 in [31] can be obtained (v) If we consider (s, m) � (1, 1) in (52), then eorem 3 in [33] is obtained (vi) If we consider λ � 0 and (s, m) � (1, 1) in (52), then eorem 25 in [23] is obtained (vii) If we consider λ � 0 and p � ω � 0 in (52), then eorem 2 in [34] is obtained (viii) If we consider λ � 0, ϕ(t) � Γ(α)t α+1 , p � ω � 0, and (s, m) � (1, 1) in (52), then eorem 2 in [35] is obtained (ix) If we consider α � β in the result of (viii), then Corollary 2 in [35] is obtained (x) If we consider λ � 0, ϕ(t) � t α , g(x) � x, and m � 1 in (52), then eorem 2.3 in [36] is obtained (xi) If we consider α � β in the result of (x), then Corollary 2.5 in [36] is obtained (xii) If we consider λ � 0, ϕ(t) � Γ(α)t α/k+1 , (s, m) � (1, 1), g(x) � x, and p � ω � 0 in (52), then eorem 2 in [37] can be obtained (xiii) If we consider α � β in the result of (xii), then Corollary 4 in [37] can be obtained (xiv) If we consider α � β � k � 1 and x � ((a + b)/2) in the result of (xii), then Corollary 5 in [37] can be obtained (xv) If we consider λ � 0, ϕ(t) � Γ(α)t α+1 , g(x) � x, p � ω � 0, and (s, m) � (1, 1) in ( 52), then eorem 2 in [38] is obtained (xvi) If we consider α � β in the result of (xv), then Corollary 5 in [38] can be obtained…”