PAS MATEMATIKA BLOG: Latihan Soal 9 Persiapan PAS Gasal Matematika Peminatan Kelas XII (Limit dan Turunan Fungsi Trigonometri)

$\begin{array}{ll} 81. & Diketahui f (x) = \cos^{2} 2 x . Jika \\ f^{″} (x) = a \sin^{2} b x + c \cos^{2} d x, nilai untuk \\ \frac{a - b}{c - d} = . . . . \\ \begin{array}{llll} a . & \frac{5}{3} \\ b . & \frac{2}{3} \\ c . & - \frac{3}{5} \\ d . & - \frac{6}{5} \\ e . & - \frac{9}{5} \end{array} \\ Jawab : c \\ \begin{aligned} f (x) = \cos^{2} 2 x \\ f^{'} (x) = 2 \cos 2 x (- \sin 2 x) (2) \\ = - 4 \sin 2 x \cos 2 x \\ f^{″} (x) = - 4 \cos 2 x . (2) . \cos 2 x - 4 \sin 2 x . (- \sin 2 x) (2) \\ = 8 \sin^{2} 2 x - 8 \cos^{2} 2 x \\ Bandingkan dengan \\ f^{″} (x) = a \sin^{2} b x + c \cos^{2} d x \\ maka, a = 8, b = 2, c = - 8, d = 2 \\ Jadi, \frac{a - b}{c - d} = \frac{8 - 2}{- 8 - 2} = - \frac{3}{5} \end{aligned} \end{array}$

$\begin{array}{ll} 82. & Diketahui f (x) = \frac{\cos x}{\sin x + \cos x} . Jika \\ f^{″} (x) = \frac{m \cos 2 x}{{(\sin 2 x + n)}^{2}}, nilai dari \\ m . n = . . . . \\ \begin{array}{llll} a . & 2 \\ b . & 4 \\ c . & 5 \\ d . & 8 \\ e . & 10 \end{array} \\ Jawab : a \\ \begin{aligned} f (x) = \frac{\cos x}{\sin x + \cos x} \\ f^{'} (x) = \frac{- \sin x (\sin x + \cos x) - \cos x (\cos x - \sin x)}{(\sin x + \cos x)^{2}} \\ = \frac{- \sin^{2} x - \cos^{2} x + 0}{\sin^{2} + 2 \sin x \cos x + \cos^{2} x} \\ = \frac{- 1}{1 + \sin 2 x} \\ f^{″} (x) = \frac{0 - ((- 1) .2 \cos 2 x)}{{(\sin 2 x + 1)}^{2}} = \frac{2 \cos 2 x}{{(\sin 2 x + 1)}^{2}} \\ Bandingkan dengan yang diketahui \\ f^{″} (x) = \frac{m \cos 2 x}{{(\sin 2 x + n)}^{2}} \\ {\begin{cases} m & = 2 \\ n & = 2 \end{cases} \\ Jadi, m . n = 2.1 = 2 \end{aligned} \end{array}$

$\begin{array}{ll} 83. & Salah satu titik belok dari fungsi \\ f (x) = \sin 2 x dengan 0 \leq x \leq 2 π \\ adalah . . . . \\ \begin{array}{llll} a . & (\frac{π}{4}, 0) \\ b . & (\frac{π}{2}, 0) \\ c . & (\frac{π}{4}, 1) \\ d . & (\frac{π}{2}, 1) \\ e . & (π, 1) \end{array} \\ Jawab : b \\ \begin{aligned} f (x) = \sin 2 x \\ f^{'} (x) = 2 \cos 2 x \Rightarrow f^{″} (x) = - 4 \sin 2 x \\ Syarat belok f^{″} (x) = 0 \\ - 4 \sin 2 x = 0 \Leftrightarrow \sin 2 x = 0 \\ \Leftrightarrow \sin 2 x = \sin 0 \\ \Leftrightarrow 2 x = 0 + k .2 π atau 2 x = π + k .2 π \\ \Leftrightarrow x = 0 + k . π atau x = \frac{π}{2} + k . π \\ \Leftrightarrow x = 0, x = \frac{π}{2}, x = π, x = \frac{3 π}{2} atau x = 2 π \\ ∙ f (\frac{π}{2}) = \sin 2 (\frac{π}{2}) = 0 \Rightarrow (\frac{π}{2}, 0) \\ ∙ f (π) = \sin 2 (π) = 0 \Rightarrow (π, 0) \\ ∙ f (\frac{3 π}{2}) = \sin 2 (\frac{3 π}{2}) = 0 \Rightarrow (\frac{3 π}{2}, 0) \end{aligned} \end{array}$

\begin{array}{ll} 84. & Diketahui fungsi f (x) = - 3 \cos 2 x + 1 dengan \\ 0 < x < 2 π . Salah satu koordinat titik belok \\ dari fungsi f (x) tersebut . . . . \\ \begin{array}{llll} a . & (\frac{π}{2}, 2) \\ b . & (\frac{2 π}{3}, \frac{5}{2}) \\ c . & (\frac{3 π}{2}, 4) \\ d . & (\frac{5 π}{4}, 1) \\ e . & (\frac{5 π}{3}, \frac{5}{2}) \end{array} \\ Jawab : d \\ \begin{aligned} f (x) = - 3 \cos 2 x + 1 untuk 0 < x < 2 π \\ f^{'} (x) = 6 \sin 2 x \Rightarrow f^{″} (x) = 12 \cos 2 x \\ Syarat belok f^{″} (x) = 0 \\ 12 \cos 2 x = 0 \Leftrightarrow \cos 2 x = 0 \\ \Leftrightarrow \cos 2 x = \cos \frac{π}{2} \\ \Leftrightarrow 2 x = \pm \frac{π}{2} + k .2 π \Leftrightarrow x = \pm \frac{π}{4} + k . π \\ \Leftrightarrow x = \frac{π}{4}, x = \frac{3 π}{4}, x = \frac{5 π}{4} atau x = \frac{7 π}{4} \\ ∙ f (\frac{π}{4}) = - 3 \cos 2 (\frac{π}{4}) + 1 = 1 \Rightarrow (\frac{π}{4}, 1) \\ ∙ f (\frac{3 π}{4}) = - 3 \cos 2 (\frac{3 π}{4}) + 1 = 1 \Rightarrow (\frac{3 π}{4}, 1) \\ ∙ f (\frac{5 π}{4}) = - 3 \cos 2 (\frac{5 π}{4}) + 1 = 1 \Rightarrow (\frac{5 π}{4}, 1) \\ ∙ f (\frac{7 π}{4}) = - 3 \cos 2 (\frac{7 π}{4}) + 1 = 1 \Rightarrow (\frac{7 π}{4}, 1) \end{aligned} \end{array}

\begin{array}{ll} 85. & Diketahui fungsi f (x) = \sin^{2} x + 2 dengan \\ 0 < x < 2 π . Salah satu koordinat titik belok \\ dari fungsi f (x) tersebut . . . . \\ \begin{array}{llll} a . & (\frac{π}{4}, \frac{5}{2}) \\ b . & (\frac{π}{3}, \frac{11}{4}) \\ c . & (π, 2) \\ d . & (\frac{4 π}{3}, \frac{11}{4}) \\ e . & (\frac{11 π}{6}, \frac{9}{4}) \end{array} \\ Jawab : a \\ \begin{aligned} f (x) = \sin^{2} x + 2 untuk 0 < x < 2 π \\ f^{'} (x) = 2 \sin x \cos x \Rightarrow f^{'} (x) = \sin 2 x \\ f^{″} (x) = 2 \cos 2 x \\ Syarat belok f^{″} (x) = 0 \\ 2 \cos 2 x = 0 \Leftrightarrow \cos 2 x = 0 \\ \Leftrightarrow \cos 2 x = \cos \frac{π}{2} \\ \Leftrightarrow 2 x = \pm \frac{π}{2} + k .2 π \Leftrightarrow x = \pm \frac{π}{4} + k . π \\ \Leftrightarrow x = \frac{π}{4}, x = \frac{3 π}{4}, x = \frac{5 π}{4} atau x = \frac{7 π}{4} \\ ∙ f (\frac{π}{4}) = \sin^{2} (\frac{π}{4}) + 2 = \frac{5}{2} \Rightarrow (\frac{π}{4}, \frac{5}{2}) \\ ∙ f (\frac{3 π}{4}) = \sin^{2} (\frac{3 π}{4}) + 2 = \frac{5}{2} \Rightarrow (\frac{3 π}{4}, \frac{5}{2}) \\ ∙ f (\frac{5 π}{4}) = \sin^{2} (\frac{5 π}{4}) + 2 = \frac{5}{2} \Rightarrow (\frac{5 π}{4}, \frac{5}{2}) \\ ∙ f (\frac{7 π}{4}) = \sin^{2} (\frac{7 π}{4}) + 2 = \frac{5}{2} \Rightarrow (\frac{7 π}{4}, \frac{5}{2}) \end{aligned} \end{array}

$\begin{array}{ll} 86. & Diketahui fungsi f (x) = \frac{1}{2} \sin 2 x dengan \\ 0^{\circ} < x < 360^{\circ} . Kurva akan cekung \\ ke atas pada interval . . . . \\ \begin{array}{llll} a . & 0^{\circ} < x < 90^{\circ} \\ b . & 0^{\circ} < x < 90^{\circ} atau 180^{\circ} < x < 270^{\circ} \\ c . & 45^{\circ} < x < 225^{\circ} \\ d . & 90^{\circ} < x < 180^{\circ} atau 270^{\circ} < x < 360^{\circ} \\ e . & 180^{\circ} < x < 225^{\circ} atau 225^{\circ} < x < 360^{\circ} \end{array} \\ Jawab : d \\ \begin{aligned} f (x) = \frac{1}{2} \sin 2 x \\ f^{'} (x) = \cos 2 x \Rightarrow f^{″} (x) = - 2 \sin 2 x \\ Syarat belok f^{″} (x) = 0 \\ - 2 \sin 2 x = 0 \Leftrightarrow \sin 2 x = 0 \\ \Leftrightarrow \sin 2 x = \sin 0^{\circ} \\ \Leftrightarrow 2 x = 0^{\circ} + k {.360}^{\circ} atau 2 x = 180^{\circ} + k {.360}^{\circ} \\ \Leftrightarrow x = 0^{\circ} + k {.180}^{\circ} atau x = 90^{\circ} + k {.180}^{\circ} \\ \Leftrightarrow x = 0^{\circ}, x = 90^{\circ}, x = 180^{\circ} dan x = 270^{\circ} \\ serta x = 360^{\circ} \\ ∙ Selang 0^{\circ} < x < 90^{\circ}, misal x = 45^{\circ} \\ \Rightarrow\Rightarrow f^{″} = - 2 \sin 2 (45^{\circ}) = - 2 < 0 \\ pada selang ini kurva cekung ke bawah \\ ∙ Selang 90^{\circ} < x < 180^{\circ}, misal x = 135^{\circ} \\ \Rightarrow\Rightarrow f^{″} = - 2 \sin 2 (135^{\circ}) = 2 > 0 \\ pada selang ini kurva cekung ke atas \\ ∙ Selang 180^{\circ} < x < 270^{\circ}, misal x = 225^{\circ} \\ \Rightarrow\Rightarrow f^{″} = - 2 \sin 2 (225^{\circ}) = - 2 < 0 \\ pada selang ini kurva cekung ke bawah \\ ∙ Selang 270^{\circ} < x < 360^{\circ}, misal x = 315^{\circ} \\ \Rightarrow\Rightarrow f^{″} = - 2 \sin 2 (315^{\circ}) = 2 > 0 \\ pada selang ini kurva cekung ke atas \end{aligned} \end{array}$