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Matematika Dasar Turunan Fungsi (: Soal Dari Berbagai Sumber :)

Written By Nick Thursday, November 1, 2018 Edit

limit fungsi trigonometriAturan Turunan Fungsi

$\dfrac{d}{dx}[c]=0$

$\dfrac{d}{dx}[x]=1$

$\dfrac{d}{dx}[cx^{n}]=cnx^{n-1}$

$\dfrac{d}{dx}[cu]=cu'$

$\dfrac{d}{dx}[u \pm v]=u' \pm v'$

$\dfrac{d}{dx}[u v]=u'v+uv'$

$\dfrac{d}{dx}[\dfrac{u}{v}]=\dfrac{u'v-uv'}{v^{2}}$

$\dfrac{d}{dx}[u^{n}]=nu^{n-1}u'$

$\dfrac{d}{dx}[\left |u \right |]=\dfrac{u}{\left |u \right |}(u'),\ u\neq 0 $

$\dfrac{d}{dx}[ln\ u]=\dfrac{u'}{u}$

$\dfrac{d}{dx}[e^{u}]=u'e^{u}$

$\dfrac{d}{dx}[log_{a}u]=\dfrac{u'}{(ln\ a)u}$

$\dfrac{d}{dx}[a^{u}]=a^{u}u'(ln\ a)$

$\dfrac{d}{dx}[sin\ u]=u'(cos\ u)$

$\dfrac{d}{dx}[cos\ u]=-u'(sin\ u)$

$\dfrac{d}{dx}[tan\ u]=u'(sec^{2}\ u)$

$\dfrac{d}{dx}[cot\ u]=-u'(csc^2\ u)$

$\dfrac{d}{dx}[sec\ u]=u'(sec\ u\ tan\ u)$

$\dfrac{d}{dx}[csc\ u]=-u'(csc\ u\ cot\ u)$

$\dfrac{d}{dx}[arcsin\ u]=\dfrac{u'}{\sqrt{1-u^{2}}}$

$\dfrac{d}{dx}[arccos\ u]=\dfrac{-u'}{\sqrt{1-u^{2}}}$

$\dfrac{d}{dx}[arctan\ u]=\dfrac{u'}{1+u^{2}}$

$\dfrac{d}{dx}[arccot\ u]=\dfrac{-u'}{1+u^{2}}$

$\dfrac{d}{dx}[arcsec\ u]=\dfrac{u'}{|u| \sqrt{u^{2}-1}}$

$\dfrac{d}{dx}[arccsc\ u]=\dfrac{-u'}{|u| \sqrt{u^{2}-1}}$

$\dfrac{d}{dx}[sinh\ u]=u'(cosh\ u)$

$\dfrac{d}{dx}[cosh\ u]=-u'(sinh\ u)$

$\dfrac{d}{dx}[tanh\ u]=u'(sech^{2}\ u)$

$\dfrac{d}{dx}[coth\ u]=-u'(csch^2\ u)$

$\dfrac{d}{dx}[sech\ u]=-u'(sech\ u\ tanh\ u)$

$\dfrac{d}{dx}[csch\ u]=-u'(csch\ u\ coth\ u)$

$\dfrac{d}{dx}[sinh^{-1}\ u]=\dfrac{u'}{\sqrt{u^{2}+1}}$

$\dfrac{d}{dx}[cosh^{-1}\ u]=\dfrac{u'}{\sqrt{u^{2}-1}}$

$\dfrac{d}{dx}[tanh^{-1}\ u]=\dfrac{u'}{1-u^{2}}$

$\dfrac{d}{dx}[coth^{-1}\ u]=\dfrac{u'}{1-u^{2}}$

$\dfrac{d}{dx}[sech^{-1}\ u]=\dfrac{-u'}{u\sqrt{1-u^{2}}}$

$\dfrac{d}{dx}[csch^{-1}\ u]=\dfrac{-u'}{|u| \sqrt{1+u^{2}}}$

Menentukan Gradien Garis Singgung KurvaFungsi Naik dan Fungsi Turun

Jika $f'(x) \gt 0$ maka fungsi $y=f(x)$ naik atau sebaliknya jika $y=f(x)$ naik maka $f'(x) \gt 0$

Jika $f'(x) \lt 0$ maka fungsi $y=f(x)$ turun atau sebaliknya jika $y=f(x)$ turun maka $f'(x) \lt 0$

1. Soal SBMPTN 2018 Kode 526 (: Soal Lengkap :)Diketahui $f(x)=ax^{2}+2x+4$ dan $g(x)=x^{2}+ax-2$. Jika $h(x)=\dfrac{f(x)}{g(x)}$ dengan $h'(0)=1$, maka nilai $a$ adalah...
$\begin{align}
(A)\ & 2 \\
(B)\ & \dfrac{1}{2} \\
(C)\ & 0 \\
(D)\ & \dfrac{1}{2} \\
(E)\ & -2
\end{align}$Alternatif Pembahasan: show

Pada soal diketahui $h(x)=\dfrac{f(x)}{g(x)}$ dan $h'(0)=1$ maka kita perlu $h'(x)$
untuk $f(x)=ax^{2}+2x+4$ maka $f(0)=4$
$f'(x)=2ax+2$ maka $f'(0)=2$
untuk $g(x)=x^{2}+ax-2$ maka $g(0)=-2$
$g'(x)=2x+a$ maka $g'(0)=a$

$\begin{align}
h(x) & = \dfrac{f(x)}{g(x)} \\
h'(x) & = \dfrac{f'(x) \cdot g(x) - f(x) \cdot g'(x)}{g^{2}(x)} \\
h'(0) & = \dfrac{f'(0) \cdot g(0) - f(0) \cdot g'(0)}{g^{2}(0)} \\
1 & = \dfrac{(2) \cdot (-2) - (0) \cdot (a)}{(-2)^{2}} \\
1 & = \dfrac{-4 - 4a}{4} \\
4 & = -4 - 4a \\
8 & = - 4a \\
a & = \dfrac {8}{-4} = -2
\end{align}$

$\therefore$ Pilihan yang sesuai $(E)\ -2$

2. Soal SBMPTN 2018 Kode 527 (: Soal Lengkap :)Diketahui $f(x)=ax^{2}-4x+1$ dan $g(x)=3x^{2}+ax+2$. Jika $h(x)=f(x)+g(x)$ dan $k(x)=f(x)g(x)$ dengan $h'(0)=-3$, maka nilai $k'(0)$ adalah...
$\begin{align}
(A)\ & -7 \\
(B)\ & -4 \\
(C)\ & -3 \\
(D)\ & 0 \\
(E)\ & 2
\end{align}$Alternatif Pembahasan: show

Pada soal diketahui $h(x)=f(x)+g(x)$ dan $h'(0)=-3$ maka kita perlu $h'(x)$
untuk $f(x)=ax^{2}-4x+1$ maka $f(0)=1$
$f'(x)=2ax-4$ maka $f'(0)=-4$
untuk $g(x)=3x^{2}+ax+2$ maka $g(0)=2$
$g'(x)=6x+a$ maka $g'(0)=a$

$\begin{align}
h(x) & = f(x)+g(x) \\
h'(x) & = f'(x)+g'(x) \\
h'(0) & = f'(0)+g'(0) \\
-3 & = -4+a \\
a & = -3+4=1
\end{align}$

$\begin{align}
k(x) & = f(x)g(x) \\
k'(x) & = f'(x)g(x)+f(x)g'(x) \\
k'(0) & = f'(0)g(0)+f(0)g'(0) \\
& = (-4)(2)+(1)(1) \\
& = -4+1=-3 \\
\end{align}$

$\therefore$ Pilihan yang sesuai $(C)\ -3$

3. Soal SBMPTN 2017 Kode 106 (: Soal Lengkap :)Jika $f(x)=sin(sin^{2}x)$, maka $f'(x)=\ldots$
$(A)\ 2\ sin\ x \cdot cos(sin^{2}x)$
$(B)\ 2\ sin\ 2x \cdot cos(sin^{2}x)$
$(C)\ sin^{2}x \cdot cos(sin^{2}x)$
$(D)\ sin^{2}2x \cdot cos(sin^{2}x)$
$(E)\ sin\ 2x \cdot cos(sin^{2}x)$Alternatif Pembahasan: show

Untuk mendapatkan turunan pertama dari fungsi diatas kita coba gunakan aturan rantai, yaitu:
$f'(x) = \dfrac{df}{dx} = \dfrac{df}{dv} \cdot \dfrac{dv}{du}\cdot \dfrac{du}{dx}$

Soal:$f(x)=sin(sin^{2}x)$
Misal $u=sin\ x$
$\Rightarrow \dfrac{du}{dx}=cos\ x$

Soal:$f(x)=sin(u^{2})$
Misal $v=u^{2}$
$\Rightarrow \dfrac{dv}{du}=2u$

Soal:$f(x)=sin(v)$
$\Rightarrow \dfrac{df}{dv}=cos(v)$
$\begin{split}
f'(x) & = \dfrac{df}{dx} = \dfrac{df}{dv} \cdot \dfrac{dv}{du}\cdot \dfrac{du}{dx}\\
& =cos(v) \cdot 2u \cdot cos\ x\\
& =cos(u^{2}) \cdot 2(sin\ x) \cdot cos\ x\\
& =cos(sin^{2}x) \cdot 2(sin\ x) \cdot cos\ x\\
& =cos(sin^{2}x) \cdot sin\ 2x\\
& = sin\ 2x \cdot cos(sin^{2}x)
\end{split}$

$\therefore$ Pilihan yang sesuai adalah $(E).\ sin\ 2x \cdot cos(sin^{2}x)$

4. Soal UNBK Matematika IPA 2018 (: Soal Lengkap :)Diketahui $g(x)=3-x$ dengan $f(x)=6x^{2}+3x-9$. Jika $h(x)=f(x) \cdot g(x)$, turunan pertama dari $h(x)$ adalah $h'(x)=\cdots$
$(A)\ -6x^{2}+36x$
$(B)\ -6x^{2}+36x+18$
$(C)\ -18x^{2}+30x+18$
$(D)\ 18x^{2}+30x+18$
$(E)\ 18x^{2}-30x-18$Alternatif Pembahasan: show

Turunan pertama dari $h(x)=f(x) \cdot g(x)$ adalah:
$ \begin{align}
h(x) & = f(x) \cdot g(x) \\
h'(x) & = f'(x) \cdot g(x)+f(x) \cdot g'(x) \\
& =(12x+3)(3-x)+(6x^{2}+3x-9)(-1) \\
& =36x+9-12x^{2}-3x-6x^{2}-3x+9 \\
& =-18x^{2}+30x+18
\end{align} $

$\therefore$ Pilihan yang sesuai adalah $(C).\ -18x^{2}+30x+18$

5. Soal UNBK Matematika IPA 2018 (: Soal Lengkap :)14. Fungsi $f(x)=x^{3}+3x^{2}-9x-7$ turun pada interval...
$(A)\ 1 \lt x \lt 3$
$(B)\ -1 \lt x \lt 3$
$(C)\ -3 \lt x \lt 1$
$(D)\ x \lt -3\ \text{atau}\ x \gt 1$
$(E)\ x \lt -1\ \text{atau}\ x \gt 3$Alternatif Pembahasan: show

Syarat suatu fungsi akan turun adalah turunan pertama kurang dari nol,
turunan pertama $f(x)$ adalah $f'(x)=3x^2+6x-9$
$ \begin{align}
f'(x) & \lt 0 \\
3x^2+6x-9 & \lt 0 \\
x^2+2x-3 & \lt 0 \\
(x+3)(x-1) \lt 0 & \lt 0 \\
\text{diperoleh pembuat nol} \\
x & =-3\ \text{atau} \\
x & =1 \end{align} $

Kesimpulan fungsi $f(x)=x^{3}+3x^{2}-9x-7$ turun pada interval $-3 \lt x \lt 1$

Jika masih kesulitan menyelesaikan pertidaksamaan kuadrat dengan cepat silahkan disimak caranya: Cara Kreatif Menentukan HP Pertidaksamaan Kuadrat

$\therefore$ Pilihan yang sesuai adalah $(C).\ -3 \lt x \lt 1$

6. Soal UNBK Matematika IPS 2018 (: Soal Lengkap :)Grafik fungsi $f(x)=2x^{3}-3x^{2}-120x+15$ naik untuk $x$ yang memenuhi...
$(A)\ 4 \lt x \lt 5$
$(B)\ -4 \lt x \lt 5$
$(C)\ x \lt -5\ \text{atau}\ x \gt 4$
$(D)\ x \lt 4\ \text{atau}\ x \gt 5$
$(E)\ x \lt -4\ \text{atau}\ x \gt 5$Alternatif Pembahasan: show

Syarat suatu grafik fungsi akan naik adalah turunan pertama lebih dari nol,
turunan pertama $f(x)$ adalah $f'(x)=6x^{2}-6x -120$
$ \begin{align}
f'(x) & \gt 0 \\
6x^{2}-6x -120 & \gt 0 \\
x^{2}-x -20 & \gt 0 \\
(x-5)(x+4) & \gt 0 \\
\text{diperoleh pembuat nol} \\
x & =5\ \text{atau} \\
x & =-4 \end{align} $

Kesimpulan fungsi $f(x)=2x^{3}-3x^{2}-120x+15$ naik pada interval $x \lt -4\ \text{atau}\ x \gt 5$

Jika masih kesulitan menyelesaikan pertidaksamaan kuadrat dengan cepat silahkan disimak caranya: Cara Kreatif Menentukan HP Pertidaksamaan Kuadrat

$\therefore$ Pilihan yang sesuai adalah $(E)\ x \lt -4\ \text{atau}\ x \gt 5$

7. Soal UNBK Matematika IPS 2018 (: Soal Lengkap :)Turunan pertama dari $h(x)=(-x+1)^{3}$ adalah...
$(A)\ h'(x)=-3x^{2}+6x-3$
$(B)\ h'(x)=-3x^{2}-6x+3$
$(C)\ h'(x)=3x^{2}+6x-3$
$(D)\ h'(x)=3x^{2}+3x-6$
$(E)\ h'(x)=-3x^{2}-6x+3$Alternatif Pembahasan: show

Turunan petama dari $h(x)= \left[ f(x) \right]^{n}$ adalah $h'(x)= n \cdot \left[ f(x) \right]^{n-1} \cdot f'(x)$.
$h(x)=(-x+1)^{3} $

$ \begin{align}
h(x) & = (-x+1)^{3} \\
h'(x) & = 3(-x+1)^{3-1} (-1) \\
& = -3(-x+1)^{2}\\
& = -3(x^{2}-2x+1)\\
& = -3x^{2}+6x-3
\end{align} $

$\therefore$ Pilihan yang sesuai adalah $(A)\ -3x^{2}+6x-3$

8. Soal SIMAK UI 2018 Kode 641 (: Soal Lengkap :)Jika persamaan kuadrat $x^{2}-px+q=0$ memiliki akar yang berkebalikan dan merupakan bilangan negatif, nilai maksimum $p-q$ adalah...
$\begin{align}
(A).\ & 2 \\
(B).\ & 1 \\
(C).\ & -1 \\
(D).\ & -2 \\
(E).\ & -3
\end{align}$Alternatif Pembahasan: show

Karena persamaan kuadrat $x^{2}-px+q=0$ memiliki akar yang berkebalikan dan merupakan bilangan negatif, maka dapat kita misalkan akar-akarnya adalah $m$ dan $ \dfrac{1}{m}$ dengan syarat $m \gt 0$.

Hasil kali akar-akar,
$\begin{align}
m \times \dfrac{1}{m} & = \dfrac{c}{a} \\
1 & = q
\end{align}$

Hasil jumlah akar-akar,
$\begin{align}
m + \dfrac{1}{m} & = -\dfrac{b}{a} \\
m+m^{-1} & = p
\end{align}$

Nilai maksimum $p-q$ kita coba cari dengan turunan pertama $p-q$ yaitu
$\begin{align}
p-q & = m+m^{-1} - 1 \\
(p-q)' & = 1-m^{-2} \\
1-m^{-2} & = 0 \\
m^{-2} & = 1 \\
\dfrac{1}{m^{2}} & = 1 \\
1 & = m^{2} \\
m = -1\ & \text{atau}\ m=1\ \text{(TM)}
\end{align}$

Untuk $m=-1$
$p-q = m+m^{-1} - 1$
$p-q =-1+(-1)^{-1} - 1$
$p-q =-3$

$ \therefore $ Pilihan yang sesuai adalah $(E).\ -3$

Jika engkau tidak sanggup menahan lelahnya belajar, Maka engkau harus menanggung pahitnya kebodohan" ___pythagoras

lembar jawaban penilaian harian matematika,

lembar jawaban penilaian akhir semester matematika,

presentasi hasil diskusi matematika atau

pembahasan quiz matematika di kelas.

Artikel ini sebelumnya di Posting oleh http://www.defantri.com

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