Ockim-Delighter

Sabtu, 12 Desember 2009

Mengungkap Tabir Perang Dunia I dan II

Pada awal abad ke-20, hubungan yang didasarkan pada kepentingan telah membagi Eropa menjadi dua kutub yang berlawanan. Inggris, Prancis, dan Rusia berada di satu pihak, dan Jerman beserta Kekaisaran Austria-Hungaria yang diperintah oleh keluarga Hapsburg asal Jerman berada di pihak lainnya.
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Menyingkap Tabir Perang DuniaAbad ke-20 adalah babak paling berdarah di sepanjang sejarah dunia. Selama masa ini, untuk pertama kalinya umat manusia diperkenalkan pada gagasan “perang dunia.”Secara keseluruhan, Perang Dunia pertama dan kedua telah menelan korban 65 juta jiwa. Sekitar separuh dari korban ini adalah warga sipil yang tidak ada hubungannya dengan kedua perang ini. Anak-anak, wanita, dan orang tua yang tak berdaya sama-sama dibantai secara kejam. Sehingga, kita mungkin bertanya, bagaimana dunia bisa berada di tengah-tengah penyakit jiwa yang begitu meluas seperti itu?Bagaimana bisa manusia begitu mudahnya mengorbankan bangsanya sendiri maupun bangsa lain? Pemikiran apakah di balik kekejaman ini? Jawaban dari pertanyaan ini akan dijawab dalam tulisan ini.Perang telah ada hampir sejak awal keberadaan umat manusia itu sendiri. Kebutuhan ekonomi dan politik yang saling bersaing telah menggiring manusia untuk mengangkat senjata melawan satu sama lain. Senjata dan tentara telah berkembang berdampingan, sehingga perang telah tumbuh semakin dahsyat dan merusak.

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Selasa, 24 November 2009

Islam Masuk ke Nusantara ketika Rasulullah SAW masih Hidup

Dalam literatur kuno asal Tiongkok tersebut, orang-orang Arab disebut sebagai orang-orang Ta Shih, sedang Amirul Mukminin disebut sebagai Tan mi mo ni’. Disebutkan bahwa duta Tan mi mo ni’, utusan Khalifah, telah hadir di Nusantara pada tahun 651 Masehi atau 31 Hijriah dan menceritakan bahwa mereka telah mendirikan Daulah Islamiyah

Islam masuk ke Nusantara dibawa para pedagang dari Gujarat, India, di abad ke 14 Masehi. Teori masuknya Islam ke Nusantara dari Gujarat ini disebut juga sebagai Teori Gujarat. Demikian menurut buku-buku sejarah yang sampai sekarang masih menjadi buku pegangan bagi para pelajar kita, dari tingkat sekolah dasar hingga lanjutan atas, bahkan di beberapa perguruan tinggi.Namun, tahukah Anda bahwa Teori Gujarat ini berasal dari seorang orientalis asal Belanda yang seluruh hidupnya didedikasikan untuk menghancurkan Islam?

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Jumat, 20 November 2009

The Gallant Jiraiya

Jiraiya, literally `Young Thunder', was the scion of a powerful clan from Kyushu. When the family fell on hard times he went to Echigo province, now Niigata Prefecture, became a freebooter and rose to the position of chief of a chivalrous band of robbers. He was initiated into toad magic by an immortal who resided on Mount Myoko, popularly known as Echigo Fuji. He failed to overcome and kill a hated rival, an older man named Sarashina, who was the cause of his family's ruin.

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Rabu, 18 November 2009

Mengenal Zodiak Mesir

Mungkin selama ini kita mengira astrologi atau ilmu perbintangan berasal dari Yunani, namun penduduk Mesir juga sudah mengenalnya. Ketahui bagaimana sifat anda dari zodiak mesir ini..

Sejak awal peradaban bahkan sebelum itu, Astrologi telah memainkan peran utama dalam masyarakat. Pengaruh dari astrologi ini, bahkan bisa dirasakan sampai ke seluruh dunia, termasuk juga di Indonesia.

Sabtu, 31 Oktober 2009

Uang Tempoe Doeloe

Kita tentu jarang mengenal uang -uang kuno rupiah tempo ulu atau ejaan lamanya "tempo Doeloe"

Kamis, 29 Oktober 2009

ST12 : Syuting Video Klip Biarkan Jatuh Cinta

shootvcbajc_231009 ST12 segera merilis video klip mereka yang berjudul “Biarkan Jatuh Cinta”. Lagu ”Biarkan Jatuh Cinta”, dari nada dan warna vokal yang dilantunkan Charly, memang kental dengan warna Melayunya. Mungkin dengan video klip terbaru ini, ST12 ingin menunjukkan eksistensi diri mereka bermusik dan kecintaan mereka terhadap musik Melayu

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Senin, 26 Oktober 2009

Discography ST 12

ST 12 (Discography)

01. ST 12 _ Jalan Terbaik (2007)

Label: Trinity Optima Production

Track List

1. ATSL (Aku Tak Sanggup Lagi)
2. Rasa Yang Tertinggal
3. Ruang Hidup
4. Aku Masih Sayang
5. Kepedihan Jiwa
6. Cinta Abadi
7. Sirna Sudah
8. Dewiku
9. Jiwa Yang Hilang
10. Jalan Terbaik

02. ST 12 _ P.U.S.P.A (2008)

Label: Trinity Optima Production

Track List
1. P.U.S.P.A
2. Jangan Pernah Berubah
3. Cari Pacar Lagi
4. Putri Iklan
5. Skj
6. Saat Terakhir
7. Tak Dapat Apa Apa
8. Cinta Jangan Dinanti
9. Cinta Tak Direstui
10. Jalan Terbaik
11. Rasa Yang Tertinggal
12. Aku Masih Sayang

03. ST 12 _ P.U.S.P.A Repackaged (2009)

Label: Trinity Optima Production

Track List
1. Putri Iklan (New Version)
2. Biarkan Jatuh Cinta
3. SKJ (New Version)
4. Isabella (Beat Version)
5. Saat Terakhir
6. Cari Pacar Lagi
7. Cinta Tak Direstui
8. P.U.S.P.A
9. Jangan Pernah Berubah
10. Tak Dapat Apa-Apa (My Hot)
11. Cinta Jangan Dinanti
12. Isabella (Slow Version)
13. KebesaranMu
14. MemujaMu

Sabtu, 17 Oktober 2009

ST12: Mengapa Malu Melayu?

Jumat, 09 Oktober 2009

محمد فرح عيديد

Mohammed Farrah Aidid
General Mohamed Farrah Aidid (Somali: Maxamed Faarax Caydiid, Arabic: محمد فرح عيديد‎) (December 15, 1934 – August 2, 1996) claimed to be the President of Somalia from 1995 to 1996 and a controversial Somali military leader, often described as a warlord^[1]. He was the chairman of United Somali Congress (USC) and later Somali National Alliance (SNA), who drove Mohamed Siad Barre’s dictatorial regime from the capital, Mogadishu and eventually from Somalia altogether. Later he challenged the presence of United Nations and United States troops in the

country. General Aidid was one of the main targets of Operation Restore Hope, the United Nations and United States military operation that came to the country to provide humanitarian aid and to break the military siege. He became General of Somalia for a short period after forcing UN forces to abandon the country in 1995.

Biography

Aidid was born in the Habar Gidir clan of the Mudug region of Somalia. He was educated in Rome and Moscow and served in the Italian colonial police force in the 1950s. Later he rose in the military of Mohamed Siad Barre to the rank of general and served in the 1977-78 Ogaden War with Ethiopia.Aidid also served in Barre's cabinet and as Somali ambassador to India before finally being appointed intelligence chief.

Somali Civil War

Barre suspected Aidid of planning a coup d'état and had him imprisoned for six years as means of pre-emption. In 1991, Aidid's clan did indeed manage to overthrow Barre, and the former, as leader of the United Somali Congress, emerged as a major force in the ensuing civil war.

Further information: Somalian Revolution (1986-1992)

Opposition to UN intervention

As the civil war grew, with the breakdown of centralized government and no single successor to Barre's regime emerging, the term "warlord" came into use in Somalia. The tribalism of clan-based rebel organizations, and a complex web of regional and local domination elevated warlords to be de facto rulers of the country. Aidid was considered chief amongst them.^[3] However, he was defeated by a rival, which led to the opportunity for UN peace keepers to be brought in.^[1]
General Aidid hindered international U.N. peacekeeping forces in 1992 culminating with an attack on Pakistani peace keeping forces which resulted in 24 dead. As a result, the US put a $25,000 bounty on his head and attempted to arrest and try him for war crimes. On October 3, 1993, by the order of President Bill Clinton, a force of United States Army Rangers and Delta Force operators set out to capture several officials of Aidid's militia in an area of the Somali capital city of Mogadishu, controlled by him (as portrayed in the film Black Hawk Down). Although technically successful, with the capture of several "tier-one personalities", the operation did not completely go as planned, between 500 and 1500 Somalis, as well as 18 American soldiers and 1 Malaysian soldier, died as a result in the First Battle of Mogadishu. Also, as a result of the downed Blackhawk from crash site 2, Warrant Officer-Pilot Michael J. Durant from 160th SOAR was held captive for 11 days, and he recalls in his book, In the Company of Heroes that he believed that he may have seen General Aidid behind the cameraman as he was being filmed briefly by film reporters during his captivity.
The United States withdrew its forces soon afterwards and the United Nations left Somalia in 1995.

Further information: Unified Task Force, Operation Provide Relief, UNOSOM I, and UNOSOM II

President of Somalia

Aidid then declared himself President of Somalia in June 1995,^[4] but his government was not internationally recognized. Indeed, within Somalia and even within Mogadishu, his control was fiercely fought over, especially by Ali Mahdi Muhammad.

Death

Aidid died on August 1, 1996 as a result of gunshot wounds sustained a week earlier in a fight with competing factions.
There have been persistent rumors (including articles in the Los Angeles Times and USA Today), that US Special Operations forces, or Central Intelligence Agency Special Activities Division officers, were directly or indirectly involved with General Aidid's death.^{[citation needed]}
Heir
Hussein Mohamed Farrah, son of General Aidid, migrated to the United States when he was 17 years old. He stayed 16 years in the nation and became a naturalized citizen, and later a United States Marine who served in Somalia. Two days after his father's death, the Somali National Alliance selected him to become the new president of the Republic of Somalia.
He resigned his position in Cairo, Egypt following a peace process between the Salbalar administration and Soodare Group. Hussein Mohammed Farrah is seen by the West as making available a chance for improvement of relationships between the West and Somalia. When asked about his Marine days, he replied: "Once a Marine, always a Marine."^[5]

Kamis, 08 Oktober 2009

Integral

Integral adalah kebalikan dari proses diferensiasi. Integral ditemukan menyusul ditemukannya masalah dalam diferensiasi di mana matematikawan harus berpikir bagaimana menyelesaikan masalah yang berkebalikan dengan solusi diferensiasi. Lambang integral adalah $\int\,$
Integral terbagi dua yaitu integral tak tentu dan integral tertentu. Bedanya adalah integral tertentu memiliki batas atas dan batas bawah. Integral tertentu biasanya dipak

ai untuk mencari volume benda putar dan luas.

Mencari nilai integral

Substitusi

Contoh soal:

Cari nilai dari: $\int \frac{ln x}{x}\,dx\,$

$t = \ln x, dt = \frac{dx}{x}$

$\int \frac{ln x}{x}\,dx\, = \int t\,dt$

$= \frac {1}{2} t^2 + C$

$= \frac {1}{2} ln^2x + C$

Integrasi parsial

Integral parsial menggunakan rumus sebagai berikut:

$\int f'(x)g(x)\,dx = f(x)g(x) - \int f(x)g'(x)\,dx$

Contoh soal:

Cari nilai dari: $\int \ln x \,dx\,$

$f'(x) = 1, f(x) = x, g(x) = ln x, g'(x) = \frac{1}{x}\,$

Gunakan rumus di atas

$\int \ln x\ dx = x ln x - \int x\frac{1}{x}\,dx\,$

$= x ln x - \int 1\,dx\,$

Substitusi trigonometri

Bentuk	Gunakan
$\sqrt{a^2-b^2x^2}\,$	$x = \frac{a}{b}\sin \alpha\,$
$\sqrt{a^2+b^2x^2}\,$	$\!\, x = \frac{a}{b}\tan \alpha\,$
$\sqrt{b^2x^2-a^2}\,$	$\, x = \frac{a}{b}\sec \alpha\,$

Contoh soal:

Cari nilai dari: $\int \frac{dx}{x^2\sqrt{x^2+4}}\,$

$x = 2 \tan A, dx = 2 \sec^2 A\,dA\,$

$\int \frac{dx}{x^2\sqrt{x^2+4}}\,$

$= \int \frac {2 sec^2 A\,dA}{(2 tan A)^2\sqrt{4 + (2 tan A)^2}}\,$

$= \int \frac {2 sec^2 A\,dA}{4 tan^2A\sqrt{4 + 4 tan^2A}}\,$

$= \int \frac {2 sec^2 A\,dA}{4 tan^2A\sqrt{4(1+tan^2A)}}\,$

$= \int \frac {2 sec^2 A\,dA}{4 tan^2A\sqrt{4 sec^2A}}\,$

$= \int \frac {2 sec^2 A\,dA}{4 tan^2A.2sec A}\,$

$= \int \frac {sec A\,dA}{4 tan^2A}\,$

$= \frac {1}{4}\int \frac {secA\,dA}{tan^2A}\,$

$= \frac {1}{4}\int \frac{cos A}{sin^2A}\,dA\,$

Cari nilai dari: $\int \frac{cos A}{sin^2A}\,dA\,$ dengan menggunakan substitusi

$t = sin A, dt = cos A\,dA\,$

$\int \frac{cos A}{sin^2A}\,dA\,$

$= \int \frac{dt}{t^2}\,$

$= \int t^{-2}\,dt\,$

$= -t^{-1} + C= -\frac{1}{sin A} + C\,$

Masukkan nilai tersebut:

$= \frac {1}{4}\int \frac{cos A}{sin^2A}\,dA\,$

$= \frac {1}{4}.-\frac{1}{sin A} + C\,$

$= -\frac {1}{4 sin A} + C\,$

Nilai sin A adalah $\frac{x}{\sqrt{x^2+4}}$

$= -\frac {1}{4 sin A} + C\,$

$= -\frac {\sqrt{x^2+4}}{4x} + C\,$

Integrasi pecahan parsial

Contoh soal:

Cari nilai dari: $\int\frac{dx}{x^2-4}\,$

$\frac{1}{x^2-4} = \frac{A}{x+2} + \frac{B}{x-2}\,$

$= \frac {A(x-2) + B(x+2)}{x^2-4}\,$

$= \frac{Ax-2A+Bx+2B}{x^2-4}\,$

$=\frac{(A+B)x-2(A-B)}{x^2-4}\,$

Akan diperoleh dua persamaan yaitu $A+B = 0\,$ dan $A-B = -\frac{1}{2}$

Dengan menyelesaikan kedua persamaan akan diperoleh hasil $A = -\frac{1}{4}, B = \frac{1}{4}\,$

$\int\frac{dx}{x^2-4}\,$

$= \frac{1}{4} \int (\frac{1}{x-2} - \frac {1}{x+2})\,dx\,$

$= \frac{1}{4} (ln|x-2| - ln|x+2|) + C\,$

$= \frac{1}{4} ln|\frac{x-2}{x+2}| + C\,$

Rumus integrasi dasar

Umum

$\int x^n\,dx = \frac{x^{n+1}}{n+1} + C\,$ (n ≠ -1)

$\int\frac{d}{dx}[f(x)]\,dx = f(x) + C\,$

$\int(u+v)\,dx = \int u \,dx + \int v \,dx\,$

$\int au\,dx = a \int u\, dx\,$ (a adalah konstanta)

$\int \frac{dx}{x} = ln |x| + C\,$

$\int a^x \,dx = \frac{a^x}{ln a} + C\,$ (a > 0, a ≠ 1)

$\int \frac{dx}{x} = ln |x| + C$

Bilangan natural

$\int e^u du= e^u + C\,$

Logaritma

$\int \log_b(x) \,dx = x \log_b(x) - \frac{x}{\ln(b)} + C = x \log_b \left(\frac{x}{e}\right) + C$

Trigonometri

$\int\sin x\,dx = -\cos x + C\,$

$\int\cos x\,dx = \sin x + C\,$

$\int\tan x\,dx = \ln |\sec x| + C\,$

$\int\cot x\,dx = \ln |\sin x| + C\,$

$\int\sec x\,dx = \ln |\sec x + \tan x| + C\,$

$\int\csc x\,dx = \ln |\csc x - \cot x| + C\,$

$\int\sec^2 x\,dx = \tan x + C\,$

$\int\csc^2 x\,dx = - \cot x + C\,$

$\int\sec x\tan x\,dx = \sec x + C\,$

$\int\csc x\cot x\,dx = -\csc x + C\,$

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Sabtu, 12 Desember 2009

Selasa, 24 November 2009

Jumat, 20 November 2009

Rabu, 18 November 2009

Sabtu, 31 Oktober 2009

Kamis, 29 Oktober 2009

Senin, 26 Oktober 2009

Sabtu, 17 Oktober 2009

Jumat, 09 Oktober 2009

Biography

Somali Civil War

Opposition to UN intervention

President of Somalia

Death

Kamis, 08 Oktober 2009

Mencari nilai integral

Substitusi

Integrasi parsial

Integrasi pecahan parsial

Rumus integrasi dasar

Umum

Bilangan natural

Logaritma

Trigonometri

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