Sistem atau zat dielektrik secara keseluruhan mempunyai besaran-besaran polarisasi P, medan listrik luar dengan kuat medan listrik Є, dan temperatur T. Sistem atau zat dielektrik dapat digambarkan sebagai berikut.
![](data:image/png;base64,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)
Zat dielektrik, jika tidak dikenai medan listrik luar, maka atom atau molekulnya memiliki pusat muatan positif yaitu inti atom yang berimpit dengan pusat muatan negatifnya, yaitu elektron (perhatikan gambar 4.a). Jika zat dielektrik dikenai atau dimasukkan ke dalam medan listrik luar dengan kuat medan listrik Є, maka zat dielektrik akan terkena induksi (imbas) medan listrik. Karena terkena medan listrik luar, maka pusat muatan positif inti dan elektron atom tidak lagi berimpit, melainkan agak bergeser (tergeser), sehingga atom atau molekul menyerupai dipole listrik yang kecil sekali (perhatikan gambar 4.b). Ini berarti atom-atom zat dielektrik diarahkan oleh medan listrik luar. Peristiwa terarahnya atom-atom zat dielektrik ini dikenal sebagai peristiwa polarisasi. Dengan peristiwa polarisasi, atom-atom zat dielektrik menjadi dipole listrik. Oleh karena itu, ada dua besaran zat dielektrik, yaitu: polarisasi (P) dan kaut medan listrik luar (Є) yang saling mempengaruhi; sehingga disebut sebagai variabel keadaan atau koordinat sistem dielektrik.
Bagaimana kalau temperatur zat dielektrik dinaikkan ? Jika temperatur zat dielektrik dinaikkan, maka getaran atom atau molekul zat dielektrik semakin hebat; sehingga arah positif dan negatifnya atom yang netral semakin acak. Karena semakin acak, maka kenaikan temperatur pada hakikatnya menentang terorientasinya muatan atom-atom zat dielektrik.
Dengan ini jelas bahwa temperatur juga mempengaruhi polarisasi, sehingga temperatur juga merupakan variabel keadaan atau koordinat sistem dielektrik.
Bagaimana polarisasi P zat dielektrik, jika zat dielektrik dimasukkan dalam medan listrik luar dengan kuat medan listrik Є, dan temperatur T zat dielektrik dinaikkan ? Menurut hasil eksperimen, salah satu hubungan antara polarisasi P, kuat medan listrik Є, dan temperatur T ditunjukkan oleh persamaan berikut.
![](data:image/png;base64,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)
dengan a dan b sebagai tetapan yang harganya ditentukan dengan eksperimen..
Zat dielektrik, jika tidak dikenai medan listrik luar, maka atom atau molekulnya memiliki pusat muatan positif yaitu inti atom yang berimpit dengan pusat muatan negatifnya, yaitu elektron (perhatikan gambar 4.a). Jika zat dielektrik dikenai atau dimasukkan ke dalam medan listrik luar dengan kuat medan listrik Є, maka zat dielektrik akan terkena induksi (imbas) medan listrik. Karena terkena medan listrik luar, maka pusat muatan positif inti dan elektron atom tidak lagi berimpit, melainkan agak bergeser (tergeser), sehingga atom atau molekul menyerupai dipole listrik yang kecil sekali (perhatikan gambar 4.b). Ini berarti atom-atom zat dielektrik diarahkan oleh medan listrik luar. Peristiwa terarahnya atom-atom zat dielektrik ini dikenal sebagai peristiwa polarisasi. Dengan peristiwa polarisasi, atom-atom zat dielektrik menjadi dipole listrik. Oleh karena itu, ada dua besaran zat dielektrik, yaitu: polarisasi (P) dan kaut medan listrik luar (Є) yang saling mempengaruhi; sehingga disebut sebagai variabel keadaan atau koordinat sistem dielektrik.
Bagaimana kalau temperatur zat dielektrik dinaikkan ? Jika temperatur zat dielektrik dinaikkan, maka getaran atom atau molekul zat dielektrik semakin hebat; sehingga arah positif dan negatifnya atom yang netral semakin acak. Karena semakin acak, maka kenaikan temperatur pada hakikatnya menentang terorientasinya muatan atom-atom zat dielektrik.
Dengan ini jelas bahwa temperatur juga mempengaruhi polarisasi, sehingga temperatur juga merupakan variabel keadaan atau koordinat sistem dielektrik.
Bagaimana polarisasi P zat dielektrik, jika zat dielektrik dimasukkan dalam medan listrik luar dengan kuat medan listrik Є, dan temperatur T zat dielektrik dinaikkan ? Menurut hasil eksperimen, salah satu hubungan antara polarisasi P, kuat medan listrik Є, dan temperatur T ditunjukkan oleh persamaan berikut.
dengan a dan b sebagai tetapan yang harganya ditentukan dengan eksperimen..
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