<> "The repository administrator has not yet configured an RDF license."^^ . <> . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n"^^ . "There are several methods to solve an initial value problem of second-order \r\nhomogenous linear systems of differential equations with constant coefficients.\r\nThat are elimination met hod and matrix method. Whereas to solve\r\nnonhomogenous systems, used undetermined coefficient method and variation of\r\nparameter method, that through some difficulties and complex procceses. But\r\nthen, there is an alternative method to solve it. It is Matrix Laplace Transform\r\nMethod. \r\n\r\n The goals of the research are to explain Matrix Laplace Transform Method\r\nand use it to solve init ial value problems of second-order homogenous linear\r\nsystems of differential equations with constant coefficients that form \r\n \r\n\r\n(\r\n\r\n)\r\n= \r\n(\r\n\r\n)\r\n\r\n(\r\n\r\n)\r\n+ \r\n(\r\n\r\n)\r\n \r\n(\r\n1\r\n)\r\n\r\nwhere \r\n\r\n(\r\n\r\n)\r\n is second derivative from \r\n(\r\n\r\n)\r\n. \r\n(\r\n\r\n)\r\n is column vector from \r\n(),\r\n\r\n\r\n(),…,\r\n(). \r\n(\r\n\r\n)\r\n is × matrices form. All of matrix entries are constant. If\r\nall entries of \r\n(\r\n\r\n)\r\n equal zero, then\r\n(\r\n1\r\n)\r\n said homogenous. If not, it is called\r\nnonhomogenous. Hence, if value of \r\n(\r\n\r\n)\r\n and '\r\n(\r\n\r\n)\r\n as initial conditions are \r\n\r\nknown, or \r\n(\r\n\r\n\r\n)\r\n= \r\n\r\n and '\r\n(\r\n\r\n, then (1) is an init ial value problem of\r\nsecond-order linear systems. \r\n\r\n)\r\n= '\r\n\r\n\r\n The result of the research is be obtained solutions of second-order linear\r\nsystems of differential equations with constant coefficients use Matrix Laplace\r\nTransform Method is \r\n = L\r\n\r\n\r\n\r\n = L\r\n\r\n\r\n(\r\n\r\n\r\n - \r\n)\r\n\r\nxviii \r\n\r\n\r\n\r\n(\r\n\r\n)\r\n+ \r\n(\r\n\r\n)\r\n+ '\r\n(\r\n\r\n)\r\n\r\n.\r\nThen, appliying this met hod to solve initial value problems on spring-mass \r\nsystems. That are undamped free motion of spring-mass systems, f ree motion with\r\ndamped and forced motion of spring-mass systems. \r\n\r\n\r\nKeyword : Matrix Laplace Transform Method, initial value problems, secondorder\r\n\r\nsystems of linear different ial equations with constant coefficients, springmass\r\nsystems."^^ . "2013-05-08" . . . . "UIN SUNAN KALIJAGA"^^ . . . "FAKULTAS SAINS DAN TEKNOLOGI, UIN SUNAN KALIJAGA"^^ . . . . . . . . . "NIM. 07610002"^^ . "SYAMSUL ARIFIN"^^ . "NIM. 07610002 SYAMSUL ARIFIN"^^ . . . . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Text)"^^ . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Text)"^^ . . . "BAB I, V, DAFTAR PUSTAKA.pdf"^^ . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "lightbox.jpg"^^ . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "preview.jpg"^^ . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "medium.jpg"^^ . . . "METODE TRANSFORMASI LAPLACE MATRIKS \r\nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \r\n (Other)"^^ . . . . . . "small.jpg"^^ . . "HTML Summary of #8512 \n\nMETODE TRANSFORMASI LAPLACE MATRIKS \nDAN PENERAPANNYA PADA SISTEM PEGAS MASSA \n\n\n" . "text/html" . . . "Matematika"@id . .