PARA PENCARI TUHAN (PPT) JILID 7 EPISODE 01, TAYANG 10 JULI 2013 DI SCTV

Fokus masalah pada penelitian ini adalah mendekripsikan tentang menemukan suatu teori dakwah dalam Sinetron religi dengan judul Para Pencari Tuhan jilid 7 episode 01 tayang pada 10 Juli 2013 di SCTV. Untuk menjawab rumusan masalah tersebut, dalam penelitian ini peneliti menggunakan pendekatan penelitian kualitatif deskriptif dengan metode analisis framing Gamson Modigliani. Teknik pengumpulan data yang dilakukan adalah dokumentasi. Selama proses penelitian berlangsung, peneliti di sini melihat dan memahami dari Sinetron religi Para Pencari Tuhan jilid 7 episode 01 tayang pada 10 Juli 2013 di SCTV, kemudian peneliti juga berusaha semaksimal mungkin untuk mengumpulkan dan menyalin data data yang ada kaitannya dalam penelitian ini, seperti buku buku yang berkaitan dengan (dakwah, dan televisi), situs situs di internet sehingga nantinya peneliti dapat merangkum hal hal yang terpenting dari semua data yang berhasil didapatkan. Setelah itu, peneliti menganalisis untuk membedah serta mengetahui bagaimana teori dakwah dalam Sinetron religi dengan judul Para Pencari Tuhan jilid 7 episode 01 tayang pada 10 Juli 2013 di SCTV. Dalam sinetron para pencari tuhan yang disiarkan oleh SCTV terdapat cerita antagonis dengan perilaku serakah yang di perankan oleh dua pencuri dan udin, adapun perilaku yang ingin mendapatkan ridho Allah yang di perankan oleh Asrul, Pak Ustadz, Azam, Bang Jek. Hasil penelitian penulis, tentang Sinetron Para Pencari Tuhan jilid 7 episode 01 tayang 10 juli 2013 di SCTV, menemukan teori bahwa terdapat cerita antagonis dalam sinetron itu

Generalizations and Some Applications of Kronecker and Hadamard Products of Matrices

In this thesis, generalizations of Kronecker, Hadamard and usual products (sums) that depend on the partitioned of matrices are studied and defined. Namely: Tracy- Singh, Khatri-Rao, box, strong Kronecker, block Kronecker, block Hadamard, restricted Khatri-Rao products (sums) which are extended the meaning of Kronecker, Hadamard and usual products (sums). The matrix convolution products, namely: matrix convolution, Kronecker convolution and Hadamard convolution products of matrices with entries in set of functions are also considered. The connections among them are derived and most useful properties are studied in order to find new applications of Tracy-Singh and Khatri-Rao products (sums). These applications are: a family of generalized inverses, a family of coupled singular matrix problems, a family of matrix inequalities and a family of geometric means. In the theory of generalized inverses of matrices and their applications, the five generalized inverses, namely Moore-Penrose, weighted Moore-Penrose, Drazin, weighted Drazin and group inverses and their expressions and properties are studied. Moreover, some new numerous matrix expressions involving these generalized inverses and weighted matrix norms of the Tracy-Singh products matrices are also derived. In addition, we establish some necessary and sufficient conditions for the reverse order law of Drazin and weighted Drazin inverses. These results play a central role in our applications and many other applications. In the field of system identification and matrix products work, we propose several algorithms for computing the solutions of the coupled matrix differential equations, coupled matrix convolution differential, coupled matrix equations, restricted coupled singular matrix equations, coupled matrix least-squares problems and weighted Least -squares problems based on idea of Kronecker (Hadamard) and Tracy-Singh(Khatri-Rao) products (sums) of matrices. The way exists which transform the coupled matrix problems and coupled matrix differential equations into forms for which solutions may be readily computed. The common vector exact solutions of these coupled are presented and, subsequently, construct a computationally - efficient solution of coupled matrix linear least-squares problems and nonhomogeneous coupled matrix differential equations. We give new applications for the representations of weighted Drazin, Drazin and Moore-Penrose inverses of Kronecker products to the solutions of restricted singular matrix and coupled matrix equations. The analysis indicates that the Kronecker (Hadamard) structure method can achieve good efficient while the Hadamard structure method achieve more efficient when the unknown matrices are diagonal. Several special cases of these systems are also considered and solved, and then we prove the existence and uniqueness of the solution of each case, which includes the well-known coupled Sylvester matrix equations. We show also that the solutions of non-homogeneous matrix differential equations can be written in convolution forms. The analysis indicates also that the algorithms can be easily to find the common exact solutions to the coupled matrix and matrix differential equations for partitioned matrices by using the connections between Tracy-Singh, Block Kronecker and Khatri -Rao products and partitioned vector row (column) and our definition which is the so-called partitioned diagonal extraction operators. Unlike Matrix algebra, which is based on matrices, analysis must deal with estimates. In other words, Inequalities lie at the core of analysis. For this reason, it’s of great importance to give bounds and inequalities involving matrices. In this situation, the results are organized in the following five ways: First, we find some extensions and generalizations of the inequalities involving Khatri-Rao products of positive (semi) definite matrices. We turn to results relating Khatri-Rao and Tracy- Singh powers and usual powers, extending and generalizing work of previous authors. Second, we derive some new attractive inequalities involving Khatri-Rao products of positive (semi) definite matrices. We remark that some known inequalities and many other new interesting inequalities can easily be found by using our approaches. Third, we study some sufficient and necessary conditions under which inequalities below become equalities. Fourth, some counter examples are considered to show that some inequalities do not hold in general case. Fifth, we find Hölder-type inequalities for Tracy-Singh and Khatri-Rao products of positive (semi) definite matrices. The results lead to inequalities involving Hadamard and Kronecker products, as a special case, which includes the well-known inequalities involving Hadamard product of matrices, for instance, Kantorovich-type inequalities and generalization of Styan's inequality. We utilize the commutativity of the Hadamard product (sum) for possible to develop and improve some interesting inequalities which do not follow simply from the work of researchers, for example, Visick's inequality. Finally, a family of geometric means for positive two definite matrices is studied; we discuss possible definitions of the geometric means of positive definite matrices. We study the geometric means of two positive definite matrices to arrive the definitions of the weighted operator means of positive definite matrices. By means of several examples, we show that there is no known definition which is completely satisfactory. We have succeeded to find many new desirable properties and connections for geometric means related to Tracy-Singh products in order to obtain new unusual estimates for the Khatri-Rao (Tracy-Singh) products of several positive definite matrices

Polymer Retention during Flow of Polymer Solutions through Porous Media

Polymer solution flow and retention through porous media is of interest to many applications in the oil industry such as drilling, water shut-off and enhanced oil recovery. Operators of mature oil and gas fields are faced with the problem of excessive water production (EWP), which can cause a premature abandonment of some oil and gas wells. It has been found that the injection of high molecular weight polymer solutions through the pay zones of the oil and gas wells would induce a sharp decrease of the water production without affecting the oil and gas production. This effect is called disproportionate permeability reduction (DPR) and the polymer solutions inducing such an effect are called relative permeability modifiers (RPM). Hence, the DPR effect has been utilized in the water shut-off or conformance control of oil and gas wells suffering from EWP. In spite of the extensive research of the DPR effect, there is still a lack of agreement on the mechanisms controlling such an effect and relatively high percentage failures are observed during conformance control field applications. Polymer retention in porous media has been attributed to mechanisms such as bridging-adsorption, adsorption-entanglement, and flow-induced adsorption. These mechanisms have been proposed to account for the increase in flow resistance during or after the flow of polymer solutions through porous media. The DPR effect has been attributed to effects induced by this retained polymer such as steric and lubrication effects, wettability change, segregated oil and water pathways, and swelling and shrinking of the adsorbed polymer layer. The aim of this study is to add knowledge on the effect of polymer solution flow on polymer retention in porous media. In this study, the rheology of high molecular weight polymer solutions was studied using a cone-and-plate setup. Moreover, the characteristics and the effective hydrodynamic thickness of adsorbed polymer layers on glass from these polymer solutions under static conditions were investigated using atomic force microscopy (AFM). Also, quartz crystal microbalance with the dissipation monitoring (QCM-D) was used to investigate the effect of increasing the flow rate of polymer solutions on the adsorbed amount on silica and gold surfaces. Additionally, the mobility reduction and the residual resistance as a result of polymer solution flow through single glass capillaries, 2D and 3D models of porous media were studied. The implementation of the above techniques was used to relate the microscopic effect of the flow of the polymer solutions to the polymer retention in the porous media. The anti-thixotropic behaviour of the polymer solutions, which can be attributed to the shearinduced formation of micron-size transient entanglement networks (TEN), is expected to play a major role in the polymer retention in porous media. These microscopic structures can adsorb on the solid surfaces if the adsorption energy of the polymer/solid system is sufficient. Also, in porous media in which mechanical entrapment is possible, these structures can be entrapped in the small pores and pore throats. Two new mechanisms for polymer retention are proposed in this study: transient-entanglement networks adsorption (TENA) and transient-entanglement networks entrapment (TENE). The TENA is the retention mechanism of the TEN structures in flow systems in which mechanical entrapment is not possible provided that the adsorption energy is sufficient. If mechanical entrapment is possible, then the retention by adsorption and mechanical entrapment are lumped in the TENE mechanism. The results from this study have given a new insight on the flow and retention of polymer solutions through porous media. Hence, it is believed that the improved understanding will improve the design of high molecula

Kronecker operational matrices for fractional calculus and some applications

The problems of systems identification, analysis and optimal control have been recently studied using orthogonal functions. The specific orthogonal functions used up to now are the Walsh, the block-pulse, the Laguerre, the Legendre, Haar and many other functions. In the present paper, several operational matrices for integration and differentiation are studied. we introduce the Kronecker convolution product and expanded to the Riemann-Liouville fractional integral of matrices. For some applications, it is often not necessary to compute exact solutions, approximate solutions are sufficient because sometimes computational efforts rapidly increase with the size of matrix functions. Our method is extended to find the exact and approximate solutions of the general system matrix convolution differential equations, the way exists which transform the coupled matrix differential equations into forms for which solutions may be readily computed. Finally, several systems are solved by the new and other approaches and illustrative examples are also considered

IMPLEMENTASI METODE SCRUM DALAM PENGEMBANGAN APLIKASI LOCATION BASED SERVICE PERNCARIAN KULINER DI KOTA SEMARANG HALAMAN JUDUL

Semarang memiliki beragam jenis kuliner, keberagaman tersebut menjadikan Semarang sebagai salah satu kota tempat tujuan wisata kuliner. Namun masih banyak orang yang mengalami kesulitan untuk mendapatkan informasi lokasi wisata kuliner tersebut. Dengan perkembangan teknologi informasi yang semakin pesat, terutama perkembangan teknologi Android mobile phone. Android memiliki berbagai macam fitur, salah satunya yaitu Global Positioning System (GPS). Dengan memanfaatkan GPS, pengguna dapat mengetahui posisinya secara real time dan mencari tempat-tempat tertentu. Location Based Service (LBS) merupakan teknologi yang memanfaatkan Geographic Information System (GIS), Internet Service, dan mobile devices. Aplikasi LBS pencarian lokasi kuliner berbasis mobile application dapat digunakan sebagai sebuah solusi untuk mengetahui informasi lokasi kuliner di Kota Semarang. Metode pengembangan perangkat lunak yang digunakan adalah metode scrum. Penggunaan metode Scrum menghasilkan artifact berupa product backlog, sprint backlog, serta burdown cart. Sistem ini menggunakan bahasa pemrograman Java untuk client dan bahasa pemrograman PHP untuk administrator, dengan database management system MySQL, dan didukung dengan peta digital Google Maps API. Hasil dari aplikasi LBS ini adalah informasi lokasi kuliner yang didukung dengan Google Maps

Backpropagation Neural Network For Colour Recognition

Colour Image Processing (CIP) is useful for inspection system and Automatic Packing Lines Systems. CIP usually needs expensive and special hardware as well as software to extract colour from image. Most of CIP software use statistical methods to extract colours and some system use Neural Network such as Counter-Propagation and Back-Propagation . Some researchers had used Neural Network methods to recognize colour of Commission Internationale de L'Ec1airage (CIE) Models either L *u *v or L *a *b. CIE colour components need special and expensive devices to extract their values from an image. However, this project will use RED, GREEN, BLUE (RGB) colour components, which can be read from an image. In this research, RGB values are used to represent the colour. RGB values are used in two forms. The first form is the actual values that are used in PPM File Format within (0,255) and the second form is normalized RGB values within (0, I ). Back-Propagation Neural Network is used to recognize colour in RGB values. It is found that RGB is useful when used with Neural Network and the Normalized RGB value is faster in the learning of neural network