Natalie Alper

Natalie Alper was born in New York City. She has a B.A. from New York University, Washington Square College, and an M.A. in history from Boston University. She attended the School of the Museum of Fine Arts in Boston and also taught painting there. In 1984 she was a visiting lecturer in the department of visual and environmental smdies at Harvard University. She has received grants from the National Endowment for the Arts and the Massachusetts Artists Foundation

Pengembangan Alper Aljabar untuk Siswa Kelas VII SMP Negeri 3 Salatiga

Penelitian ini bertujuan untuk mengembangkan alat peraga untuk siswa kelas VII SMP khususnya pada materi pengenalan bentuk aljabar serta operasi penjumlahan dan pengurangan bentuk aljabar. Jenis penelitian ini adalah R & D (Research and Development). Model pengembangan pada penelitian ini adalah ADDIE (Analyyze, Design, Development, Implementation, Evaluation). Subjek penelitian ini adalah 28 siswa kelas VII G SMP Negeri 3 Salatiga. Tekhnik pengumpulan data menggunakan observasi, pretest dan posttest, lembar pendapat siswa. Analisis data meliputi analisis hasil observasi, analisis validasi dan kepraktisan, analisis keefektifan yang dilihat dari hasil pretest dan posttest. Hasil penelitian menunjukkan bahwa ALPER aljabar matematika Valid karena ALPER aljabar matematika telah melalui tahap validasi dari 3 validator dan telah melalui revisi berdasarkan kritik dan saran validator yang meliputi aspek ALPER, tampilan, dan materi. Berdasarkan hasil validasi dari keseluruhan aspek diperoleh 80,73% yang termasuk dalam kategori baik. Efektif, dilihat berdasarkan pretest dan posttest yang dianalisis dan dihitung peningkatannya menggunakan N-Gain, hasilnya terdapat peningkatan sebesar 0,47 yang termasuk dalam kategori peningkatan sedang. Praktis, berdasarkan hasil angket kepraktisan ALPER aljabar matematika yang diperoleh dari 28 orang siswa pengguna ALPER diperoleh presentasi 81,6% dan termasuk dalam kategori tinggi

Torts—Duty of Property Owner to Licensee

Krause v. Alper, 4 N.Y.2d 518, 176 N.Y.S.2d 349 (1958)

Canonical Artin Stacks over Log Smooth Schemes

We develop a theory of toric Artin stacks extending the theories of toric Deligne-Mumford stacks developed by Borisov-Chen-Smith, Fantechi-Mann-Nironi, and Iwanari. We also generalize the Chevalley-Shephard-Todd theorem to the case of diagonalizable group schemes. These are both applications of our main theorem which shows that a toroidal embedding X is canonically the good moduli space (in the sense of Alper) of a smooth log smooth Artin stack whose stacky structure is supported on the singular locus of X.Comment: To appear in Mathematische Zeitschrif

Sales—Sale by Sample

Alper Blouse Co. v. E. E. Conner & Co., 309 N. Y. 67, 127, N. E. 2d 813 (1955)

Blind Dates: When Should the Statute of Limitations Begin to Run on a Method-of-Execution Challenge?

This Article is the first to take a comprehensive look at the issue of statute-of-limitations accrual in method-of-execution cases. In other words, when does the clock start ticking on a death row inmate\u27s right to challenge the way in which the state intends to execute him? Most circuit courts have held that method-of-execution challenges accrue at the completion of the direct appeal process. This means that death row inmates in these jurisdictions must file method-of-execution challenges years, and sometimes even decades, before an actual execution is scheduled. Although this approach has been the subject of much criticism, even the dissenting view would tie the accrual date to a particular stage of the death row inmate\u27s appeals