{"id":35813,"date":"2024-06-10T10:43:54","date_gmt":"2024-06-10T10:43:54","guid":{"rendered":"https:\/\/chineselens.com\/?p=35813"},"modified":"2025-02-03T03:29:35","modified_gmt":"2025-02-03T03:29:35","slug":"achromatic-lenses-guides","status":"publish","type":"post","link":"https:\/\/chineselens.com\/id\/achromatic-lenses-guides\/","title":{"rendered":"Panduan Lensa Akromatik tentang Pengetahuan, Biaya dan Produksi"},"content":{"rendered":"<div data-elementor-type=\"wp-post\" data-elementor-id=\"35813\" class=\"elementor elementor-35813\" data-elementor-post-type=\"post\">\n\t\t\t\t<div class=\"elementor-element elementor-element-bc4c94e e-flex e-con-boxed e-con e-parent\" data-id=\"bc4c94e\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ecf827e elementor-widget elementor-widget-heading\" data-id=\"ecf827e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Ikhtisar Lensa Akromatik<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-336463f elementor-widget elementor-widget-heading\" data-id=\"336463f\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Apa itu Lensa Akromatik? <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-eff411e elementor-widget elementor-widget-image\" data-id=\"eff411e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img fetchpriority=\"high\" decoding=\"async\" width=\"1000\" height=\"700\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens.webp\" class=\"attachment-full size-full wp-image-35862\" alt=\"apa itu lensa akromatik\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens.webp 1000w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-300x210.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-768x538.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-18x12.webp 18w\" sizes=\"(max-width: 1000px) 100vw, 1000px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-bac7c3d elementor-widget elementor-widget-text-editor\" data-id=\"bac7c3d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lensa akromatik adalah jenis lensa optik yang dirancang untuk membatasi efek aberasi kromatik dan bola. Penyimpangan kromatik terjadi ketika panjang gelombang cahaya yang berbeda dibiaskan dengan jumlah yang berbeda, sehingga menyebabkan kegagalan memfokuskan semua warna ke titik konvergensi yang sama. Hal ini menghasilkan gambar buram dengan pinggiran warna di sekeliling tepinya. Lensa akromatik dirancang untuk memfokuskan dua panjang gelombang, biasanya merah dan biru, pada bidang yang sama, sehingga secara signifikan mengurangi penyimpangan kromatik.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-20964b2 elementor-widget elementor-widget-heading\" data-id=\"20964b2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Komposisi<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-862e7e9 elementor-widget elementor-widget-text-editor\" data-id=\"862e7e9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lensa akromatik biasanya dibuat dengan menggabungkan dua jenis kaca dengan sifat dispersi berbeda:<\/p><ol class=\"list-decimal marker:font-mono marker:text-sm pl-11\"><li><strong>Kaca Mahkota<\/strong>: Jenis kaca dengan dispersi rendah.<\/li><li><strong>Kaca Batu Api<\/strong>: Jenis kaca dengan dispersi tinggi.<\/li><\/ol><div>\u00a0<\/div><p>Dua elemen atau lebih ini disatukan untuk membentuk lensa doublet. Kombinasi bahan-bahan ini membantu melawan dispersi cahaya, dan secara efektif meminimalkan penyimpangan kromatik.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-17984d5 elementor-widget elementor-widget-heading\" data-id=\"17984d5\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Manfaat<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ec79b30 elementor-widget elementor-widget-text-editor\" data-id=\"ec79b30\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<ul class=\"list-disc pl-8\"><li><strong>Peningkatan Kualitas Gambar<\/strong>: Dengan mengurangi aberasi kromatik, lensa akromatik menghasilkan gambar yang lebih jernih dan tajam.<\/li><li><strong>Hemat Biaya<\/strong>: Dibandingkan dengan sistem lensa yang lebih kompleks, lensa akromatik menawarkan keseimbangan yang baik antara performa dan biaya.<\/li><li><strong>Keserbagunaan<\/strong>: Cocok untuk berbagai aplikasi optik.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-a0a5686 e-flex e-con-boxed e-con e-parent\" data-id=\"a0a5686\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a52b2d6 elementor-widget elementor-widget-heading\" data-id=\"a52b2d6\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Bagaimana cara kerja lensa akromatik?<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-c5306d7 elementor-widget elementor-widget-heading\" data-id=\"c5306d7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Penyimpangan Kromatik<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ced0abd elementor-widget elementor-widget-text-editor\" data-id=\"ced0abd\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Penyimpangan kromatik terjadi karena panjang gelombang (warna) cahaya yang berbeda dibiaskan, atau dibelokkan, dengan jumlah yang berbeda ketika melewati lensa. Hal ini menyebabkan setiap warna terfokus pada titik berbeda di sepanjang sumbu optik, menghasilkan gambar buram dengan pinggiran warna.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-99b2dc7 elementor-widget elementor-widget-heading\" data-id=\"99b2dc7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Prinsip bekerja<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ce16dab elementor-widget elementor-widget-text-editor\" data-id=\"ce16dab\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Kunci fungsionalitas lensa akromatik terletak pada kombinasi kedua elemen ini. Begini cara kerjanya:<\/p><ol class=\"list-decimal marker:font-mono marker:text-sm pl-11\"><li><strong>Refraction by Crown Glass<\/strong>: When light enters the crown glass lens, it refracts and starts to focus. However, due to its low dispersion, different wavelengths of light (e.g., red and blue) will still focus at slightly different points.<\/li><li><strong>Correction by Flint Glass<\/strong>: The light then passes through the flint glass lens. Because flint glass has a higher dispersion, it bends the light more. The negative curvature of the flint glass lens counteracts the positive curvature of the crown glass lens.<\/li><li><strong>Converging to a Common Focus<\/strong>: The combination of these two lenses ensures that two wavelengths of light (typically red and blue) converge at the same focal point. This significantly reduces chromatic aberration, resulting in a clearer image.<\/li><\/ol>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ce9d3ee elementor-widget elementor-widget-heading\" data-id=\"ce9d3ee\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Diagram Explanation<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-5b2fd04 elementor-widget elementor-widget-image\" data-id=\"5b2fd04\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img decoding=\"async\" width=\"800\" height=\"626\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works.webp\" class=\"attachment-large size-large wp-image-35975\" alt=\"how achromatic lens works\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works.webp 920w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-300x235.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-768x601.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-15x12.webp 15w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-9678b66 elementor-widget elementor-widget-text-editor\" data-id=\"9678b66\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>To visualize this, imagine a beam of white light (which contains all colors) entering the achromatic lens:<\/p><ul class=\"list-disc pl-8\"><li>The crown glass lens bends the light, causing different colors to start focusing at different points.<\/li><li>The flint glass lens then bends the light in the opposite direction, bringing the different colors back together to a common focal point.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-06f408d e-flex e-con-boxed e-con e-parent\" data-id=\"06f408d\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-125159e elementor-widget elementor-widget-heading\" data-id=\"125159e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Jenis Lensa Akromatik<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-df658a5 elementor-widget elementor-widget-heading\" data-id=\"df658a5\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Akromatik Positif <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-43798b1 elementor-widget elementor-widget-text-editor\" data-id=\"43798b1\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<div class=\"auto-hide-last-sibling-br paragraph_1252f paragraph-element\"><img decoding=\"async\" class=\"alignleft\" style=\"text-align: var(--text-align); font-size: 1rem;\" 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dt69OMHCHTrxu9j2QLVZfmYD7D9\/\/cPrs4dPpj3\/zDU83weAHK0ZfzRfRSz5xQHlWerSPnzyb\/ur9z6d3rl9U0OVF45SCh6B78vTZdE6BCJdAgEcwPJWhs6dPOigUb5IrqCpwHSzC2JJ0cHXqJHqygR0GoBoco\/5\/H9yZ\/o8ev0vAmWdpoRSA7u1GldnZjbH8ykZx\/\/HT6d9\/\/6Pp125c8MKx6Fq\/SUlJD\/onqh8espZ3u8Q1j8mDf23v7PRYgaUcNJ09ddKZjvasHFw8d9rtGQUXAXZGPB57CszTMkRmJLMRUGfFo\/WDMRCIasHQ4k+NA01u1SabfffNS9Of\/+zW9PG9hwrO7AjGQjDW\/lB\/N8pXIuD+5AcfT9967aIW+pRn3YuVpQtNDROeWv9Bwhn80HMdLPT9J0+n7755eXr\/9gPjW9+ZygpwKNT1wA8mZo76\/VfMJS1WFNCg3xV2yIYnpvc\/f1T+Efef0TtTfSUC7t9978PpTR3z5HUzx0KdAZIFwqMPxn90tUzJGMhZM1fVACg9ta9dODt9dOfR9FDZFJ3xiJUDdHRtIjJbt+d4KX\/mtFsGwYNCUzS+Xr90VgHHMV3ZGG2g1tmB6sgH3H\/76S2\/RF3ZO1PpJBmh8oSWYH8mKFoAMFBdh2MylbMUwBPTI72kfufmJS36Q9POjMhLH0wyHvZQh6al26gwCmEhEuOsYrB6VRD4\/8R0SS\/rH95NhoNp\/xFS70w58gH3b7\/30fT16xd8QN6pw4lhsQROFoPuDBEG1OE5QnwMUcrg65fOOctAW0QbQEyYnnWMmdWFRdY6KNJf0Ci0EmLJUj+frl84N\/3003sSz7yWG7Qj1ZEOuJ99dn\/68a1709eu7mXHV0pJYmDfZ++7VzLSyYGsUplic82kZR3M0I\/0vN4YfHjnYVi2Bb+yVNk2kn6pjTae21T0zLNG+SlHbtJnvJfPny6\/UPZozUKXge03Rzrg\/uyHn+hUxQWf2\/LOrwzRxznJAJVFnBmSQcyhq\/VJxhAniSMr5j4A+N1G9O0bl6ZfKNDtA3ms7KNtGPXhA5NBR6MdmYeQUr7Sb7r0JLv76Mn0iV5WZzux1erW23J1pAPuT9\/9aPqm3p3OGYYumSVZIHNP\/xBaqaEzRfLFYqWcNgBIz+mJNnLOw3Ea5t6jp+UnVho7PFm3fNBnaIt6Y2xl207aEQD6\/kczp2c+08nkWFpajLVdqI9swP2nH33i4xpe4pwDkkI8551ZegEWomDJEZUWvjhHCDBA9GONhlMwfTwVdgkNamB8QM2P9AoxjyWm4699mhdkj\/HC2dPTLZ2LozRvtmX21qsjG3B\/+u7H09s6dtMHRSra\/84GSRVJDMkAkZIsilbrv0AXfBtaVAJYB\/P0I0KXj60+1imSOZPCpVDXAz\/qLjjq91\/BlrTVUUBDxU20+7md1snm2\/o0pbilHfiu1Ecy4D7QQfsPPr6rNwvnlYQqa9DWw8dXG3mFbBMcGP8B1yo13+LKGxZQgUXgNkuKLp8gXN47Pb13W8dyBge34bd0oj5QxuPXakWBMSvgItQUbbvqnz97cvqUTxv4E522TEVr6\/WRDLj\/8pNb02\/qnNhTLVRyi\/Z8tr0zxJx5mP9FVvFyFD1UOl801iqpnKVKThOuk9Bbl\/em9z7TJw\/tuLChAaoXVbWNWvqKNSTGWUXyJiyGnp\/BxbNnnOHMGcYNAb0T5UgG3J\/p5fT1y+f9ATu73Hu8GvrZ\/fP8Jxc0HYrkQRn6IRe1AM4whRp4e9NnqKemO3rXyJsHc+x\/4YkM1DqYMmqu46jGEqL8lZJ56fcY+Xz2Y71LpTTPxA5VRy7gvvfR3emhzvpf1ScLzhe10\/s4p3d\/5xTWIlnEaBGmRiKxXtLIvmUjtTi9RAd1lWinx\/k\/Pm4y1+Znqf3M6hlraZepYW3Q9leUm\/Sxir29M6enu4+ffIEtxrT9cuQC7r\/q5ZQ3C1z+43zhNKK+s5E4zizILNUKpG85POT80UVKp2i3rBksqrKVFl4QVpH8kq4UScBhrx5RLl1biax1Jbf52RrmU+g0Ac80NmJ7T5dBfXrvca6dC9e2Wr2sbLU5cgH3nxVwX792wZPK\/vfudwYw4UzQx0yZ+WSd5Ao4RZM0imorozUYgLCVdWgo1in5nk5TcI0b5+Uam\/EARLfx4S5rG1uMxXT5iiw2cIie\/9TnypW7nAPUXyTxMXS23DlSAfcX792eOO924ayuvNXE5lG9ZsBXH7LLQiSW88UikWxKW8cWRrYhw0Qyo9UT8y1dpfJDvWPeL0WGTuPTznXjM5pWRwFMl\/TBYAkRz\/2+Am7wGroj7ZEKuP+ok71ceq2kUvtbrVOP9vsiOySzJAOwDu4VzpmH\/AAT2eCHnmsBZtDcRdeg+OScHC+rF5XtylNa6aIOdn6gy18xizJtnnrDZ4OwEz4NF37eU0ZtS0MX+A6UIxVwf6kMx\/Gbj5c0ud73zgjsflH1iNxSo8gGlqMhTOj9+qwWEjepwA6bhQdTIGRc3Xtdb2B8Tg68LZSfNLaBSqRBGNYc25O8fDGEmGk70sG2yPOnT\/kzVdPoA7HCblRHJuD+Ut8p4KCZBzu+d3Z6ZABNuB\/JCC2Hmb9ekJmKylwHW3Ywhh\/SChYgZxfplfzy+bPTu3r3nO8wgEIcnZjBp62MGkg4hYOyk9K3WH3\/o5\/+OQWcMxzY4tHblXJkAu5\/\/uzT+dwbu71mOL3a5may62c5MKjGLyl4kcxSmy07c\/oQqiDW2ZA\/1ymafrfKN7kauNARy3qL2n6MHhoCASz9eSBG2QIifc\/hHt8GK1uxszv1kQm4\/\/7zz3zdG7u6M5z3eO30NNn1kVcGYI1KJxkh2cLJBNkiU4xlc8pQNYPcRR5b1bOcL8WcnN7Qiej39VEXchfJFurmludGtLWZLnvRp44t2yx7Z\/W9jfv6FtlBW9baenUkAo7PTclafEMqxzLz\/oZm96dJhkiGC98yy4sW0H9A0VzqW2JzqcAid1t425LYbcsnvWk4Nb2rcfKS77LUoR8Ne6Cf4pFk7DDKl2UZnJ0aVfbO6E0Dp2FKs+zG2i7URyLgOB1ysz7KcvZit2t286jeYEhW8ixA54JejtAoL\/XpJ3+5SeWsUqiBF8pgGPGFoev6ks3Hdx9Op\/QmwsWy8kHfFue6QOJjI5Q7g0BBAv8bZZKvGnJaZNNi6e9AcyQC7n\/o+O3NK7w7JQlob\/PQ5OZRvWaw99WH7DJEZiQ3AAh\/U9o6lg5DsYlsRmOgH\/l+6c1L56cfKcvxDX1krd46eMYCdQr9Bd32WlzIIFRL8fb9RwpqfZPfsoXu0NluZ\/UBd+v+4+k9fVPq9YtnKwGQEXp\/kwQqazgbdJ\/EkD7T717hMOI\/MTf5+xcKwAC5G1uxbA\/tM4b8URcngSHtp9Uh\/SjflqcKh75K23O\/KyGKT\/OmrlLhEve2ZF9Ad6SsPuD+t15O37mmz06dMdjl9dAEO1+w7dnvtPVIBizauaDkaKBv\/KzftO2wcMBcqR42C1+6toMtyyVTy7vVD\/WyynFW5G4sk0nbtK\/yMTgIVdpXCDNsAH4e+Zb+A71pMF1jKXWrbbtafcD9ud6dXtPNXFh\/72qyhrZ67+z0YGqq\/RCn5QZZa+BnYPeW8lgD7B52SCtQ5mU5wwoj2UcIMXm3ekNj\/fGtvKyW6hhPrKcuS\/ZjHF7oNAHAtJr6U+Ng5k1Djwue\/nemrD7gvvfhnemmvg9KcZZQld2dOSZjWFIN\/aXcNLzA24qpqMz1BgQNZxa42BzS6iMHktZMdXm3+sOP7xncOgPiUWyOBUpqKQYOSrz0g1Bf\/2RP35XJsiW2jWy3XXXAvfvJ3XGbrN7J7Gw\/NK\/s7N7pTgypSm6pUc4QlllBetjYpy\/RKE4ZAIIbrQC2uiEHhyDtNX3M9aGOOXnjMPsoSDwbHl8eyUxbwcajUBJQPQY+S+UuAK1Z6DH0bXdWHXB\/pVtUvaaXKG6Z1VnLLbRm1g+ygnpp1B\/YgUBqfS+GdYPf0I\/QNqnQaVtp4dUjigs5XSs5A507fcL3djunK1sCtTXbpAcvJZTHDsM2ShpFOzSKcYvHXZae6V5zfTcnw8raLjSrDjjOv3EGn12cHc1GV49HzW56ogKqTDDLW7PxM7B7UYy89ES4V75MmVc6VoEhlB74Xrbc3ot7uiEItNpQrjN8+PoDRLGtJpqOlYET5ryu\/H2g6+KGfXR3pKw64PiE4YbuGlR73u0ywzHHyRdCjK1OJgi312CIzJip9Ga68XEofmUVewGmYrT7LadFkBbffKProzsPppHhWq8GCTyFcS7GahuzNIap7cAuqLB7T9+naElb24V2tXfA\/N5Hd6YrutaMm\/k5gMgizHunAxaHIpoubHOqD2FatXNG4SBipwCDPxQEkF3d+tRY6WPBH8sLQg8Dz4fco2Ag7iC\/dO6MMtAzH9wzfg4JkDpLNdJwWytNBLFRhho52O2BS5T8TtWaeZbW2YFqtRmOL8twNS2XcBNQyVr066HJZaqh6bkNcGDViazlaKBvetZv2nakYVhjh83Cl65tY8tyyfa1fNTFZ6s5JYeHWLev8jE4CFXGczBhBkzzkdkFlayNz1N5SuB3pKw24Lj+jQ\/r2fR+VH4InczAHI8cwfb3QxyBnA2qgnLXi2LQohdp5LOee9jBIfpqglFrVhjLYzcATV\/W2H\/Eu2xluB5PrKf2ALDLXxmObhEAymmhMgDxzp0+rYDjngM1hhjbiXq1Afcj3YbrNX2clV2dXey9zY5mt9f0pgdTDDMrI4zpBxFUWANYKqGtOptIDz\/D5jA4eBjozGbmguZw4M6Dx75Zop+DLWJscywbYzPQDstZ+tHAOOrP9VL9aPq\/Oj8ZRkF3pFllwHHfN268zNWt3uTZyOznZAsx3S+anQ6uqmBmBFLzsiamDI2NuUYONSr8lF23JUpfAstpEaTtDMdNpnkOnJPjIN8Q1fnDCWUfbRsgLerKqPjCzQmdCN\/TN9d0T7xIDN+VapUB9+4n96Y39OlCzr95UzsvZIOTdcaeT4ZBWrufTuRkBDOj6z7Lgm7wC6k4LTPEmLaVNvnEOl2VL5Q70y1bPub6gd78xPLwXL7aX8YSkA25axBj9j+YGrNa4vKRXlLFCSwaO1Gv8l0qnzBc1B0fnQH8llJd3hVSmG0KC6CGXU6bt57uiKOCnI6qaASPRkq9e13Q492oICekhz5omZJbr3x8irlfu70sW77RxZdryHQn+Opq+cJmSjj9lMZzG2J7n\/XK7yO9kWIzxmKPpJW2264yw\/EO9foen5\/WDnZEQbH44vGoeS1ECWFuyosz8Atg7C3qYG0ilX2VhXaIxH1VNZaYgIaVFhnfzP9cx3EnFXDi6jHXWA1nfi42HOMRG7\/Qszq\/gjP5k4aWFHgnmtUF3GPdEukX+j2Eqxd17xBtffa4M4A66YvXfMvMNa+BkYfPKmAFni1YF3q2FwTI8OyICqzVqrW8+y0fhqxsP6VDZuO3Iz7U91b7G13SHubjt2g7j026Mwh\/7Ysh8SMn\/FRSLOFql8rqXlJ\/ojt185sI\/i0qzWRv+M4DM51pdkYpXBIANXt\/rioxwLHBptNu5p3WM1dEZ1P8Gq\/aY6iBIGfpwR\/WXtGhAadH+LgrnhiEkBjjBDIkL\/uKnNiCD2EBVbruEV7yo+bx0\/r2ve1gcTfK6jLcTz69r2vKdHWvpzALwQRD+4+ZFaMnOD0DvBBkAD+Yf4OsNfBhRps60rRdA7bdYQub8FLom+EmgmQh2Jv0VQXa+7f1XQeO42whdVkyz\/aGrfZSPmyudBEJzHV3\/OicRxR36u9GWV3A\/VSnRM773iFMaLLJnF3EMXvOFemJGbgBnZWyBCBm\/AzsHorpj9YsbEovDu03SLOHhuUIapD7ae4jd1ffIyXgMorNsUC13dgY1OzDCPHLD8dwCbglltFvv6wu4Pg4iKwwMhU7uHaxmplPv+je6cUIprIJssoPtRpztrB+4ehT3HYlx8lYtOUPzAF5McEMYBQ4l4hCgo7zcfx1CTVo6xblJn1rSBaxfndLGY7Lk6LdtnajXV3AvacDbH4Ew1nKGaaTR+WHyjre7JrjzkCdBMgS1oVB1lGbv16QohAvpPSDdWOdYavHEVGZxUB8Yagz22GtzvvqjZBOjyh+DhuLh2n3sUk3g4MunR6DWu4dxW82tC1BdqasKuA+0u1E+Wa5P390HuhdTXbhLxnE2a+muLgA6oFOuOZZr2jrNLBVkLW8WkHcc1aJ1NmlfWYgNtAZ7UXtDZ3Efk\/vvFPaF9Rs27KksMAs9kAa5QxHRYYjv9Uo3ZuVtttb1bvUzm7OHDVv3r3Z6OYkoyUBwGCXR5DGnAW+EYWyxoxsKW2K267UJvuQyRaYDXnenUY6v1td0hd0uTlf7eN3W3W9rnx10PXoi44zxRE4ih2pRkMUZ6LV9zGcXlLpg2i0ulsvqws4f4lYEz4mkUVowrNbxGJxDPEpBsmAA1ELnGINRNYp2\/XJAVKbVZ1WOOur8n+W26iFwRddD7fwKhMndBNBXaGrj6L6nSrmsU1F467J0RvyJTvSZDhuORvtHhTI7ZdVBRw\/DXmJj7QUGD2NHVfNmelM7sh4UgAzaMQ2Es1ZL5ah6Vmn2oWK+QCwZ9zAw0OBKnIWHtQXtXzxhY+iHnITGkUNmn+T83AcJ\/HT5x6ZjS2ClkFtsazqGI5zcJd1tSyrkt2rmm2tRzhNR8q8pmeAsT5+s370Zk3QC7z7LZ35uGt\/HkeNhXFYVvIMTLwSfFnL1\/s+4d4jPh+HEUo9qzIcG8MLxu20UO7De6jvM3AHpRLO47LN7VarCjh+g4B72JI9Kq9UNklWGInF8kxs45w2CtBZaUYE1XSstc1hwWJMYMtc\/OhhyjxDomiH6iI3JO0X0Rf0KzIf+Bb7pW5TeLGnGLYtjHVJP4jYZ0K4MDULu8S2znbb1bykckxy++FjH+8wjfM+r0ntuWXXUxwIdHIMlteo0EYIP1Rgj4VNTnyu1zS\/rA1PWVZ0fZWIKrfQMnTgapESzuNML9bxt0lzl0zehc+S9EANG\/3cBghJHaupG9yJ6bRw83e2+lmitP2ymoBjMa5q5yajMM0pHVcdDgfkjZQCOhtyGxn5wQZDASy8OtZbSi0LAHuWhwyqGZiRnCAD9aKWizA\/0m+E8dL65Bm326LUaBS8jrV+shD4SKXAb+doyY9elscxHDCV2Et\/m\/VqAo57q53jNle1y3uOnVmYQTIKxWuhBapAyCLDZ8ELQIMcBosJXYs78Cyc+akjjxS95fVwXvcakOPAKqoIth7vsBZ77bVb3n3z6QAliPTol4lFB5mKBYyzbKqB4vQKb0CwRKjP9qy11Wo1AfeJbsvF9wBYRErqQe6jKzMYV8hWEBITg4Re2NuUQAXZeLeqzKctxobNBmFXggQEzDnTYWFJk+G49IpCkCYTt\/cKqTgDYFxsUCeoxnk4HcA9eXZ8Hq4m6a\/X3Lr3yGfQe7J7ynvSvX6Y7sVYLI67ZCD2uhpD1GZ5zY0oQGeE5TFcNLP4+N3McFluQqn+bf+XOQ\/nYcvraX22xY1oyHZ9tQf+xnPt5xaFIWl2cLkejmQ5BzoKu1FWk+G48SA\/710pZQRLx1XngpnOBCdTqO94EKoADraqYLlrWPWKh104rosHY9iRsuUtA9sM95PhQOUF7otbLpy8pTtYvnX6fAakTYIpv+wrmvDpoCLCIkCarntIhZE8vzVWgxLbesZst1rNaZEPdAznGzIz2XpkAtXSgdV\/plvO5A6AsSyGHy1Cb9iLnejMdSzgpOy6SwULHjYa3y7FoFuCl2k55fNJ\/ZK0lWPZtmdbsWt52y6cGhz6XB6nfT2i5bistN1qNQH3+YMn\/lqg00dlFXZzskl2OVPc2cUJwHNr7gaATLGUQy3pgOe6LAxrgK1BWwOgATdA5pccQQGM\/wJ6TwF3W5k8TwJLGdlsV72yaz\/lMaNHVn7U8MbhqY\/jgtyVejUvqZ\/r2GbjXeqYwVqOakY6GAvjoytt9gFwImBxZg7GOugqgwgflc4okUNtHsOJlqED5+HipWrsx07lyENproTpL9Xosy5j0OoRjOcmXpgejbpq898CBxzHgfwc+i6V1QTcbX276VxuxOH562DpuOpwmelMc\/M7wJKRKthsJIhhr8NQDHhIu8WicZa5UrCVPKSdegw1EOQEBKgva\/ldLu4JMpfY7mO4kd14Ke2BMCZ2hmmCSx3JdYVS7ntcxnYl7FYRcPyUd35Di+nM1PUcHzwPV0tbgZBF1qyTsTz5NfXI6aoKJ4s78LMnQBgY9f4MF0EWfaw7Vgk2gsPaX96e0dW\/HOznMqVZq0w4kGysKwsSyEbjUn7xdOZEvtdAP55babvtOgJOL6fLX3BhyrywtNXZpCszGHcQAKfx9PbTEruEvym3nipzaWsANJah6U6oznBhzpnuMPqMXv765G+PIFZqU\/STHRFYPuSQoOrzcGQ4Xgye6LweiOOAy2y+dM31\/uNYpCZ7nsRM+ljtXozF4rjrA7JouZZaaY4F2VgeMqIB7WmW7s9w2D9wDGfQcrHbd9s7SPOS2mPyl6OxuwyYfm7MnNXLRpp6Hs07qVMsj6cbF3SyfIfKKjLcPV2cyJdNvBgVSL0wHVcJB3Z5ZjdYgmpm0B8ZCViB0CkUiGGAnnW6LZzxqiwf7cJGBLbTGQ50Xq5f3KLETaEzjBoNL\/uKo9gSwARIHHVNj2CDx8dbumpE5y0ZK+yEofpbLqs4LcKBdL6ZrtlisvXIBGYhMqHwmqYHtit0WjWdIbJO4a2CxNJRh4Pt4DIEaGzCqz7uKFYoGwYFB\/\/LzsfxpvKRPgclw2GobdtsHNJNaduFwz6Dgn1Sx3DuqA97V8oqAu7e4yf+aW1PWtLL2NvewdrFbGQ\/qqJJKUk13vKVlVreWazpzhmxUZlsYQ1H5tLalijzFiAPLPIxsMK\/iCY4\/E7V+hmZ1FLsZFDipT9GCClMuDr1u4SWiW03q3hJfaiXVG6R7ML2Vcnx1aLTk1vynngyhEWzQnb8WBgQlF6ozgc5EJ\/zQ+RI9x\/D2QH28+\/Esl+77bS3L6I513hXJ7m5JSv28NcjsmGGSjHTo1FXbf5b4JYRGwZ+R8oqAo5bwOunDVJq2zqIxOld3OEy0wV3NAD0v\/DRdF0VrHBpu1f44phfOOPbjlo0Nmw0w\/wXH7OhnU2Rls9T7yqj54nVaOoYbjxZNpWH6erQ83AdgEEsgjbTsrV6FQHHZTuneZ9PWWQ4JpN3h25JOxTTWsIKhDHV4gdR59OQw1gspu0IlUUKvsMBO+CxG0NlB58ZgFvr2pEqYX+Z83CY4jsNvpatggpT9ZQXHZAqFmSETTaVCzAzVA\/HCtuvVhFwD\/WujZ3vwoKrpPaaHkJXZlhK9ik0iSX6S9pqg7cpN06VubQELljzSrMZ5ncIwCRIX0zz5uiRP22wEdtGz8++nvscgWAyFuTL83CGaofEq2E7Ua0i4DgZys53qcArSqxMejdjMXpxvMiCcYzl0os3NLOYMhBE+1FgmNGeIodKpquMh01wgPPvIRBWlNbuXnkfkv00z5PTIv7wvVDDRm+6Ybh8FKAopBnDyOpm7US1ioDjQ2jizetfgeS+prDjqsNlphHyX0j3wYd2XRWscA\/BY8HybrERO+gcluHswlXkBBXjeJmWQMvVusRHjb5e9vHloCLwPGBX6QK3FB6e5FPz5mEIbj1jtlutIuD8+aKO4Zi0553hNJNeQu1iTzFph2Ja0408CoMfRL3MLOQ2aXtZql5Gq7N0zl6izJDUhiI1YYXWYgweCNEmXRNY8Ti+rCXgHtal5hhCq0wMWzZkF0gTyObZRXlQf5zzGwrb76wm4E7121QtIqXrIov2Glsa+YzcBxgklsA2PhR6zVvKSyqwe7QVqEsbMRiLyUoJDAIIvYQE8oM0wTXiLV6Mcyz1k+0ItKOMJfL48aassfE8dqmsIuD8W1SeUU1dTTZJx6U7gy5gBQKLa1HjarnJPlGpjFCLO\/CiY6kdd6ioFevlvrU1hsvAM9xqv4gmw+UO5MAzth5BP\/cyZDnhZhRjmgWBytbQtWz71SoCjh9C2+u5ql3e8dWbvsNnpqPQfKILHTIOxXVVsMKl7V540HDcFs54VeaPdrZRgviRPEH8ci0B8hQH0bYpItz7rPkQhgR32PVwQJ\/rd1Pb0q4E3ioCjrln57tU68MqMV7leTinC1bSQ6FiOdV6VbO0rlsu7C97DGd8B5ZDlefoZ77oLOnKcIzEQ0lW2+gXfBea1QRcllNTVovRdK\/NJp3skwkuySZg7HyiBVGLD\/Y25capMpdWA4DXD\/s0QRV5QgD64DEb2ku5EYJmg3WGCqKf+xyB5cM28EVkiqdoY17GpmQgO1JW8eG956oji62rB5kgD5PkmTyaXxOcpUJnAKI3M9QLKioNbJVI4VLcqrLG8CXKvGAMMgN+Cap9GZorReZfkrGnGC6bJnogjGT40rjoq3Aa6ee6jWsos3aiWkWGYw6JN+\/nCjz3NYUdh8kzSxoh\/4V0H3lo11W1bciBj7rpyCURwBhaEel3u9AtuUwYR8iAeqnWRtGkxHYfw+HTAeQJiXyu6SHFAP5OTG\/p59kZM2zrqbvtsoqA42OtmjfNfaYun5Wyu7MovGt0MS0+AQFrwS\/N2FrIbdIrg4X4YuGsrvplzsMtAwpFB5dsdsaBjvUvaREH4o7JotuWDdkYAsbZADNN+TmR5vI\/VLbdWUXA5beoCDmVCoxQWuZmV0iGThCWwmiAHprh4AeltnvNCyfckopwj1YOW6NbM3qcahMQSOdMF+uH0QnWDKdtV0iVTUXxGC0dUObUMVyfh8tXDQu6I80qAu6CLi8f3+kdGa6WjCNjyshktRgVCCyVEcJFspDTlV44WdyB70UsaS+rQ0QKv6rzcDyVv63zcAlxLO5OWUXAcZOX+\/UNpE5pFWZNepczrZ0ELFfVOYKog3dohiuZ9Y2iV3gslJ202Iidtpc2+FYcfgROEL9kC772BBax7U3hzWFK0S4igrhj05k2yPLh3wiy5m6UdQScjkWe6+Svp\/OQDMdc\/20cw9mOvHjtVGf5FC5eUFFmSEpbUrdWaK2IHGQOHoOFfrkWy+OcY2mNABwdUCqmE8hNDkruGBFe4xnE9ss6Ak4f3D99VheZk15UUqutziY98tqMFADM\/p0P13yMqhzU3C83KDhsagCtT+tiRijkCTZovyC\/kNYFHouA69FUuPaTHYFXPjQCgmp5Hq59xmuGtQv1KgKOLwjzY4wuNdnzri1+NeP1qAKBibfosGO4GPRidagNfC3inB+y+F5YVb\/KYziuiSPw8I2\/8VxHoDUzkmYXhWJNQ\/TN2JFqFQHH7xg8\/RUdwzmMtLisbx5eaS9P0yQWcGnVh66AnttgWnHmJ8Ohn2B+ccsdj\/ylb5zYK400FU3JlqJN4AlM1\/QIOXjaZGqeyZbNiJ1gBLPdso6A02XXfKDt6aztfNh5OE+1MplbVTlLUFO9yHCRC8dCqEoLl1IZUVbsD04cZ9VYQZscUq\/xMqCQO7cYa3BoW38xzSgccBVUoOspq42uWCkZ2LCN3\/JsnRP+bmoNt1S23awj4JThuBW8i7ds72otc8VJhdmC7qkdAAciWYLieq5Cm1\/4xlTbWrSYwJ9bVa3RrRntR21e2JASzC+mn+m11Lcls37bjoXx5HouynNsMjDmSBRyxqirRXatrCLguOFy7nmr6avJ9htHk7XMnuzIvbQVCCyVEYsM50VA7vWpxWShUG+8qCzfUl7S0jMAY3GYRYZGTkWwjeAwU9y0BTpAc+x2TveJ8\/NUH3Rr9HPHephIKoDVDa5qGmW4UCjsRlnFh\/fndeKX2x+wrpVW1IdSrcYPc6DDCNYI44BHFEzLY6OtLfDRKh\/IZ70NOyIia91yB4iuwS\/f3td3UslwZLpYxK9NYSQPG7ZxIPPYLGY0FG20uh4utJlbr1aR4c7z1Tl9k4ndOn+W6rnWps8E\/03Ow2GYY8KU\/cdwyklOp4AYgHC0IdKKxSiS\/yJ3X9jOcJ3ZvqzFCs835oOek6Qd4zzFgspw4kAOymMt\/cbvQLuOgNOOJ8O5VGB0eHScbNK9y9EoiRp6v\/wxXGzFSvVtKwaxF9nw1I5quB0CoF7uGO4M39+w0bZdYdpPdkRgPINyfNUxXEWe3EUf2a6UVbykcjPC8fkik63H+AvpCWdiySh+1AxnqQBZbVOOwrAUhYG3ZL+8pDYXg\/GFT7toI3GG7RZU+2U0z5NDiBxA4I+\/KrZRlBuq9kGL28gJNX59MVQb2H67igzH7eTHvW9rl4+sUp3OBZ0EKkFo2gfAvf0ZznJBQOVRRNFwsQnObYk7s81tMF5SMAKrcUvIQL1My5sjfm\/LypWheHdDHGHTAWQCT3jomh5SeBy\/TdOvXb\/gFrb1gGy5rCLgLirgHnD7g8y2p+yvdR7Oa1HHaKwIC6HFzCtRLaaYS7pUtI69anAoDKbCSKxlQNkulX2AA\/1yLSe4uVghJVqVtEb2KqGMgksgm2e16HDe0vdjEa+tDb0tdlYRcKd1S+6zepnhBi19j5Esu5a51p8FZ2pnumd1AIwgS4zi7oKWIHaCaAmtH9JNSywVstvCWFOg9pOslMDw+GQhIYElgn+T5iWVu33O71KxWOEqmUtHoEeTMTuoslO0N\/ITlj1XUdqNehUBx1Rd0U+PP9Lu3+Pnj1T8xpGWDsWTrVaT7aWsQGCpjBAuO30hdxzUYgplvcaLSpjMcmcUFt2GYi2+8St+\/i23X2H7mKqUpNp6aZe0z4SIzScNj4oA1Rr2b4fNRFIBq25wqclwp5QpQ7XS9tvVBNxFvXHgp7X3OGWgQnBQWH+3xZlphPwPgHsj80QpcuNic+Cj7hqb8N02VgSWO9M1BrMIZn4CArSD8AXtY70T50KFZLcYwgebKa+ephRZCqMIkEqMQ3qElzqSO+Bq87WEdttlNQH32sWzE3fCnPayZ198DKcFIiA8\/8GTgUqz1oqF0b9Awe2TC2V11Rvn4aKtdYvUrdd7DijbpSIKHSmgwL+45Q3D\/Gs70i2tMjFs2ZCNjRGaBS6j4IP7ZEoQ8Ty0ttpZxWkRZuiKfg3abxycSpJdmF5IYoCGErrl5sDNP03pI4kSmq1Nb6bDnTn0LFXlPq3shbuw0iAs2587BryI5lzjno7fuHlPSmw35SfnJ1hijwazdmhxqnx7n8uchm6rbLldTcBd2zubUyNsYz2SMcg+2fi9k3Oeq\/MJu7skjUPX+pp5REYcgm\/xQg7K1rDF37BFv8zFpAgbN2ah9EL6sdLS5b0zhndlP9ik2EnsttwjKX6ayPsXbQod\/R2oV\/OSelVvGmoLJ1PU5PWGH1mmtrQbVc1nq8NzhnFbdAksg99A91XBKTtuF3baXtrZtk0I3HKCBurLWm61ysbqS7E4DMBGH8MxdgcQkRUB0nTdQ4ogv5fK4S5jRsl6xmy3Wk3AsRD8WrIXzfOamVx+lmpOLZKPo42rqeYYLoBaoFq8w47hhv0sDuvrAz2bwghFBEEloX3JKhnPAS3RgFoZ2pwXtpzcvqSNFWR80C8TyY6wu1jA8ygNN6EY5Sl+4U28krbWVtsVBdyZ6e6jp5587uyYogWvbnIBC96SnteZQa8znKUWlbzglVNaecBaN23sRH3WGJbUGeNQZw6BOdMJIdub9BNluAtnTpcE1227QqqNdgQaGZSDKu9+vAnGlcN+BrtTrSbgbuhd6j39qqCnnl3LomoelxnO06rFMF+LQzv2Nxmu6CGHoUUKP3io6AXf4WJvLDSLboVo2aRYaMOxrjq2Q7CN4Ai+vfW4ljRXxHCecbYc6aCHLTkyk6pGqG5wuS8J2S3aeTYe5w5Uqwm4CzoPx3yzKHzy09PYm77Da6a9Fl1ZAZ3OcOnDVi\/\/ttk0awPGCMsloW2sOsixR0sZPeNmOQsP9aKW+\/pih89RaRM8ZZFNAQPnFAh3Q+8\/D8cLgOEBRcX19qvVvEtlqm5ePKeXVX1dUBOeBamFEBFO0yU3iMoA6zjjePVsJnpNGwnWirh0gcRi3pWWnpiG0eqP0i2ksfCi\/KUtG+niWR2\/2Z7NlcXyA8u2FmNr2\/ZcOPH4eCx3fc+IFhpteGvtqgLu7SvnJ37KklJ7O5teROhKAousE0kAYJzhOlNYyVzbjN1NOryyUnZRd2YzlCxEJ5jujExqMEKUomf4PvqBjk+v6JQIx16xFouz9bYxS9tj\/KtGpIrzlRf8EWCPDFu7UVYVcDcvnfM7VZ3PrGySXV0bncRSmSQ7O1NsLgqVINKBawVbmvHLnGDMQt7ZJ4kG3\/Ww8TJXdp3ZcDEGh98vph8ow132O9QaSw0QKuOwMQzgwbZSZQzw7UoVFzv43fNSN1pbr1cVcG8o4HgnR1nu6iQLOPozEWlSRfj0I0qnYEOnkoPppIrg7Ulg\/9Eu7CTLLe0j9OA8jtgML+PC5uH0nQePp2vnz8RPnmA9y\/g0q523vOgxDkyLxyO3OKvxgt+Rspo3DcwXAccxXPY8y8muZsHV43wa7aA1+SSDehfKgbX+ARgnQTIHesaJLnzTBkgHPrdRcNt6CFlcMbHrUcSAnEiHqvyFNkf8w1v20Z6u+0MziFnLZpF0BxGl\/A0NK24ewzG42V7UtlmvKuC4o+PHdx9mnj1r2cF0K+yIgZKkzaob4PV3htkQOVqGTuw0IO2wWR0aZxLEIsrlrGR5PINLQICa361GOtMP9G2ty+f4uXDsdQi17aLL\/zwB8RwNVAmt575NhDfXwZFJvt2yqoDjmjh2OQfFPk7R3M0Zrfax5F7aEQjN752+kHt9tJhus3gJChYleC9+ywGy6NCp6ADVf+NFS+4QMdbgMF0fpO\/rDcMlXZzAc0PaiLIy0x6oABSDqDxC09FLEHPVcKz187LW1qtVHcMxW1\/TO9XPdLyTudcyM5+14Cy6M1gHm+fa3GDAoVByd0sHaB6R4wuaOtms2hKbhx3bKmQMWjF8dYv3opZfvL56\/iye6s+O49v+i7at+BIb4\/FlDGOJPz64H8dwtlL6O9CsLuD4Yshn9zvgtIfZ1np0bggdqrOAKWOEA5BodRMZRmwmdkpuJnyLhbRu6M5GCG3DBtoJmHBnncgOo8lw1\/RJSmlk2HYe2\/FfAxlE04x7gZOcWDzFF3GGRXV3pKwu4L5+dS8B52XJrmaGyQ0UdjlVKHNg9L9E9Evqhqpo9zbptuC29GKifIhYegNnd+bjSvZsMu1hNG+EOFyInaW12EbdJY6bUhvJ0Cs\/fBHH8VYWFwpb764u4L6hDMcP2Gaja2eTfZw82OXJLMk6PbcDYGwyTLBWUJW\/4MuKCTTn\/BHb8VF9OU8ma6QVUCl+WvthoMXfT5PhrugNQ4\/E1qpajq2eQJwMUMaAzC5UEXenfV8RtHerrOpNA1P3ztXz0\/ufP\/AsMrV94UjnBZIApVuygFmqaJ1hSm4a7pAVGkFhzLFcdmgHtvKKGAW37faLH\/i0LDvUYS3Hb+f1OfEZXbw2WxISZVW23adkbAu+wigCEdV1j\/B67iuG89VWgWzHsW7EtqvVZTg+3OYjrk\/uPdK8a2GYYz1YTNdNVxuJAUGg4Ec3RaNt2Exbofi2s9BDpn8rxXf1YZYJd4cOTOCb7T1lt+sXOH5DPNcii1PPEcq6YKq0LWvGLk+CGNvTZU5x6Lo1tt6uLuCYse+8fmm6dZeA0wZmdr2R6Sxpk3DyMAY5nWCHXtFBpm5t2oiVbRpXEFsRb85MpSUBUMPmjhnxX0YF+Oz+o+mGLkowdlHHUmwjc7GtQYmVfvyrDykMd77Md6mX2JjYdr3KgOOd6j2u\/lXEEXQkBrKDuzDgj5k1NxiLFnK6IAuvXujShjancPYHxyrSHL4aaQVULIMbTCsdpB\/om2hX63sMjCV\/ZWc\/Xf4stcv2a4djXLx49\/VwQbS97berDLhv37iYTxx6\/ry5KxtUFvDersoZAIwf6XSyiGzkCCWJAso2GNKGsW6rX3Y6W0YbfOQxEW5ntMNavqXFObO8Q7UnvKBeJVTGwVDmsRmUgUWnfOPnsb6\/6+8zlK3ZXtvdXrvKgHvn2t50R8c+fDG6MwiZgdRCEqDrnV2VZcXrrGSMeVQGWifY0DHSYmxbwXD6RrltPJjyH+hCJ4zZxglf+XJDnw+3rVgsu44J+vor8+4MAj9lM6jgxOPzXd8Qx\/yaC9vbfrXKgGPafv3GhenDOw\/9M43s9s4LbPrQPbkzwz1nBXoqblRZKWTslDyoFjuDWc0q5VG67bvg8Q8GF\/bnTvGHYPpUx2+vK+CMA1I96JTYHvRy7AZEMvRsSBnuKdfDcSHAgZGV3e01qw24337zyvTh53yQP+9yphHSbRrVMBqDnP4SNNNwk19KXjYGvDpuUEMuIjoFNi8ubA9wOm57vOjxDvW18Q4VsYGuYy224brY1qDESr\/1oq7spnNw3FOv5VHejXq1Affdm5d89W+WaN7LlaycKzLF3vbJLmIk41TOUOMcUEpBFn6xPhEL2biC0Ih5MI9IANSwuWNGZ7z7+nSBC0m56HJAouE67mPbfsqXwRHi3D0\/B\/px6LuFnvelTkNzaGy7s7oTvz1hv643Drd0Lo4rR\/zFk55bZQG6ufcI6MoI47qwyL1wEv3S9xYhOmySiqVWfhErvQoB7AIy1uAxjmSjabr94IlfTpGOJBgtNKuM3BUaYBd3qXJCGaVIdeclXT3sLx2Z0xPTitttV5vhmLbfe\/uKP3VgHToXdAbzNFflDEBQ+NGdoqXZWSOZZpO2ZVj8CRAbqKQPgz\/KzKt+8RBnXHPL+bebl\/SLza1HO\/5EuBQn5lHOA1kU3RpV48HPwydPfI+SaAcae9uvVx1wf\/eNy9Pte4\/9Y2idC5wEerd7yyMJA3Icw8EyuzqWkSVmmi4liUWSKIRW32K3M9DYMgF31oEZmq\/JfK7ziDcv6x1qYdyGil0cq+c\/hBT7b6LpgRrj0qGhPi5jaTPGhQZWtlpWHXC\/9daV6Re373sCvdDqkQTY\/TQpM8O9fVmCLBCl6JheaGPDNt3GanwEibB6cWeF6Mz+yohdPZ8+0yZ5XZ8u5Jq19ktrjYX32I7XtjEoGHib9az+XMdw+nzW99E7MDLjt1mtOuD4jgNXyn6ij7n4jVFnicoC8642l81eCSIdy+m2QKsAb5kTjIGzsG0MevCGr0bWUrYce8a4YwfQn+jl9A19HjxE9hvf+Le1qgaN6fJHdwYtxlF+dXXSOIazGSvsRrXqgGMK\/97XrjnLEXDOB5XBkoVAJEuQDCJKp2DJDgaXvICVLKIvedseevCKQGZP5lnFstjAH7bn9q7eMLBZSn3Gxkusody0+22jCcTYzDiwH5LvpXIFSq6vMw9TO1JWH3C\/ozcOn\/nKkcoQvaVp3a8cob5ZnSWgzasO8AWtbul325kkOIwZE6ugLcBGdRf+EEWBd6cXlZX3\/C17dCJDjZF2jY308VuUbRRhsfr+n58jl2udOqnLneqK38ijvwv16gPu7+h83GdaRG7ldZI7PlYC8OS6T6VH\/iWnAy+Ns1PTRiKLHIyLyWQS2ylIUEU0tlXEtsT+xKz2U20OXk6hy22LhI8t6hQ44Zq2jVna42w91B\/qlMjy6uG2tCvt6gOOifyDb1ybfq5fXfE38isLOA+MqjIBzSJLuOsUYOAiv4TOInWGod20A0n64W+jADO\/\/QUHjC8AvaV3p9YDN4tsZ9NaKDAu9l+Um\/TtH3+QCjruKzL\/le6ONEci4H7\/61cnMoeP4yoLOHs4GVSOUD+i7hTNChl8kEYkbolpwRZOfavRBmhBeHTDnXV4d\/rIX3a+oJdTlMHiYmBtaViLb3iAKFYoIoo2gIZtiOdbfuk+wea5jo8Y2H59JALu996+On2oL0jzZRTfNUg73bu9skAyQGeTEo6mwdEJ1opR0BrZFjmDTsPTLWHjwaAQtrtD58T0kd5Nf+3KXlZd\/BLZbtTmukDJVLApVmiiadzVn0RcmsQl63Aiod6dciQCjun8h9+8Pv301j1nOW1s\/qs4FVQmULMvS5AJOoUEWfhWV5sMkywC2zRqS4J+F2Ql7wzHLbS4OuQtjt8oogcG0o+5BgI3f6GiAKZL+mCMVcN9ggm4wWvojrRHJuD+\/jeuTx\/rcqVkuOzvzHF2Ots8CaI6COm2IGRoeKMIQTbiDwMqbScZL7IBNwAM\/LR0uCSeS5H4WSO8YsR2QgWrelizqwVtu9Gja4XWyoBsj1\/rue4riPfpWmn71ZEJuN9687Iv9\/GxnOaV7OGN3zlCtDNKKsuSYUpQOs4MEqDeVY6xxIuCW\/PKVqHtoFjB2Cb2J19KxctpsPF5AGvpPt\/wPBjMR4+hYdMC8XosiB\/qHNwFvgEGv3RL3Wrbro5MwDGRf\/TrN6Yf6WW1j+M6C7DX69+Zp1NLMsycNZZ0JZisTxHJaCSn2V5SjQEI2vSi1b1QdFzF4y19idtjwWphPS76sBZ1O4aHO0pn1FBmoGQ966pPhuM8n7ERUu9MOVIB9wfvXJ\/e\/0ynRzg\/QvHWdipw371FlnAXEJ2CkxWaNrMFzhbISpzu0DLWWSVasQ32uV\/q3+LNguVSpNCfu5jFw6iBhBNuSMlbqeSNAht1BZzeBbctw3aoOlIBx20g3tQtvX72qbIcacFxR5W+Wam8BIEgM9DwZIrQWafOMLSbdowSzzqA3aelGy4t706\/+dqFkpdt5DE3t7Y0rNkQVGlY32D7GlUQZY9MeolPMcYfuN0pRyrgmNY\/1svqL3QS2C+rJAzv9ex+ksM4DnI\/0s4aljtTVFZp\/dGihI3YCRusexZENst5I8NLHD8y3MdVjAoj8TdjY2lYG2MH59LGIeCVAeupD8ll6xfO5lv8sReo9XegOnIB94ffes0XZfony50aKkeMbEInRJqitRhLWlwxaoWKWGY4ZBFTp4eBMj1avujzzrXKbsgPxYa7rOM5eGy62HgT4pSzQpnkoy1ubLi0tdAoQ9trjlzAERT\/5DduTu9+dCcvq0kF3uZJCqpJBSpJEAsaXuONqMpwMgjYUk\/XGmYuoXAl50Q0l8C\/eUUfZbmIafs0yUjNSTvXje8sFXXJMTxK+j1mRPzm6mVl1MEb2N3oHLmAY1r\/8Ndem37KcZzfPLC\/9eDfj+rANXtBGym6s5B69MGltcKwY76qZBMwpWmTJ3TZ1IPpHd0lwLpDWvbRizl7Cze26GcIC9o8FCwdctu2oRP6eiA\/DndG5\/ryKzTRtuOdqY5kwPHm4bs3L08\/1ikSMop3eyWHA8dwpIXKGu6CVse5o6qIw0dgORjkxrqTfsmfaPFv6eO2r+lL2xLMOrZskPWx0f7wmj+rjLHbj11FT11M2p\/9MwY9yKiXztXnqPD4Q8UKu1EdyYBjav\/o2zd8ioTrwtjp9a8EUVmim6al4y5odZxHXCHAYvj0l\/YiBIAATOQcu\/HJwvmNTxbQBAs82KiFu6wLZDw2KWPsIW3D+kH5DQO\/uugRWMmDAbIz5cgG3O9\/7apvBcHl5+z0+ncm8LbXEmT3I0sOoA429Fglk2QLdfI\/tzD8iMEy5bsCfOu1iyUpJQltH8P0UU23rMRWsZHUn2HWGUpmBRmbynC6JvAN3bqV0jwTO1Qd2YBjjv\/Fd9+cfvDxnXygz2b3ozqSm3aKSA6gdpbplIIROBbTohs9mGHTumcBEG7tf0b3y7qqbBMJupg6iC22cZEOa\/E9W49jG7KoqyDE52X8hr56aJvmLm0JvgPlSAfcH\/\/G6zrLz5el9asbSgZklGQpOkV3R4thObmB7MPiVJVMFP6ADwxYA20ALHfo\/KbeLMQOsujOdJyBtbRsxdKwFj3rqkuxAhr0ecSA9dTn4s5r9Q51aas0rLbt6kgH3Gm9S\/3nv3lz+qGyHNs+2YROiDRFayWa\/tJjOBuKvbKadZSBzx8+1tf0nus7p3wrqzNafMx0nMUffpOJlnUZTJ7CH8UKTTTNCPLHl6tf52riotNS70450gHHNP9jZTkCjuvRkhTICtnzSRALWnijSj6WyXBJohB11AygTo\/m5\/os9+vXdVWI+iNTttxtY7EXTTh5zHV8Mxr+qsRoU2ojCeK5Dx3e0hsVSvOGrrnbr458wHF3oj\/69uvTjz+5Vwki2YapT4ZZ0PDIBwhGEcckLbISqx82rXsTN4j+XF\/o4ZMFQxszEODqgUzdBceoYQ3B4NRgYjREyY0Rn59nf4PjN+wuNA0r9V1ojnzAMcn\/5Ds3FXB3Pd\/JUtr3\/PtRHUmTcZQb1BE3DHJFCPOjF53GdDbhizxcPGB9bNgOqOovaIzqvx5tgTZ9\/FjPuvTBloIJM2wA\/gc+biSzlo3RYmV3ylci4L6hk6+\/o9tC\/OTW\/WQpcgD\/flRHa2KarFJZwgzWShCqkeGsXGwLT\/jSbs69fUt3dUIvWLINyvERuzZWmBY1KthCxCcWhoo6TUjqPiz9cfuIb3C9neXooGQh9c6Ur0TAMdv\/9DtvTD+7dTdZova8EwZ9OirUzi9FF6xShCRRCBu1hRanQrg5je8eLpxN0DbGxqHDAWAMPsWyeFFbzeihUcDSb7vo6+8XHDteS3ZFFK0l1gpbr1Z7f7hfdua+8\/rF6ds6Ecvnm28rE7DKTgL60Y386iP3WaMsaDOSYRwcUnDQCdVoaD7D\/JGOEf+R3qDwyYIzmXT9GYfaZDZa5xzT9iQGLppPx7SFwTauWDTGpwWt0zB6Tt\/WTwl86\/pF+ZTfvgDV0t2qvjIBx7T\/M50i+dd\/8n3dDFA\/DrdYhyyzGGJu8sMDOjD0FyC672nB+SGOD24\/VCDuL3MmawlB2YHbvG6d6RzdzVm2Cfj9PrhQ4V\/9g29NZ3Y40PpZ6EaRX\/jsGnOk2j\/5wUcbL2EE0nKRmY0saAKlZWSpyEraODG\/\/\/Hd6ff0UVqCkszZvQpOYTtILSFKN3jxaYz5QgmDv1mvlqEE7QPuWX1e\/Nu6x8piHxR495qvXMDt3hJ8tUb0lXnT8NVa1t19tscBt7trcyRHdhxwR3JZd\/dJHQfc7q7NkRzZccAdyWXd3Sd1HHC7uzZHcmTHAXckl3V3n9RxwO3u2hzJkf1\/Ya2vvDr4zH0AAAAASUVORK5CYII=\" alt=\"Lensa Akromatik Positif \" width=\"103\" height=\"127\" \/>Lensa Akromatik Positif adalah lensa optik rekayasa presisi yang dirancang untuk mengoreksi aberasi kromatik yang disebabkan oleh panjang gelombang cahaya berbeda. Mereka biasanya dibuat dengan mengikat secara hati-hati dua jenis bahan kaca dengan indeks bias dan laju dispersi yang berbeda-beda, yang bertujuan untuk memfokuskan cahaya dengan panjang gelombang berbeda pada bidang yang sama, sehingga mengurangi atau menghilangkan penyimpangan kromatik.<\/div>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8db43c2 elementor-widget elementor-widget-text-editor\" data-id=\"8db43c2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Struktur dan Prinsip<\/strong><\/p><p>Lensa Akromatik Positif biasanya berupa doublet, terdiri dari elemen indeks bias rendah positif (seperti kaca mahkota) dan elemen indeks bias tinggi negatif (seperti kaca batu api). Kombinasi ini memungkinkan penyimpangan kromatik pada satu lensa dinetralkan oleh lensa lainnya, sehingga menghasilkan koreksi penyimpangan kromatik.<\/p><p><strong>Aplikasi<\/strong><\/p><p>Lensa ini banyak digunakan antara lain dalam mikroskop fluoresensi, penyampaian gambar, deteksi, dan spektroskopi. Lensa ini memberikan panjang fokus yang hampir konstan pada rentang panjang gelombang yang luas, dan dibandingkan dengan lensa tunggal, lensa ini menghasilkan titik cahaya yang lebih kecil dan gambar yang lebih jelas.<\/p><p><b>Keuntungan<\/b><\/p><ul><li>Koreksi Penyimpangan Kromatik: Secara efektif memfokuskan dua panjang gelombang cahaya utama, secara signifikan mengurangi penyimpangan kromatik.<\/li><li>Peningkatan Kualitas Gambar: Menghasilkan gambar yang lebih jelas dan titik cahaya yang lebih halus dibandingkan dengan lensa tunggal.<\/li><li>Beragam Pilihan Pelapisan: Menawarkan pilihan pelapis seperti VIS, NIR, SWIR untuk memenuhi berbagai kebutuhan aplikasi.<\/li><\/ul><div>\u00a0<\/div><p><b>Manufaktur dan Bahan<\/b><\/p><p>Penciptaan Lensa Akromatik Positif melibatkan ikatan yang tepat dari dua bahan pilihan, biasanya kaca N-BK7 dan SF5. Parameter desain lensa termasuk radius kelengkungan, ketebalan tengah, dan lainnya dihitung dengan cermat untuk memastikan kinerja optik optimal.<\/p><p><b>Spesifikasi Khas (Contoh)<\/b><\/p><ul><li>Diameter: 50.80mm<\/li><li>Panjang Fokus Efektif (EFL): 150,00 mm<\/li><li>Lapisan: Lapisan Anti-Reflektif AR@400-700nm<\/li><li>Bahan: N-BK7\/SF5<\/li><li>Panjang Fokus Belakang (BFL): 140,40mm<br \/>Radius Kelengkungan (R1\/R2\/R3): masing-masing 83,20mm, -72,10mm, -247,70mm<\/li><li>Ketebalan Tengah (CT): 15.00mm<\/li><li>Kualitas Permukaan: Berkisar antara 40-20 hingga 60-40 tergantung spesifikasi<\/li><\/ul><p>\u00a0<\/p><p>Dengan kemampuan pencitraan presisi dan koreksi penyimpangan kromatik, Lensa Akromatik Positif merupakan komponen yang sangat diperlukan dalam sistem optik canggih, khususnya dalam aplikasi yang mengutamakan kualitas gambar.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-183dfe8 e-flex e-con-boxed e-con e-parent\" data-id=\"183dfe8\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a1e46ce elementor-widget elementor-widget-heading\" data-id=\"a1e46ce\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Akromatik Negatif <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-50b540c elementor-widget elementor-widget-text-editor\" data-id=\"50b540c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"alignright\" style=\"text-align: var(--text-align); font-size: 1rem;\" 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\" alt=\"Lensa Akromatik Negatif \" width=\"107\" height=\"159\" \/>Lensa Akromatik Negatif adalah lensa optik yang dirancang khusus untuk mengoreksi penyimpangan kromatik, biasanya dibuat dengan menyatukan dua jenis bahan kaca yang berbeda\u2014kaca mahkota dengan indeks bias rendah dan kaca batu api dengan indeks bias tinggi. Berbeda dengan lensa akromatik positif, lensa akromatik negatif terutama berfungsi untuk menyebarkan, bukan memfokuskan, sinar cahaya.<\/p><p id=\"structure-and-working-principle\"><strong>Struktur dan Prinsip Kerja<\/strong><\/p><p>Lensa akromatik negatif terdiri dari lensa kaca mahkota dispersi positif yang dipasangkan dengan lensa kaca batu api dispersi negatif. Desain ini bertujuan untuk melawan aberasi kromatik yang dihasilkan oleh satu lensa dengan lensa lain, sehingga secara efektif mengoreksi aberasi kromatik. Lensa ini memainkan peran penting dalam berbagai sistem optik yang memerlukan cahaya untuk menyimpang.<\/p><p id=\"application-fields\"><strong>Bidang Aplikasi<\/strong><\/p><p>Lensa akromatik negatif memiliki beragam aplikasi dalam optik, seperti ekspander sinar laser, sistem relai optik, dan banyak lagi. Lensa ini menawarkan sudut divergen yang stabil pada panjang gelombang yang lebar dan dapat menghasilkan titik serta gambar yang lebih kecil dan jelas dibandingkan lensa tunggal.<\/p><p id=\"advantages\"><strong>Keuntungan<\/strong><\/p><ol><li><strong>Koreksi Penyimpangan Kromatik yang Efektif<\/strong>: Lensa dapat menyebarkan sinar cahaya dengan panjang gelombang berbeda ke bidang yang sama, sehingga mengurangi masalah penyimpangan kromatik secara signifikan.<\/li><li><strong>Kualitas Pencitraan Unggul<\/strong>: Dibandingkan dengan lensa tunggal, lensa akromatik negatif memberikan kualitas gambar yang lebih jernih dan menghasilkan titik cahaya yang lebih kecil.<\/li><li><strong>Konfigurasi Beragam<\/strong>: Tergantung pada kebutuhan penggunaan yang berbeda, lensa dapat dikonfigurasikan dengan berbagai opsi lapisan yang sesuai untuk cahaya tampak, inframerah dekat (NIR), inframerah gelombang pendek (SWIR), dan panjang gelombang lainnya.<\/li><\/ol><div>\u00a0<\/div><p id=\"manufacturing-materials\"><strong>Bahan Pembuatan<\/strong><\/p><p>Dalam produksinya, lensa akromatik negatif biasanya menggunakan bahan seperti N-BK7 dan SF5. Pembuatan lensa melibatkan desain yang cermat terhadap banyak parameter, seperti radius kelengkungan, ketebalan tengah, dan ketebalan tepi, untuk memastikan kinerja optik yang optimal.<\/p><p id=\"typical-specifications\"><strong>Spesifikasi Khas<\/strong><\/p><ul><li>Diameter: 50,80 mm<\/li><li>Panjang Fokus Efektif: -150,00 mm<\/li><li>Pelapisan: Lapisan reflektifitas yang ditingkatkan untuk pita 400-700 nm<\/li><li>Bahan: Biasanya kaca N-BK7 dan SF5<\/li><li>Panjang Fokus Belakang: -140,40 mm<\/li><li>Radius Kelengkungan : R1 -83,20 mm, R2 72,10 mm, R3 247,70 mm<\/li><li>Ketebalan Tengah: 15,00 mm<\/li><li>Kualitas Permukaan: Bervariasi dari 40-20 hingga 60-40<\/li><\/ul><div>\u00a0<\/div><p>Secara keseluruhan, lensa akromatik negatif memainkan peran penting dalam sistem optik yang memerlukan pengalihan cahaya dan koreksi penyimpangan kromatik dengan presisi tinggi.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-23ab886 e-flex e-con-boxed e-con e-parent\" data-id=\"23ab886\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-57bee19 elementor-widget elementor-widget-heading\" data-id=\"57bee19\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Triplet Akromatik<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-7cef211 elementor-widget elementor-widget-text-editor\" data-id=\"7cef211\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"alignleft\" style=\"text-align: var(--text-align); font-size: 1rem;\" 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alt=\"triplet akromat\" width=\"116\" height=\"150\" \/><\/p><p>Lensa Triplet Akromatik mewakili teknologi optik canggih yang dirancang khusus untuk koreksi efektif penyimpangan kromatik dan jenis anomali optik lainnya. Lensa ini terdiri dari tiga elemen lensa berbeda, biasanya dua elemen terbuat dari bahan indeks bias tinggi dan satu elemen terbuat dari bahan indeks bias lebih rendah. Pengaturan ini tidak hanya mengurangi aberasi secara signifikan, termasuk distorsi dan aberasi sferis, namun juga memberikan hasil pencitraan yang jelas dan berkualitas tinggi.<\/p><p><b>Struktur dan Prinsip Kerja<\/b><\/p><p>Lensa Triplet Akromatik biasanya menampilkan desain tiga elemen simetris, terdiri dari dua kaca indeks bias tinggi (seperti kaca mahkota) dan satu kaca indeks bias rendah (seperti kaca batu api) yang diikat menjadi satu melalui proses adhesi yang tepat. Tata letak struktural ini memungkinkan lensa mengoreksi aberasi kromatik secara efisien dan selanjutnya mengurangi aberasi, seperti distorsi bantalan bantalan dan aberasi bola, melalui simetrinya.<\/p><p><b>Area Aplikasi<\/b><\/p><p>Dengan sifat pencitraannya yang luar biasa, Lensa Triplet Achromatic banyak digunakan di bidang yang menuntut pencitraan berkualitas tinggi. Ini termasuk mikroskop fluoresensi, spektroskopi, inspeksi permukaan, dan pencitraan ilmu hayati. Lensa mampu memberikan koreksi warna yang sangat baik dan kualitas gambar resolusi tinggi pada rentang panjang gelombang yang luas.<\/p><p><b>Keuntungan<\/b><\/p><ol><li><strong>Koreksi Penyimpangan Kromatik<\/strong>: Lensa Triplet Akromatik dapat secara tepat menyesuaikan cahaya dengan panjang gelombang berbeda ke bidang fokus yang sama, sehingga secara signifikan mengurangi terjadinya penyimpangan kromatik.<\/li><li><strong>Mengurangi Penyimpangan<\/strong>: Berkat desain simetris yang cerdik dan proses manufaktur yang presisi, distorsi seperti distorsi bantalan dan aberasi bola dapat dikontrol dan diminimalkan secara efektif.<\/li><li><strong>Pencitraan Resolusi Tinggi<\/strong>: Lensa ini menawarkan solusi pencitraan definisi tinggi dan berkualitas tinggi untuk berbagai aplikasi optik presisi.<\/li><\/ol><div>\u00a0<\/div><p><b>Bahan dan Proses Pembuatan<\/b><\/p><p>Produksi Lensa Triplet Achromatic melibatkan pengikatan lensa secara presisi yang terbuat dari berbagai jenis bahan. Bahan lensa yang umum antara lain adalah kaca optik tradisional, silika leburan tingkat ultraviolet (JGS1), silika leburan tingkat inframerah (JGS3), dan kalsium fluorida (CaF2). Parameter lensa utama, seperti radius kelengkungan, ketebalan tengah dan tepi, dirancang dengan cermat untuk memastikan kinerja optik optimal.<\/p><p><b>Spesifikasi Khas<\/b><\/p><ul><li><strong>Bahan Pembuatan<\/strong>: Beragam, termasuk kaca optik, silika leburan tingkat ultraviolet, silika leburan tingkat inframerah, dan kalsium fluorida.<\/li><li><strong>Toleransi Dimensi<\/strong>: Biasanya, \u00b10,03mm untuk spesifikasi standar pabrik, dengan manufaktur presisi yang mencapai hingga \u00b10,01mm.<\/li><li><strong>Toleransi Ketebalan Tengah<\/strong>: \u00b10,03mm sebagai spesifikasi standar pabrik, dengan batas produksi mencapai \u00b10,02mm.<\/li><li><strong>Radius Toleransi Kelengkungan<\/strong>: \u00b10,3% sesuai spesifikasi standar pabrik, dengan batas produksi mencapai \u00b10,2%.<\/li><li><strong>Kualitas Permukaan<\/strong>: Mencapai level 20-10 berdasarkan standar pabrik, meningkatkan ke level 10-5 untuk permintaan yang lebih tinggi.<\/li><li><strong>Ketidakteraturan<\/strong>: Standar umumnya adalah 1\/5 Lambda, dengan batas permintaan yang lebih tinggi kurang dari 1\/10 Lambda.<\/li><li><strong>Deviasi Sentrasi<\/strong>: Dalam kondisi pabrik normal, pemusatan dapat dikontrol dalam 3 menit busur (Arcmin), dengan batas produksi diperketat menjadi 1 Arcmin.<\/li><\/ul><div>\u00a0<\/div><p>Lensa Triplet Akromatik memainkan peran penting dalam sistem optik modern, terutama dalam aplikasi yang memerlukan pencitraan presisi tinggi dan koreksi penyimpangan kromatik. Desain dan manufaktur berkualitas tinggi menjadikannya pilihan utama untuk banyak aplikasi optik tingkat lanjut.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-26117ba e-flex e-con-boxed e-con e-parent\" data-id=\"26117ba\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ef82057 elementor-widget elementor-widget-heading\" data-id=\"ef82057\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Akromatik Asferis<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-138885f elementor-widget elementor-widget-text-editor\" data-id=\"138885f\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"\" style=\"text-align: var(--text-align); font-size: 1rem;\" 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\" alt=\"\" width=\"212\" height=\"106\" \/><\/p><p>Lensa Akromatik Asferis menggabungkan keunggulan lensa asferis dan akromatik, sehingga menciptakan komponen optik yang canggih. Kombinasi unik ini memungkinkannya menghasilkan kualitas gambar luar biasa dan koreksi penyimpangan kromatik yang presisi.<\/p><p><b>Struktur dan Prinsip Kerja<\/b><\/p><p>Lensa ini biasanya disusun dengan menyatukan dua lensa: satu lensa akromatik dan satu lensa asferis. Desain lensa asferis bertujuan untuk mengurangi kesalahan muka gelombang yang dihasilkan oleh lensa sferis tradisional, sehingga mencapai kualitas gambar yang lebih akurat, mengurangi ukuran titik RMS, dan mendekati batas difraksi.<\/p><p><b>Manufaktur dan Pemilihan Bahan<\/b><\/p><p>Umumnya, lensa ini terbuat dari polimer fotosensitif dan komponen kaca optik, dengan polimer diterapkan pada satu permukaan pasangan lensa yang diikat. Metode ini tidak hanya memungkinkan lensa diproduksi dengan cepat dalam jangka waktu singkat namun juga menawarkan fleksibilitas serupa dengan rakitan multi-elemen tradisional. Namun, kisaran suhu kerja Lensa Akromatik Asferis cukup sempit, dibatasi dari -20\u00b0C hingga +80\u00b0C, dan tidak cocok untuk transmisi spektral Ultraviolet Dalam (DUV).<\/p><p><b>Keuntungan Utama<\/b><\/p><ol><li><strong>Koreksi Penyimpangan Kromatik<\/strong>: Mereka secara efektif memperbaiki penyimpangan kromatik, dengan tepat memfokuskan cahaya dengan panjang gelombang berbeda ke bidang yang sama.<\/li><li><strong>Pengurangan Penyimpangan<\/strong>: Desain asferisnya secara signifikan mengurangi aberasi bola dan kesalahan muka gelombang, sehingga meningkatkan kualitas gambar.<\/li><li><strong>Efektivitas biaya<\/strong>: Dibandingkan dengan sistem optik multi-elemen konvensional, lensa ini memberikan nilai uang yang lebih besar.<\/li><\/ol><div>\u00a0<\/div><p><b>Area Aplikasi<\/b><\/p><p>Lensa Achromatic Aspheric banyak digunakan dalam berbagai sistem optik presisi tinggi, seperti:<\/p><ul><li>Pemfokusan atau kolimasi serat<\/li><li>Sistem relai pencitraan<\/li><li>Sistem deteksi dan pemindaian<\/li><li>Sistem pencitraan aperture numerik tinggi<\/li><li>Ekspander sinar laser<\/li><\/ul><div>\u00a0<\/div><p><b>Spesifikasi teknis<\/b><\/p><ul><li><strong>Bahan<\/strong>: Polimer fotosensitif dan lensa optik kaca<\/li><li><strong>Kisaran Suhu Pengoperasian<\/strong>: Dari -20\u00b0C hingga +80\u00b0C<\/li><li><strong>Aplikasi Utama<\/strong>: Termasuk pemfokusan serat, relai pencitraan, pemindaian deteksi, dan pencitraan aperture numerik tinggi, antara lain<\/li><\/ul><div>\u00a0<\/div><p>Dengan desain cerdik dan proses manufaktur yang efisien, Lensa Akromatik Asferis menunjukkan kinerja optik yang luar biasa dan spektrum aplikasi yang luas, menjadikannya komponen kunci yang sangat diperlukan dalam optik presisi dan sistem penglihatan modern.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-4ec83c6 e-flex e-con-boxed e-con e-parent\" data-id=\"4ec83c6\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-563319c elementor-widget elementor-widget-heading\" data-id=\"563319c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Perbandingan Lensa Akromatik yang Berbeda<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-45d378b elementor-widget elementor-widget-text-editor\" data-id=\"45d378b\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Tabel berikut membandingkan karakteristik berbagai jenis lensa akromatik:<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-f79d29c elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"f79d29c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_f79d29c\">\n<table id=\"tablepress-44\" class=\"tablepress tablepress-id-44\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fitur<\/th><th class=\"column-2\">Doublet Akromatik<\/th><th class=\"column-3\">Triplet Akromatik<\/th><th class=\"column-4\">Akromatik Positif<\/th><th class=\"column-5\">Akromatik Negatif<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Konstruksi<\/td><td class=\"column-2\">2 elemen <\/td><td class=\"column-3\">3 elemen<\/td><td class=\"column-4\">Positif negatif<\/td><td class=\"column-5\">Positif negatif<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Koreksi Warna<\/td><td class=\"column-2\">Bagus (spektrum terbatas)<\/td><td class=\"column-3\">Luar biasa (spektrum lebih luas)<\/td><td class=\"column-4\">Bagus (spektrum terbatas)<\/td><td class=\"column-5\">T\/A (divergen)<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Penyimpangan Bola<\/td><td class=\"column-2\">Tidak ditangani<\/td><td class=\"column-3\">Tidak ditangani<\/td><td class=\"column-4\">Tidak ditangani<\/td><td class=\"column-5\">Tidak ditangani<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Kualitas gambar<\/td><td class=\"column-2\">Bagus<\/td><td class=\"column-3\">Bagus sekali<\/td><td class=\"column-4\">Bagus<\/td><td class=\"column-5\">T\/A (divergen)<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Aplikasi<\/td><td class=\"column-2\">Mikroskop, Teleskop, Kamera<\/td><td class=\"column-3\">Pencitraan presisi tinggi (astronomi)<\/td><td class=\"column-4\">Kamera, Teleskop<\/td><td class=\"column-5\">Jangkauan Laser, Spektroskopi<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Biaya<\/td><td class=\"column-2\">Sedang<\/td><td class=\"column-3\">Tinggi<\/td><td class=\"column-4\">Sedang<\/td><td class=\"column-5\">Sedang<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-01b5676 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"01b5676\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_01b5676\">\n<table id=\"tablepress-45\" class=\"tablepress tablepress-id-45\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fitur<\/th><th class=\"column-2\">Akromatik Silinder<\/th><th class=\"column-3\">Pasangan Akromatik<\/th><th class=\"column-4\">Achromat yang diasferisasi<\/th><th class=\"column-5\">Asfer Hibrida<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Konstruksi<\/td><td class=\"column-2\">Bentuk silinder<\/td><td class=\"column-3\">Doublet yang Cocok<\/td><td class=\"column-4\">Permukaan asferis<\/td><td class=\"column-5\">Elemen asferis + jenis lensa lainnya<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Koreksi Warna<\/td><td class=\"column-2\">Satu bidang (horizontal\/vertikal)<\/td><td class=\"column-3\">Ditingkatkan melalui Doublet tunggal<\/td><td class=\"column-4\">Bagus sekali<\/td><td class=\"column-5\">Luar biasa<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Penyimpangan Bola<\/td><td class=\"column-2\">Tidak ditangani<\/td><td class=\"column-3\">Tidak ditangani<\/td><td class=\"column-4\">Dikoreksi<\/td><td class=\"column-5\">Dikoreksi<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Kualitas gambar<\/td><td class=\"column-2\">Sedang<\/td><td class=\"column-3\">Sangat bagus<\/td><td class=\"column-4\">Bagus sekali<\/td><td class=\"column-5\">Unggul<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Aplikasi<\/td><td class=\"column-2\">Pembentukan sinar silinder, koreksi astigmatisme<\/td><td class=\"column-3\">Peningkatan kualitas gambar<\/td><td class=\"column-4\">Pencitraan kelas atas<\/td><td class=\"column-5\">Pencitraan kelas atas<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Biaya<\/td><td class=\"column-2\">Sedang<\/td><td class=\"column-3\">Tinggi<\/td><td class=\"column-4\">Sangat tinggi<\/td><td class=\"column-5\">Paling tinggi<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-09e74ad e-flex e-con-boxed e-con e-parent\" data-id=\"09e74ad\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-587897a elementor-widget elementor-widget-heading\" data-id=\"587897a\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Achromat yang disemen vs. dengan jarak udara<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-25f269b elementor-widget elementor-widget-text-editor\" data-id=\"25f269b\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lensa akromatik secara efektif mengurangi atau menghilangkan aberasi kromatik dengan menggabungkan bahan kaca dengan indeks bias dan sifat dispersi berbeda. Lensa ini terutama dibagi menjadi dua jenis: disemen dan diberi jarak udara. Berikut perbandingan lebih lanjut kedua jenis lensa tersebut:<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-d32d01d elementor-widget elementor-widget-heading\" data-id=\"d32d01d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Akromatik yang Disemen<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-2a29fe1 elementor-widget elementor-widget-image\" data-id=\"2a29fe1\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"800\" height=\"693\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic.webp\" class=\"attachment-large size-large wp-image-35946\" alt=\"disemen akromatik\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic.webp 896w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-300x260.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-768x665.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-14x12.webp 14w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-6446ad6 elementor-widget elementor-widget-text-editor\" data-id=\"6446ad6\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Keuntungan:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Mengurangi Kerugian Refleksi<\/strong>: Dengan menghilangkan kehilangan pantulan pada dua antarmuka kaca-udara, lensa yang disemen memiliki efisiensi transmisi cahaya yang lebih tinggi.<\/li><li><strong>Struktur Kompak<\/strong>: Lensa yang disemen biasanya lebih kecil dan ringan, sehingga cocok untuk sistem optik yang memerlukan desain ringkas.<\/li><li><strong>Daya tahan<\/strong>: Karena elemen lensa disemen menjadi satu, lensa yang disemen tidak terlalu rentan terhadap goresan dan kerusakan fisik.<\/li><li><strong>Desain Jalur Optik yang Disederhanakan<\/strong>: Perambatan cahaya di dalam lensa dapat mengabaikan jumlah lapisan yang disemen, sehingga menyederhanakan desain jalur optik.<\/li><\/ul><p><strong>Kekurangan:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Masalah Ekspansi Termal<\/strong>: Perbedaan koefisien muai panas bahan kaca yang berbeda dapat menyebabkan lapisan semen retak atau terpisah seiring dengan perubahan suhu, terutama pada lensa berdiameter besar.<\/li><li><strong>Biaya Produksi Lebih Tinggi<\/strong>: Lensa yang disemen memerlukan proses produksi dengan presisi tinggi untuk memastikan keselarasan elemen lensa dengan tepat, sehingga meningkatkan biaya produksinya.<\/li><li><strong>Penyimpangan Kromatik Residu<\/strong>: Meskipun lensa yang disemen secara efektif mengurangi aberasi kromatik, dalam beberapa kasus aberasi kromatik sisa mungkin masih muncul di tepi gambar.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-818f770 elementor-widget elementor-widget-heading\" data-id=\"818f770\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lensa Akromatik dengan Jarak Udara\n<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-f2f556c elementor-widget elementor-widget-image\" data-id=\"f2f556c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"800\" height=\"778\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic.webp\" class=\"attachment-large size-large wp-image-35947\" alt=\"akromatik dengan jarak udara\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic.webp 872w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-300x292.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-768x747.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-12x12.webp 12w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-267ca58 elementor-widget elementor-widget-text-editor\" data-id=\"267ca58\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Keuntungan:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Koreksi Penyimpangan yang Lebih Baik<\/strong>: Desain dengan spasi udara memberikan lebih banyak kebebasan desain, membantu mengoreksi aberasi seperti aberasi bola dan koma dengan lebih efektif.<\/li><li><strong>Resistensi Kerusakan Laser Lebih Tinggi<\/strong>: Tanpa menggunakan perekat, lensa dengan jarak udara memiliki ketahanan terhadap kerusakan yang lebih baik untuk aplikasi laser daya tinggi.<\/li><li><strong>Stabilitas Termal Lebih Baik<\/strong>: Lensa dengan jarak udara tidak terlalu terpengaruh oleh pemuaian termal material seiring dengan perubahan suhu, sehingga cocok untuk lensa berdiameter besar.<\/li><\/ul><p><strong>Kekurangan:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Peningkatan Kerugian Refleksi<\/strong>: Antarmuka kaca-udara pada lensa dengan jarak udara meningkatkan kehilangan pantulan, sehingga berpotensi memerlukan lapisan anti-reflektif tambahan.<\/li><li><strong>Struktur Lebih Kompleks<\/strong>: Desain dan pembuatannya lebih kompleks, sehingga memerlukan jarak dan penyelarasan elemen lensa yang tepat.<\/li><li><strong>Peningkatan Ukuran dan Berat<\/strong>: Untuk menjaga jarak udara antar elemen lensa, lensa dengan jarak udara seringkali lebih besar dan lebih berat daripada lensa yang disemen.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ff25546 elementor-widget elementor-widget-text-editor\" data-id=\"ff25546\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lensa akromatik yang disemen dan lensa akromatik dengan jarak udara masing-masing memiliki kelebihan dan kekurangan yang unik. Lensa yang disemen cocok untuk aplikasi yang memerlukan desain ringkas dan efisiensi transmisi cahaya tinggi, sedangkan lensa dengan jarak udara menunjukkan keunggulannya dalam penggunaan laser berdaya tinggi atau skenario yang memerlukan koreksi aberasi yang lebih presisi. Mempertimbangkan kebutuhan aplikasi spesifik dan rasio biaya-kinerja dapat membantu menentukan jenis lensa yang akan dipilih.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-1fce2c4 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"1fce2c4\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_1fce2c4\">\n<table id=\"tablepress-47\" class=\"tablepress tablepress-id-47\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fitur<\/th><th class=\"column-2\">Achromat yang disemen<\/th><th class=\"column-3\">Achromat dengan Jarak Udara<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Konstruksi<\/td><td class=\"column-2\">Dua atau tiga elemen disemen menjadi satu<\/td><td class=\"column-3\">Dua atau tiga elemen dipisahkan oleh celah udara<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Keuntungan<\/td><td class=\"column-2\">* Kompak dan ringan * Biaya lebih rendah * Lebih mudah untuk diproduksi<\/td><td class=\"column-3\">* Kualitas gambar superior (mengurangi pantulan internal) * Lebih banyak kebebasan desain untuk koreksi aberasi * Kurang rentan terhadap kabut<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Kekurangan<\/td><td class=\"column-2\">* Refleksi internal yang lebih tinggi (dapat menyebabkan ghosting) * Kebebasan desain yang terbatas untuk koreksi aberasi * Lebih rentan terhadap kerusakan akibat perubahan suhu (karena tingkat pemuaian kaca yang berbeda)<\/td><td class=\"column-3\">* Lebih besar dan lebih berat * Biaya lebih tinggi * Lebih rumit untuk diproduksi<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Aplikasi<\/td><td class=\"column-2\">* Solusi hemat biaya untuk koreksi warna dasar * Kamera (terutama model kompak) * Teleskop (tingkat pemula) * Mikroskop (kelas pelajar)<\/td><td class=\"column-3\">* Sistem pencitraan berkinerja tinggi * Teleskop astronomi * Mikroskop kelas atas * Aplikasi laser<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Biaya<\/td><td class=\"column-2\">Lebih rendah<\/td><td class=\"column-3\">Lebih tinggi<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-2bef683 e-flex e-con-boxed e-con e-parent\" data-id=\"2bef683\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-1474119 elementor-widget elementor-widget-heading\" data-id=\"1474119\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Indikator Kinerja<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-4f2cbd9 elementor-widget elementor-widget-text-editor\" data-id=\"4f2cbd9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Saat memilih lensa akromatik, penting untuk fokus pada indikator kinerja berikut untuk memastikan lensa memenuhi persyaratan aplikasi spesifik:<\/p><ul class=\"list-disc pl-8\"><li><strong>Kemampuan Koreksi Penyimpangan Kromatik<\/strong>: Tugas utama lensa akromatik adalah mengoreksi aberasi kromatik, memastikan cahaya dengan panjang gelombang berbeda dapat fokus pada titik yang sama. Kemampuan ini merupakan indikator utama kinerja lensa.<\/li><li><strong>Transmisi<\/strong>: Transmisi lensa secara langsung mempengaruhi hilangnya energi cahaya yang melewatinya. Transmitansi yang tinggi menunjukkan bahwa lensa dapat mentransmisikan cahaya dengan lebih efisien, sehingga mengurangi kehilangan cahaya.<\/li><li><strong>Distorsi Muka Gelombang<\/strong>: Distorsi muka gelombang menggambarkan derajat deformasi muka gelombang setelah cahaya melewati lensa. Lensa dengan distorsi muka gelombang yang lebih rendah dapat mempertahankan muka gelombang asli cahaya dengan lebih baik, sehingga meningkatkan kualitas gambar.<\/li><li><strong>Bahan dan Pelapis<\/strong>: Bahan dan lapisan permukaan yang digunakan pada lensa berdampak signifikan terhadap kinerjanya. Lensa yang terbuat dari bahan berkualitas tinggi dan lapisan yang sesuai biasanya memiliki daya tahan lebih tinggi, sifat anti-reflektif, dan kemampuan beradaptasi terhadap lingkungan.<\/li><li><strong>Panjang Fokus dan Aperture Numerik (NA)<\/strong>: Panjang fokus berkaitan dengan perbesaran dan jarak kerja lensa, sedangkan bukaan numerik berkaitan dengan resolusi lensa dan kemampuan pengumpulan cahaya.<\/li><li><strong>Ukuran dan bentuk<\/strong>: Ukuran dan bentuk lensa harus dipilih berdasarkan persyaratan aplikasi spesifik untuk memastikan kompatibilitas dengan sistem optik yang digunakan.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-cd4e600 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"cd4e600\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_cd4e600\">\n<table id=\"tablepress-46\" class=\"tablepress tablepress-id-46\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Indikator Kinerja<\/th><th class=\"column-2\">Keterangan<\/th><th class=\"column-3\">Pentingnya<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Focal length<\/td><td class=\"column-2\">Jarak dari pusat lensa ke tempat berkumpulnya cahaya paralel<\/td><td class=\"column-3\">Menentukan pembesaran dan jarak kerja<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Bukaan yang Efektif<\/td><td class=\"column-2\">Diameter bukaan bening untuk jalur cahaya<\/td><td class=\"column-3\">Mempengaruhi pengumpulan cahaya dan kedalaman bidang<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Koreksi Warna<\/td><td class=\"column-2\">Kemampuan untuk meminimalkan penyimpangan kromatik (memfokuskan panjang gelombang berbeda pada jarak berbeda)<\/td><td class=\"column-3\">Penting untuk meminimalkan pinggiran warna<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Resolusi gambar<\/td><td class=\"column-2\">Tingkat detail yang ditangkap pada gambar yang dibentuk<\/td><td class=\"column-3\">Mempengaruhi ketajaman, kontras, dan kualitas gambar secara keseluruhan<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Penularan<\/td><td class=\"column-2\">Persentase cahaya yang melewati lensa<\/td><td class=\"column-3\">Transmisi yang lebih tinggi menghasilkan gambar yang lebih cerah dan kinerja cahaya rendah yang lebih baik<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Distorsi<\/td><td class=\"column-2\">Bagaimana garis lurus diregangkan atau dibengkokkan pada gambar<\/td><td class=\"column-3\">Penting untuk aplikasi seperti fotografi arsitektur dan fotogrametri<\/td>\n<\/tr>\n<tr class=\"row-8\">\n\t<td class=\"column-1\">Kualitas Permukaan<\/td><td class=\"column-2\">Kualitas permukaan lensa<\/td><td class=\"column-3\">Goresan, lubang, atau lapisan yang tidak rata menurunkan kualitas gambar<\/td>\n<\/tr>\n<tr class=\"row-9\">\n\t<td class=\"column-1\">Sifat Bahan<\/td><td class=\"column-2\">Sifat kaca yang digunakan (indeks bias, dispersi, dll)<\/td><td class=\"column-3\">Mempengaruhi koreksi warna, transmisi, dan daya tahan<\/td>\n<\/tr>\n<tr class=\"row-10\">\n\t<td class=\"column-1\">Ukuran dan Berat<\/td><td class=\"column-2\">Dimensi fisik dan berat lensa<\/td><td class=\"column-3\">Penting untuk portabilitas dan keterbatasan ruang<\/td>\n<\/tr>\n<tr class=\"row-11\">\n\t<td class=\"column-1\">Biaya<\/td><td class=\"column-2\">Harga lensa akromatik<\/td><td class=\"column-3\">Menyeimbangkan kebutuhan kinerja dengan anggaran sangatlah penting<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-25411c5 e-flex e-con-boxed e-con e-parent\" data-id=\"25411c5\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-7196900 elementor-widget elementor-widget-heading\" data-id=\"7196900\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Penerapan Lensa Akromatik<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-da07fea elementor-widget elementor-widget-text-editor\" data-id=\"da07fea\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lensa akromatik memainkan peran penting dalam berbagai bidang karena kemampuan koreksi penyimpangan kromatiknya yang sangat baik, sehingga secara signifikan meningkatkan kualitas gambar dan kinerja sistem optik secara keseluruhan. Area aplikasi utama meliputi:<\/p><ul class=\"list-disc pl-8\"><li><strong>Sistem Pencitraan Optik<\/strong>: Pada perangkat seperti mikroskop, teleskop, dan kamera, lensa akromatik secara efektif mengurangi penyimpangan kromatik dan bola, sehingga menghasilkan gambar yang lebih jelas.<\/li><li><strong>Fotografi dan Videografi<\/strong>: Dengan mengoreksi penyimpangan kromatik, lensa akromatik memastikan reproduksi warna yang akurat pada foto dan video, sehingga menghasilkan gambar yang lebih realistis dan alami.<\/li><li><strong>Sistem Laser<\/strong>: Lensa akromatik digunakan dalam pemfokusan dan transmisi laser, mengurangi dampak penyimpangan kromatik pada kualitas laser, sehingga meningkatkan presisi dan efisiensi sistem secara keseluruhan.<\/li><li><strong>Komunikasi Serat Optik<\/strong>: Lensa akromatik membantu mengurangi efek dispersi, sehingga meningkatkan kualitas dan stabilitas transmisi sinyal, yang sangat penting untuk teknologi komunikasi serat optik.<\/li><li><strong>Penelitian ilmiah<\/strong>: Dalam instrumen ilmiah seperti spektrometer dan interferometer, lensa akromatik meningkatkan akurasi pengukuran, meningkatkan keandalan dan presisi data.<\/li><li><strong>Inspeksi Industri dan Visi Mesin<\/strong>: Dalam bidang ini, lensa akromatik meningkatkan kejernihan dan akurasi gambar, mengoptimalkan efisiensi proses inspeksi dan pengenalan.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8840d35 elementor-widget elementor-widget-text-editor\" data-id=\"8840d35\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Performa lensa akromatik yang luar biasa dalam mengurangi aberasi kromatik dan aberasi lainnya telah sangat memajukan teknologi optik modern. Beragamnya area aplikasi menunjukkan kontribusi signifikan lensa akromatik dalam meningkatkan kinerja dan kualitas gambar berbagai sistem optik.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-9ec4842 e-flex e-con-boxed e-con e-parent\" data-id=\"9ec4842\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a0f9001 elementor-widget elementor-widget-heading\" data-id=\"a0f9001\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Faktor Harga untuk Pembelian Massal dan Penyesuaian Elemen Lensa Akromatik\n<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-6647ad3 elementor-widget elementor-widget-text-editor\" data-id=\"6647ad3\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Jika menyangkut pembelian massal dan penyesuaian lensa akromatik, harga terutama ditentukan oleh faktor-faktor berikut:<\/p><ul class=\"list-disc pl-8\"><li><strong>Kualitas Bahan<\/strong>: Lensa akromatik biasanya terbuat dari kaca batu indeks bias tinggi dan kaca mahkota indeks bias rendah. Kualitas bahan-bahan ini merupakan faktor kunci yang mempengaruhi kinerja dan harga lensa, dengan kaca optik berkualitas lebih tinggi harganya lebih mahal.<\/li><li><strong>Presisi Manufaktur<\/strong>: Pemrosesan dan perakitan presisi tinggi sangat penting untuk pembuatan lensa akromatik, yang melibatkan parameter seperti bentuk permukaan lensa, pemusatan, dan penyelesaian permukaan. Semakin tinggi presisi lensa, semakin tinggi pula biaya produksinya.<\/li><li><strong>Ukuran Lensa dan Panjang Fokus<\/strong>: Diameter dan panjang fokus lensa berdampak signifikan terhadap harga. Lensa berdiameter lebih besar dan panjang fokus lebih panjang memerlukan lebih banyak bahan dan proses pembuatan yang lebih rumit, sehingga membuatnya lebih mahal.<\/li><li><strong>Pelapis Optik<\/strong>: Lapisan optik yang meningkatkan transmitansi lensa dan sifat anti-reflektif juga merupakan faktor biaya. Pelapis multi-lapis berkinerja tinggi lebih mahal daripada pelapis satu lapis.<\/li><li><strong>Persyaratan Kustomisasi<\/strong>: Lensa yang disesuaikan untuk kebutuhan aplikasi spesifik biasanya memerlukan biaya desain, pengujian, dan produksi tambahan, sehingga membuat lensa khusus lebih mahal dibandingkan produk standar.<\/li><li><strong>Pembelian Massal<\/strong>: Produksi skala besar dapat mengurangi biaya per lensa dengan membagi biaya tetap. Namun, biaya cetakan dan pemasangan awal mungkin tinggi.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-50f88d2 elementor-widget elementor-widget-text-editor\" data-id=\"50f88d2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Dalam proses pengadaan, mempertimbangkan faktor-faktor seperti kualitas bahan, presisi produksi, ukuran lensa dan panjang fokus, lapisan optik, persyaratan penyesuaian, dan pembelian dalam jumlah besar merupakan kunci dalam memilih lensa akromatik yang memenuhi kebutuhan aplikasi dan anggaran tertentu.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-ee2a96b e-flex e-con-boxed e-con e-parent\" data-id=\"ee2a96b\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ea3af1e elementor-widget elementor-widget-heading\" data-id=\"ea3af1e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Ringkasan<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-cadbf6a elementor-widget elementor-widget-text-editor\" data-id=\"cadbf6a\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Mencari produsen lensa akromatik yang hemat biaya? Pertimbangkan Chineselens Optics \u2013 perusahaan optik terkemuka yang berbasis di Tiongkok. Kami mengkhususkan diri dalam pembuatan lensa akromatik untuk berbagai aplikasi termasuk: lensa kamera, teleskop, dan mikroskop. Optik Chineselens telah membangun reputasi di industri karena harga yang terjangkau dan kualitas produk yang unggul.<br \/>Baik untuk proyek penelitian ilmiah, hobi fotografi, instrumentasi, atau situasi apa pun yang memerlukan pencitraan presisi, lensa akromatik kami akan memberi Anda koreksi warna dan kejernihan gambar yang luar biasa. Pilih Optik Chineselens untuk solusi dan layanan optik berkualitas yang akan membantu proyek dan produk Anda mencapai tingkatan baru. <strong><em><a href=\"https:\/\/chineselens.com\/id\/optical-lens-manufacturer\/#lenscontact\" target=\"_blank\" rel=\"noopener\">Hubungi pakar kami hari ini untuk konsultasi!<\/a><\/em><\/strong><\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>","protected":false},"excerpt":{"rendered":"<p>Lensa akromatik mengurangi aberasi kromatik, digunakan pada kamera, teleskop &amp; mikroskop. Beli lensa akromatik berkualitas tinggi atau pelajari lebih lanjut!<\/p>","protected":false},"author":1,"featured_media":29829,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"_acf_changed":false,"_seopress_titles_title":"Achromatic Lenses Guides of Knowledge, Cost and Manufactures","_seopress_titles_desc":"Achromatic lenses reduces chromatic aberration, used in cameras, telescopes & microscopes. 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