[{"data":1,"prerenderedAt":-1},["ShallowReactive",2],{"$fKVMM5wEXWpW5ADPR7XGVbucdFk18TXMCwNlbvBLSwKI":3,"$fdRHrBWtOADlqAoGoe7z3X3Y4B3VzEzjlgavIMXRuP3Q":12},{"author":4,"tags":11},{"author_id":5,"author_name":6,"author_name_first_letter":7,"article_count":8,"bio":9,"short_bio":9,"slug":10,"image_url":9},75596,"Richard A. Dunlap","R",1,null,"richard-a-dunlap",[],{"quotes":13,"pagination":47},[14],{"id":15,"quote_text":16,"author_id":5,"source_id":17,"has_image":18,"author":19,"source":20,"quote_tag":21,"commentary":9},528466,"It is shown that the golden ratio plays a prominent role in the dimensions of all objects which exhibit five-fold symmetry. It is also showed that among the irrational numbers, the golden ratio is the most irrational and, as a result, has unique applications in number theory, search algorithms, the minimization of functions, network theory, the atomic structure of certain materials and the growth of biological organisms.",2,false,{"id":5,"author_name":6,"slug":10,"author_name_first_letter":7,"article_count":8,"image_url":9},{},[22,27,32,37,42],{"id":23,"tag":24},2903450,{"id":25,"tag_name":26},2547,"mathematics",{"id":28,"tag":29},2903452,{"id":30,"tag_name":31},3249,"symmetry",{"id":33,"tag":34},2903445,{"id":35,"tag_name":36},4292,"biology",{"id":38,"tag":39},2903449,{"id":40,"tag_name":41},43348,"golden-ratio",{"id":43,"tag":44},2903447,{"id":45,"tag_name":46},45600,"fine-structure-constant",{"currentPage":8,"totalPages":8,"totalItems":8,"itemsPerPage":48},10]