{"id":1328,"date":"2023-10-02T10:57:32","date_gmt":"2023-10-02T10:57:32","guid":{"rendered":"https:\/\/www.matematikazavsicki.com\/tr\/?p=1328"},"modified":"2023-10-02T10:57:33","modified_gmt":"2023-10-02T10:57:33","slug":"uslu-sayilarda-carpma-ve-bolme-islemi","status":"publish","type":"post","link":"https:\/\/www.matematikazavsicki.com\/tr\/uslu-sayilarda-carpma-ve-bolme-islemi\/","title":{"rendered":"\u00dcsl\u00fc Say\u0131larda \u00c7arpma Ve B\u00f6lme \u0130\u015flemi"},"content":{"rendered":"\n

\u00dcsl\u00fc say\u0131larda \u00e7arpma ve b\u00f6lme i\u015flemi? Bu sayfada dereceleri ayn\u0131 yani e\u015fit tabanla \u00e7arpma ve b\u00f6lme kurallar\u0131n\u0131 bulabilirsiniz. A\u015fa\u011f\u0131da kurallara ek olarak ayn\u0131 tabana sahip hem \u00e7arpma hem de b\u00f6lme kuvvetleri i\u00e7in \u00e7\u00f6z\u00fcml\u00fc bir \u00f6rnek verilmi\u015ftir. Daha fazla \u00e7\u00f6z\u00fclm\u00fc\u015f \u00f6rnek, a\u015fa\u011f\u0131da metinde de bulunabilecek videoda g\u00f6r\u00fclebilir.<\/p>\n\n\n\n

\u00dcsl\u00fc Say\u0131larda \u00c7arpma<\/h2>\n\n\n\n

Dereceleri ayn\u0131 tabanla \u00e7arparken a\u015fa\u011f\u0131daki form\u00fcl uygulan\u0131r:<\/p>\n\n\n

\n
\"\u00dcsl\u00fc<\/figure>\n<\/div>\n\n\n

Buradan, dereceler ayn\u0131 tabanla \u00e7arp\u0131ld\u0131\u011f\u0131nda taban\u0131n \u00e7arpma sonras\u0131nda de\u011fi\u015fmeden kald\u0131\u011f\u0131, derecenin (\u00fcs) ise \u00e7arpma i\u015fleminden \u00f6nce verilen iki farkl\u0131 kuvvetin toplam\u0131n\u0131 temsil etti\u011fi g\u00f6r\u00fclebilir.<\/p>\n\n\n\n

\u00d6rnek 1: \u00dcr\u00fcn\u00fc belirlemek i\u00e7in:<\/p>\n\n\n

\n
\"Ayn\u0131<\/figure>\n<\/div>\n\n\n

Temel 5 olarak kal\u0131r ve sonu\u00e7taki derece, 7 ve 2 derecelerinin toplam\u0131 olarak elde edilir. 1 numaral\u0131 g\u00f6revin sonucu:<\/p>\n\n\n

\n
\"\u00c7arpman\u0131n<\/figure>\n<\/div>\n\n\n

Bu t\u00fcr bir problemi \u00e7\u00f6zerken derecelerden biri (iki veya daha fazlas\u0131) negatif say\u0131 ise, hesaplama s\u0131ras\u0131nda tam say\u0131lar\u0131 toplama<\/a> kurallar\u0131 uygulan\u0131r. Derece kesir ise kesir ekleme kurallar\u0131 uygulan\u0131r.<\/p>\n\n\n\n

\u00dcsl\u00fc Say\u0131larda B\u00f6lme i\u015flemi<\/h2>\n\n\n\n

Dereceleri ayn\u0131 tabana g\u00f6re b\u00f6lerken a\u015fa\u011f\u0131daki form\u00fcl uygulan\u0131r:<\/p>\n\n\n

\n
\"\u00dcsl\u00fc<\/figure>\n<\/div>\n\n\n

buradan, dereceleri ayn\u0131 tabanla b\u00f6lerken taban\u0131n b\u00f6lme sonras\u0131nda de\u011fi\u015fmeden kald\u0131\u011f\u0131, derecenin (\u00fcs) ise b\u00f6lmeden \u00f6nce verilen birinci ve ikinci (uygun s\u0131rayla) derecelerden fark\u0131 temsil etti\u011fi g\u00f6r\u00fclebilir. .<\/p>\n\n\n\n

\u00d6rnek 2: B\u00f6l\u00fcm\u00fc belirlemek i\u00e7in:<\/p>\n\n\n

\n
\"Ayn\u0131<\/figure>\n<\/div>\n\n\n

Taban ayn\u0131 5 olarak kal\u0131r ve sonu\u00e7taki derece 7 ile 2 aras\u0131ndaki fark (7-2) olarak elde edilir. 2 numaral\u0131 g\u00f6revin sonucu:<\/p>\n\n\n

\n
\"Ayn\u0131<\/figure>\n<\/div>\n\n\n

Ayn\u0131 tabana sahip \u00fcsleri b\u00f6lerken, \u00fcsler tam say\u0131 ise tamsay\u0131larla i\u015flem kurallar\u0131na uyuyoruz. Dereceler kesir ise kesirlerde toplama ve \u00e7\u0131karma<\/a> kurallar\u0131 uygulan\u0131r.<\/p>\n\n\n\n

A\u015fa\u011f\u0131daki videoda ayn\u0131 tabanla dereceleri \u00e7arpma ve b\u00f6lme i\u015flemine ili\u015fkin birka\u00e7 \u00f6rnek problemin \u00e7\u00f6z\u00fcm\u00fcn\u00fc izleyebilirsiniz!<\/p>\n\n\n

\n
\"\u00dcsl\u00fc<\/a><\/figure>\n<\/div>\n\n\n
\n\n\n