GeoGebra Classroom გეომეტრიული ალბათობა
- დავიწყოთ ტექსტით
დავწეროთ პირობა: ამოცანა: კვადრატში ჩახაზულია წრე. ვიპოვოთ ალბათობა იმისა, რომ კვადრატში შემთხვევით შერჩეული წერტილი მოხვდება წრეში. - ავაგოთ კვადრატი
ინსტრუმენტით( დაერქმევა poly1). გვერდს დავაწეროთ შესაბამისი ასო(მარჯვენა ღილაკი "აჩვენე აღნიშვნა")მაგ. f. - მოვნიშნოთ კვადრატის ცენტრი
ინსტრუმენტით. კვადრატში ჩავხაზოთ წრეწირი მოცემული ცენტრითა და f/2 რადიუსით
ინსტრუმენტით.(c წრეწირი) - ავიღოთ სრიალა "მთელი" 1 დან 1000 .
ინსტრუმენტით. - შეტანის ველში ჩავწეროთ ბრძანება მიმდევრობა(RandomPointin(poly1),k,1,n) დაერქმევა l1
- შეტანის ველში ჩავწეროთ ბრძანება მიმდევრობა(არისშიგნითა(ელემენტი(l1,i),c),i,1,n) დაერქვმევა l2={true, false. ...}
- შეტანის ველში ჩავწეროთ ბრძანება m=თვლაპირობით(x==true,l2)
ინსტრუმენტით დავწეროთ ტექსტი: წრეში მოხვედრილ წერტილთა რაოდენობა m=(დავაწკაპოთ m-ზე -ალგებრულ ფანჯარაში)
ინსტრუმენტით დავწეროთ ტექსტი: აღებულ წერტილთა რაოდენობა n=(დავაწკაპოთ n-ზე -ალგებრულ ფანჯარაში)
ინსტრუმენტით დავწეროთ ტექსტი \frac{m}{n}=\frac{}{ }≈
მიმოხილვა: ![](data:image/png;base64,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)
ინსტრუმენტით დავწეროთ ტექსტი p=\frac{π(\frac{f}{2})^2}{f^2}=\frac{π}{4}=
მიმოხილვა:![](data:image/png;base64,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)
- გამოვიძახოთ
ნიშნულა. დავარქვათ ამოხსნა და მივუთითოთ ბოლო ტექსტი.