'= В'2). Сол сияқты, С нүктесінің ординатасы мен аппликатасы нөлге тең болғандықтан, Cх = C2= C болады. Табылған А', В және C нүктелерін қосатын АВC үшбұрышы — ABC үшбұрышының тікбұрышты изометриясы.
2 - м ы с а л. ABCDEFMN тікбұрышты параллелепипедінің ұзындығы |АВ| = 5, ені |АD| = 3, және биіктігі |АN| = 7 болсын. Осы параллелепипедтің тікбұрышты изометриясын салайық. Тікбұрышты натурал координаталар жүйесінің бас нүктесі
А нүктесімен, абсциссалар осі АВ қырымен және ординаталар осі AD қырымен біріксін. Сонда параллелепипедтің AN қыры аппликаталар осінде жататынына көз жеткізу қиын емес, яғни О = А; х = АВ; у = AD; z = AN. Изометрия осьтерін жүргізейік (48-сурет). А' нүктесін бірден табамыз, ол бас нүктемен бірігіп түседі (A' = Q'). Масштаб тағайындаймыз. Абсциссалар осіне 5 кесінді салып, В' нүктесін, ординаталар осіне 3 кесінді салып, D нүктесін және аппликаталар осіне 7 кесінді салып, N' нүктесін аламыз. Проекциялау кезінде параллельдік сақталатындықтан, С' нүктесін В' нүктесі арқылы у'-қа және D' нүктесі арқылы x'-қа параллель етіп жүргізілген түзулердің қиылысу нүктесі ретінде, Ғ' нүктесін N' нүктесі арқылы у'-қа және D' нүктесі арқылы z'-қa параллель етіп жүргізілген түзулердің қиылысу нүктесі ретінде және М' нүктесін В' нүктесі арқылы z'-қа және N' нүктесі арқылы x'-қа параллель етіп жүргізілген түзулердің қиылысу нүктесі ретінде анықтаймыз. Ғ' нүктесі арқылы x'-қа, М' нүктесі аркылы у'-қа және С' нүктесі арқылы z'-қа параллель жүргізілген үш түзу бір нүктеде (Е') қиылысады. Шеңбердің параллель
проекциясы, жалпы жағдайда эллипс болатынын білеміз. Сондықтан шеңбердің аксонометриялық проекциясы да, жалпы жағдайда эллипс болады. Тікбұрышты изометрияда xOz жазықтығында немесе оған параллель жазықтықта жатқан шеңбер кіші осі у'-пен бағыттас, ал үлкен осі у'-қа перпендикуляр эллипске проекцияланады (49-суреттегі 1 эллипс). хОу жазықтығында немесе оған параллель жазықтықта жатқан шеңбер кіші осі z'-пен бағыттас, ал үлкен осі z'-қа перпендикуляр эллипске проекцияланады (49-суреттегі 2 эллипс). уОz жазықтығында немесе оған параллель жазықтықта жатқан шеңбер кіші осі х'-пен бағыттас, ал үлкен осі x'-қa перпендикуляр эллипске кескінделеді (49-суреттегі 3 эллипс). Көрсетілген 1, 2 және 3 эллипстердің өлшемдері бірдей. Олардың үлкен осьтері шеңбер диаметрін 1,22-ге, ал кіші осьтері — 0,71-ге көбейткенге тең. Шеңбердің диаметрін латынның d әрпімен белгілеп, былай жазуға болады: |А'В'| = 1,22 d; |C'D'| = 0,71 d. Эллипстің центрі арқылы аксонометриялық осьтерге
параллель түзулер жүргізсек, оларға шеңбердің диаметрлері бұрмаланбай кескінделеді: |Е'Ғ'| =|МN'| = d. Сонда табылған 8 нүктені эллипстің осьтеріне қарағанда симметриялы болатындай етіп жатық сызықпен қолдан қосу керек. Содан кейін бұл сызық үлгісызғыш көмегімен бастыра жүргізіледі. Керек болған жағдайда жоғарыда қарастырылған (§ 12) әдіспен эллипстің көптеген нүктелерін табуға болады. Іс жүзінде эллипсті сызу қолайсыз-ақ. Сондықтан оларды
екі осьті сопақшамен (овалмен) алмастыруға рұқсат етіледі. Эллипстерді сопақшалармен алмастыру жолдарын қарастыралық. хОу жазықтығына параллель жазықтықта орналасқан шеңбердің тікбұрышты изометриясы болатын сопақшаны салуды қарастырайық. Шеңбер центрінің изометриясы О' нүктесі арқылы х және у' осьтеріне параллель түзулер жүргізейік (50, а-сурет). Оларға О' нүктесінен бастап шеңбердің радиусына тең кесінділер салып. A', К, С' және D' нүктелерін аламыз. А'
және В' нүктелері арқылы C'D' түзуіне параллель түзулер, ал С' және D' нүктелері арқылы А'В' түзуіне параллель түзулер жүргізсек, 1234 төртбұрышын аламыз. 1234 төртбұрышы ромб екенін дәлелдеу қиын емес. Ромбының үлкен диагоналі — 13
сопақшаның үлкен осінің бағытын анықтайды. 2 нүктесін центр етіп алып, А' және D' нүктелерін шеңбердің доғасымен қосамыз, сол сияқты 4 нүктесін центр етіп алып, В' және С' нүктелерін шеңбердің доғасымен қосамыз (50, ә-сурет). В' және
С' нүктелерін 4 нүктесімен қосатын түзулер ромбының үлкен диагоналін 5 және 6 нүктелерінде қияды. 5 нүктесін центр етіп алып, В' және D' нүктелерін, 6 нүктесін центр етіп алып, А' және С' нүктелерін шеңбердің доғаларымен қосып, алдыңғы екі доғаны тұйықтаймыз. Сонда ромбыға іштей сызылған сопақша алынды. Біз 49-суреттегі 2 эллипсті сопақшамен алмастыруды қарастырдық. 1 және 3 эллипстердің орындарына да сопақшалар осындай ретпен салынады. ![](data:image/jpeg;base64,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) ![](data:image/jpeg;base64,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)
Достарыңызбен бөлісу: |