(2)
Температуралар қатынасын (2) теңдеуді (1) теңдеуге қоя отырып, мынаны аламыз.
бұдан ![](data:image/png;base64,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)
Немесе ; ;
Сонда
Логаритм деп аталатынымыз
Бірақ, h1 ;
Онда әдістің жұмыстың формуласы.
Лабораториялық құрылғы:
Кондырғының алдыңғы панелінде U су манометрі, онда өлшеуіне сызғыш (2) ауаны жіберуге арналған к1 краны (3) , қысымды өзгертуге арналған к2 клапаны (4), пневмопровод (5) және микрокомпресорды қосу үшін тумблер (6) орналасқан. Манометрдің үстінде бак (7) бар. Құрылғыда ауамен толтырылатын шыны баллон (8) орналасқан . Баллон U су манометрімен және компрессормен пневпровод арқылы жалғасқан. Баллонда қысымның тез өзгеруі практикалық түрде қоршаған ортамен жылу алмасусыз өтеді. Сондықтан клапанды (4) ашқан кезде өтетін процесті адиабаталық деп есептеуге болады. Компрессордың көмегімен баллонға ауаны жіберіп, к1 кранды (3) жабады. Бірнеше минуттан кейін баллондағы ауаның температурасы бөлмедегі температурамен тең болады.
Достарыңызбен бөлісу: |