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نحوه ی محاسبه ی حداقل مقدار آرماتور اعضای خمشی (تیر بتنی)
#1
سلام مهندسین گرامی سوالمو درقالب یه عکس میذارم اگر نمونه ای حل کرده بذارید ممنون میشم یکم توضیح میخوام تا دچار اشتباه نشم. ممنون

[تصویر:  gh6bccrs0d8plnksyva.jpg]


میلگرد طولی ۱۸ مناسب برای تیر آیا میتونم از میلگرد ۲۰ هم استفاده کنم روش بدست اوردن هم همینه دیگه ؟


[تصویر:  fzvvmbacagl05489liiv.jpg]
پاسخ
#2
فکر میکنم مقدار آیین نامه ای که الان دارید چک میکنید مال قدیم هست


توی آیین نامه مبحث نهم (سازه های بتنی) به این شکل فرمول حداقل مقدار آرماتور اعضای خمشی اومده

[تصویر:  5r2e1znn6tm4xgt8g8q4.jpg]

[تصویر:  xeix67tdr6q3dtxg8rk.jpg]



مقدار نسبت میلگرد باید بزرگتر از هر دو مقدار زیر باشه

[تصویر:  su2c8za7trs8mkxq7qcb.jpg]



Fy هم متناسب با نوع آرماتور مصرفی بدست میاد

توی صفحه 25 آیین نامه مبهث نهم مشخصات مکانیکی انواع آرماتور ها اومده

[تصویر:  wpm40lhjse0bhmyfa9ek.jpg]


p هم مقدار درصد نسبت سطح مقطع فولاد مصرفی به سطع مقطع بتن هست



مثلا توی تیر زیر سطح مقطع بتن برابر هست با


[تصویر:  cxe24jz7fmy22jge6d01.jpg]


40*60=2400 میلی متر مربع

اگر از 4 تا آرماتور شماره 20 استفاده کنیم داریم (سطح مقطع آرماتور 20 برابر است با 314 میلیمتر مربع)
4*314=1256

پس مقدار p برابر است با 2400/1256=1.91
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فیلم آموزش طراحی یک ساختمان فلزی از اول تا آخر در ایتبس و طراحی پی در سیف(Etabs&Safe) https://goo.gl/TlWlvw
دانلود 35 قسمت فیلم فارسی آموزش اتوکد دو بعدی 2012 توسط استاد آریانی (400دقیقه) https://goo.gl/NRuR94
دانلود 40 قسمت فیلم فارسی آموزش اتوکد 2012 سه بعدی توسط استاد آریانی (7ساعت) https://goo.gl/GsLsyv
پاسخ
#3
مهندسین عزیز، لطفاً در این مورد اظهارنظر کرده و راهنمایی بفرمایید.
در شکل زیر، ستون ها 30 * 30 بوده و تیرها هم 30 * 40 لحاظ شده است.
همانطور که در شکل زیر ملاحظه می کنید، مقدار آرماتور طولی تیر (مثلاً در جایی که با خطر قرمز مشخص شده) با در نظر گرفتن رابطه 9-14-5-2-1 و Asmin=pmin*b*d خیلی کمتر است.
pmin=0.0035
Asmin=0.0035*30*(40-5)=3.675
عددی که در مقادیر مقاطع پایین تیرها بوسیله نرم افزار محاسبه شده از عدد حاصله بالا خیلی کمتر است.
در این موقعیت چه نظر تخصصی دارید؟ چطور باید اقدام کرده و ادامه داد؟
ممنون از توجه تان.

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[/img]
پاسخ
#4
مهندسین عزیز، لطفاً در این مورد اظهارنظر کرده و راهنمایی بفرمایید.
در شکل زیر، ستون ها 30 * 30 بوده و تیرها هم 30 * 40 لحاظ شده است.
همانطور که در شکل زیر ملاحظه می کنید، مقدار آرماتور طولی تیر (مثلاً در جایی که با خطر قرمز مشخص شده) با در نظر گرفتن رابطه 9-14-5-2-1 و Asmin=pmin*b*d خیلی کمتر است.
pmin=0.0035
Asmin=0.0035*30*(40-5)=3.675
عددی که در مقادیر مقاطع پایین تیرها بوسیله نرم افزار محاسبه شده از عدد حاصله بالا خیلی کمتر است.
در این موقعیت چه نظر تخصصی دارید؟ چطور باید اقدام کرده و ادامه داد؟
ممنون از توجه تان.
[تصویر:  2022-09-07_copy_f0t3.jpg]
پاسخ


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