@@abcsky5232 actually, there's a lot of method (portal method, cantilever method, Factor method, Rigidity Method and a lot more.) But if we need an approximate value for analysis of shear and moment we could use portal method. You just have to add the two moment and divide with their span to get shear. And to get the moment, you just have to multiply the shear to half of its distance.
ok.. Good explaining... Can understand.... Tq.
Thank you
Thanks very much madam 🙏🤝
I just wanna ask can you show the direction of each shear and for the reactions? Thank you.
/| |/ that's the direction of each shear
thankyou so much miss.😭
Always welcome po
Thank you so much for this
the initial direction of the shear will be either upward or downward?
Actually magkahiwalay yan /| |/ pinagsama ko lang para mas mabilis iguhit. 🤭 depende pa din sa sign convention mo. Pero kapag upward (+)
supporting you maam , your videos will soon be discovered by students ❤️🙏
Yeah
How I write in exam paper sheet
thanks again ♡...
Thanks mam
Pano po pag yung lateral load ay nasa right side? Mag papalit ba ng direction yung mga moment?
Same process pa din po. Ung direction ng moment ay assume lang na clockwise po.
Paano po kukunin yung axial load for the members?
May ibang video po ako kung paano makuha ang axial loads. Thank you for watching po
Like draw a dia and put like that
Yes, this is the easiest way to solve the portal method
@@EngrMmBrutas I see in u TH-cam I got xtra 2 method I'm so confused what I do ।।। Exam date is 31 july
@@abcsky5232 actually, there's a lot of method (portal method, cantilever method, Factor method, Rigidity Method and a lot more.)
But if we need an approximate value for analysis of shear and moment we could use portal method.
You just have to add the two moment and divide with their span to get shear.
And to get the moment, you just have to multiply the shear to half of its distance.
First write ABCDE number