I've read a handful of past threads on this, but wanted some assurance I'm doing this correctly.
To determine the design moment we take: S[sub]d[/sub]*M[sub]strength[/sub]
This would then be compared to M=A[sub]s[/sub]*F[sub]y[/sub]*(d-a/2)
I'm checking a design that calculates S[sub]d[/sub]=f[sub]y[/sub]/f[sub]s[/sub] (assume phi and gamma are 1.0) and then take S[sub]d[/sub]*M[sub]service[/sub]. The design then compares that amplified moment to M=A[sub]s[/sub]*F[sub]y[/sub]*(d-a/2).
I seem to be able to get a little more out of my section if I actually calculate S[sub]d[/sub] using phi=.9 and gamma equal to my load factor.
To determine the design moment we take: S[sub]d[/sub]*M[sub]strength[/sub]
This would then be compared to M=A[sub]s[/sub]*F[sub]y[/sub]*(d-a/2)
I'm checking a design that calculates S[sub]d[/sub]=f[sub]y[/sub]/f[sub]s[/sub] (assume phi and gamma are 1.0) and then take S[sub]d[/sub]*M[sub]service[/sub]. The design then compares that amplified moment to M=A[sub]s[/sub]*F[sub]y[/sub]*(d-a/2).
I seem to be able to get a little more out of my section if I actually calculate S[sub]d[/sub] using phi=.9 and gamma equal to my load factor.