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r13
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Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

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enter image description here

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

enter image description here

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

enter image description here

ADD: For add'l question in comment

enter image description here

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r13
r13
  • 8.2k
  • 3
  • 9
  • 28

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

enter image description here

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$

enter image description here

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r13
r13
  • 8.2k
  • 3
  • 9
  • 28

Let's calculate the equivalent reinforcing steel area ($Ast)$ in a $1 m$ strip from the given reinforcing configuration ($1-N16@175 mm$ spaced center to center) using the concept of "consistent reinforcing ratio".

The reinforcing ratio of the $1 m$ strip is, $\rho_1 = \dfrac{Ast}{1 m*d}$, and the reinforcing ratio for $1 - N16$ at $175 mm$ spacing is, $\rho_{act} = \dfrac{200 mm^2}{0.175 m*d}$, and, since $\rho_1 = \rho_{act}$,

  • $\dfrac{Ast}{1 m*d} = \dfrac{200 mm^2}{0.175 m*d}$

With "$d$" cancels out, the equivalent reinforcement in $1 m$ strip, therefore, is,

  • $\dfrac{Ast}{m} = \dfrac{200 mm^2}{0.175 m} = 1142 mm^2/m$