🔍
🔍

## Credits

Birsa Institute of Technology (BIT), Sindri
Suraj Kumar has created this Calculator and 1000+ more calculators!
Meerut Institute of Engineering and Technology (MIET), Meerut
Ishita Goyal has verified this Calculator and 1000+ more calculators!

## Load per meter Length of Pipe when Compressive End Fibre Stress is Given Solution

STEP 0: Pre-Calculation Summary
Formula Used
load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)+(1)/(2*Thickness of pipe))
w = S/((3*D)/(8*t^2)+(1)/(2*t))
This formula uses 3 Variables
Variables Used
Extreme fibre stress - Extreme fibre stress at the end of horizontal diameter. (Measured in Newton per Square Meter)
Diameter of Pipe - Diameter of Pipe is the length of the longest chord of the pipe in which the liquid is flowing. (Measured in Centimeter)
Thickness of pipe - Thickness of pipe is the smaller dimention of pipe . (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Extreme fibre stress: 2 Newton per Square Meter --> 2 Pascal (Check conversion here)
Diameter of Pipe: 2 Centimeter --> 0.02 Meter (Check conversion here)
Thickness of pipe: 3 Meter --> 3 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
w = S/((3*D)/(8*t^2)+(1)/(2*t)) --> 2/((3*0.02)/(8*3^2)+(1)/(2*3))
Evaluating ... ...
w = 11.9402985074627
STEP 3: Convert Result to Output's Unit
11.9402985074627 --> No Conversion Required
11.9402985074627 <-- Load per unit length
(Calculation completed in 00.031 seconds)

## < 11 Other formulas that you can solve using the same Inputs

Specific Weight of Liquid When Head loss Due to Laminar Flow is Given
specific_weight_of_liquid = (128*Viscous Force*Rate of flow*Length of Pipe)/(Head loss*pi*(Diameter of Pipe)^(4)) Go
Head loss due to Laminar Flow
head_loss = (128*Viscous Force*Rate of flow*Length of Pipe)/(specific weight of liquid*pi*(Diameter of Pipe)^(4)) Go
Viscous Force When Head loss Due to Laminar Flow is Given
viscous_force = Head loss*specific weight of liquid*pi*(Diameter of Pipe^4)/(128*Rate of flow*Length of Pipe) Go
Rate of Flow When Head loss In Laminar Flow is Given
rate_of_flow = Head loss*specific weight of liquid*pi*(Diameter of Pipe^4)/(128*Viscous Force*Length of Pipe) Go
Length of Pipe When Head loss is Given
length_of_pipe = Head loss*specific weight of liquid*pi*(Diameter of Pipe^4)/(128*Rate of flow*Viscous Force) Go
Loss of pressure head for viscous flow through circular pipe
loss_of_peizometric_head = (32*viscosity of fluid*Velocity*Length)/(Density*[g]*(Diameter of Pipe^2)) Go
Length of pipe for loss of pressure head in viscous flow
length = (loss of peizometric head*Density*[g]*(Diameter of Pipe^2))/(32*viscosity of fluid*Velocity) Go
Length of pipe for head loss due to friction in viscous flow
length_of_pipe = (loss of head*Diameter of Pipe*2*[g])/(4*Coefficient of Friction*(Average Velocity^2)) Go
Loss of head due to friction
loss_of_head = (4*Coefficient of Friction*Length of Pipe*(Average Velocity^2))/(Diameter of Pipe*2*[g]) Go
Length of pipe for difference of pressure in viscous flow
length_of_pipe = (difference in pressure viscous flow*(Diameter of Pipe^2))/(32*viscosity of oil*Average Velocity) Go
Difference of pressure for viscous or laminar flow
difference_in_pressure_viscous = (32*viscosity of fluid*Average Velocity*Length)/(Diameter of Pipe^2) Go

## < 11 Other formulas that calculate the same Output

Uniformly distributed load unit length in terms of circular frequency
load_per_unit_length = ((pi^4)/(Natural circular frequency^2))*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4))) Go
load_per_unit_length = ((504*Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)*(Natural circular frequency^2))) Go
Uniformly distributed load unit length in terms of natural frequency
load_per_unit_length = ((pi^2)/(4*(frequency^2)))*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4))) Go
load_per_unit_length = (3.573^2)*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)*(frequency^2))) Go
Value of load for simply supported beam with a uniformly distributed load
load_per_unit_length = (384*Static deflection*Young's Modulus*Moment of inertia of the beam)/(5*(Length of the Beam^4)) Go
Uniformly distributed load unit length in terms of static deflection
load_per_unit_length = ((Static deflection*384*Young's Modulus*Moment of inertia of the shaft)/(5*(Length of Shaft^4))) Go
Load per meter Length of Pipe when Tensile End Fibre Stress is Given
load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)-(1)/(2*Thickness of pipe)) Go
load_per_unit_length = ((Static deflection*384*Young's Modulus*Moment of inertia of the shaft)/(Length of Shaft^4)) Go
load_per_unit_length = (384*Static deflection*Young's Modulus*Moment of inertia of the beam)/(Length of the Beam^4) Go
load_per_unit_length = (8*Static deflection*Young's Modulus*Moment of inertia of the beam)/(Length of the Beam^4) Go
Load per meter Length of Pipe
load_per_unit_length = Coefficient*unit weight of fill*(Width of trench)^2 Go

### Load per meter Length of Pipe when Compressive End Fibre Stress is Given Formula

load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)+(1)/(2*Thickness of pipe))
w = S/((3*D)/(8*t^2)+(1)/(2*t))

## What is mass per unit length ?

The mass per unit length is the linear density of a one-dimensional substance such as a wire or thread. ... Some of these are defined reciprocally in terms of the length of thread needed for a given weight (see specific weight).

## How to Calculate Load per meter Length of Pipe when Compressive End Fibre Stress is Given?

Load per meter Length of Pipe when Compressive End Fibre Stress is Given calculator uses load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)+(1)/(2*Thickness of pipe)) to calculate the Load per unit length, The Load per meter Length of Pipe when Compressive End Fibre Stress is Given calculates the value of load per meter length of pipe when we have prior information of other parameters used. Load per unit length and is denoted by w symbol.

How to calculate Load per meter Length of Pipe when Compressive End Fibre Stress is Given using this online calculator? To use this online calculator for Load per meter Length of Pipe when Compressive End Fibre Stress is Given, enter Extreme fibre stress (S), Diameter of Pipe (D) and Thickness of pipe (t) and hit the calculate button. Here is how the Load per meter Length of Pipe when Compressive End Fibre Stress is Given calculation can be explained with given input values -> 11.9403 = 2/((3*0.02)/(8*3^2)+(1)/(2*3)).

### FAQ

What is Load per meter Length of Pipe when Compressive End Fibre Stress is Given?
The Load per meter Length of Pipe when Compressive End Fibre Stress is Given calculates the value of load per meter length of pipe when we have prior information of other parameters used and is represented as w = S/((3*D)/(8*t^2)+(1)/(2*t)) or load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)+(1)/(2*Thickness of pipe)). Extreme fibre stress at the end of horizontal diameter, Diameter of Pipe is the length of the longest chord of the pipe in which the liquid is flowing and Thickness of pipe is the smaller dimention of pipe .
How to calculate Load per meter Length of Pipe when Compressive End Fibre Stress is Given?
The Load per meter Length of Pipe when Compressive End Fibre Stress is Given calculates the value of load per meter length of pipe when we have prior information of other parameters used is calculated using load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)+(1)/(2*Thickness of pipe)). To calculate Load per meter Length of Pipe when Compressive End Fibre Stress is Given, you need Extreme fibre stress (S), Diameter of Pipe (D) and Thickness of pipe (t). With our tool, you need to enter the respective value for Extreme fibre stress, Diameter of Pipe and Thickness of pipe and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Load per unit length?
In this formula, Load per unit length uses Extreme fibre stress, Diameter of Pipe and Thickness of pipe. We can use 11 other way(s) to calculate the same, which is/are as follows -
• load_per_unit_length = (384*Static deflection*Young's Modulus*Moment of inertia of the beam)/(Length of the Beam^4)
• load_per_unit_length = (384*Static deflection*Young's Modulus*Moment of inertia of the beam)/(5*(Length of the Beam^4))
• load_per_unit_length = (8*Static deflection*Young's Modulus*Moment of inertia of the beam)/(Length of the Beam^4)
• load_per_unit_length = ((Static deflection*384*Young's Modulus*Moment of inertia of the shaft)/(5*(Length of Shaft^4)))
• load_per_unit_length = ((pi^2)/(4*(frequency^2)))*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)))
• load_per_unit_length = ((pi^4)/(Natural circular frequency^2))*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)))
• load_per_unit_length = (3.573^2)*((Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)*(frequency^2)))
• load_per_unit_length = ((504*Young's Modulus*Moment of inertia of the shaft*Acceleration Due To Gravity)/((Length of Shaft^4)*(Natural circular frequency^2)))
• load_per_unit_length = ((Static deflection*384*Young's Modulus*Moment of inertia of the shaft)/(Length of Shaft^4))
• load_per_unit_length = Coefficient*unit weight of fill*(Width of trench)^2
• load_per_unit_length = Extreme fibre stress/((3*Diameter of Pipe)/(8*Thickness of pipe^2)-(1)/(2*Thickness of pipe)) Let Others Know