Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam Solution

STEP 0: Pre-Calculation Summary
Formula Used
Distance from Centroidal = (((Intensity of Normal Stress-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section)/Bending Moment)
Yt = (((σi-(p/Acs))*IH)/Mb)
This formula uses 6 Variables
Variables Used
Distance from Centroidal - (Measured in Meter) - Distance from Centroidal is the average distance between all points and the central point.
Intensity of Normal Stress - (Measured in Pascal) - Intensity of Normal Stress on Horizontal plane is the ratio of normal force and area.
Load on Buttress Dams - (Measured in Newton) - Load on Buttress Dams here specifies the vertical load acting on the member.
Cross-Sectional Area of Base - (Measured in Square Meter) - Cross-Sectional Area of Base is the area of a two-dimensional shape that is obtained when a three-dimensional shape is sliced perpendicular to some specified axis at a point.
Moment of Inertia of Horizontal Section - (Measured in Meter⁴) - Moment of Inertia of horizontal section is defined as the body resisting angular acceleration which is the sum of the product of the mass of with its square of a distance from the axis of rotation.
Bending Moment - (Measured in Newton Meter) - The Bending Moment is the reaction induced in a structural element when an external force or moment is applied to the element, causing the element to bend.
STEP 1: Convert Input(s) to Base Unit
Intensity of Normal Stress: 1200 Pascal --> 1200 Pascal No Conversion Required
Load on Buttress Dams: 15 Kilonewton --> 15000 Newton (Check conversion ​here)
Cross-Sectional Area of Base: 13 Square Meter --> 13 Square Meter No Conversion Required
Moment of Inertia of Horizontal Section: 23 Meter⁴ --> 23 Meter⁴ No Conversion Required
Bending Moment: 53 Newton Meter --> 53 Newton Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Yt = (((σi-(p/Acs))*IH)/Mb) --> (((1200-(15000/13))*23)/53)
Evaluating ... ...
Yt = 20.0290275761974
STEP 3: Convert Result to Output's Unit
20.0290275761974 Meter --> No Conversion Required
FINAL ANSWER
20.0290275761974 20.02903 Meter <-- Distance from Centroidal
(Calculation completed in 00.020 seconds)

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Created by Rithik Agrawal
National Institute of Technology Karnataka (NITK), Surathkal
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Buttress Dams using law of Trapezoid Calculators

Moment for Maximum Intensity in horizontal plane on Buttress Dam
​ LaTeX ​ Go Moment of Buttress Dams = (Stress on Buttress Dams-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section/Distance from Centroidal
Sectional Area of Base for Maximum Intensity in horizontal plane on Buttress Dam
​ LaTeX ​ Go Cross-Sectional Area of Base = Load on Buttress Dams/(Intensity of Normal Stress-((Bending Moment*Distance from Centroidal)/Moment of Inertia of Horizontal Section))
Total Vertical Load for Maximum Intensity in horizontal plane on Buttress Dam
​ LaTeX ​ Go Load on Buttress Dams = (Intensity of Normal Stress-((Bending Moment*Distance from Centroidal)/Moment of Inertia of Horizontal Section))*Cross-Sectional Area of Base
Maximum Intensity of Vertical Force in horizontal plane on Buttress Dam
​ LaTeX ​ Go Intensity of Normal Stress = (Load on Buttress Dams/Cross-Sectional Area of Base)+((Bending Moment*Distance from Centroidal)/Moment of Inertia of Horizontal Section)

Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam Formula

​LaTeX ​Go
Distance from Centroidal = (((Intensity of Normal Stress-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section)/Bending Moment)
Yt = (((σi-(p/Acs))*IH)/Mb)

What is Buttress Dam ?

A buttress dam or hollow dam is a dam with a solid, water-tight upstream side that is supported at intervals on the downstream side by a series of buttresses or supports. The dam wall may be straight or curved. Most buttress dams are made of reinforced concrete and are heavy, pushing the dam into the ground.

How to Calculate Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam?

Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam calculator uses Distance from Centroidal = (((Intensity of Normal Stress-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section)/Bending Moment) to calculate the Distance from Centroidal, The Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam is defined as the distance between the centroid and its corresponding vertex is twice the distance between the barycenter and the midpoint of the opposite side. Distance from Centroidal is denoted by Yt symbol.

How to calculate Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam using this online calculator? To use this online calculator for Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam, enter Intensity of Normal Stress i), Load on Buttress Dams (p), Cross-Sectional Area of Base (Acs), Moment of Inertia of Horizontal Section (IH) & Bending Moment (Mb) and hit the calculate button. Here is how the Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam calculation can be explained with given input values -> 20.02903 = (((1200-(15000/13))*23)/53).

FAQ

What is Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam?
The Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam is defined as the distance between the centroid and its corresponding vertex is twice the distance between the barycenter and the midpoint of the opposite side and is represented as Yt = (((σi-(p/Acs))*IH)/Mb) or Distance from Centroidal = (((Intensity of Normal Stress-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section)/Bending Moment). Intensity of Normal Stress on Horizontal plane is the ratio of normal force and area, Load on Buttress Dams here specifies the vertical load acting on the member, Cross-Sectional Area of Base is the area of a two-dimensional shape that is obtained when a three-dimensional shape is sliced perpendicular to some specified axis at a point, Moment of Inertia of horizontal section is defined as the body resisting angular acceleration which is the sum of the product of the mass of with its square of a distance from the axis of rotation & The Bending Moment is the reaction induced in a structural element when an external force or moment is applied to the element, causing the element to bend.
How to calculate Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam?
The Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam is defined as the distance between the centroid and its corresponding vertex is twice the distance between the barycenter and the midpoint of the opposite side is calculated using Distance from Centroidal = (((Intensity of Normal Stress-(Load on Buttress Dams/Cross-Sectional Area of Base))*Moment of Inertia of Horizontal Section)/Bending Moment). To calculate Distance from Centroid for Maximum Intensity in horizontal plane on Buttress Dam, you need Intensity of Normal Stress i), Load on Buttress Dams (p), Cross-Sectional Area of Base (Acs), Moment of Inertia of Horizontal Section (IH) & Bending Moment (Mb). With our tool, you need to enter the respective value for Intensity of Normal Stress, Load on Buttress Dams, Cross-Sectional Area of Base, Moment of Inertia of Horizontal Section & Bending Moment and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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