Vector Mechanics for Engineers: Statics
Vector Mechanics for Engineers: Statics
12th Edition
ISBN: 9781260501735
Author: BEER
Publisher: MCG
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Chapter 5.3, Problem 5.81P

The cross section of a concrete dam is as shown. For a 1-m-wide dam section determine (a) the resultant of the reaction forces exerted by the ground on the base AB of the dam, (b) the point of application of the resultant of part a, (c) the resultant of the pressure forces exerted by the water on the face BC of the dam.

Chapter 5.3, Problem 5.81P, The cross section of a concrete dam is as shown. For a 1-m-wide dam section determine (a) the

Fig. P5.81

(a)

Expert Solution
Check Mark
To determine

The reaction forces exerted by the ground on the base of the concrete dam AB.

Answer to Problem 5.81P

The resultant reaction forces acts on the base of the dam is H=44.1kN and V=228kN acts in the upward direction.

Explanation of Solution

Given that the width of the dam section w is 1ft. The height of the dam at the point C is h=18ft.

The free-body diagram consists of dam and the triangular section BDE of water above the dam is shown in the Figure 1.

Vector Mechanics for Engineers: Statics, Chapter 5.3, Problem 5.81P , additional homework tip  1

The length x1 is acts on the load W1, the distance from the base to the center of the dam is x2 acts on the load W2, the distance from the base to the point D is x3 acts on the load W3, other forces acting on the free body are the weight of the dam represented by the weights of its components are W1, W2, and the weight of the water is W3, and the resultant pressure forces exerted on section BD by the water is P.

Write the equation for weight force acts on the dam.

W=ρghA (I)

Here, the weight of the dam is W, density of the object is ρ, acceleration due to gravity is g, height of the dam is h, and the area of the cross section of the dam is A.

Replace bt for A in the equation (I).

W=ρgh(bt)

Here, the thickness of the dam section is t and the breadth of the dam section is b.

Write the equation for the weight of the dam represented by the weights of its components. W1=ρCgh1(b1t)

Here, the weight of the dam by the components of fist section is W1, density of the concrete dam is ρC, acceleration due to gravity is g, the thickness of the dam section is t, the breadth of the dam section at C is b1, and the height of the dam from the ground to cross section of dam is h1.

Substitute 2.4×103kg/m3 for ρC, 9.81m/s2 for g, 4m for h1, 1.5m for b1 and 1m for t.

W1=(2.4×103kg/m3)(9.81m/s2)(4m)(1.5m)(1m)=141.264×103N(1kN103N)=141.26kN

Write the equation for the weight of the dam represented in the triangular section.

W2=13ρCg(b2h2t)

Here, the weight of the dam by the components of second section is W2, the thickness of the dam section is t, the breadth of the dam section at CE is b2, and the height of the dam from the ground section EB is h2.

Substitute 2.4×103kg/m3 for ρC, 9.81m/s2 for g, 3m for h2, 2m for b2 and 1m for t.

W2=13(2.4×103kg/m3)(9.81m/s2)(2m)(3m)(1m)=47.088×103N(1kN103N)=47.09kN

Write the equation for the weight of the dam represented in the parabola section by the weights of its components.

W3=23ρwg(b3h3t)

Here, the weight of the dam by the components of third section is W3, density of the water is ρw, the breadth of the dam section at CE is b2, and the height of the dam from the ground section EB is h3.

Substitute 103kg/m3 for ρw, 9.81m/s2 for g, 3m for h3, 2m for b3 and 1m for t.

W3=23(103kg/m3)(9.81m/s2)(2m)(3m)(1m)=39.24×103N(1kN103N)=39.24kN

Write the equation of the force pressure exerted by the ground on the base of the dam.

P=12Ap (II)

Here, the reaction force exerted on the dam is P, cross section area of the dam is A, and the pressure of the water is p.

Replace ρgh for p and hw for A in equation (II).

P=12(hw)(ρwgh) (III)

Write the equilibrium equation for the section of dam acts along x axis (Refer Fig 1).

Fx=0HP=0 (IV)

Here, the reaction force exerted by the ground on the base AB of the dam is H.

Write the equilibrium equation for the section of beam acts along y axis and then calculate the reaction force (Refer Fig 1).

Fy=0VW1W2W3=0 (V)

Here, the reaction force exerted by the ground on the base AB of the dam is V.

Conclusion:

Substitute 103kg/m3 for ρw, 9.81m/s2 for g, 3m for h, and 1m for w. in equation (III) and solve for P.

P=12(3m)(103kg/m3)(9.81m/s2)(1m)(3m)=44.145×103N(1kN103N)=44.145kN

Substitute 44.145kN for P in equation (IV) and solve for H.

H44.145kN=0H=44.145kN=44.1kN

Substitute 141.26kN for W1, 47.09kN for W2, and 39.24kN for W3, in equation (V) and solve for V.

V141.26kN47.09kN39.24kN=0V227.59kN=0V=227.6kN=228kN

Therefore, the resultant reaction forces acts on the base of the dam is H=44.1kN and V=228kN acts in the upward direction.

(b)

Expert Solution
Check Mark
To determine

The point of forces acts on the base AB of the dam from the resultant of part a.

Answer to Problem 5.81P

The point in which the forces acts on the base AB of the dam is x=1.167m acting toward right side of A.

Explanation of Solution

The distance from the base of the dam to the point A acts on the load W1 is

x1=12(1.5m)=0.75m

The distance from the base of the dam to the side BD acts on the load W2 is.

x2=1.5m+14(2m)=2m

The distance from the base of the dam to the point DE acts on the load W3 (Refer fig 1) is.

x3=1.5m+58(2m)=2.75m

Write the equilibrium equation for the section on the base AB of the dam and calculate the moment labeled at point A (Refer Fig 1).

MA=0xVW1x1W2x2W3x3+Pw=0 (VI)

Here, the different section of the dam is represented as x1, x2, and x3.

Conclusion:

Substitute 144.26kN for W1, 47.09kN for W2, 39.24kN for W3, 228kN for V, 0.75m for x1, 2m for x2, 2.75m for x3, 44.145kN for P, and 1m for w in equation (VI) and to solve x.

x(228kN)(144.26kN)(0.75m)(47.09kN)(2m)(39.24kN)(2.75m)+(44.145kN)(1m)=0x(228kN)(108.195kNm)(94.18kNm)(107.91kNm)+(44.145kNm)=0x(228kN)(310.285kN.m)+(44.145kNm)=0

Solve the above equation for x.

x(228kN)(310.285kN.m)+(44.145kNm)=0x(228kN)(266.14kNm)=0x(228kN)=(266.14kNm)x=1.167m

Therefore, the point in which the forces acts on the base AB of the dam is x=1.167m acting toward right side of A.

(c)

Expert Solution
Check Mark
To determine

The resultant pressure force exerted by the water on the face BC of the dam.

Answer to Problem 5.81P

The resultant pressure force exerted by the water on the face BC of the dam is R=59.1kN at the angle of 41.6°.

Explanation of Solution

The free body diagram of the water section BDE in the dam as shown in figure 2:

Vector Mechanics for Engineers: Statics, Chapter 5.3, Problem 5.81P , additional homework tip  2

Vector Mechanics for Engineers: Statics, Chapter 5.3, Problem 5.81P , additional homework tip  3

Write the equilibrium equation for the s resultant pressure force exerted by the water on the face BC of the dam (Refer Fig 2).

F=0R=P2+W32 (VII)

Here, the resultant pressure force exerted by the water on the dam is R.

Solve for the angle of resultant force exerted by the water on the dam by using trigonometric relation (Refer fig 3).

tanθ=oppadjθ=tan1(W3P) (VIII)

Conclusion:

Substitute 39.24kN for W3 and 44.145kN for P in equation (VII) and to solve for R.

R=(44.145kN)2+(39.24kN)21948.781025=59.06kN=59.1kN

Substitute 39.24kN for W3 and 44.145kN for P in equation (VIII) and to solve for θ.

θ=tan1(39.24kN44.145kN)=tan1(0.8889)=41.6°

Therefore, the resultant pressure force exerted by the water on the face BC of the dam is R=59.1kN at the angle of 41.6°.

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Chapter 5 Solutions

Vector Mechanics for Engineers: Statics

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