Confined seepage problem is characterized in that all boundaries of the flow domain are initially known and completely defined. As given by Harr (1962) [3] , the case of a confined seepage under impervious structure with sheet pile based on layer of finite depth was studied by Pavlovsky (1956) [14] and Muskat (1936) [15] , as shown in Figure 2, using the Schwarz-Christoffel transformation. As a result, the seepage discharge due to confined seepage per unit width can be determined as follows:

where K_s is the hydraulic conductivity coefficient for the pervious foundation soil, H is the total effective head on the structure, and K', K are the constants of complete elliptic integral of the first kind with respect to modulus (m), which may be found as follows:

where S is the depth of sheet pile, T is the depth of pervious foundation soil, and b is length of the left and right parts of the structure base width with respect to sheet pile (b₁ = b₂ = b).

It should be noticed that, the values of the constants k, k' can be determined from specific tables according to the value of the modulus (m), as given by Milton, et al. (1970) [16] .

The unconfined seepage problem is characterized by one boundary of the flow domain, free surface. Considering

a two dimensional flow on a horizontal impervious boundary, the Dupuit’s formula for the unconfined seepage discharge per unit width is:

where h₁ and h₂ are the elevation of the two points on the free surface, with distance (L) in between.

Considering the confined seepage problem shown in Figure 2 and eliminating the width of structure, the problem is transformed to a seepage flow beneath a single sheet pile. This case is typically found in zone (I) concerning confined seepage. Therefore, the seepage discharge due to confined seepage in zone (I) may be found using Equation (1).

Substituting for the effective head (H), where H = T + H₁ ? H_o, the confined seepage discharge equation per unit width may be written as follows:

where H₁ is the depth of retained water by the sheet pile, and H_o is the maximum height of free surface just behind sheet piling cofferdam.

Considering the base width (b) = 0 in Equation (2), the modulus (m) becomes:

Substituting for h₁ = H_o and h₂ = T ? D +H₂ in Equation (3), the unconfined seepage discharge equation per unit width is given as follows:

where D is the depth of excavation in the site, H₂ is the depth of seepage water above the foundation layer, and L is the horizontal projection of the free surface length.

For the steady flow condition, the discharge of both confined and unconfined seepage should be the same. Then, equating Equations (4) and (6), one can obtain the following equation:

Adding the term to each side of the above equation and rearranging, the maximum relative height of free surface may be given as follows:

The relative horizontal projection of the free surface length can be determined as follows:

where X is the horizontal distance between the sheet piling cofferdam and the excavated area, M is the side slope factor (M = cotθ), and θ is the inclination angle of excavation slope.

Once the maximum height of free surface (H_o) is found from Equation (8), quantity of the relative seepage

discharge is then calculated, using Equation (4),by:

Considering specific values of the relative parameters (H₁/T) = 0.0, 0.2, (X/T) = 0.0, 0.5, 1.0, (D/T) = 0.2, 0.6, 1.0, M = 1.0, and (S/T) = 0.2, 0.4, 0.6, 0.8, values of (H_o/T) are plotted against (H₂/T) values. Figure 3 is an example to illustrate the effect of variation of (H₂/T) values on (H_o/T) values for specific values of (H₁/T) = 0.0, (X/T) = 0.0, M = 1.0, (D/T) = 0.6, and (S/T) = 0.2, 0.4, 0.6, 0.8. It is found that, values of (H_o/T) increase with increasing values of (H₂/T) for values of (D/T) = 0.2 to about 0.8. For values of (D/T) > 0.8, values of (H_o/T) slightly decrease with increasing values of (H₂/T), as shown in Figure 4.

Also, values of (q/(K_sT)) corresponding to values of (H_o/T) are plotted against (H₂/T) values. Figure 5 illustrates the effect of variation of (H₂/T) values on (q/(K_sT)) values for specific values of (H₁/T) = 0.2, (X/T) = 0.0, M = 1.0, (D/T) = 0.2, and (S/T) = 0.2, 0.4, 0.6, 0.8. It is seen that, values of (q/(K_sT)) linearly decrease with increasing values of (H₂/T). Such decrease in (q/(K_sT)) values gradually disappears with increasing values of (D/T), as shown in Figure 6.

From results of the analysis in this case, it is noticed that, when value of (H₂/T) = (D/T) = 0.2, and (H₁/T) = 0.0, the value of (H_o/T) = 1.0 and in turn value of (q/(K_sT)) = 0.0. For all values of (H_o/T) > 1.0, the corresponding values of (q/(K_sT)) are deleted since combined seepage is only existed for values of (H_o/T) < 1.0.

Considering specific values of the relative parameters (H₂/T) = 0.0, 0.2, (X/T) = 0.0, 0.5, 1.0, (D/T) = 0.2, 0.6, 1.0, M = 1.0, and (S/T) = 0.2, 0.4, 0.6, 0.8, the effect of the relative retained water head (H₁/T) on values of (H_o/T) and (q/(K_sT)) is analyzed. Figure 7 shows the relation between (H_o/T) and (H₁/T) for specific values of (X/T) = 0.5, (H₂/T) = 0.0, M = 1.0, (D/T) = 0.2, and (S/T) = 0.2, 0.4, 0.6, 0.8. It is shown that, (H_o/T) linearly increases as (H₁/T) increases for all values of (D/T). Also, it is shown that, when (H₂/T) = (D/T) = 0.20, and (H₁/T) = 0.05, 0.10, 0.15, 0.20, the values of (H_o/T) > 1.0. In this case, the theory of combined seepage is not valid and the seepage flow becomes confined seepage.

Figure 8 illustrates the effect of variation of (H₁/T) values on (q/(K_sT)) values for specific values of (H₂/T) = 0.0, (D/T) = 0.2, M = 1.0, and (S/T) = 0.2, 0.4, 0.6, 0.8. It is obvious that, (q/(K_sT)) increases as (H₁/T) increases. Also, it is noticed that, when value of (H₂/T) = (D/T) = 0.2, the values of (q/(K_sT)) = 0.0 for any value of (H₁/T).

Applying specific values of the relative parameters (H₁/T) = (H₂/T) = 0.0, 0.2, (D/T) = 0.2, 0.6, 1.0, M = 1.0, and (X/T) = 0.0, 0.5, 1.0, the effect of variation of (S/T) values on both (H_o/T) and (q/(K_sT)) values is checked as

illustrated in Figure 9 and Figure 10. Figure 9 shows the effect of variation of (S/T) values on (H_o/T) values for specific values of (H₁/T) = (H₂/T) = 0.0, M = 1.0, (D/T) = 0.6, and (X/T) = 0.0, 0.5, 1.0. It is clear that, values of (H_o/T) strongly decrease as values of (S/T) increase up to (S/T) = 0.20, after which a slight decrease is obtained. Also, it is seen that, when (H₂/T) = (D/T) = 0.20, (X/T) = 0.0, 0.5, 1.0, values of (H_o/T) ≥ 1.0.

On the other hand, Figure 10 illustrates the effect of variation of (S/T) values on (q/(K_sT)) values for specific values of (H₁/T) = (H₂/T) = 0.0, M = 1.0, (D/T) = 0.6, and (X/T) = 0.0, 1.0. It is found that, values of (q/(K_sT)) have the same trend as values of (H_o/T), where decrease as (S/T) values increase. Also, it is shown that, for values of (H₂/T) = (D/T) = 0.2, (H₁/T) = 0.0, the obtained values of (q/(K_sT)) = 0.0 for values of (X/T) = 0.0, 1.0 at which (H_o/T) ≥ 1.0.

Using specific values of the relative parameters (H₁/T) = 0.0, 0.2, (H₂/T) = 0.0, 0.2, (D/T) = 0.2, 0.6, 1.0, M = 1.0,

and (S/T) = 0.2, 0.4, 0.6, 0.8, the effect of variation of (X/T) values on values of (H_o/T) and (q/(K_sT)) is investigated. Figure 11 shows the effect of variation of (X/T) values on (H_o/T) values for specific values of (H₁/T) = 0.2, (H₂/T) = 0.0, M = 1.0, (D/T) = 0.6, and (S/T) = 0.2, 0.4, 0.6, 0.8. It is clear that, values of (H_o/T) increase with increasing of (X/T) values. Also, it is seen that, for values of (H₂/T) = (D/T) = 0.2, values of (H_o/T) ≥ 1.0.

Figure 12 shows the effect of variation of (X/T) values on (q/(K_sT)) values for the same specific values of parameters as shown in Figure 11. It is found that, values of (q/(K_sT)) decrease when values of (X/T) increase. Also, it is noticed that, for values of (H₂/T) = (D/T) = 0.2, values of (q/(K_sT)) = 0.0 at which (H_o/T) ≥ 1.0.

Applying specific values of the relative parameters (H₁/T) = 0.0, 0.2, (H₂/T) = 0.0, 0.2, (X/T) = 0.0, 0.5, 1.0, M = 1.0, and (S/T) = 0.2, 0.6, 0.8, the effect due to variation of (D/T) values on values of (H_o/T) and (q/(K_sT)) is

analyzed. Figure 13 shows the effect of variation of (D/T) values on (H_o/T) values for specific values of (H₁/T) = (H₂/T) = 0.0, M = 1.0, (X/T) = 0.5, and (S/T) = 0.2, 0.6, 0.8. It is seen that, values of (H_o/T) decrease as values of (D/T) increase reaching to its minimum value, nearly, at (D/T) = 0.7 after which it slightly increases again. This may be referred to that the flow cross section area at the entrance to the excavation area being more contracted when (D/T) = 0.7. Such contraction causes backing effect to the flow which slightly raises the free surface and then increases value of (H_o/T) again. For values of (D/T) > 0.8, the values of (H_o/T) increase because the flow has no way to enter the excavation through its bed surface. Hence, the sloped face of excavation becomes the only possible path for seepage flow to the excavated area.

Values of (q/(K_sT)) are also affected by variation of (D/T) values, as shown in Figure 14 for specific values of

(H₁/T) = 0.2, (H₂/T) = 0.0, M = 1.0, (X/T) = 0.5, and (S/T) = 0.2, 0.6, 0.8. It is noticed that, values of (q/(K_sT)) slightly increase as (D/T) values increase reaching to its maximum value, nearly, at (D/T) = 0.7, then a slight decrease occurred. This may be due to the reverse relation between H_o and q where value of q increases when value of H_o decreases and vice-versa.

To investigate the effect of the side slope factor (M) on values of (H_o/T) and (q/(K_sT)), some specific values of the relative parameters are tested such as; (H₁/T) = (H₂/T) = 0.0, 0.2, (X/T) = 0.0, 0.5, 1.0, (D/T) = 0.2, 0.6, 1.0, and (S/T) = 0.2, 0.8. Thus, various values of the side slope factor are used where M = 0.5, 0.67, 1.0, 1.5, 2.0. The effect of M values on values of (H_o/T) and (q/(K_sT)) is presented as shown in Figure 15 and Figure 16.

Figure 15 illustrates the effect of variation of M values on (H_o/T) values for specific values of (X/T) = 0.0, (S/T) = 0.2, (D/T) = 0.6, and (H₁/T) = (H₂/T) = 0.0, 0.2. It is clear that, increasing the side slope factor (M) leads to a slight increase in values of (H_o/T) for (D/T) = 0.2. Such increase is being noticeable when (D/T) increases as shown in Figure 15 where (D/T) = 0.6.

Figure 16 illustrates the effect of variation of M values on (q/(K_sT)) values for the same specific values of the relative parameters used in Figure 15. It is seen that, increasing the side slope factor (M) leads to a slight decrease in values of (q/(K_sT)) for (D/T) = 0.2. Such decrease of (q/(K_sT)) values increases when (D/T) increases as shown in Figure 16 where (D/T) = 0.6.