User talk:EmmaJr

γbulk= WT/ VT = (Ws+WW)/(Vs+VV) but Vs=1 therefore,              e=Vv/Vs,        is equal to   e= Vv , γbulk= (Ws+Ww)/(1+e) Ws=Gsγw                Ww=WGsγw γbulk=(Gsγw+WGsγw)/(1+e)

Solution 2. γsat= WT/VT=(Ws+Ww)/(Vs+Vv) e= Vv/Vs             Vs=1,                 e=Vv γsat= (Ws+Ww)/(1+e) = (Gsγw+Ww)/(1+e) = (Gsγw+γwe)/(1+e) =γw((Gs+e)/(1+e))

Solution 3. W=Ww/Ws                             Ww=Sreγw Referring to γdry=WS/VT    WS=γdry(Vs+Vv) Ws=γdry(1+e) However, since Vs=1 and Vv=e when we placed the values in W, we had W=Ww/Ws W= Sreγw/γdry(1+e)

(Wγdry/Srγw)=(e/1+e) but e=WGs/Sr

(Wγdry/Srγw)=((WGs/Sr)/(1+(WGs/Sr))

(Wγdry/Srγw)=(WGs/Sr)/((Sr+WGs)/Sr)

(Wγdry/Srγw)=(WGs/Sr+WGs)

Wγdry(Sr+WGs)=SrγwWGs

γdry=(GsSrγw/Sr+WGs)

γdry=(GsSr/Sr+WGs)γw

Solution 4. γdry= Ws/VT =Gsγw/Vs+Vv γdry=Gsγw/1+e 1+e=Gsγw/γdry e=((Gsγw/γdry))-1

Solution 5. From W=Ww/Ws, γw=Ww/Vw       so, Ww=γwVw Ww=Vwγw     and   Sr=Vw/Vv results in Vw=SrVv Ws=γs Ww=Srγwe because as earlier on stated Vv=e, so Ws=Gsγw W=Ww/Ws so W=eSr/Gs