7.9 10-5
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∙ 15y agoThe solubility of BaCO3 can be calculated by taking the square root of the Ksp value, which is 7.94 x 10^-5 mol/L. This represents the maximum amount of BaCO3 that can dissolve in water at equilibrium.
The solubility of PbBr2 at 25°C can be calculated using the Ksp value. Since PbBr2 dissociates into Pb2+ and 2 Br- ions, the solubility (S) can be found using the expression Ksp = [Pb2+][Br-]^2. By substituting the given Ksp value into the equation, you can solve for the solubility of PbBr2 at 25°C.
The solubility of a compound is related to its Ksp value through the equilibrium expression for the dissolution of the compound in water. The Ksp value represents the equilibrium constant for the dissolution reaction, and a higher Ksp value indicates a higher solubility of the compound in water. Essentially, the Ksp value quantitatively describes the extent to which the compound will dissolve in water.
The symbol for the solubility product constant is Ksp. It represents the equilibrium constant for the dissolution of a sparingly soluble compound in a solvent.
From the definition of Ksp, the product of the concentrations of Ag+ and Cl- can be no more than (1.8 X 10-10)/0.35 = 5.1 X 10-10. Since the only named material that is a source of silver ions is AgCl and the concentrations are molar, this is the maximum possible solubility of AgCl.
It gives us an indication of its solubility in water. A large solubility constant (Ksp) means it is easily water-soluble. A small Ksp means it is generally insoluble in water.
The solubility-product constant (Ksp) for barium carbonate (BaCO3) is calculated by multiplying the concentrations of the ions in a saturated solution. If the concentration of BaCO3 in a saturated solution is 1.1 x 10^(-4) M, then [Ba^2+][CO3^2-] = Ksp = (1.1 x 10^(-4))^2.
The solubility of AlPO4 can be calculated by taking the square root of its Ksp value. In this case, the solubility of AlPO4 is equal to approximately 3.13 x 10-11.
The solubility of PbBr2 at 25°C can be calculated using the Ksp value. Since PbBr2 dissociates into Pb2+ and 2 Br- ions, the solubility (S) can be found using the expression Ksp = [Pb2+][Br-]^2. By substituting the given Ksp value into the equation, you can solve for the solubility of PbBr2 at 25°C.
1.2x10-2
The solubility of a compound is related to its Ksp value through the equilibrium expression for the dissolution of the compound in water. The Ksp value represents the equilibrium constant for the dissolution reaction, and a higher Ksp value indicates a higher solubility of the compound in water. Essentially, the Ksp value quantitatively describes the extent to which the compound will dissolve in water.
The solubility of PbCl2 can be calculated using the formula for Ksp: [Pb2+][Cl-]^2 = 2 x 10^-5. Let the solubility of PbCl2 be "x". Therefore, the expression for the Ksp would be x(2x)^2 = 2 x 10^-5. Solving for x gives a solubility of 1.58 x 10^-2 M.
The symbol for the solubility product constant is Ksp. It represents the equilibrium constant for the dissolution of a sparingly soluble compound in a solvent.
The solubility of AuCl in a 0.2 M solution of NaCl would depend on the solubility product constant (Ksp) of AuCl in water. If the Ksp of AuCl is exceeded by the presence of NaCl, AuCl would precipitate out of solution. If the Ksp is not exceeded, AuCl would remain in solution. Additional information, such as the Ksp value of AuCl, would be needed to calculate the exact solubility.
From the definition of Ksp, the product of the concentrations of Ag+ and Cl- can be no more than (1.8 X 10-10)/0.35 = 5.1 X 10-10. Since the only named material that is a source of silver ions is AgCl and the concentrations are molar, this is the maximum possible solubility of AgCl.
1.0 x 10-12
It gives us an indication of its solubility in water. A large solubility constant (Ksp) means it is easily water-soluble. A small Ksp means it is generally insoluble in water.
The solubility of potassium nitrate can be calculated using its solubility product constant (Ksp). The Ksp value for potassium nitrate is determined experimentally and represents the product of the concentrations of the ions in a saturated solution of the compound. By using the Ksp value, you can set up an equilibrium expression and solve for the solubility of potassium nitrate in moles per liter.