To solve this problem, we can use the concept of mass balance and stoichiometry. First, we need to find the moles of chloride ions Cl- in the sample using the mass of silver chloride AgCl obtained.The molar mass of AgCl = 107.87 Ag + 35.45 Cl = 143.32 g/molNow, we can find the moles of AgCl:moles of AgCl = mass of AgCl / molar mass of AgClmoles of AgCl = 6.50 g / 143.32 g/mol = 0.0453 molSince the reaction between chloride ions and silver nitrate is a 1:1 ratio, the moles of Cl- ions in the sample are also 0.0453 mol.Now, let's assume that the mass of NaCl in the sample is x grams and the mass of KCl is 2.00 - x grams.The molar mass of NaCl = 22.99 Na + 35.45 Cl = 58.44 g/molThe molar mass of KCl = 39.10 K + 35.45 Cl = 74.55 g/molWe can now find the moles of Cl- ions from NaCl and KCl:moles of Cl- from NaCl = x g / 58.44 g/molmoles of Cl- from KCl = 2.00 - x g / 74.55 g/molSince the total moles of Cl- ions in the sample are 0.0453 mol, we can write the equation:moles of Cl- from NaCl + moles of Cl- from KCl = 0.0453 molSubstituting the expressions for moles of Cl- from NaCl and KCl, we get: x / 58.44 + 2.00 - x / 74.55 = 0.0453Now, we can solve for x:x 1.22 gSo, the mass of NaCl in the sample is approximately 1.22 g, and the mass of KCl is:2.00 g - 1.22 g 0.78 gNow, we can find the percentage composition of NaCl and KCl in the mixture:% NaCl = mass of NaCl / total mass of the mixture 100% NaCl 1.22 g / 2.00 g 100 61%% KCl = mass of KCl / total mass of the mixture 100% KCl 0.78 g / 2.00 g 100 39%Therefore, the composition of the mixture is approximately 61% sodium chloride NaCl and 39% potassium chloride KCl .