A sample of iron ore, weighing 0.700 g, is dissolved in nitric acid. The solution is then, diluted with water, following with sufficient concentrated aqueous ammonia, to quantitative precipitation the iron as `Fe(OH)_(3)`. The precipitate is filtered, ignited and weighed as `Fe_(2)O_(3)`. If the mass of the ignited and dried preciipitate is 0.541 g, what is the mass percent of iron in the original iron ore sample (Fe=56)

A silver coin weighing 11.34 g was dissolved in nitric acid When sodium chloride was added to the solution all the silver (present as AgNO_(3) ) precipitated as silver chloride. The mass of the precipitated silver chloride was 14.35 g. Calculate the percentage of silver in the coin.

A silver coin weighing 11.34g was dissolved in nitric acid. When sodium chloride was added to the solution all the silver (present as AgNO_3 ) was precipitated as silver chloride. The mass of the precipitated silver chloride was 14.35g . Calculate the percentage of silver in the coin.

0.7 g sample of iron ore was dissolved in acid. Iron was reduced to +2 state and it required 50 " mL of " (M)/(50) KMnO_(4) solution for titration. The percentage of Fe and Fe_(3)O_(4) in the ore is

0.804 g sample of iron ore was dissolved in acid. Iron was oxidised to +2 state and it requires 47.2 mL of 0.112N KMnO_(4) solution for titration, Calculate % of Fe of Fe_(3)O_(4) in ore.

1.0 g a of moist sample of a mixture of KCl and KClO_3 was dissolved in water and made up to 250mL . 25 " mL of " this solution was treated with SO_2 . The chlorate was reduced to chloride and excess of SO_2 was removed by boiling. The total chloride was precipitated as AgCl . The weight of the precipitate was 0.1435 g . In another experiment, 25 " mL of " the original solution was heated with 30 " mL of " 0.2 N solution of ferrous sulphate, and the unreacted ferrous sulphate required 37.5 " mL of " 0.08 N solution of an oxidising agent for complete oxidation. Calculate the molar ratio of the chlorate to the chloride in the given mixture Fe^(2+) reacts with ClO_3^(ɵ) according to the equation. ClO_3^(ɵ)+6Fe^(2+)+6H^(o+)toCl^(ɵ)+6Fe^(3+)+3H_2O

10.0 g sample of Cu_(2)O is dissolved in dil. H_(2)SO_(4) where it undergoes disproportionation quantitatively. The solution is filtered off and 8.3 g pure KI cyrstals are added to clear filtrate in order to precipitate CuI with the liberation of I_(2) . The solution is again filtered and boiled till all the I_(2) is removed. Now excess of an oxidising agent is added to the filtrate which liberates I_(2) again. The liberated I_(2) now requires 10 mL of 0.1M Na_(2)S_(2)O_(3) .The percentage by mass of Cu_(2)O in the sample is

Calculate the number of millilitre of NH_(3) (aq) solution (d=0.986g/ml) contain 2.5% by mass NH_(3) , which will be required to precipitate iron as Fe(OH)_(3) in a 0.8 g sample that contains 50% Fe_(2)O_(3) .

Calculate the mass of iron which will be converted into its oxide (Fe_(3)O_(4)) by the action of 36 g steam on it.

2 g of FeC_(2)O_(4) are made to react in acid solution with 0.25 M KMnO_(4) solution. What volume of KMnO_(4) would be required? The be reqruied? The resulting solution is treated with excess of NH_(4)Cl solution and NH_(4)OH solution. The precipitated Fe(OH)_(3) is filtered off, washed and ignited. What is the mass of the product obtained? (Atomic weight of Fe=56 )

A sample containing HAsO_2 (mol. mass =108 ) and weighing 3.78g is dissolved and diluted to 250mL in a volumetric flask. A 50mL sample (aliquat) is withdrawn with a pipet and titrated with 35mL of 0.05 M solution of I_2 . Calculate the percentage HAsO_2 in the sample :