1. /
2. CBSE
3. /
4. Class 12
5. /
6. Solutions Class 12 Notes...

# Solutions Class 12 Notes Chemistry

### myCBSEguide App

Download the app to get CBSE Sample Papers 2023-24, NCERT Solutions (Revised), Most Important Questions, Previous Year Question Bank, Mock Tests, and Detailed Notes.

CBSE Class 12 Chemistry Chapter 2 Solutions notes in PDF are available for free download in myCBSEguide mobile app. The best app for CBSE students now provides Solutions class 12 Notes Chemistry latest chapter wise notes for quick preparation of CBSE board exams and school-based annual examinations. Class 12 Chemistry notes on chapter 2 Solutions are also available for download in CBSE Guide website.

## Solutions Class 12 Notes Chemistry

Download CBSE class 12th revision notes for chapter 2 Solutions in PDF format for free. Download revision notes for Solutions class 12 Notes and score high in exams. These are the Solutions class 12 Notes Chemistry prepared by team of expert teachers. The revision notes help you revise the whole chapter 2 in minutes. Revision notes in exam days is one of the best tips recommended by teachers during exam days.

## CBSE Class 12 Chemistry Quick Revision Notes Chapter 2 Solutions

$Molality = \frac{{{\text{ Number of moles of solute}}}}{{{\text{Mass of solvent in kilograms}}}}$

$Molarity = \frac{{{\text{ Number of moles of solute}}}}{{{\text{Volume of solution in litres}}}}$

The difference in boiling points of solution ${T_b}$ and pure solvent $T_b^0$ is called elevation in boiling point $\Delta T = {T_b} - T_b^0$

$\Delta {T_b} = \frac{{{k_b}{\text{ x 1000 x }}{{\text{w}}_2}}}{{{M_2}{\text{ x }}{{\text{w}}_1}}}$

$\Delta {T_f} = \frac{{{k_f}{\text{ x 1000 x }}{{\text{w}}_2}}}{{{M_2}{\text{ x }}{{\text{w}}_1}}}$

$\frac{{p_1^0 - {p_`}}}{{p_1^0}} = i.\frac{{{n_2}}}{{{n_1}}}\\\$

$\Delta {T_b} = i.\frac{{{k_b}{\text{ x 1000 x }}{{\text{w}}_2}}}{{{M_2}{\text{ x }}{{\text{w}}_1}}}\\\$

$\Delta {T_f} = i.\frac{{{k_f}{\text{ x 1000 x }}{{\text{w}}_2}}}{{{M_2}{\text{ x }}{{\text{w}}_1}}}\\\$

• Solutions: Solutions are the homogeneous mixtures of two or more than two components.
• Binary solution: A solution having two components is called a binary solution.
• Components of a binary solution.
It includes solute and solvent.

1. When the solvent is in solid state, solution is called solid solution.
2. When the solvent is in liquid state, solution is called liquid solution.
3. When the solvent is in gaseous state, solution is called gaseous solution.
• Concentration: It is the amount of solute in given amount of solution.
• Mass by volume percentage (w/v): Mass of the solute dissolved in 100 mL of solution.
• Molality (m) is the number of moles of solute present in 1kg of solvent.
• Molarity (M) is the number of moles of solute present in 1L of solution.
• Normality is the number of gram equivalent of solute dissolved per litre of solution.
• Solubility: It is the maximum amount that can be dissolved in a specified amount of solvent at a specified temperature.
• Saturated solution: It is a solution in which no more solute can be dissolved at the same temperature and pressure.
• In a nearly saturated solution if dissolution process is an endothermic process, solubility increases with increase in temperature.
• In a nearly saturated solution if dissolution process is an exothermic process, solubility decreases with increase in temperature.
• Henry’s Law: It states “at a constant temperature the solubility of gas in a liquid is directly proportional to the pressure of gas”. In other words, “the partial pressure of gas in vapour phase is proportional to the mole fraction of the gas in the solution”.
• When a non-volatile solute is dissolved in a volatile solvent, the vapour pressure of solution is less than that of pure solvent.
• Raoult’s law: It states that “for a solution of volatile liquids the partial vapour pressure of each component in the solution is directly proportional to its mole fraction”.${p_1} = {p^0}_1{X_1};{p_2} = {p^0}_2{X_2}$
• Using Dalton’s law of partial pressure the total pressure of solution is calculated.
${p_{total}} = {p^0}_1 + ({p_2} - {p^0}_1){X_2}$
• Comparison of Raoult’ law and Henry’s law: It is observed that the partial pressure of volatile component or gas is directly proportional to its mole fraction in solution. In case of Henry’s Law the proportionality constant is KH and it is different from p10 which is partial pressure of pure component. Raoult’s Law becomes a special case of Henry’s Law when KH becomes equal to p10 in Henry’s law.
• Classification of liquid–liquid solutions: It can be classified into ideal and non-ideal solutions on basis of Raoult’s Law.
• Ideal solutions:
1. The solutions that obey Raoult’s Law over the entire range of concentrations are known as ideal solutions.
2. ${\Delta _{mix}}H = 0{\text{ and }}{\Delta _{mix}}V = 0$
3. The intermolecular attractive forces between solute molecules and solvent molecules are nearly equal to those present between solute and solvent molecules i.e. A-A and B-B interactions are nearly equal to those between A-B.
• Non-ideal solutions:
1. When a solution does not obey Raoult’s Law over the entire range of concentration, then it is called non-ideal solution.
2. ${\Delta _{mix}}H \ne 0{\text{ and }}{\Delta _{mix}}V \ne 0$
3. The intermolecular attractive forces between solute molecules and solvent molecules are not equal to those present between solute and solvent molecules i.e. A-A and B-B interactions are not equal to those between A-B
• Types of non- ideal solutions:
1. Non ideal solution showing positive deviation
2. Non ideal solution showing negative deviation
• Non ideal solution showing positive deviation
1. The vapour pressure of a solution is higher than that predicted by Raoult’s Law.
2. The intermolecular attractive forces between solute-solvent molecules are weaker than those between solute-solute and solvent-solvent molecules i.e., A-B < A-A and B-B interactions.
• Non ideal solution showing negative deviation
1. The vapour pressure of a solution is lower than that predicted by Raoult’s Law.
2. The intermolecular attractive forces between solute-solvent molecules are stronger than those between solute-solute and solvent-solvent molecules i.e. A-B > A-A and B-B interactions.
• Azeotopes: These are binary mixtures having same composition in liquid and vapour phase and boil at constant temperature. Liquids forming azeotrope cannot be separated by fractional distillation.
• Types of azeotropes: There are two types of azeotropes namely,
1. Minimum boiling azeotrope
2. Maximum boiling azeotrope
• The solutions which show a large positive deviation from Raoult’s law form minimum boiling azeotrope at a specific composition.
• The solutions that show large negative deviation from Raoult’s law form maximum boiling azeotrope at a specific composition.
• Colligative properties: The properties of solution which depends on only the number of solute particles but not on the nature of solute are called colligative properties.
• Types of colligative properties: There are four colligative properties namely,
1. Relative lowering of vapour pressure
2. Elevation of boiling point
3. Depression of freezing point
4. Osmotic pressure
• Relative lowering of vapour pressure: The difference in the vapour pressure of pure solvent $p_1^0$ and solution ${p_1}$ represents lowering in vapour pressure$(p_1^0 - {p_1})$.
• Relative lowering of vapour pressure: Dividing lowering in vapour pressure by vapour pressure of pure solvent is called relative lowering of vapour pressure $\left( {\frac{{p_1^0 - {p_1}}}{{p_1^0}}} \right)$
• Relative lowering of vapour pressure is directly proportional to mole fraction of solute. Hence it is a colligative property.
• Elevation of boiling point: $\left( {\frac{{p_1^0 - {p_1}}}{{p_1^0}}} \right) = {X_2}$
• For a dilute solution elevation of boiling point is directly proportional to molal concentration of the solute in solution. Hence it is a colligative property.
• Depression of freezing point: The lowering of vapour pressure ofsolution causes a lowering of freezing point compared to that of pure solvent.The difference in freezing point of the pure solvent $T_f^0$ and solution ${T_f}$is called the depression in freezing point.$\Delta T = T_f^0 - {T_f}$
• For a dilute solution depression in freezing point is a colligative property because it is directly proportional to molal concentration of solute.
• Osmosis: The phenomenon of flow of solvent molecules through a semi permeable membrane from pure solvent to solution is called osmosis.
• Osmotic pressure: The excess pressure that must be applied to solution to prevent the passage of solvent into solution through a semipermeable membrane is called osmotic pressure.
• Osmotic pressure is a colligative property as it depends on the number of solute particles and not on their identity.
• For a dilute solution, osmotic pressure ($\pi$) is directly proportional to the molarity (C) of the solution i.e. $\pi$= CRT
• Osmotic pressure can also be used to determine the molar mass of solute using the equation ${M_2} = \frac{{{w_2}RT}}{{\pi V}}$
• Isotonic solution: Two solutions having same osmotic pressure at a given temperature are called isotonic solution.
• Hypertonic solution: If a solution has more osmotic pressure than other solution it is called hypertonic solution.
• Hypotonic solution: If a solution has less osmotic pressure than other solution it is called hypotonic solution.
• Reverse osmosis: The process of movement of solvent through a semipermeable membrane from the solution to the pure solvent by applyingexcess pressure on the solution side is called reverse osmosis.
• Colligative properties help in calculation of molar mass of solutes.
• Abnormal molar mass: Molar mass that is either lower or higher than expected or normalmolar mass is called as abnormal molar mass.
• Van’t Hoff factor: Van’t Hoff factor (i)accounts for the extent of dissociation or association.$i = \frac{{{\text{Normal molar mass}}}}{{{\text{Abnormal molar mass}}}}$$= \frac{{{\text{Observed collogative property}}}}{{{\text{Calculated collogative property}}}}$$= \frac{{{\text{Total number of moles of particles after association / dissociation}}}}{{{\text{Total number of moles of particles before association / dissociation}}}}$
• Value of i is less than unity in case solute undergo association and the value of i is greater than unity in case solute undergo dissociation.
• Inclusion of van’t Hoff factor modifies the equations for colligative properties as:

## CBSE Class 12 Revision Notes and Key Points

Solutions class 12 Notes. CBSE quick revision note for class-12 Chemistry, Physics Math’s, Biology and other subject are very helpful to revise the whole syllabus during exam days. The revision notes covers all important formulas and concepts given in the chapter. Even if you wish to have an overview of a chapter, quick revision notes are here to do if for you. These notes will certainly save your time during stressful exam days.

To download Solutions class 12 Notes, sample paper for class 12 Physics, Chemistry, Biology, History, Political Science, Economics, Geography, Computer Science, Home Science, Accountancy, Business Studies and Home Science; do check myCBSEguide app or website. myCBSEguide provides sample papers with solution, test papers for chapter-wise practice, NCERT solutions, NCERT Exemplar solutions, quick revision notes for ready reference, CBSE guess papers and CBSE important question papers. Sample Paper all are made available through the best, app for CBSE students and myCBSEguide website.

Test Generator

Create question paper PDF and online tests with your own name & logo in minutes.

myCBSEguide

Question Bank, Mock Tests, Exam Papers, NCERT Solutions, Sample Papers, Notes

### 2 thoughts on “Solutions Class 12 Notes Chemistry”

1. VEr good notes