Solution propertiesSolution properties
pHpH AcidAcid BaseBase Ionization of waterIonization of water pH scalepH scale significancesignificance
pKapKa Weak acid, baseWeak acid, base Henderson-Haslebach Henderson-Haslebach
equationequation significancesignificance
Buffered solutionBuffered solution DefinitionDefinition ActionAction Buffer capacityBuffer capacity
Depend on ratio salt/acidDepend on ratio salt/acid Depend on concentration Depend on concentration
salt + acidsalt + acid Depend on amount of Depend on amount of
added a, badded a, b Maximum buffer capacityMaximum buffer capacity PreparationPreparation examplesexamples
Acid
a substance which donates a proton (or hydrogen ion)
the addition of an acid to water will increase hydrogen ion concentration (more than 10-7 mol/l)
Base
a substance that accepts protons the addition of a base will decrease
the concentration of hydrogen ions.
dissociation of water
The dissociation of water can be represented by:
H2O H+ + OH- In pure water the concentrations of
H+ and OH- ions are equal and at 25°C both have the values of 1 x 10-7 mol/l.
dissociation of water
The hydrogen ion concentration range is from 1 mol/l for a strong acid down to 1 x 10-14 mol/l for a strong base.
To avoid the use of such low values pH has been introduced as a more convenient measure of hydrogen ion concentration.
pH scalepH scale
pH
the negative logarithm of the hydrogen Ion concentration [H+]
pH = -log10 [H+]
pH
pH of a neutral solution like pure water is 7, why?
because the conc. of H+ ions (and OH- ) ions = 1 x 10-7 mol/l
pH
pHs of acidic solutions will be less than 7
pHs of alkaline solutions will be greater than 7
pH has several important applications in pharmaceutical
practice.
Affect the solubilities of drugs that are weak acids or bases
Affect the stabilities of many drugs Affect the ease of absorption of
drugs from the GIT
Solution propertiesSolution properties
AcidAcid BaseBase Ionization of waterIonization of water pHpH
significancesignificance pKapKa Henderson-Henderson-
Haslebach equationHaslebach equation
Buffer solutionBuffer solution DefinitionDefinition ActionAction Buffer capacityBuffer capacity PreparationPreparation examplesexamples
Dissociation (or ionization) constants and pKa:
In solutions of weak acids or weak bases equilibria exist between
undissociated molecules and their ions.
Dissociation (or ionization) constants and pKa:
In a solution of a weakly acidic drug HA the equilibrium may be represented by:
HA H+ + A-
Dissociation (or ionization) constants and pKa:
The protonation of a weakly basic drug B can be represented by :
B + H+ BH+
Dissociation (or ionization) constants and pKa:
Such equilibrium do not occur in solutions of strong acids or bases in water, why?
because they are completely ionized.
The ionization constant (dissociation constant) Ka of a weak acid can be obtained by applying the Law of Mass Action:
[H+] [A-] Ka = [HA]
pKa = the negative logarithm of Ka
pH = the negative logarithm of the hydrogen ion conc. [H+]
[HA] pKa = pH + log [A-]
Henderson-Hasselbalch equation:A general equation that is applicable to any acidic drug with one ionizable group where: Cu = conc. of the unionized ; Ci = conc. of the ionized species
Cu pKa = pH + log Ci
The ionization constant (dissociation constant) Ka of a protonated weak base is given by
[H+] [B] Ka = [BH+]
Taking the negative log of this equation:
[BH+] pKa = pH + log [B]
Henderson-Hasselbalch equation:A general equation that is applicable to any weak basic drug with one ionizable group where: Ci = conc. of protonated ; Cu = conc. of the unionized species
Ci pKa = pH + log Cu
The degree of ionization of a drug in a solution can be calculated from the Henderson-Hasselbalch equations for weak acids and bases if the pKa of the drug and the pH of the solution are known
Such calculations are useful in determining the degree of ionization of drugs in various parts of the GIT and in the plasma
Examples
1. The pKa of the weakly acidic drug sulphapyridine is about 8.0
and if the pH of the intestinal contents is 5.0 then the ratio of unionized:ionized drug is given by:
Cu log = pKa - pH = 8 – 5 = 3
Ci
Cu:Ci = antilog 3 = 103 : 1
The pKa value of aspirin, which is a weak acid, is about 3.5, and the pH of the gastric contents is 2.0
Cu log = pKa - pH = 3.5 - 2.0 = 1.5 Cithe ratio of the conc. of unionized acetylsalicyclic acid to acetylsalicylate anion is given by:
Cu:Ci = antilog 1.5 = 31.62 :1
The pH of plasma is 7.4 so that the ratio of unionized:ionized aspirin in this medium is given by:
Cu log = pKa - pH = 3.5 – 7.4 = -3.9 Ci
Cu:Ci = antilog -3.9 = 1.259 x 10-4: 1
Solution propertiesSolution properties
AcidAcid BaseBase Ionization of waterIonization of water pHpH
significancesignificance pKapKa Henderson-Henderson-
Haslebach equationHaslebach equation
Buffer solutionBuffer solution DefinitionDefinition ActionAction Buffer capacityBuffer capacity PreparationPreparation examplesexamples
Buffered Solutions
A buffered solution or buffer is a solution that resists a change in pH upon addition of small amounts of strong acid or strong base.
Composition and Action of Buffered Solutions
A buffer consists of a mixture of a weak acid (HX) and its conjugate base (X–).
HX(aq) ↔ H+(aq) + X–(aq)Thus a buffer contains both: An acidic species (to neutralize OH–)
and A basic species (to neutralize H+).
Buffer Capacity
A buffer counteracts the change in pH of a solution upon the addition of a strong acid, a strong base, or other agents that tend to alter the hydrogen ion concentration.
Buffer capacity β: buffer efficiency, buffer index or buffer value Is the resistance of a buffer to pH changes
upon the addition of a strong acid or base.Definition:It can be defined as being equal to the amount of strong acid or strong base , expressed as moles of H +or OH- ions, required to change the pH of one litre of the buffer by one pH unite.Maximum buffer capacity (βmax) obtain when ratio of acid to salt =
1 i.e. pKa = pH
Definition The ratio of increase of strong base (or acid) to small
change in pH brought about by this addition.
β = Δ B Δ pH
ΔB = the small increment in gram equiv./liter of strong base
added to the buffer solution to produce a pH change Δ pH = pH change
The buffer capacity of the solution has a value of 1:
when the addition of 1 gram equiv. of strong base (or acid) to
1 liter of the buffer solution results in a change of 1 pH unit.
Ex: Acetate buffer contains: 0.1 mole each of acetic acid & sodium acetate in 1 liter of solution. a) 0.01 mole portions of NaOH is added
b) The conc. of Na acetate (the [salt] in buffer equation) ↑ by 0.01 mol/l
& the conc. of acetic acid [acid] ↓ by 0.01 mol/l
because each increment of base converts 0.01 mole of acetic acid into 0.01 mole of sodium acetate according to the reaction. HAc + NaOH NaAc + H2O (0.1 – 0.01) (0.01) (0.1 + 0.01)
The changes in concentration of the salt and the acid by the addition of a base are represented in the buffer equation by using the modified form pH = pKa + log [salt ] + [base] [acid] - [base]
Before the addition of the first portion of NaOH, the pH of the buffer solution is
pH = 4.76 + log ( 0.1 + 0 ) = 4.76 ( 0.1 – 0 )
Moles of NaOH added
pH of solution
0 4.76
0.01 4.85
0.02 4.94
0.03 5.03
0.04 5.13
0.05 5.24
0.06 5.36
Buffer Capacity, β
0.11
0.11
0.11
0.10
0.09
0.08
0.07
The buffer capacity is not a fixed value for a given buffer
system, but depends on the amount of base added.
With the addition of more NaOH, the buffer capacity
decreases rapidly, and, when sufficient base has been
added the acid convert completely into sodium ions and
acetate ions
The buffer has it’s greatest capacity before any base is
added where [salt] / [acid] = 1, and according to equation,
pH = pKa.
The buffer capacity is influenced by an increase in the total
conc. of the buffer constituents since a greater conc. of salt
and acid provides a greater alkaline and acid reserve.
Van Slyke developed a more exact equation for calculation
of buffer capacity β
Ka [H3O+] 2.3 C = β
]H3O+([2+ Ka (
C = The total buffer concentration (the sum of the molar
concentrations of the acid and the salt .(
Ka = dissociation constant
H3O+ = hydrogen ion concentration
The equation permits the calculation of the buffer capacity
at any hydrogen ion concentration, i.e. when no acid or base
has been added to the buffer
Example :
If hydrogen ion concentration is 1.75 x 10-5, pH = 4.76
what is the capacity of the buffer containing 0.10 mole of
each of acetic acid and sodium acetate per liter of solution ?
The total concentration , C = [acid] + [salt], is 0.20 mol/l and
the dissociation constant Ka is 1.75 x 10-5
Ka [H3O+] 2.3 C = β
(Ka + [H3O+])2
β = 2.3 X 0.20 X (1.75x10-5) X (1.75 X 10-5) = 0.115
[(1.75x10-5) +(1.75 X 10-5)]2
Prepare a buffer solution of pH 5 having a capacity of 0.02.
1-One chooses a weak acid having a pKa close to the pH desired. Acetic acid, pKa= 4.76 is suitable in
this case
2-The ratio of salt and acid required to produce a pH of 5 was found to be [salt] / [acid] = 1.74/ 1
3 [The buffer capacity equation is used to obtain the total buffer concentration , C = [salt ] + [acid]
Ka[H3O+] 2.3 C = β
]H3O+([2+ Ka (
0.02 = 2.3 X C X (1.75x10-5) X (1X 10-5)
[(1.75x10-5) + (1 X 10-5)]2
C= 3.75 x 10-2 mol/l From (b): [salt] = 1.74 x [acid], and from (c): C = 1.74 x [acid] + [acid] = 3.75 X 10-2 mol/l
[acid] = 1.37 x 10-2 mol/l[salt] = 1.74 X [acid] = 2.38 X 10-2 mol/l
The influence of concentration on buffer capacity .
The buffer capacity is affected not only by the (salt)/(acid) ratio but also by the total concentrations of acid and salt . As shown previously in the table.when 0.01 mole of base was added to a 0.1 molar acetate buffer, the pH increased from 4.76 to 4.85 or a ∆ pH of 0.09 If the concentration of acetic acid and sodium acetate is raised to 1 molar ,the pH of the original buffer solution remains at about 4.76 , but now upon the addition of 0.01 mole of base it becomes 4.77 and ∆ pH of only 0.01 Therefore, an increase in the concentration of the buffer components results in a greater buffer capacity or efficiency.
In summary , the buffer capacity depends on
)a (the value of the ratio salt/acid , β increase as the value approaches unity.
)b (the magnitude of the individual concentrations of the buffer components, β increase as C increased
Maximum buffer capacity.
The maximum buffer capacity occurs when pH = pKa or when (H3O+) = Ka
max = 2.303 C (H3O+) 2 = 0.576 β 2 )H3O+ (2
β max = 0.576 C
Where C is the total buffer concentration
Example: What is the maximum buffer capacity of an acetate buffer
with a total concentration of 0.20 mol/l? β max = 0.576 C
= 0.01152 = 0.01
Solution propertiesSolution properties
pHpH AcidAcid BaseBase Ionization of waterIonization of water pH scalepH scale significancesignificance
pKapKa Weak acid, baseWeak acid, base Henderson-Haslebach Henderson-Haslebach
equationequation significancesignificance
Buffered solutionBuffered solution DefinitionDefinition ActionAction Buffer capacityBuffer capacity
Depend on ratio salt/acidDepend on ratio salt/acid Depend on concentration Depend on concentration
salt + acidsalt + acid Depend on amount of Depend on amount of
added a, badded a, b Maximum buffer capacityMaximum buffer capacity PreparationPreparation examplesexamples
I think you are referring to buffers. At the I think you are referring to buffers. At the point of half neutralisation, the acid and its point of half neutralisation, the acid and its conjugate base are at equal concentrationsconjugate base are at equal concentrations
Ka= [H+][A-]/[HA]Ka= [H+][A-]/[HA]
But when [HA]=[A-] half way through the But when [HA]=[A-] half way through the reacion, this cancels down to Ka=[H+]reacion, this cancels down to Ka=[H+]=> pKa=pH=> pKa=pH
Isoelectric pointIsoelectric point The The isoelectric pointisoelectric point ( (pIpI), sometimes abbreviated ), sometimes abbreviated
to to IEPIEP, is the pH at which a particular molecule or , is the pH at which a particular molecule or surface carries no net electrical charge.surface carries no net electrical charge.
Amphoteric molecules called zwitterions contain both Amphoteric molecules called zwitterions contain both positive and negative charges depending on the positive and negative charges depending on the functional groups present in the molecule. The net functional groups present in the molecule. The net charge on the molecule is affected by pH of their charge on the molecule is affected by pH of their surrounding environment and can become more surrounding environment and can become more positively or negatively charged due to the loss or positively or negatively charged due to the loss or gain of protons (H+). The pI is pH value at which the gain of protons (H+). The pI is pH value at which the molecule carries no electrical charge or the negative molecule carries no electrical charge or the negative and positive charges are equal.and positive charges are equal.
The pI value can affect the solubility of a molecule at The pI value can affect the solubility of a molecule at a given pH. Such molecules have minimum solubility a given pH. Such molecules have minimum solubility in water or salt solutions at the pH which corresponds in water or salt solutions at the pH which corresponds to their to their pIpI and often precipitate out of solution. and often precipitate out of solution.