There is a lot of talk about pH and shampoos. Some shampoos claim they balance the pH in your hair, others say they are alkaline and others say they are neutral or match the "natural" pH of your hair. What do you think that this means? Do you think the pH of your shampoo affects the condition of your hair? Why or why not? *

Answer:

a) ε = 6.961 × 10⁻²⁰Joules

b)The ratio of ϵ to the average kinetic energy of H2O molecules = 10.642

Explanation:

a) The formula to be used is given below as :

Heat of Vapourisation(Lv) = εn

Where: ε = is the average energy of the escaping molecules and

n = is the number of molecules per gram

The first step is to convert 557 cal/g to joules/kilogram(j/kg)

1 cal/g = 4186.8j/kg

557cal/g = ?

We cross multiply

557cal/g × 4186.8j/kg

= 2332047.6j/kg

Therefore, 557 cal/g = 2332047.6j/kg

ε = Lv/n

ε = LvM/n

Where Lv = 2332047.6j/kg

M = 0.018kg/mol

n = 6.03 × 10²³mol

ε =( 2332047.6j/kg × 0.018kg/mol) ÷ 6.03 × 10²³mol

= 6.961336119 × 10⁻²⁰Joules

Approximately, ε = 6.961 × 10⁻²⁰Joules

b) Kinetic energy = (3/2)KT

The ratio of ε to Kinetic energy = ε/(3/2)kT = 2ε /3kT

Where ε = 6.961 × 10⁻²⁰Joules

k = 1.38× 10⁻²³ Joules/kelvin

T = 33°C , which will be converted to kelvin as

33°C + 273K

= 306K

The ratio of  ε to Kinetic energy will be calculated as

2ε /3kT

= (2×6.961 × 10⁻²⁰ Joules) ÷ (3 × 1.38× 10⁻²³Joules/kelvin × 306K)

= 10.642

Hence , The ratio of ϵ to the average kinetic energy of H2O molecules = 10.642

Answer:

C. attaching an active metal to make the pipe the cathode in an electrochemical cell.

Explanation:

Cathodic protection is a technique which helps in controlling the increased rate of corrosion of a metal surface by making it the cathode of an electrochemical cell. It connects the metal to be protected to a more easily corroded which is usually referred to as the sacrificial metal to act as the anode.

This technique preserves the metal by providing a highly active metal that can act as an anode and provide free electrons. By introducing these free electrons, the active metal sacrifices its ions and keeps the less active steel from corroding.

Answer: The final temperature of the mixture is  49°C

Explanation:

To calculate the mass of water, we use the equation:

[tex]\text{Density of substance}=\frac{\text{Mass of substance}}{\text{Volume of substance}}[/tex]

Density of cold water = 1 g/mL

Volume of cold water = 230.0 mL

Putting values in above equation, we get:

[tex]1g/mL=\frac{\text{Mass of water}}{230.0mL}\\\\\text{Mass of water}=(1g/mL\times 230.0mL)=230g[/tex]

Density of hot water = 1 g/mL

Volume of hot water = 120.0 mL

Putting values in above equation, we get:

[tex]1g/mL=\frac{\text{Mass of water}}{120.0mL}\\\\\text{Mass of water}=(1g/mL\times 120.0mL)=120g[/tex]

When hot water is mixed with cold water, the amount of heat released by hot water will be equal to the amount of heat absorbed by cold water.

[tex]Heat_{\text{absorbed}}=Heat_{\text{released}}[/tex]

The equation used to calculate heat released or absorbed follows:

[tex]Q=m\times c\times \Delta T=m\times c\times (T_{final}-T_{initial})[/tex]

[tex]m_1\times c\times (T_{final}-T_1)=-[m_2\times c\times (T_{final}-T_2)][/tex]      ......(1)

where,

q = heat absorbed or released

[tex]m_1[/tex] = mass of hot water = 120 g

[tex]m_2[/tex] = mass of cold water = 230 g

[tex]T_{final}[/tex] = final temperature = ?°C

[tex]T_1[/tex] = initial temperature of hot water = 95°C

[tex]T_2[/tex] = initial temperature of cold water = 25°C

c = specific heat of water = 4.186 J/g°C

Putting values in equation 1, we get:

[tex]120\times 4.186\times (T_{final}-95)=-[230\times 4.186\times (T_{final}-25)][/tex]

[tex]T_{final}=49^oC[/tex]

Hence, the final temperature of the mixture is  49°C

The bond angles for ozone (O₃), boron trifluoride (BF₃), oxygen difluoride (OF₂), beryllium dichloride (BeCl₂), phosphorus trifluoride (PF₃), and silicon tetrachloride (SiCl₄) are <120°, 120°, <109.5°, 180°, <109.5°, and 109.5° respectively, based on their molecular geometries.

The correct value for the indicated bond angle in each of the compounds is based on the molecular geometry and electron-pair repulsion theory. Here are the answers:

Ozone (O₃): The O-O-O angle in O₃ is expected to be <120° due to its bent molecular structure.

Boron trifluoride (BF₃): The F-B-F angle in BF3 is 120° because of its trigonal planar molecular geometry.

Oxygen difluoride (OF₂): The F-O-F angle in OF2 is expected to be <109.5° because fluoro substituents cause greater repulsion than hydrogens, narrowing the bond angle from the tetrahedral

Beryllium dichloride (BeCl₂): The Cl-Be-Cl angle in BeCl₂ is 180° due to its linear molecular structure.

Phosphorus trifluoride (PF₃): The F-P-F angle in PF₃ is expected to be <109.5° due to its trigonal pyramidal molecular structure.

Silicon tetrachloride (SiCl₄): The Cl-Si-Cl angle in SiCl₄ is 109.5° since it has a tetrahedral molecular geometry.

Answer:

One mole of a substance is equal to 6.022 × 10²³ units of that substance (atoms, molecules, or ions)

Explanation:

This number is Avogadro's number. The concept of the mole can be used to convert between mass and number of particles. its used to compare very large numbers.

The  law used to determine the relationship between the volume and the number of moles in this equation is called the Avogadro's law. by this law, the volume of gas is directly proportional to the number of moles of the gas.

Avogadro's law, which was proposed by the Italian scientist Amedeo Avogadro, explains the behavior of gases and states that gases of different chemical nature and physical conditions at the same temperature and pressure have an equal number of molecules in equal volumes.

In simpler terms, the number of molecules or moles in a gas sample is directly proportional to its volume at a constant temperature and pressure.

This law is significant in various areas of chemistry, including the calculation of chemical reactions involving gases, determination of molar volumes, and the study of ideal gases.

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Answer:

O3 + NO. = O2. + NO2

2O. +NO2 = NO. + 2O2

Explanation:

NO. = Radical

O. & O2. = Radical

Final answer:

Nitric oxide (NO) catalytically destroys ozone (O3) in the stratosphere via a series of propagation steps, contributing to ozone layer depletion and increasing exposure to harmful UV rays.

Explanation:

Nitric oxide (NO) plays a significant role in the destruction of ozone (O3) through a series of reactions in the stratosphere. The presence of NO contributes to the depletion of the ozone layer, which can increase the risk of harmful UV exposure to humans and the environment. The relevant ozone depletion mechanism proceeds with nitric oxide acting as a catalyst through the following propagation steps:

These reactions show how NO continues to regenerate and is not consumed, which is why it acts as a catalyst, increasing the rate of ozone decomposition. The nitric oxide is primarily produced by high-flying aircraft and motor vehicles, raising concerns about its environmental impact.

Final answer:

To calculate the percent dissociation of trimethylacetic acid in an aqueous solution, use the equilibrium constant expression and the initial concentration of the acid.

Explanation:

To calculate the percent dissociation of trimethylacetic acid in an aqueous solution, we need to use the equilibrium constant expression and the initial concentration of the acid. The equilibrium expression for the dissociation of trimethylacetic acid is written as:

Ka = [CH₃COOH]/[CH₃C₃H₇OH]

where [CH₃COOH] represents the concentration of trimethylacetic acid and [CH₃C₃H₇OH] represents the concentration of the dissociated form of the acid.

By rearranging the equation, we can solve for the percent dissociation:

Percent Dissociation = ([CH₃C₃H₇OH]/[CH₃COOH]) x 100

Using the given information or data from the ALEKS Data resource, we can substitute the values into the equation and calculate the percent dissociation.

Final answer:

Evidence of a chemical reaction can be determined by changes such as temperature fluctuations, formation of a precipitate, gas production, and color changes. Temperatures changing, solid products forming, gas releasing, and explosions are all indications of chemical reactions.

Explanation:

Evidence indicating that a chemical reaction has occurred includes:

Based on these observations, the correct answers from the choices provided are: (a) The temperature decreased, (b) A solid brown product formed, (c) The temperature increased, (d) A gas formed, and potentially (e) An explosion occurred, as an explosion indicates a rapid energy transfer and creation of new substances.

Answer:

11.6 L will be the number of liters of carbon dioxide measured at STP.

Explanation:

The balanced equation for this combustion reaction is:

C₃H₈  +  5O₂ →  3CO₂  + 4H₂O

where 1 mol of propane reacts to 5 moles of oxygen in order to produce 3 moles of carbon dioxide and 4 moles of water.

We assume the oxygen in excess, so the limiting reagent is the propane. Now, we determine the moles: 7.65 g . 1 mol/ 44 g = 0.174 moles

Ratio is 1:3. 1 mol of propane can produce 3 moles of CO₂

Therefore, 0.174 moles will produce (0.174 . 3) / 1 = 0.521 moles of CO₂

As 1 mol of gas is contained in 22.4L at STP conditions, we propose

22.4L / 1 mol = V₂ / 0.521 mol

22.4 L / 1 mol . 0.521 mol = V₂ → 11.6 L

Answer:

C3H8(g) + 5O2(g) → 3CO2(g) + 4H2O (g)

11.6 L of CO2 will be produced

Explanation:

Step 1: Data given

Mass of propane = 7.65 grams

Molar mass propane = 44.1 g/mol

Burning = combustion reation = adding O2. The products will be CO2 and H2O

Step 2: The balanced equation

C3H8(g) + 5O2(g) → 3CO2(g) + 4H2O (g)

Step 3: Calculate moles propane

Moles propane = 7.65 grams / 44.1 g/mol

Moles propane = 0.173 moles

Step 4: Calculate moles CO2

For 1 mol propane we need 5 moles O2 to produce 3 moles CO2 and 4 moles H2O

For 0.173 moles propane we'll have 3*0.173 = 0.519 moles CO2

Step 5: Calculate volume of CO2

1 mol = 22.4 L

0.519 moles = 22.4 L * 0.519 = 11.6 L

11.6 L of CO2 will be produced

Answer:

The option (e) None of the choice are correct.

Explanation:

To find [tex]\frac{m}{z}[/tex] ratio in mass spectrometer,

We start calculating from the first option

(a)

 [tex]CH_{3}- CH_{2}- OH[/tex]

We know mass of carbon [tex]m= 12[/tex] and atomic number of carbon [tex]Z = 6[/tex]

After calculating we come up with,

[tex]\frac{m}{z} = 46[/tex]

Therefore option (a) is incorrect.

(b)

  [tex]CH_{3} -CH_{2}- NH_{2}[/tex]

After calculating we come up with,

[tex]\frac{m}{z} = 45[/tex]

Therefore option (b) is incorrect.

(c)

  [tex]CH_{3}- CH_{2}-CH_{3}[/tex]

[tex]\frac{m}{z} = 44[/tex]

Therefore option (c) is incorrect.

(d)

  [tex]CH_{3}- CH=CH_{2}[/tex]

[tex]\frac{m}{z} = 42[/tex]

Therefore option (d) is incorrect.

Therefore, the option (e) is correct for this problem

Answer:

Match each exploration mission.

1. explored the Challenger Deep  

5

Apollo 11  

2. took pictures and video of Mars surface  

3

Sputnik 1  

3. first man-made object sent into space  

2

Sojourner  

4. first manned orbit around the earth  

6

Trieste  

5. first men to walk on the moon  

4

Vostok  

6. explored the dark side of Venus  

1

Mariner 5

Explanation:

*

Answer:

Apollo 11 - First man to walk on the moon

Trieste - Explored the challenger deep

Sojourner - First man-made object sent into space

Vostok - First manned orbit around the earth

Mariner 5 - Explored the dark side of venus

Sputnik 1 - Took pictures and videos of Mars surface

Explanation:

Answer:

The drawing of the structure is found in diagram 1 of the attached figure.

Explanation:

Diagram 1 shows that three different types of protons are found in the structure. The nine hydrogen atoms have a similar behavior, the six hydrogen atoms also have a similar behavior and finally, the three hydrogen atoms adjacent to oxygen have a similar behavior. The number of peaks are as follows:

9H = singlet peak = between 3 and 4 ppm

6H = singlet peak = 4 ppm

3H = singlet peak = 3 ppm.

The 9 protons are around 3.5 ppm and the 6 hydrogen atoms show a peak at 4 ppm, and finally, the 3 protons have a peak around 3 ppm. Therefore, the corresponding drawing can be seen in diagram 2.

To construct a simulated 1H NMR spectrum for CH3OC(CH2OCH3)3, analyze the structure and determine the chemical shifts and integration values for each proton.

In order to construct a simulated 1H NMR spectrum for CH3OC(CH2OCH3)3, we need to analyze the structure of the molecule and determine the chemical shifts and integration values for each proton. Let's break down the molecule:

By analyzing the structure and applying the appropriate splitting patterns and chemical shifts, we can construct a simulated 1H NMR spectrum for CH3OC(CH2OCH3)3.

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Final answer:

The heat of combustion of one mole of naphthalene is 591 kJ/mol.

Explanation:

To calculate the heat of combustion of one mole of naphthalene, we first need to calculate the heat released by the combustion of the given mass of naphthalene. We can use the formula q = mcΔT, where q is the heat released, m is the mass of the naphthalene, c is the heat capacity of the calorimeter and its surroundings, and ΔT is the change in temperature. Substituting the given values into the equation, we have:

q = 1.44 g * 10.17 kJ/°C * (30.70°C - 25.00°C)

q = 1.44 g * 10.17 kJ/°C * 5.7°C

q = 82.9728 kJ

Now, to calculate the heat of combustion per mole of naphthalene, we will use the molar mass of naphthalene, which is 128.18 g/mol:

Heat of combustion per mole = 82.9728 kJ / 1.44 g * 128.18 g/mol

Heat of combustion per mole = 591 kJ/mol

Final answer:

To determine the heat of combustion per mole of naphthalene, the heat released was first calculated using the calorimeter's heat capacity and the observed temperature change. This amount was then divided by the mass of naphthalene burned to find the heat of combustion per gram, which was finally multiplied by the molar mass of naphthalene to get the value per mole.

Explanation:

To find the heat of combustion of one mole of naphthalene using a bomb calorimeter, we first need to use the given heat capacity of the calorimeter, which is 10.17 kJ/°C, and the temperature change that the combustion caused in the water, which was from 25.00°C to 30.70°C. The mass of naphthalene combusted was 1.44 g.

First, calculate the total heat q released during the combustion:

q = C₁₄₂₃ bomb × ΔT = (10.17 kJ/°C) × (30.70°C - 25.00°C) = 10.17 kJ/°C × 5.70°C = 57.969 kJ

Next, calculate the heat of combustion per gram of naphthalene:

q per gram = 57.969 kJ / 1.44 g = 40.2604 kJ/g

Now, to find the heat of combustion per mole of naphthalene, we multiply this value by the molar mass of naphthalene. The molar mass of naphthalene (C₁₀H₈) is approximately 128.17 g/mol.

Heat of combustion per mole = q per gram × Molar Mass = 40.2604 kJ/g × 128.17 g/mol ≈ 5160.76 kJ/mol

Therefore, the heat of combustion of one mole of naphthalene is around 5160.76 kJ/mol.

pH before KOH: 4.23. After 25.0 mL KOH: 4.23. After 35.0 mL: 9.98. After 50.0 mL: 11.26. After 60.0 mL: 11.85.

To solve this problem, we'll use the stoichiometry of the reaction between HClO and KOH to find the amount of each reactant remaining at each point of the titration. Then, we'll use the relevant equilibrium equations to calculate the pH.

Step 1: Calculate the initial pH before adding any KOH.

[tex]\[ \text{HClO} \rightleftharpoons \text{H}^+ + \text{ClO}^- \][/tex]

[tex]\[ K_a = \frac{[\text{H}^+][\text{ClO}^-]}{[\text{HClO}]} \][/tex]

[tex]\[ [\text{H}^+] = \sqrt{K_a [\text{HClO}]} \][/tex]

[tex]\[ [\text{H}^+] = \sqrt{(3.5 \times 10^{-8})(0.110)} \][/tex]

[tex]\[ [\text{H}^+] \approx 5.92 \times 10^{-5} \, \text{M} \][/tex]

[tex]\[ \text{pH} = -\log{[\text{H}^+]} = -\log{(5.92 \times 10^{-5})} \][/tex]

[tex]\[ \text{pH} \approx 4.23 \][/tex]

Step 2: Calculate the pH after adding 25.0 mL of KOH.

Moles of HClO initially = [tex]\( 0.110 \, \text{M} \times 0.0500 \, \text{L} = 0.00550 \, \text{mol} \)[/tex]

Moles of KOH added = [tex]\( 0.110 \, \text{M} \times 0.0250 \, \text{L} = 0.00275 \, \text{mol} \)[/tex]

Remaining moles of HClO = [tex]\( 0.00550 \, \text{mol} - 0.00275 \, \text{mol} = 0.00275 \, \text{mol} \)[/tex]

Calculate the new concentration of HClO:

[tex]\[ \text{New volume of HClO} = 50.0 \, \text{mL} - 25.0 \, \text{mL} = 25.0 \, \text{mL} = 0.0250 \, \text{L} \][/tex]

[tex]\[ \text{New} \, [\text{HClO}] = \frac{0.00275 \, \text{mol}}{0.0250 \, \text{L}} \][/tex]

[tex]\[ \text{New} \, [\text{HClO}] = 0.110 \, \text{M} \][/tex]

Now, we use the equilibrium equation for the dissociation of HClO to find the concentration of [tex]\( \text{H}^+ \):[/tex]

[tex]\[ \text{HClO} \rightleftharpoons \text{H}^+ + \text{ClO}^- \][/tex]

[tex]\[ K_a = \frac{[\text{H}^+][\text{ClO}^-]}{[\text{HClO}]} \][/tex]

[tex]\[ [\text{H}^+] = \sqrt{K_a [\text{HClO}]} \][/tex]

[tex]\[ [\text{H}^+] = \sqrt{(3.5 \times 10^{-8})(0.110)} \][/tex]

[tex]\[ [\text{H}^+] \approx 5.92 \times 10^{-5} \, \text{M} \][/tex]

[tex]\[ \text{pH} = -\log{[\text{H}^+]} = -\log{(5.92 \times 10^{-5})} \][/tex]

[tex]\[ \text{pH} \approx 4.23 \][/tex]

The pH remains the same after adding 25.0 mL of KOH.

Let's now calculate the pH after adding 35.0 mL, 50.0 mL, and 60.0 mL of KOH.

Answer:

6.1 × 10⁻⁸ M

Explanation:

Let's consider the solution of fluorapatite.

Ca₅(PO₄)₃F(s) ⇄ 5 Ca²⁺(aq) + 3 PO₄³⁻(aq) + F⁻(aq)

We can relate the solubility (S) with the solubility product constant (Ksp) using an ICE chart.

        Ca₅(PO₄)₃F(s) ⇄ 5 Ca²⁺(aq) + 3 PO₄³⁻(aq) + F⁻(aq)

I                                        0                   0                0

C                                     +5 S              +3 S            +S

E                                       5 S               3 S               S

The Ksp is:

Ksp = [Ca²⁺]⁵ × [PO₄³⁻]³ × [F⁻] = (5 S)⁵ × (3 S)³ × S = 84,375 S⁹

[tex]S = \sqrt[9]{\frac{Ksp}{84,375} } = \sqrt[9]{\frac{1.0 \times 10^{-60} }{84,375} } =6.1 \times 10^{-8} M[/tex]

The solubility of fluorapatite compound Ca₅(PO₄)₃F in water is 6.1 × 10⁻⁸M.

Ksp is the solubility product constant which tells about the relative solubility of the compound which is in equilibrium with their constitute ions.

Chemical reaction for the solubility of fluorapatite compound is:

Ca₅(PO₄)₃F(s) ⇄ 5Ca²⁺(aq) + 3PO₄³⁻(aq) + F⁻(aq)

Let at equilibrium formed concentration of Ca²⁺, PO₄³⁻ and F⁻ are 5x, 3x and x respectively.

Given value of Ksp for Ca₅(PO₄)₃F = 1.0 × 10⁻⁶⁰

Ksp equation for the given reaction will be represented as:

Ksp = [Ca²⁺]⁵[PO₄³⁻]³[F⁻]

On putting above values in the equation we get,

1.0 × 10⁻⁶⁰ = (5x)⁵. (3x)³. (x)

x = 6.1 × 10⁻⁸M

Hence, solubility of Ca₅(PO₄)₃F is 6.1 × 10⁻⁸M.

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Answer:

Yes

Explanation:

A reaction normally takes place between metals and non metals. The metals acts as the electron donors and the non metals acts as the electron acceptors. This exchange of electrons form bonds such as ionic or covalent.

A good example of a reaction between a metal and non metal is Sodium metal and Chlorine(non metal). They form an ionic bond and the product is Sodium chloride.

Answer:

lignands, the central atom/metal ion

Explanation:

When a complex ion forms, ligands arrange themselves around , the central atom/metal ion creating a new ion.

This is defined as an atom or molecule which possesses an electric charge such as positive or negative.

Complex ion form as a result of ligands arrangement around central atom/metal ion with a charge equal to the sum of the charges of its components.

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Answer:

Explanation:

Given reaction

N₂H₄ + O₂ ⇒ N₂ + 2H₂O   ΔH₁ = -543 KJ ---------- ( 1 )

2H₂ + O₂ ⇒ 2H₂O              ΔH₂ = -484 KJ ---------- ( 2 )

N₂ + 3 H₂ ⇒ 2NH₃              ΔH₃ = -92 KJ  -----------( 3 )

( 1 ) -  ( 2 ) +( 3 )

N₂H₄ + O₂ - 2H₂ - O₂ +N₂ + 3 H₂ ⇒ N₂ + 2H₂O - 2H₂O +2NH₃  

                                                         ΔH =       -543 + 484 -92 = -151 KJ

     N₂H₄ + H₂ ⇒ 2NH₃     ΔH  = -151 KJ .

2NH₃ ⇒ N₂H₄ + H₂     ΔH  = + 151 KJ

Answer : The specific heat capacity of lead is, [tex]0.128J/g^oC[/tex]

Explanation :

Formula used:

[tex]q=m\times c\times (T_2-T_1)[/tex]

where,

q = heat produced = 3840 J

m = mass of lead = 3 kg = 3000 g

c = specific heat capacity of lead = ?

[tex]T_1[/tex] = initial temperature = [tex]40^oC[/tex]

[tex]T_2[/tex] = final temperature = [tex]50^oC[/tex]

Now put all the given values in the above formula, we get:

[tex]3840J=3000g\times c\times (50-40)^oC[/tex]

[tex]c=0.128J/g^oC[/tex]

Therefore, the specific heat capacity of lead is, [tex]0.128J/g^oC[/tex]

Answer:

The half life is     [tex]H_{1/2}= 7333.3sec[/tex]

Explanation:

   The half life of a first order  reaction is mathematically represented as

                          [tex]H_{1/2} = \frac{0.693}{Rate Constant }[/tex]

 Substituting   [tex]9.45 * 10^{-5}s^{-1}[/tex]  for the rate constant

                         [tex]H_{1/2} = \frac{0.693}{9.45*10^{-5}}[/tex]

                                 [tex]H_{1/2}= 7333.3sec[/tex]

Final answer:

The half-life of the isomerization of methylisonitrile to acetonitrile, which is a first-order reaction with a rate constant of 9.45 x 10⁻⁵ s⁻¹, is approximately 7330 seconds.

Explanation:

The student's question asks for the calculation of the half-life of the reaction where methylisonitrile isomerizes to acetonitrile (CH₃NC to CH₃CN). This reaction is first order with respect to methylisonitrile, and the rate constant k is given as 9.45 x 10⁻⁵ s⁻¹ at 478 K. To find the half-life ([tex]t^{1/2[/tex]), we can use the first-order half-life equation, [tex]t^{1/2[/tex] = (ln 2) / k. Substituting the given rate constant into this equation

[tex]t^{1/2[/tex] = (ln 2) / (9.45 x 10⁻⁵ s⁻¹)

[tex]t^{1/2[/tex] = (0.693) / (9.45 x 10⁻⁵ s⁻¹)

[tex]t^{1/2[/tex] ≈ 7330 seconds

The half-life of the reaction under the given conditions is approximately 7330 seconds.

The pH of the unknown solution is 3.07.

Explanation:

1.Find the cell potential as a function of pH

From the Nernst Equation:

Ecell=E∘cell−RT /zF × lnQ

where

R denotes the Universal Gas Constant

T denotes the temperature

z denotes the moles of electrons transferred per mole of hydrogen

F denotes the Faraday constant

Q denotes the reaction quotient

Substitute the values,

E∘cell=0   lnQ=2.303logQ

E0cell=−2.30/RT /zF × log Q

Solving the equation,

2. Find the Q  value

Q=[H+]2prod pH₂, product/ [H+]2reactpH₂, reactant

Q=[H+]^2×1/1×1=[H+]2

Taking the log

logQ= log[H+]^2=2log[H+]=-2pH

From the formula,

Ecell=−2.303RT /zF× logQ

E cell= 2.303 × 8.314 CK mol (inverse)  × 298.15

K × 2pH /2×96 485  C⋅mol

( inverse)

E cell= 0.0592 V × pH

3. Finding the pH value

E cell= 0.0592 V × pH

pH = E cell/ 0.0592 V= 0.182V/ 0.0592V

pH=3.07

The pH of the unknown solution is 3.07.

Answer:

First of all, exterior paint is more resistant to extreme temperatures, humidity, pressure differences, the presence of droughts and this is due to its chemical composition, which is more resistant and because it penetrates the surface to be painted better (than in This case is the external wall of a home), by better penetrating the surface to which it is applied, there is less risk of detachment, of accumulating bubbles or air at the wall-paint interface, it adheres much better ... as explained this? Well, this phenomenon is due to the fact that it presents a solvent that helps to impregnate the wall (primer) and transports the paint as a vehicle to the internal pores of the wall.

On the other hand, in interior environments, the paints are less resistant to the aforementioned adverse factors and less impregnate the surfaces because the solvent is in less quantity or does not have the same impregnation capacity or essential primer as in the case of exterior paints. .

Explanation:

There are some specialists in the field who nowadays advise even interior paints with insulating or waterproof lacquers since the interior ones bear so little factors such as humidity that they no longer meet the basic requirements, that is why some interior paints they show fungus or wet stains against walls with wet content.

Answer:

Water on the outside of the paint evaporate faster than the inside. To test this hypothesis this student might place water in containers with different sizes and shapes in locations with different temperatures. This way it can be measured how fast water in different places evaporate.

Explanation:

A change in temperature can affect the  physical properties of water.  Water circulates through a continuous  cycle.  The sun’s energy drives weather patterns, and enables water to change through different stages in the water cycle : evaporation, condensations,  precipitation, ground water,  transpiration.

By placing water in containers with different sizes and shapes in locations with different temperatures, the student will see that the sun’s energy increases the amount of water that evaporates. More water evaporates when the temperature is warmer and when there is a large surface area or mouth/opening.

When 32.40 mL of 0.258 M NaOH is used to titrate a 1.00 mL sample, the concentration of acetic acid in the mixture is 8.36 M.

Let's consider the neutralization reaction between sodium hydroxide and acetic acid.

NaOH + CH₃COOH ⇒ CH₃COONa + H₂O

32.40 mL of 0.258 M NaOH react. The reacting moles of NaOH are:

[tex]0.03240 L \times \frac{0.258mol}{L} = 8.36 \times 10^{-3} mol[/tex]

The molar ratio of NaOH to CH₃COOH is 1:1. The moles of CH₃COOH required to react with 8.36 × 10⁻³ moles of NaOH are:

[tex]8.36 \times 10^{-3} mol NaOH \times \frac{1molCH_3COOH}{1molNaOH} = 8.36 \times 10^{-3} mol CH_3COOH[/tex]

8.36 × 10⁻³ moles of CH₃COOH are in 1.00 mL of solution. The concentration of CH₃COOH is:

[tex]M = \frac{8.36 \times 10^{-3} mol}{1.00 \times 10^{-3} L} = 8.36 M[/tex]

When 32.40 mL of 0.258 M NaOH is used to titrate a 1.00 mL sample, the concentration of acetic acid in the mixture is 8.36 M.

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The concentration of acetic acid in the mixture can be found by titrating with NaOH, using a stoichiometric reaction to equate the moles of NaOH to moles of acetic acid, and then calculating the concentration of the acid.

This problem is about using acid-base reactions to determine the concentration of acetic acid in a solution. The reaction between the acetic acid and sodium hydroxide (NaOH) is a stoichiometric reaction where one mole of acetic acid reacts with one mole of NaOH. We use that information to calculate the number of moles of acetic acid.

First, we calculate the number of moles of NaOH used in the titration, which is the concentration of NaOH multiplied by the volume used (in liters): moles NaOH = (0.258 mol/L) * (32.40 mL * 1L/1000 mL) = 0.00835 mol NaOH.

Since the reaction is stoichiometric, the number of moles of NaOH is equivalent to the number of moles of acetic acid.

Finally, the concentration of acetic acid is the number of moles divided by the volume of the sample: concentration = moles / volume = 0.00835 mol / 0.001 L = 8.35 M.

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In a reversible reaction at equilibrium, including the reaction PCl5↽−−⇀PCl3+Cl2, the concentrations of all components, including PCl5 and PCl3, remain constant because the forward and reverse reactions occur at the same rate.

In a reversible reaction at equilibrium the concentrations of all reactants and products remain constant. This is because the rate of the forward reaction equals the rate of the reverse reaction. So, in the context of the provided equation PCl5↽−−⇀PCl3+Cl2, when the system reaches equilibrium, no changes are noticeable, meaning the concentrations of phosphorus pentachloride, PCl5, and phosphorus trichloride, PCl3, as well as chlorine (Cl2), are constant. Therefore, the correct answer is (c) The concentrations of both PCl5 and PCl3 are constant at equilibrium.

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At equilibrium, the concentrations of both phosphorus pentachloride (PCl5) and phosphorus trichloride (PCl3) are constant due to the condition of dynamic equilibrium. The reaction continues to occur, but the amounts of reactants and products remain unchanged.

In the context of the reversible reaction PCl5 ↔ PCl3 + Cl2, at equilibrium, both the concentration of phosphorus pentachloride, PCl5, and the concentration of phosphorus trichloride, PCl3, are constant.

This is described as a condition known as dynamic equilibrium, where the forward and reverse reactions are happening at the same rate, meaning the concentrations of PCl5, PCl3, and Cl2 are not changing, even though the reacting process is still happening. Therefore, the correct answer is (c) The concentrations of both PCl5 and PCl3 are constant at equilibrium.

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Answer:

Answer: Kp = 4.5

Explanation:

The balanced equation for the production of synthetic gas is

    CH4 +  H20 ⇒ CO + 3H2

Let x be the change in the concentration of each species at equilibrium

 CH4  +   H20   ⇔ CO  +  3H2

Initial                  0.60       2.6        0          0

Change               -x           -x          +x       +3x

Equilibrium      0.60-x      2.6-x       x        3x

Given that the equilibrium partial pressure of H2= 1.4 atm

then, 3x= 1.40

x= 1.4/3 = 0.466667

The equilibrium concentrations are

{CH4} = 0.60- x = 0.60 - 0.466667 = 0.133333atm

{H2O} = 2.60- x = 2.60 - 0.466667 = 2.133333atm

{CO} = x = 0.466667atm

{H2} = 1.4atm (given)

Kp  = {CO}{H2}³

        {CH4}{H2O}

Kp = (0.466667)(1.4)³

         (0.133333)(2.133333)

=  4.501875

Kp = 4.5

Answer:

For 1: The molecular equation is [tex]CuI_2(aq)+2NaOH(aq)\rightarrow Cu(OH)_2(s)+2NaI(aq)[/tex]

For 2: The net ionic equation is [tex]Cu(OH)_2(s)\rightarrow Cu^{2+}(aq)+2I^{-}(aq)[/tex]

For 3: The equilibrium constant expression is [tex]K_{eq}=[Cu^{2+}][I^-]^2[/tex]

Explanation:

A molecular equation is defined as the chemical equation in which the ionic compounds are written as molecules rather than component ions.

The molecular equation for the reaction of copper (II) iodide and sodium hydroxide is given as:

[tex]CuI_2(aq)+2NaOH(aq)\rightarrow Cu(OH)_2(s)+2NaI(aq)[/tex]

Net ionic equation of any reaction does not include any spectator ions.

Spectator ions are defined as the ions which does not get involved in a chemical equation. They are found on both the sides of the chemical reaction when it is present in ionic form.

The chemical equation for the reaction of copper hydroxide and sodium iodide is given as:

[tex]2NaI(aq)+Cu(OH)_2(s)\rightarrow 2NaOH(aq)+CuI_2(aq)[/tex]

Ionic form of the above equation follows:

[tex]2Na^{+}(aq)+2I^{-}(aq)+Cu(OH)_2(s)\rightarrow 2Na^+(aq)+2OH^-(aq)+Cu^{2+}(aq.)+2I^{-}(aq.)[/tex]

As, sodium and iodide ions are present on both the sides of the reaction. Thus, it will not be present in the net ionic equation and are spectator ions.

The net ionic equation for the above reaction follows:

[tex]Cu(OH)_2(s)\rightarrow Cu^{2+}(aq)+2I^{-}(aq)[/tex]

The expression of equilibrium constant for the net ionic equation above follows:

[tex]K_{eq}=[Cu^{2+}][I^-]^2[/tex]

Concentrations of pure solids and pure liquids are taken as 1 in equilibrium constant expression.

Answer:

0.471 mol/L

Explanation:

First, we'll begin by by calculating the number of mole of KMnO4 in 26g of KMnO4.

This is illustrated below:

Molar Mass of KMnO4 = 39 + 55 + (16x4) = 39 + 55 + 64 = 158g/mol

Mass of KMnO4 from the question = 26g

Mole of KMnO4 =?

Number of mole = Mass/Molar Mass

Mole of KMnO4 = 26/158 = 0.165mole

Now we can obtain the concentration of KMnO4 in mol/L as follow:

Volume of the solution = 350mL = 350/1000 = 0.35L

Mole of KMnO4 = 0.165mole

Conc. In mol/L = mole of solute(KMnO4)/volume of solution

Conc. In mol/L = 0.165mol/0.35

conc. in mol/L = 0.471mol/L

Answer:

The concentration of this potassium permanganate solution is 0.470 mol/L or 0.470 M

Explanation:

Step 1: data given

Mass of  potassium permanganate = 26.0 grams

Molar mass of potassium permanganate = 158.034 g/mol

Volume = 350 mL = 0.350 L

Step 2: Calculate moles potassium permanganate

Moles KMnO4 = mass KMnO4 / molar mass KMnO4

Moles KMnO4 = 26.0 grams / 158.034 g/mol

Moles KMnO4 = 0.1645 moles

Step 3: Calculate concentration of KMnO4 solution

Concentration KMnO4 = moles KMnO4 / volume

Concentration KMnO4 = 0.1645 moles / 0.350 L

Concentration KMnO4 = 0.470 M

The concentration of this potassium permanganate solution is 0.470 mol/L or 0.470 M

Answer:

Gases are easily compressed. We can see evidence of this in Table 1 in Thermal Expansion of Solids and Liquids, where you will note that gases have the largest coefficients of volume expansion. The large coefficients mean that gases expand and contract very rapidly with temperature changes. In addition, you will note that most gases expand at the same rate, or have the same β. This raises the question as to why gases should all act in nearly the same way, when liquids and solids have widely varying expansion rates.

The answer lies in the large separation of atoms and molecules in gases, compared to their sizes, as illustrated in Figure 2. Because atoms and molecules have large separations, forces between them can be ignored, except when they collide with each other during collisions. The motion of atoms and molecules (at temperatures well above the boiling temperature) is fast, such that the gas occupies all of the accessible volume and the expansion of gases is rapid. In contrast, in liquids and solids, atoms and molecules are closer together and are quite sensitive to the forces between them.

Answer:

that are glucogenic all produce oxaloacetate and then glucose.

Explanation:

The major aim of protein catabolism during a state of starvation is to provide the glucogenic amino acids especially alanine and glutamine, that serve as substrates for endogenous glucose production ie gluconeogenesis in the liver.

Glucogenic amino acid are known for their production of oxaloacetate and then glucose.