alculate the percent by mass (percent composition) of hydrogen in methane (CH4). Round your answer to the nearest whole number.

Answer:

Sample: 1.67

Blank: 0.070

Explanation:

The absorbance of a solution (A) is explained by the Beer-Lambert law.

A = ε . l . c

where,

ε is the absorptivity of the species

l is the optical path length

c is the molar concentration of the species

As we can see, the absorbance is directly proportional to the path length, that is, the length of the cuvette. If l is increased 5 times (1.00 cm to 5.00 cm), the absorbance will also be increased 5 times.

The absorbance of the sample will be 5 × 0.333 = 1.67

The absorbance of the blank will be 5 × 0.014 = 0.070

According to Beer's law, if the cuvette size increases fivefold from 1.00 cm to 5.00 cm, the absorbance will also increase fivefold. Therefore, the absorbance of the sample would become 1.665, and the reagent blank would become 0.070.

The absorbance of a solution is related to the path length (in this case, cuvette size) according to Beer's law, which states that A = εlc, where A is absorbance, ε is molar absorptivity, l is path length, and c is concentration. Thus, absorbance is directly proportional to the path length.

If the path length increases from 1.00 cm to 5.00 cm, the absorbance also increases by the same factor. Therefore, the absorbance of the sample and the reagent blank in a 5.00 cm cuvette would be:

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To find the mass of carbon tetrachloride needed, multiply the volumes by the density. The student needs to weigh out 135 g of carbon tetrachloride, rounded to the correct number of significant digits.

To solve this problem, we need to multiply the volume of carbon tetrachloride needed by the student (85.0 mL) by its density (1.59 g/cm^3). However, note that the volume is given in milliliters (mL) while the density is given in grams per cubic centimeter (g/cm^3). You need to know that 1 mL is equivalent to 1 cm^3. So, we don’t have to convert the units. Hence, the calculation becomes:

Mass = Density x Volume = 1.59 g/cm^3 x 85.0 mL = 135.15 g.

Since the given values only have three significant digits, the answer should also be rounded to three significant digits so the student needs to weigh out 135 g of carbon tetrachloride.

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Answer:

b. The final state of the substance is a gas.

d. The sample is initially a liquid. One or more phase changes will occur.

Explanation:

Methane has the following properties:

*"Normal" refers to normal pressure (1 atm).

According to this, we can affirm:

A sample of methane at a pressure of 1.00 atm and a temperature of 93.1 K is heated at constant pressure to a temperature of 158 K. Which of the following are true? Choose all that apply.

a. The liquid initially present will solidify.  FALSE. The liquid will vaporize.

b. The final state of the substance is a gas.  TRUE.

c. The sample is initially a solid.  FALSE. The sample is initially a liquid.

d. The sample is initially a liquid. One or more phase changes will occur. TRUE.

The substance would start as a gas, then transition to a solid without becoming a liquid due to temperature conditions.

The substance would begin as a gas and as the pressure increases, it would compress and eventually solidify without liquefying as the temperature is below the triple point temperature.

Describe the phase changes from -80°C to 500°C at 2 atm.

The sample is initially a gas, condenses to a solid as the pressure increases, and then melts when the pressure is increased further to give a liquid.

Answer: the heat-sensitive glassware that were given are : Volumetric and Graduated cylinder.

Explanation:glass material that reacts to ambient temperatures radiated off of other surfaces like hands or water is known as heat sensitive glassware. They are not meant to be heated and could shatter if exposed to a heat source. Examples from the video includes Volumetric and Graduated cylinder. Hope this helps. Thanks.

The glassware in the video that are shown to be heat sensitive are volumetric and graduated cylinders.

The exposure of heat to the system has been resulted in the atoms of the system to excite. The material that radiate hands or water with the exposure of the heat are termed as heat-sensitive materials.

The heat sensitive  materials are not heated at the high temperatures, as they may shatter. This has been the result, as there has been an increase in the volume of the glassware with the explosion of heat.

The heat results in the glass molecules to raise the temperature. The excited electrons emit the radiations, that has been the representation of the material to be heat-sensitive.

The glassware in the video that are shown to be heat sensitive are volumetric and graduated cylinders.

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Answer:

The mol fraction of cyclohexane in the liquid phase is 0.368

Explanation:

Step 1: Data given

Mass of cyclohexane = 25.0 grams

Mass of 2-methylpentane = 44.0 grams

Temperature = 35.0 °C

The pressure of cyclohexane = 150 torr

The pressure of 2-methylpentane = 313 torr

The pressure we only need for the mole fraction in gas phase.

Step 2: Calculate moles of cyclohexane

Moles cyclohexane = mass cyclohexane / molar mass

Moles cyclohexane = 25.0 g / 84 g/mol = 0.298 mol of cyclohexane

Step 3: Calculate moles of 2-methylpentane

Moles = 44.0 grams / 86 g/mol = 0.512 mol of 2-methylpentane

Step 4: Calculate mole fraction of cyclohexane in the liquid phase

Mole fraction of C6H12:

0.298 / (0.298 + 0.512) = 0.368

The mol fraction of cyclohexane in the liquid phase is 0.368

The mole fraction of cyclohexane in the liquid phase is 36.8%.

To find the mole fraction of cyclohexane in the liquid phase, we need to calculate the total moles of cyclohexane and 2-methylpentane in the mixture. First, we calculate the moles of each component using their molar masses:

moles of cyclohexane = 25 g / 84.18 g/mol = 0.297 mol

moles of 2-methylpentane = 44 g / 86.18 g/mol = 0.509 mol

Next, we calculate the mole fraction of cyclohexane:

mole fraction of cyclohexane = moles of cyclohexane / (moles of cyclohexane + moles of 2-methylpentane)

mole fraction of cyclohexane = 0.297 mol / (0.297 mol + 0.509 mol) = 0.368 or 36.8%

Answer:

high C:N; N supply; energy

Explanation:

Nitrogen supply is required for microbial growth to synthesize nutrients such as amino acids and proteins. For a high C:N ratio, the amount of nitrogen supply is considerably small compared with the amount of carbon. As a result, a low amount of nutrients is released during decomposition.

In the given question, the organic matter with a __high C:N___ ratio results in a low net release of nutrients during decomposition. This is because microbial growth is more limited by __N supply____ than it is by __energy_____.

Answer:

c. Ice, H₂O, has a solid structure with alternating H−O interactions.

e. HF has a higher boiling point than HCl.

Explanation:

For molecules to interact through hydrogen bonding, it is required that there is an H atom bonded to a more electronegative atom, such as N, O or F.

Select the interactions that can be explained by hydrogen bonding. Check all that apply.

a. CH₄ molecules interact more closely in the liquid than in the gas phase.  NO. The electronegativity of C is not high enough to form hydrogen bondings.

b. HF is a weak acid neutralized by NaOH. NO. This reaction occurs in water and it is better explained by ion-ion forces.

c. Ice, H₂O, has a solid structure with alternating H−O interactions. YES. This structure is a consequence of the hydrogen bonding.

d. H₂Te has a higher boiling point than H₂S.  NO. The electronegativities of Te and S are not high enough to form hydrogen bondings.

e. HF has a higher boiling point than HCl. YES. The stronger hydrogen bonding interactions in HF explain the higher boiling point.

Final answer:

Hydrogen bonding explains interactions such as HF being a weak acid, the solid structure of ice (H2O), and the higher boiling point of HF compared to HCl.

Explanation:

In the context of the provided information, the interactions that can be explained by hydrogen bonding are:

Hydrogen bonding occurs when a hydrogen atom is bonded to a highly electronegative atom such as oxygen, nitrogen, or fluorine, creating a strong dipole-dipole interaction.

These interactions are responsible for the higher boiling points and particular properties of substances like water (H2O) and hydrogen fluoride (HF).

Answer:

a. kc = 1,67x10⁶

b. kc = 1,17x10⁷

c. Drug B is the better choice.

Explanation:

The bind of drug-protein is described as:

Protein + Drug ⇄ Drug-protein

Where kc is:

kc = [Drug-protein] / [Protein] [Drug] (1)

a. For A, the equilibrium concentration of each specie is:

[Protein]: 1,60x10⁻⁶M - x

[Drug]: 2,00x10⁻⁶M - x

[Drug-protein]: x = 1,00x10⁻⁶M

-Where x is reaction coordinate-

Thus:

[Protein]: 1,60x10⁻⁶M - 1,00x10⁻⁶M = 0,60x10⁻⁶M

[Drug]: 2,00x10⁻⁶M - 1,00x10⁻⁶M = 1,00x10⁻⁶M

Replacing in (1):

kc = [1,00x10⁻⁶] / [1,00x10⁻⁶] [0,60x10⁻⁶]

kc = 1,67x10⁶

b. For B:

[Protein]: 1,60x10⁻⁶M - x

[Drug]: 2,00x10⁻⁶M - x

[Drug-protein]: x = 1,40x10⁻⁶M

-Where x is reaction coordinate-

Thus:

[Protein]: 1,60x10⁻⁶M - 1,40x10⁻⁶M = 0,20x10⁻⁶M

[Drug]: 2,00x10⁻⁶M - 1,40x10⁻⁶M = 0,60x10⁻⁶M

Replacing in (1):

kc = [1,40x10⁻⁶] / [0,20x10⁻⁶] [0,60x10⁻⁶]

kc = 1,17x10⁷

c. The drug with the bigger kc will be the more effective because will be the drug that binds more strongly with the protein. Thus, drug B is the better choice.

I hope it helps!

The Kc values for the A-protein and B-protein binding reactions are 3.125 and 4.375, respectively. Drug B, which has the higher Kc value, is the better choice for further research as it binds more strongly to the protein.

a. To calculate the Kc value for the A-protein binding reaction, we need to use the equilibrium concentrations of drug A and the A-protein complex. The Kc value is given by [A-protein complex] / ([A] * [protein]). Plugging in the values, we get Kc = (1.00×10^6) / ((2.00×10^6) * (1.60×10^−6)) = 3.125.

b. Similarly, to calculate the Kc value for the B-protein binding reaction, we use the equilibrium concentrations. Kc = (1.40×10^6) / ((2.00×10^6) * (1.60×10^−6)) = 4.375.

c. The drug that binds more strongly will form a higher concentration of drug-protein complex at equilibrium, indicating greater efficacy. In this case, drug B has a higher Kc value, suggesting that it binds more strongly and would be a better choice for further research.

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Answer:

-1

Explanation:

The relation between Kp and Kc is given below:

[tex]K_p= K_c\times (RT)^{\Delta n}[/tex]

Where,  

Kp is the pressure equilibrium constant

Kc is the molar equilibrium constant

R is gas constant

T is the temperature in Kelvins

Δn = (No. of moles of gaseous products)-(No. of moles of gaseous reactants)

For the first equilibrium reaction:

[tex]2SO_2_{(g)}+O_2_{(g)}\rightleftharpoons2SO_3_{(g)} [/tex]

Δn = (2)-(2+1) = -1  

Thus, Kp is:

[tex]K_p=  K_c\times (RT)^{-1}[/tex]

Answer:

C

Explanation:

If 2 moles of potassium chlorate produced 2 moles of MgO, then 2*6/2 moles of MgO are produced when 6 moles of potassium perchlorate is used.

Answer:

94.56KJ

Explanation:

1.7 grams of CH4 contains 1.7/16 moles of CH4.

If 1 mole of CH4 give 890KJ

1.7/16 moles of CH4 gives 1.7/16*890 = 94.56KJ

Answer:

Orbital mixing or sigma pi crossover

Explanation:

Looking at the diagram below, the ordering of molecular orbitals differ between carbon and oxygen molecules. The reason for this is that, with increase in atomic number, the energies of sigma 2p bonding molecular orbital and pi 2p molecular orbital come close together but are energetically far apart in the lighter elements. Following this ordering of orbitals, the two degenerate pi- 2p antibonding orbitals are singly filled accounting for the paramagnetism of oxygen while the two degenerate pi-2p bonding orbitals in carbon molecule is doubly occupied hence the molecule is diamagnetic.

O₂ is paramagnetic with a bond order of 2 due to two unpaired electrons in antibonding molecular orbitals. C₂ is diamagnetic and also has a bond order of 2, but with all electrons paired due to two additional electrons filling the antibonding orbitals when compared to B₂.

The student is asking about the paramagnetic nature of O₂ and the diamagnetic nature of C₂ despite both having a bond order of 2. According to molecular orbital theory, the electronic configuration of O₂ includes two unpaired electrons in antibonding
(*12py, *12pz) molecular orbitals. These unpaired electrons cause O₂ to be paramagnetic. Calculating the bond order, we find that there are eight electrons in bonding orbitals and four electrons in antibonding orbitals, resulting in a bond order of 2 (8 - 4 = 2), which confirms the double covalent bond in O₂. In contrast, the C₂ molecule, with two additional electrons compared to B₂, fills up its antibonding orbitals completely, leading to all electrons being paired and thus making C₂ diamagnetic.

Answer: principal quantum number (n), azimuthal quantum number (l) and magnetic quantum number (m)

Explanation:

According to quantum mechanics, there are three sets of quantum numbers which accurately describes the electrons position; principal quantum number (n), azimuthal quantum number (l) and magnetic quantum number (m). These three quantum numbers are obtained from Schrödinger wave equation.

Final answer:

Lithium aluminum hydride reduces carboxylic acids to primary alcohols via an aldehyde intermediate, although the aldehyde is not isolated and is reduced further to a primary alcohol in one step. So the correct option is C.

Explanation:

Lithium aluminum hydride reduces carboxylic acids to primary alcohols by first forming an aldehyde as the intermediate. The reduction process does not stop at the aldehyde stage but proceeds to reduce the aldehyde further to a primary alcohol. When a carboxylic acid is reduced, the process typically bypasses the isolation of the intermediate aldehyde due to the strong reducing power of lithium aluminum hydride (LiAlH4), which is capable of fully reducing the carboxylic acid to the alcohol in one step.

Answer:

Solid KOH will corrode the skin but a solution of KOH in triethyleneglycol will not.

The temperature is monitored with an external thermometer also because the sand looses some heat to energy exchange with the surrounding.

Explanation:

KOH is a deliquescent solid which is very corrosive upon contact with skin. Its solution in an organic liquid is not corrosive.

Secondly, when exposed to the surrounding, heat is lost according to the laws of thermodynamics.

Answer:

The molar mass of the solid is 511.3 g/mol

Explanation:

Step 1: Data given

Mass of the sample = 0.588 grams

Mass of benzene = 11.5 grams

The solution freezes at 5.02 °C

The freezing point of benzene is 5.51 °C

The freezing point depression constant, kf = 4.90 °C/m

Step 2:  Determine the temperature change

Δt = 5.51 - 5.02 = 0.49°C

Step 3: Determine number of moles

Δt = i*Kf*m

⇒ with i = the number of dissolved particles the solute produces = 1

⇒ with Kf = the molal freezing point depression constant Kf = 4.90 °C*Kg/mol

⇒ with m =  the molality of the solute

0.49 °C = (1) (4.90 °C kg/mol) (x / 0.01150 kg)

x = 0.00115 mol

Step 4: Calculate molar mass

0.588 grams / 0.00115 mol = 511.3 g/mol

The molar mass of the solid is 511.3 g/mol

Answer:

For a: The empirical formula for the given compound is [tex]CH[/tex]

For b: The empirical and molecular formula for the given organic compound are [tex]C_{10}H_{20}O[/tex]

Explanation:

The chemical equation for the combustion of hydrocarbon follows:

[tex]C_xH_y+O_2\rightarrow CO_2+H_2O[/tex]

where, 'x', and 'y' are the subscripts of Carbon and hydrogen respectively.

We are given:

Conversion factor used:  1 g = 1000 mg

Mass of [tex]CO_2=5.86mg=5.86\times 10^{-3}g[/tex]

Mass of [tex]H_2O=1.37mg=1.37\times 10^{-3}g[/tex]

We know that:

Molar mass of carbon dioxide = 44 g/mol

Molar mass of water = 18 g/mol

For calculating the mass of carbon:

In 44g of carbon dioxide, 12 g of carbon is contained.

So, in [tex]5.86\times 10^{-3}g[/tex]  of carbon dioxide, [tex]\frac{12}{44}\times 5.86\times 10^{-3}=1.60\times 10^{-3}g[/tex] of carbon will be contained.

For calculating the mass of hydrogen:

In 18g of water, 2 g of hydrogen is contained.

So, in [tex]1.37\times 10^{-3}g[/tex] of water, [tex]\frac{2}{18}\times 1.37\times 10^{-3}=0.152\times 10^{-3}g[/tex] of hydrogen will be contained.

To formulate the empirical formula, we need to follow some steps:

Moles of Carbon = [tex]\frac{\text{Given mass of Carbon}}{\text{Molar mass of Carbon}}=\frac{1.60\times 10^{-3}g}{12g/mole}=0.133\times 10^{-3}moles[/tex]

Moles of Hydrogen = [tex]\frac{\text{Given mass of Hydrogen}}{\text{Molar mass of Hydrogen}}=\frac{0.152\times 10^{-3}g}{1g/mole}=0.152\times 10^{-3}moles[/tex]

For the mole ratio, we divide each value of the moles by the smallest number of moles calculated which is [tex]0.133\times 10^{-3}[/tex] moles.

For Carbon = [tex]\frac{0.133\times 10^{-3}}{0.133\times 10^{-3}}=1[/tex]

For Hydrogen = [tex]\frac{0.152\times 10^{-3}}{0.133\times 10^{-3}}=1.14\approx 1[/tex]

The ratio of C : H = 1 : 1

Hence, the empirical formula for the given compound is [tex]CH[/tex]

The chemical equation for the combustion of menthol follows:

[tex]C_xH_yO_z+O_2\rightarrow CO_2+H_2O[/tex]

where, 'x', 'y' and 'z' are the subscripts of Carbon, hydrogen and oxygen respectively.

We are given:

Mass of [tex]CO_2[/tex]  = 0.2829 g

Mass of [tex]H_2O[/tex] = 0.1159 g

We know that:

Molar mass of carbon dioxide = 44 g/mol

Molar mass of water = 18 g/mol

For calculating the mass of carbon:

In 44g of carbon dioxide, 12 g of carbon is contained.

So, in 0.2829  g of carbon dioxide, [tex]\frac{12}{44}\times 0.2829=0.077g[/tex] of carbon will be contained.

For calculating the mass of hydrogen:

In 18g of water, 2 g of hydrogen is contained.

So, in 0.1159 g of water, [tex]\frac{2}{18}\times 0.1159=0.013g[/tex] of hydrogen will be contained.

Mass of oxygen in the compound = (0.1005) - (0.077 + 0.013) = 0.105 g

To formulate the empirical formula, we need to follow some steps:

Moles of Carbon = [tex]\frac{\text{Given mass of Carbon}}{\text{Molar mass of Carbon}}=\frac{0.077g}{12g/mole}=0.0064moles[/tex]

Moles of Hydrogen = [tex]\frac{\text{Given mass of Hydrogen}}{\text{Molar mass of Hydrogen}}=\frac{0.013g}{1g/mole}=0.013moles[/tex]

Moles of Oxygen = [tex]\frac{\text{Given mass of oxygen}}{\text{Molar mass of oxygen}}=\frac{0.0105g}{16g/mole}=0.00065moles[/tex]

For the mole ratio, we divide each value of the moles by the smallest number of moles calculated which is 0.00065 moles.

For Carbon = [tex]\frac{0.0064}{0.00065}=9.84\approx 10[/tex]

For Hydrogen = [tex]\frac{0.013}{0.00065}=20[/tex]

For Oxygen = [tex]\frac{0.00065}{0.00065}=1[/tex]

The ratio of C : H : O = 10 : 20 : 1

The empirical formula for the given compound is [tex]C_{10}H_{20}O[/tex]

For determining the molecular formula, we need to determine the valency which is multiplied by each element to get the molecular formula.

The equation used to calculate the valency is:

[tex]n=\frac{\text{Molecular mass}}{\text{Empirical mass}}[/tex]

We are given:

Mass of molecular formula = 156 g/mol

Mass of empirical formula = 156 g/mol

Putting values in above equation, we get:

[tex]n=\frac{156g/mol}{156g/mol}=1[/tex]

Multiplying this valency by the subscript of every element of empirical formula, we get:

[tex]C_{(1\times 10)}H_{(1\times 20)}O_{(1\times 1)}=C_{10}H_{20}O[/tex]

Hence, the empirical and molecular formula for the given organic compound are [tex]C_{10}H_{20}O[/tex]

Final answer:

The empirical formula of toluene, derived from combustion yielding 5.86 mg of CO2 and 1.37 mg of H2O, is C7H8. For menthol, from 0.1005 g combusted to give 0.2829 g of CO2 and 0.1159 g of H2O and a molar mass of 156 g/mol, its empirical and molecular formulas are both C10H20O.

Explanation:

Empirical and Molecular Formulas of Organic Compounds

Combustion analysis is commonly used to determine the empirical formulas of organic compounds. The process involves burning a sample of the compound to produce CO2 and H2O, which can then be analyzed to determine the amounts of carbon and hydrogen in the original compound.

The empirical formula of toluene, given that combustion yields 5.86 mg of CO2 and 1.37 mg of H2O with only carbon and hydrogen present, can be found by:

Converting the mass of CO2 to moles of carbon.

Converting the mass of H2O to moles of hydrogen.

Determining the simplest whole number ratio of carbon to hydrogen atoms to find the empirical formula.

Following these steps, we can determine that the empirical formula of toluene is C7H8.

For menthol, with a 0.1005-g sample yielding 0.2829 g of CO2 and 0.1159 g of H2O, and a known molar mass of 156 g/mol, we:

Convert the masses of CO2 and H2O to moles of carbon and hydrogen, respectively.

Assume the rest of the mass is due to oxygen and calculate its moles.

Determine the empirical formula.

Calculate the molecular formula using the empirical formula and the given molar mass.

By doing so, we find that menthol's empirical formula is C10H20O and its molecular formula is also C10H20O.

Explanation:

As per Brønsted-Lowry concept of acids and bases, chemical species which donate proton are called Brønsted-Lowry acids.

The chemical species which accept proton are called Brønsted-Lowry base.

(a) [tex]HNO_3 + H_2O \rightarrow H_3O^+ + NO_3^-[/tex]

[tex]HNO_3[/tex] is Bronsted lowry acid and [tex]NO_3^-[/tex] is its conjugate base.

[tex]H_2O[/tex] is Bronsted lowry base and [tex]H_3O^+[/tex] is its conjugate acid.

(b)

[tex]CN^- + H_2O \rightarrow HCN + OH^-[/tex]

[tex]CN^-[/tex] is Bronsted lowry base and HCN is its conjugate acid.

[tex]H_2O[/tex] is Bronsted lowry acid and [tex]OH^-[/tex] is its conjugate base.

(c)

[tex]H_2SO_4 + Cl^- \rightarrow HCl + HSO_4^-[/tex]

[tex]H_2SO_4[/tex] is Bronsted lowry acid and [tex]HSO_4^-[/tex] is its conjugate base.

Cl^- is Bronsted lowry base and HCl is its conjugate acid.

(d)

[tex]HSO_4^-+OH^- \rightarrow SO_4^{2-}+H_2O[/tex]

[tex]HSO_4^-[/tex] is Bronsted lowry acid and [tex]SO_4^{2-}[/tex] is its conjugate base.

OH^- is Bronsted lowry base and [tex]H_2O[/tex] is its conjugate acid.

(e)

[tex]O_{2-}+H_2O \rightarrow 2OH^-[/tex]

[tex]O_{2-}[/tex] is Bronsted lowry base and OH- is its conjugate acid.

[tex]H_2O[/tex] is Bronsted lowry acid and OH- is its conjugate base.

The identification and labelling of the Brønsted-Lowry acid and base, and their respective conjugate are done below.

Brønsted-Lowry acids are chemical species that donate proton (H+) while the chemical species which accept proton (H+) are called Brønsted-Lowry base

Based on this question, the conjugate acid and base of the equations given are as follows:

For equation a:

For equation b:

For equation c:

For equation d:

For equation e:

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The electron configuration shows the arrangement of electrons in atoms.

The electron configuration gives a description of the location of the electron in an atom.

Note that;

n = Principal quantum number

l = orbital quantum number

m = magnetic quantum number

s = spin quantum number

n = 4, l = 3, m = 3, -2, -1, 0, 1, 2, 3, s= ±1/2

n = 3, l = 0, m = 0, s = ±1/2

n = 4, l = 0, m = 0, s = ±1/2

n = 4, l = 0, m = 0, s = ±1/2

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Final answer:

The quantum numbers for specific electrons in the 4f6, 3s1, 28Ni, and 22Ti configurations have been provided according to their respective principal, azimuthal, magnetic, and spin quantum numbers.

Explanation:

The four quantum numbers are principal (n), azimuthal (l), magnetic (ml), and spin (ms). Here are their specified values for the given electrons:

Final answer:

The quantum numbers for specific electrons in the 4f6, 3s1, 28Ni, and 22Ti configurations have been provided according to their respective principal, azimuthal, magnetic, and spin quantum numbers.

Explanation:

The four quantum numbers are principal (n), azimuthal (l), magnetic (ml), and spin (ms). Here are their specified values for the given electrons:

Answer:

CH3Cl + Cl2 -> CH2ClCH2Cl + HCl

Explanation:

Chlorination is an addition reaction that involves addition of Chlorine to a chemical compound. Methane undergo addition reaction with chlorine to produce chloromethane, which undergo further further chlorination to produce dichloromethane.

For the chlorination of methane, one of the hydrogen atoms of methane is replaced by a chlorine atom of the chlorine gas (molecule)

CH4         +          Cl2          ->           CH3Cl        +          HCl

methane         chlorine               chloromethane     Hydrochloric acid

Using their structure:

        H                                                                  H

         I                                                                    I

  H - C - H            +       Cl - Cl        ->            H - C - Cl               +         HCl

         I                                                                   I

        H                                                                  H

     methane                                         chloromethane

In further chlorination of chloromethane, one of the hydrogen atom of chloromethane is replaced by the chlorine atom in the chlorine gas (molecule)

Chlorination of Chloromethane to dichloromethane is represented below:

       CH3Cl         +          Cl2          ->        CH2ClCH2Cl        +          HCl

Chloromethane         Chlorine               dichloromethane     Hydrochloric acid

Using their structure:

        Cl                                                                 Cl

         I                                                                    I

  H - C - H            +       Cl - Cl        ->            H - C - Cl               +         HCl

         I                                                                   I

        H                                                                  H

Chloromethane                 chlorine                        dichloromethane

Organic compound    Inorganic compound

From the chemical equation above, an organic compound (Chloromethane) reacts with an inorganic compound (Chlorine) .

Answer:

Ionic crystal

Explanation:

An ionic crystal has a high melting point. In an ionic crystal, the ions are tightly held in electrostatic attraction by their oppositely charged neighbors forming a rigid three dimensional lattice. However, when this solid melts, the rigid crystal structure collapses and the individual ions become free and mobile. Hence the melt conducts electricity.

Answer:

The Emf of the given cell at [Fe2+] = 2.0 M and [Fe3+] = 1.9 M is 0.48 V

Explanation:

The half cell reaction can be written as :

Anode-Half (oxidation) :

[tex]Fe^{2+}\rightarrow Fe^{3+} + 1e^{-}[/tex] ......E = 0.77 V

(multiply this equation by 4 to balance the electrons)

Cathode-half (reduction)

[tex]4H^{+} +O_{2} + 4e^{-} \rightarrow 2H_{2}O[/tex]....E= 1.23 V

[tex]E^{0}_{cell} = E_{cathode} - E_{anode}[/tex]

[tex]E^{0}_{cell} = 1.23 - 0.77[/tex]

[tex]E^{0}_{cell} = 0.46 V[/tex]

According to Nernst Equation

[tex]E_{cell} = E^{0} - \frac{RT}{nF}lnQ[/tex]

[tex]E_{cell} = E^{0} - \frac{0.059}{n}logQ[/tex]

n = number of electron transferred in the cell reaction = 4

The balanced equation is :

[tex]4Fe^{2+} + 4H^{+} +O_{2} \rightarrow 4Fe^{3+} + 2H_{2}O[/tex]

[tex]E_{cell} = 0.46 - \frac{0.059}{4}logQ[/tex]

[tex]log Q = \frac{[Fe^{3+}]^{4}}{[Fe^{2+}]^{4}}[/tex]

[tex]log Q = \left ( \frac{[Fe^{3+}]}{[Fe^{2+}]} \right )^{4}[/tex]

[tex]log Q = \left ( \frac{1.9}{2.0} \right )^{4}[/tex]

Insert the value of log Q in Nernst  Equation:

[tex]E_{cell} = 0.46 - \frac{0.059}{4} log\left ( \frac{1.9}{2.0} \right )^{4}[/tex]

(using :[tex]log^{a}b = a\log b[/tex]

)

[tex]E_{cell} = 0.46 - log\frac{1.9}{2.0}[/tex]

[tex]E_{cell} = 0.46 - log(0.95)[/tex]

[tex]E_{cell} = 0.46 -(-0.0227)[/tex]

[tex]E_{cell} = 0.482 V[/tex]

The cell EMF is obtained from Nernst equation as 0.451 V.

The reaction equation is given by;

4Fe2+ (aq) + O2(g) + 4H+ (aq)-------->4Fe3+(aq)+2H2O(l)

We have the following information;

EMF under standard conditions = 0.46 V

[Fe2+]= 2.0M

[Fe3+]= 1.9 M

From Nernst equation;

Ecell = E°cell - 0.0592/n logQ

Where;

E°cell = 0.46 V

n = 4

Q =  [Fe3+]^4/ [Fe2+]^4

Q = [1.9]^4/[2.0]^4

Q = 0.8

Substituting values;

Ecell =  0.46 - 0.0592/4 log (0.8)

Ecell = 0.451 V

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Answer:

Separated

Explanation:

Stan does not feel he identifies closely with the group. He feels the other members are close knit with each other but he is not part of the group.

For Stan, it would be an illusion to say he has a close relationship with the members of the group

This infers that Stan has a separated self-schema with respect to the group.

There are three conditions for simplifying the Michaelis-Menten equation: when [S] is significantly less than Km, when [S] equals Km, and when [S] is much larger than Km. These are associated with less than 10% and half of the active sites being occupied by the substrate, and with doubling [S] either almost doubling the rate or having little effect.

The Michaelis-Menten equation expresses the relationship between the initial enzymatic reaction velocity, V₀, and the substrate concentration, [S]. It allows for a simplification of the relationship between [S] and rate, given certain conditions:

Understanding these conditions can significantly simplify the usage of the Michaelis-Menten equation in exploring enzyme kinetics.

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Answer:

A

Explanation:

Iron has the ground state electronic configuration [Ar]3d64s2

Fe2+ has the electronic configuration [Ar]3d6.

In an octahedral crystal field, there are two sets of degenerate orbitals; the lower lying three t2g orbitals, and the higher level two degenerate eg orbitals. Strong field ligands cause high octahedral crystal field splitting, there by separating the two sets of degenerate orbitals by a tremendous amount of energy. This energy is much greater than the pairing energy required to pair the six electrons in three degenerate orbitals. Since CN- is a strong field ligand, it leads to pairing of six electrons in three degenerate orbitals

The Fe(CN)64- ion is diamagnetic due to the significant energy difference caused by strong field ligands like CN-, resulting in pairing of electrons in the 3 low energy d orbitals before filling the higher energy ones.

The answer is A. There are 3 low lying d orbitals, which will be filled with 6 electrons before filling the 2, assumed to be degenerate, higher energy orbitals. When a metal ion is coordinated to ligands, such as in Fe(CN)64-, the degeneracy of the 3d orbitals is broken (they have different energies), due to the electrostatic interactions between the ligands and the orbitals. In the case of strong-field ligands like CN-, the energy difference is significant enough to cause pairing of electrons in the 3 low energy d orbitals before the 2 high energy orbitals are populated, resulting in a diamagnetic species.

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Answer:

The system is at equilibrium

Explanation:

Let's consider the following reversible reaction.

2 SO₂(g) + O₂(g) ⇄ 2 SO₃(g)

To determine whether a reaction is at equilibrium or not, we have to calculate the reaction quotient (Q).

[tex]Q=\frac{[SO_{3}]^{2}}{[SO_{2}]^{2}.[O_{2}]} =\frac{(9.00)^{2} }{(6.00)^{2}\times 0.45} =5.0[/tex]

Since Q = K (equilibrium constant), regardless of the significant figures, the system is at equilibrium.

The correct answer is at equilibrium.

The initial concentrations given correspond to the equilibrium concentrations for the reaction at 1300 K, and no shift in the reaction direction is necessary to achieve equilibrium because [tex]\( Q = K \).[/tex]

The equilibrium position of the reaction under the given conditions, we need to compare the initial concentrations with the equilibrium concentrations and the equilibrium constant [tex]\( K \).[/tex]

Given.

- Equilibrium constant K = 5.00

- Initial concentrations.

- [tex]\([SO_2]_{\text{initial}} = 6.00 \)[/tex] M.

- [tex]\([O_2]_{\text{initial}} = 0.45 \)[/tex]  M.

- [tex]\([SO_3]_{\text{initial}} = 9.00 \)[/tex] M.

The reaction is. [tex]\( 2 SO_2(g) + O_2(g) \leftrightarrow 2 SO_3(g) \)[/tex]

1.Calculate Reaction Quotient Q

[tex]\[ Q = \frac{[\text{SO}_3]^2}{[\text{SO}_2]^2 [\text{O}_2]} \][/tex]

Substitute the initial concentrations into the expression for [tex]\( Q \).[/tex]

[tex]\[ Q = \frac{(9.00)^2}{(6.00)^2 \times 0.45} \][/tex]

[tex]\[ Q = \frac{81.00}{16.20} \][/tex]

[tex]\[ Q \approx 5.00 \][/tex]

2. Compare Q with K.

- Q = 5.00

- K = 5.00

Since Q the reaction quotient is equal to K the equilibrium constant the system is already at equilibrium.

Answer:

q = 38,5 kJ

Explanation:

In its melting point, at 0°C, water is liquid. The boiling point of water is 100°C. It is possible to estimate the heat you required to raise the temperature of water from 0°C to 100°C using:

q = C×m×ΔT

Where C is specific heat of water (4,184J/g°C), m is mass of water (92,0g) and ΔT is change in temperature (100°C-0°C = 100°C)

Replacing:

q = 4,184J/g°C×92,0g×100°C

q = 38493 J, in kilojoules:

q = 38,5 kJ

I hope it helps!

The heat energy required to raise the temperature of 92.0g of water from its melting point to its boiling point is calculated using the formula q = mcΔT. Using given values and converting to kilojoules, the answer is 38.51kJ.

To find the heat required to raise the temperature of water from its melting point to its boiling point, we can make use of the formula for calculating heat (q):

q = mcΔT

Where:

In your case, m = 92g, c = 4.184 J/(g??C), and ΔT = 100°C (boiling point of water) - 0°C (melting point of water) = 100°C.

Substitute these values into the formula:

q = (92g)(4.184 J/g°C)(100°C)

Calculate to get q = 38506.88 J, in kilojoules convert by dividing by 1000 to get 38.51 kJ.

Hence, the heat required to raise the temperature of 92.0g of water from its melting point to its boiling point is 38.51 kJ.

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Answer:

Micelle Formation

Explanation:

The soap molecule has a nonpolar and a polar cationic end when it is dissolved in water. When it dissolves in water, the sodium stearate congregates to form small spheres (called micelles) with the on the inside and the on the surface. The anionic end can attract and interacts with the polar water molecules, while the interact with the nonpolar grease. This allows the soapy water to remove the grease by trapping the grease inside the micelle.

Because greased is electrically neutral and water is polarity, water alone will not simply remove oil off dishes or hands. The grease, on the other hand, dissolves when soap is added to water.

This traps the greasy within the micelle, allowing the soapy liquid to remove it.

So,

In case 1: Hydro-carbon  

In case 2: Anionic  

In case 3: Hydro-carbon  

In case 4: Anionic  

In case 5: Anionic  

In case 6: Hydro-carbon

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Answer:

k = 0,0026 s⁻¹

Explanation:

To calculate the rate constant it is necessary to find out the order of reaction. The R² nearest 1 will be the order of reaction.

For zeroth order the integrated rate law is:

[A] = [A]₀ -kt

The graph of [A] vs t gives a correlation coefficient R² of 0,9944.

The first order is:

ln [A] = ln [A]₀ -kt

The graph of ln [A] vs t gives a R² of 1

The second order is:

1/[A] = 1/[A]₀ -kt

The graph of 1/[A] vs t gives a R² of 0,9942

As R² = 1 for first order, the descomposition of azomethane follows this kinetics order. The lineal correlation is:

y = b - mx

y = 1,5077 - 0,0026x

ln [A] = ln [A]₀ -kt

That means:

-k = - 0,0026 s⁻¹

k = 0,0026 s⁻¹

I hope it helps!

To find the missing equilibrium constant, we can use stoichiometry and the first given equilibrium constant. The missing equilibrium constant for the second reaction is the square of the given Kc value.

To determine the missing equilibrium constant, you can use the concept of equilibrium constant expressions.

In the first reaction, 2 HD(g) ⇌ H2(g) + D2(g), the equilibrium constant is given as Kc = 0.28.

To find the value of the missing equilibrium constant for the second reaction, 2 H2(g) + 2 D2(g) ⇌ 4 HD(g), we can use the stoichiometry.

Since the equilibrium constant is a ratio of product concentrations to reactant concentrations, and the stoichiometric coefficients for the second reaction are all multiplied by 2 compared to the first reaction, the missing equilibrium constant would be the square of the given Kc value.

Therefore, the missing equilibrium constant is 0.28 squared, which is approximately 0.0784.

The equilibrium constant for the reaction 2 H₂(g) + 2 D₂(g) ⇌ 4 HD(g) is D) 13

To determine the equilibrium constant for the reaction 2 H₂(g) + 2 D₂(g) ⇌ 4 HD(g) given the equilibrium constant for the reverse reaction, 2 HD(g) ⇌ H₂(g) + D₂(g), which is Kc = 0.28, we can use the concept that the equilibrium constant for the reverse reaction is the reciprocal of the equilibrium constant for the forward reaction.

The given reaction is:

2 HD(g) ⇌ H₂(g) + D₂(g), Kc = 0.28

The reverse reaction is:

H₂(g) + D₂(g) ⇌ 2 HD(g), K'c = 1 / 0.28

K'c = 3.57

The target reaction is twice the reverse reaction:

2 H₂(g) + 2 H₂(g) ⇌ 4 HD(g)

When the reaction coefficients are doubled, the equilibrium constant is squared:

Kc = K'c²

Kc = 3.57² = 12.75

Therefore, the equilibrium constant for the reaction 2 H₂(g) + 2 D₂(g) ⇌ 4 HD(g) is 12.798

Rounding of to two significant figures, the Equilibrium constant is D) 13

Complete question is - The equilibrium constant is given for one of the reactions below. Determine the value of the missing equilibrium constant.

2 HD (g) = H2 (g) + D2 (g) Kc = 0.28

2 H2 (g) + 2 D2 (g) = 4 HD (g) Kc = ?

A) 7.8 x 10⁻²

B) 3.6

C) 0.53

D) 13

E) 1.9