Nitrogen and oxygen react at high temperatures. N2(g) + O2(g) equilibrium reaction arrow 2 NO(g) ΔH = 182.6 kJ (a) What will happen to the concentrations of N2, O2, and NO at equilibrium if more O2 is added?

Answer:

Theoretical yield=0.764 g.

Percent yield 42%.

Explanation:

Hello,

In this case the undergoing chemical reaction is shown on the attached picture. In such a way, starting by the given mass of 2-naphtol, one computes the theoretical yielded grams of 2-butoxynaphthalene as shown below, considering their 1 to 1 molar relationship:

[tex]m_{2-butoxynaphthalene}=0.55g2-naphtol*\frac{1mol2-naphtol}{144.17g2-naphtol}*\frac{1mol2-butoxynaphthalene}{1mol2-naphtol}*\frac{200.28g2-butoxynaphthalene}{1mol2-butoxynaphthalene}=0.764g2-butoxynaphthalene[/tex]

Moreover, the percent yield turns out:

[tex]Y=\frac{0.32g}{0.764g}*100\% =42\%[/tex]

Best regards.

Without the balanced chemical equation and molar masses, the theoretical yield of 2-butoxynaphthalene cannot be calculated. Normally, it involves stoichiometric calculations from the starting material. Percent yield is obtained by dividing actual yield by theoretical yield and multiplying by 100%.

To calculate the theoretical yield and percent yield for the given reaction, we need to perform a few stoichiometric calculations. However, without the balanced chemical equation and the molar masses, we cannot calculate the theoretical yield for the specific reaction of 2-naphthol and 1-bromobutane to form 2-butoxynaphthalene. If we had the balanced equation, we would calculate the moles of 2-naphthol used, and using stoichiometry, find the moles of 2-butoxynaphthalene that could be formed. Multiplying by the molar mass would give us the theoretical yield in grams. To find percent yield, we would then divide the actual yield (0.32 g) by the theoretical yield and multiply by 100.

Generally speaking, percent yield is the ratio of the actual yield to the theoretical yield multiplied by 100%. It indicates the efficiency of a chemical reaction and can be decreased by incomplete reactions, side reactions, or product recovery losses.

Answer: The value of [tex]K_{final}[/tex] for the net reaction is [tex]7.34\times 10^{25}[/tex]

Explanation:

The given chemical equations follows:

Equation 1:  [tex]H_2S(aq.)\rightleftharpoons HS^-(aq.)+H^+(aq.);K_1[/tex]

Equation 2:  [tex]HS^-(aq.)\rightleftharpoons S^{2-}(aq.)+H^+(aq.);K_2[/tex]

The net equation follows:

[tex]S^{2-}(aq.)+2H^+(aq.)\rightleftharpoons H_2S(aq.);K_{final}[/tex]

As, the net reaction is the result of the addition of reverse of first equation and the reverse of second equation. So, the equilibrium constant for the net reaction will be the multiplication of inverse of first equilibrium constant and the inverse of second equilibrium constant.

The value of equilibrium constant for net reaction is:

[tex]K_{final}=\frac{1}{K_1}\times \frac{1}{K_2}[/tex]

We are given:  

[tex]K_1=9.39\times 10^{-8}[/tex]

[tex]K_2=1.45\times 10^{-19}[/tex]

Putting values in above equation, we get:

[tex]K_{final}=\frac{1}{(9.39\times 10^{-8})}\times \frac{1}{(1.45\times 10^{-19})}=7.34\times 10^{25}[/tex]

Hence, the value of [tex]K_{final}[/tex] for the net reaction is [tex]7.34\times 10^{25}[/tex]

The equilibrium constant for the reaction S2−(aq) + 2H+(aq) ⇌ H2S(aq) is 1.361×10−26.

To find the equilibrium constant for the reaction S2−(aq) + 2H+(aq) ⇌ H2S(aq), we can use the equilibrium constant expressions for the given reactions and multiply them together. The equilibrium constant for the first reaction (K1) is 9.39×10−8, and for the second reaction (K2) it is 1.45×10−19. So, the equilibrium constant for the overall reaction (Kfinal) is the product of K1 and K2: Kfinal = K1 × K2 = 9.39×10−8 × 1.45×10−19 = 1.361×10−26.

Explanation:

Since, the given reaction is as follows.

       [tex]2NO(g) \rightleftharpoons N_{2}(g) + O_{2}(g)[/tex]

Initial:    36.1 atm                 0          0

Change:    2x                      x           x

Equilibrium: (36.1 - 2x)       x            x

Now, expression for [tex]K_{p}[/tex] of this reaction is as follows.

            [tex]K_{p} = \frac{[N_{2}][O_{2}]}{[NO]^{2}}[/tex]

As the initial pressure of NO is 36.1 atm. Hence, partial pressure of [tex]O_{2}[/tex] at equilibrium will be calculated as follows.

              [tex]K_{p} = \frac{[N_{2}][O_{2}]}{[NO]^{2}}[/tex]

        [tex]2.40 \times 10^{3} = \frac{x \times x}{(36.1 - 2x)^{2}}[/tex]

                 x = 18.1 atm

Thus, we can conclude that partial pressure of [tex]O_{2}[/tex] at equilibrium is 18.1 atm.

Answer:

partial pressure O2 = 17.867 atm

Explanation:

Step 1: Data given

Temperature = 200 °C

Kp = 2.40 *10^3

Pressure NO = 36.1 atm

Step 2: The balanced equation

2 NO ⇔ N2 + O2

Step 3: The initial pressure

pNO = 36.1 atm

pN2 = 0 atm

pO2 = 0 atm

Step 4: the pressure at the equilibrium

For 2 moles NO we'll have 1 mol N2 and 1 mol O2

pNO = 36.1 - 2X atm

pN2 = X atm

pO2 = X atm

Step 5: Calculate partial pressures

Kp = pN2 * pO2 / (pNO)²

2.40*10³ = x²/(36.1 - 2x)²

48.99 = x/(36.1-2x)

x = 1768.5 -97.98x

x = 17.867

x = partial pressure O2 = 17.867 atm

Calculating the final molarity of iodide anion in the solution, convert the grams of iron (II) iodide to moles, convert the volume of the silver nitrate solution to liters, use the stoichiometry of the reaction, calculate the moles of iodide anion, and divide the moles by the final volume of the solution.

To calculate the final molarity of iodide anion in the solution, we need to use the stoichiometry of the reaction between iron (II) iodide and silver nitrate. Given that there is 0.981 g of iron (II) iodide and 150 mL of a 35.0 mM aqueous solution of silver nitrate, we can determine the moles of iron (II) iodide and the moles of iodide anion produced. Finally, we can calculate the final molarity of iodide anion by dividing the moles by the final volume of the solution.

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Answer:

We need 1.714 moles N2

Explanation:

Step 1: Data given

The reaction yield = 87.5 %

Number of moles NH3 produced = 3.00 moles

Step 2: The balanced equation

N2(g)+ 3H2(g) →2NH3(g)

Step 3: Calculate moles N2

For 2 moles NH3 produced we need 1 mol N2 and 3 moles H2

This means, if the yield was 100%, for 3.00 moles NH3 produced , we need 1.5 moles N2

For a 87.5 % yield:  

we need more N2, increased by a ratio of 100/87.5.

100/87.5 * 1.5 =  1.714 moles N2

Answer:

[tex]9.044\times 10^{-3}[/tex] is the value of the equilibrium constant for this reaction at 756 K.

Explanation:

[tex]COCl_2\rightleftharpoons CO+Cl_2[/tex]

Equilibrium concentration of [tex]COCl_2[/tex]

[tex][COCl_2]=7.40\times 10^{-4} M[/tex]

Equilibrium concentration of [tex]CO[/tex]

[tex][CO]=3.76\times 10^{-2} M[/tex]

Equilibrium concentration of [tex]Cl_2[/tex]

[tex][Cl_2]=1.78\times 10^{-4} M[/tex]

The expression of an equilibrium constant can be written as;

[tex]K_c=\frac{[CO][Cl_2]}{[COCl_2]}[/tex]

[tex]=\frac{3.76\times 10^{-2}\times 1.78\times 10^{-4}}{7.40\times 10^{-4}}[/tex]

[tex]K_c=9.044\times 10^{-3}[/tex]

[tex]9.044\times 10^{-3}[/tex] is the value of the equilibrium constant for this reaction at 756 K.

Answer:

A) Degree of Freedom (DF) = 2 and this means that 2 variables are required to determine the state of the system

B) The vessel doesn't constitute an explosion hazard.

Explanation:

A) Degree of Freedom(DF)=2 + C - π

Where;

π = 2 (liquid and gas phase equilibrium)

C = 2 (air and MEK)

Thus, DF = 2 + 2 - 2 = 2

DF of 2 means that 2 variables are required to determine the state of the system

B) Using Antoine Equation;

Log(Pmek) = 6.97421 - (1209.6/(55 + 216)) = 2.51

Log(Pmek) = 2.51

Thus,Pmek = 10^(2.51) = 323.59mm of Hg or approximately 324mm of Hg.

So, fraction of mek in vapour phase = 324/1200 = 0.27 or 27%

Now this fraction is more than 11.5% in the question.

Therefore, the vessel contains no explosion hazard.

The number of degrees of freedom for the MEK and air system in the vessel at equilibrium is 2, meaning two variables can be varied independently without changing the number of phases. Without knowing the concentration of MEK in the vapor phase, we cannot determine whether the mixture is explosively hazardous.

(a) The Gibbs phase rule is given by F = C - P + 2, where F is the number of degrees of freedom, C is the number of components and P is the number of phases. Here, we have two components (MEK and air), and two phases (liquid and vapor) existing in the vessel. So, the number of degrees of freedom F = 2 - 2 + 2 = 2. This means that two independent variables (such as temperature and pressure) can be varied independently without changing the number of phases.

(b) The mixture of MEK vapor and air in the vessel is potentially explosive if it contains between 1.8 mole% MEK and 11.5 mole% MEK. However, without knowing the exact concentration of MEK in the vapor phase, it is impossible to determine whether the mixture is explosively hazardous or not.

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Answer:

-99.8 kJ

Explanation:

We are given the methodology to answer this question, which is basically  Kirchhoff law . We just need to find the heats of formation for the reactants and products and perform the calculations.

The standard heat of reaction is

ΔrHº = ∑ ν x ΔfHº products - ∑ ν x ΔfHº reactants

where ν are the stoichiometric coefficients in the balanced equation, and ΔfHº are the heats of formation at their  standard states.

  Compound                 ΔfHº (kJmol⁻¹)

        SO₂                             -296.8

         O₂                                    0

         SO₃                            -395.8

The balanced chemical equation is

SO₂(g) + ½O₂(g) → SO₃(g)

Thus

Δr, 298K Hº( kJmol⁻¹ ) =  1 x (-395.8) - 1 x (-296.8) = -99.0 kJmol⁻¹

Now the heat capacity of reaction  will be be given in a similar fashion:

Cp rxn = ∑ ν x Cp of products - ∑ ν x Cp of reactants

where ν is as above the stoichiometric coefficient in the balanced chemical equation.

Cprxn ( JK⁻¹mol⁻¹) = 50.7 - ( 39.9 + 1/2 x 29.4 ) = - 3.90

                         = -3.90 JK⁻¹mol⁻¹

Finally Δr,500 K Hº = Δr, 298K Hº +  CprxnΔT

Δr,500 K Hº = - 99 x 10³ J + (-3.90) JK⁻¹ ( 500 - 298 ) K = -99,787.8

                     = -99,787.8 J x 1 kJ/1000 J  = -99.8 kJ

Notice thie difference is relatively small that is why in some problems it is o.k to assume the change in enthalpy is constant over a temperature range, especially if it is a small range of temperatures.

Answer:

Not D

Explanation:

Answer: The value of [tex]\Delta S^o[/tex] for the surrounding when given amount of ethene gas is reacted is 238.80 J/K

Explanation:

Entropy change is defined as the difference in entropy of all the product and the reactants each multiplied with their respective number of moles.

The equation used to calculate entropy change is of a reaction is:

[tex]\Delta S^o_{rxn}=\sum [n\times \Delta S^o_{(product)}]-\sum [n\times \Delta S^o_{(reactant)}][/tex]

For the given chemical reaction:

[tex]C_2H_4(g)+H_2O(g)\rightarrow CH_3CH_2OH(g)[/tex]

The equation for the entropy change of the above reaction is:

[tex]\Delta S^o_{rxn}=[(1\times \Delta S^o_{(CH_3CH_2OH(g))})]-[(1\times \Delta S^o_{(C_2H_4(g))})+(1\times \Delta S^o_{(H_2O(g))})][/tex]

We are given:

[tex]\Delta S^o_{(CH_3CH_2OH(g))}=282.7J/K.mol\\\Delta S^o_{(C_2H_4(g))}=219.56J/K.mol\\\Delta S^o_{(H_2O(g))}=188.82J/K.mol[/tex]

Putting values in above equation, we get:

[tex]\Delta S^o_{rxn}=[(1\times (282.7))]-[(1\times (219.56))+(1\times (188.82))]\\\\\Delta S^o_{rxn}=-125.68J/K[/tex]

Entropy change of the surrounding = - (Entropy change of the system) = -(-125.68) J/K = 125.68 J/K

We are given:

Moles of ethene gas reacted = 1.90 moles

By Stoichiometry of the reaction:

When 1 mole of ethene gas is reacted, the entropy change of the surrounding will be 125.68 J/K

So, when 1.90 moles of ethene gas is reacted, the entropy change of the surrounding will be = [tex]\frac{125.68}{1}\times 1.90=238.80J/K[/tex]

Hence, the value of [tex]\Delta S^o[/tex] for the surrounding when given amount of ethene gas is reacted is 238.80 J/K

Answer:

Explanation:

Heat is a kind of energy.

The kinetic theory relates the heat with the movement of the particles: the more the particles move, the larger the kinetic energy of the system. The kinetic theory states that heat is the kinetic energy of the particles, atoms or molecules, in a substance, that is transferred from a substance at higher temperature to other substance at lower temperature.

Based on that principle, the kinetic theory explains the changes of phases of the substances in terms of the motion of the particles: the hotter an object the faster the particles move, the more energetic the particles are, and they occupy more space. Thus, when a solid is heated, the particles move faster and it can pass to liquid or gaseous state.

Answer:

The answer is (D) Two molar equivalents of cyclopentadiene can react with one molar equivalent of p‑benzoquinone.

Explanation:

The reaction between p-benzoquinone and cyclopentadiene is a 1,4-cyclo-addition reaction, will follow the general 4n+2 π electrons rule  of reaction between a dienophile and a diene.

Hence, two moles of cyclopentadiene added to p-benzoquinone will result in two possible isomers of cis endo and exo adducts (open and closed rings).  

Only reaction conditions can be varied to effect yield increase.

Final answer:

The correct statement regarding the stoichiometry of the Diels-Alder reaction of cyclopentadiene with p-benzoquinone is that one molar equivalent of p-benzoquinone reacts with one molar equivalent of cyclopentadiene, highlighting its [4+2] cycloaddition character and specificity.

Explanation:

Considering the Diels–Alder reaction of cyclopentadiene with p-benzoquinone, the correct statement about the stoichiometry of this reaction is: B. One molar equivalent of p-benzoquinone can react with only one molar equivalent of cyclopentadiene. The Diels-Alder reaction is characterized as a [4+2] cycloaddition, where a conjugated diene (cyclopentadiene) interacts with a dienophile (p-benzoquinone) to form a six-membered cyclic compound. This reaction is highly selective and stereospecific, generally taking place between one mole of diene and one mole of dienophile to produce a distinct cyclohexene derivative without creating long polymer chains or requiring multiple moles of either reactant.

The reaction's selectivity and efficiency contribute to its widespread use in synthetic organic chemistry, particularly in the synthesis of complex molecules and natural products. The process does not favor the formation of polymers or the interaction of uneven molar equivalents of reactants, making option B the correct choice for its stoichiometry.

Answer:

Before adding any KOH, the pH is 4.03

Explanation:

Step 1: Data given

Volume of a 0.220 M HClO = 50.0 mL = 0.050 L

Molarity of KOH = 0.220 M

The ionization constant for HClO is 4.0*10^–8

Step 2: The balanced equation

HClO + KOH → KClO + H2O

Step 3:  pH before any addition of KOH

When no KOH is added, we only have HClO, a weak acid.

To calculate the pH of a weak acid, we need the Ka

Ka = [H+] / [acid]  

4.0*10^-8 = [H+]² / 0.220  

[H+]² = (4.0*10^-8 ) * 0.220  

[H+]² = 8.8*10^-9  

[H+] = √( 8.8*10^-9)  

[H+] = 9.38*10^-5 M  

pH = -log [H+]  

pH = -log(9.38*10^-5)  

pH = 4.03

Before adding any KOH, the pH is 4.03

Final answer:

To calculate the pH before the addition of KOH in the titration of HClO with KOH, we can use the ionization constant for HClO (Ka). The initial concentration of HClO can be used to calculate the concentration of H+, which in turn can be used to calculate the pH using the pH formula.

Explanation:

The pH before the addition of any KOH can be calculated using the ionization constant for HClO. HClO is a weak acid, so we can use the expression for the acid dissociation constant, Ka, to calculate the pH. The expression for Ka for HClO is:

Ka = [H+][ClO-] / [HClO]

Since we know the initial concentration of HClO, we can assume that the concentration of H+ is equal to the initial concentration of HClO. Therefore, we can rewrite the expression for Ka as:

Ka = [H+]² / [HClO]

Now we can calculate the concentration of H+ using the given initial concentration of HClO:

[H+] = sqrt(Ka * [HClO])

Finally, we can use the concentration of H+ to calculate the pH using the pH formula:

pH = -log[H+]

Answer:

40:1  is the ratio of the magenta phenolphthalein concentration to the colorless phenolphthalein concentration.

Explanation:

To calculate the pH of acidic buffer, we use the equation given by Henderson Hasselbalch:

[tex]pH=pK_a+\log(\frac{[salt]}{[acid]})[/tex]

[tex]pH=pK_a+\log(\frac{[magenta(Php)]}{[Php]})[/tex]

We are given:

[tex]pK_a[/tex] = negative logarithm of acid dissociation constant of phenolphthalein = 9.40

[tex][magenta(Php)][/tex] = concentration of magenta phenolphthalein

[tex][Php][/tex] = concentration of colorless phenolphthalein

pH = 11

Putting values in above equation, we get:

[tex]11=9.40+\log(\frac{[magenta(Php)]}{[Php]})[/tex]

[tex]\log(\frac{[magenta(Php)]}{[Php]})=11-9.40=1.6[/tex]

[tex]\frac{[magenta(Php)]}{[Php]}=10^{1.6}=39.81 :1 \approx 40:1[/tex]

40:1  is the ratio of the magenta phenolphthalein concentration to the colorless phenolphthalein concentration.

The Lewis structure in the question represents the molecule Oxygen difluoride (OF2), where 'Y' is Oxygen with one lone pair of electrons and 'X' is Fluorine, one of which is double bonded to Oxygen while other is single bonded, with two and three lone pairs of electrons respectively.

The given generic Lewis structure shows the molecule Oxygen difluoride (OF2), which fulfills the conditions specified. Here, 'Y' can represent an Oxygen atom (O), which has one lone pair of electrons. 'X' can represent Fluorine atoms (F), one of which is double bonded to Oxygen (giving it two lone pairs of electrons), and the other is single bonded to Oxygen (giving it three lone pairs of electrons).

In the Lewis structure for Oxygen difluoride, the bonding and lone pairs of electrons in the molecule are represented through lines and dots respectively. It looks like this:

O = F

|

F

Each Fluorine atom interacts with eight valence electrons: the six in the lone pairs and the two in the single or the double bond. The Oxygen atom also interacts with eight valence electrons according to the Octet Rule, with two from its lone pair, four from its double bond with one Fluorine atom, and two from its single bond with the other Fluorine atom.

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The compound represented by the generic Lewis structure is [tex]\(\text{SO}_2\).[/tex]

To determine the compound, we need to analyze the information given about the Lewis structure:

1. The central atom Y has one lone pair of electrons.

2. The Y atom is double bonded to an X atom, which has two lone pairs of electrons.

3. The Y atom is also single bonded to an X atom, which has three lone pairs of electrons.

 Let's start by identifying the possible elements for X and Y based on the valence electrons and the types of bonds and lone pairs described:

- The Y atom has one lone pair and forms a double bond and a single bond with X atoms. This means Y must have at least 4 valence electrons (2 in the lone pair + 1 in each of the two bonds). Y also forms a total of 3 bonds (1 double bond and 1 single bond), which means it can have a maximum of 6 valence electrons (3 bonds x 2 electrons per bond). Therefore, Y must be an element from Group 16 (chalcogens), which typically have 6 valence electrons. The only chalcogen that can form a double bond with an X atom and still have a lone pair is sulfur (S), as oxygen (O) would not have a lone pair if it formed two double bonds, and the heavier chalcogens (Se, Te) are less likely to form double bonds.

 - The X atom that is double bonded to Y has two lone pairs, which means it has at least 4 valence electrons (2 in the double bond + 2 in the lone pairs). This X atom cannot have more than 6 valence electrons because it is not forming more than 2 bonds. Therefore, X must be an element from Group 16 (chalcogens) as well. Given that Y is sulfur, the only chalcogen that can form a double bond with sulfur and have two lone pairs is oxygen (O).

 The X atom that is single bonded to Y has three lone pairs, which means it has at least 5 valence electrons (1 in the single bond + 2 in the lone pairs). This X atom cannot have more than 7 valence electrons because it is not forming more than 1 bond. Therefore, X must be an element from Group 17 (halogens), which typically have 7 valence electrons. The most common element from this group that forms a single bond with sulfur and has three lone pairs is chlorine (Cl).

However, since we are looking for a compound where both X atoms are the same element, and considering the generic Lewis structure, we can conclude that both X atoms must be oxygen (O), as oxygen can form both single and double bonds with sulfur.

 Putting it all together, the central Y atom is sulfur (S), and the outer X atoms are both oxygen (O), leading to the compound[tex]\(\text{SO}_2\),[/tex]which is sulfur dioxide. The Lewis structure of [tex]\(\text{SO}_2\)[/tex] shows sulfur double bonded to one oxygen atom and single bonded to another oxygen atom, with the appropriate number of lone pairs on each atom as described in the question.

Answer:

The rate of the over all reaction is ;

[tex]R=K[A_2]^{1/2}[B][/tex]

Explanation:

Step 1 : [tex]A_2\rightleftharpoons 2 A[/tex] fast

Step 2  : [tex]A + B\rightarrow AB[/tex] slow

Equilibrium constant of the reaction in step 1:

[tex]K_1=\frac{[A]^2}{[A_2]}[/tex]....[1]

Overall reaction:

[tex]A_2 + 2 B \rightarrow 2 AB[/tex]

When there is a chemical reaction which taking place in more than 1 step than the rate of the over all reaction is determined by the slowest step occurring during that process;

Here step 2 is slow step, so the rate of the reaction will be;

[tex]R=k[A][B][/tex]..[2]

Putting value of [A] from [1] in [2]:

[tex]R=k\times \sqrt{K_1\times [A_2]}\times [B][/tex]

[tex]K=k\times (K_1)^{1/2}[/tex]

K = rate constant of the reaction

The rate of the over all reaction is ;

[tex]R=K[A_2]^{1/2}[B][/tex]

The overall rate law for the given reaction mechanism is first order in A* (generated from A2) and first order in B, leading to an overall rate law of rate = k[A*][B], with k being the rate constant.

The rate law for a chemical reaction can be determined based on the mechanism of the reaction and the rate-determining step. Considering the given mechanism, where A2 dissociates into 2 A rapidly, and then A reacts with B to form AB slowly, the slow step is the rate-determining step. Therefore, the reaction is first order with respect to A* (generated from A2) and first order with respect to B. This is because the slow step involves one molecule of A* and one molecule of B. The overall reaction rate would be expressed as rate = k[A*][B], where k is the rate constant. If we assume the steady state approximation applies, A2 rapidly reaches a steady concentration of A*, and thus its concentration does not directly figure into the rate law for the slow step.

A. The molarity after a reaction time of 19.00 hours is 0.0988M.

B. 10.12 hours are required for 69% of the [tex][Co(NH_3)_5]Br^{2+}[/tex].

Given data:

Rate constant (k) is [tex]6.3 * 10^{-6} s^{-1}[/tex].

Initial concentration of [tex][Co(NH_3)_5]Br^{2+}[/tex] is 0.100 M.

The rate law for a first-order reaction is R = k * [A]

Where,

R is the rate of the reaction.

k is the rate constant.

[A] is the concentration of the reactant.

A.

To find the molarity after a reaction time of 19.0 hours,

[tex]ln([A]^t / [A]^o) = -kt\\{[A]^t} = [A]^o * e^{-kt}\\{[A]^t} = 0.100 M * e^{-6.3 * 10^{-6} * (19.0 hours * 3600 s/hour)}\\{[A]^t} = 0.0988 M[/tex]

B.

[tex]ln([A]^t / [A]^0) = -kt\\ln(0.69) = -kt[/tex]

Solve for t:

[tex]t = -ln(0.69) / k[/tex]

Substitute the value of k:

[tex]t = -ln(0.69) / (6.3 * 10^{-6} s^{-1})[/tex]

[tex]t = 36441.49 seconds[/tex]

On converting seconds to hours:

t ≈ 10.12 hours

Therefore,

A. The molarity after a reaction time of 19.00 hours is 0.0988M.

B. The time required to react 69% of reactant is 10.12hours.

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The molarity of Co(NH3)5Br2+ after 19 hours is 0.073 M. Approximately 35.75 hours are required for 69% of the Co(NH3)5Br2+ to react.

This question pertains to the concept of chemical kinetics, specifically the first order reaction. The molarity after a certain period can be calculated using the formula for first order kinetics: [A] = [A0]e^-kt, where [A0] is the initial concentration, k is the rate constant, t is time, and [A] is the concentration at time t.

A; After 19.0 hours (or 68400 seconds, converted from hours to seconds), the molarity of Co(NH3)5Br2+ can be calculated as follows: [Co(NH3)5Br2+] = (0.100 M)e^-(6.3×10^-6 s^-1 × 68400 s) = 0.073 M.

B; To find the time when 69% of the Co(NH3)5Br2+ has reacted, you need to calculate the time when 31% of the initial molarity remains (as 100% - 69% = 31%). Hence, using the same equation, you can rearrange to find t = -(1/k)ln([A]/[A0]) = -(1/(6.3×10^-6 s^-1)) ln(0.031/0.100) = Approx. 128,680 seconds, or about 35.75 hours.

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Answer:

La is the chemical symbol for this element.

Explanation:

[tex]2XCl_3+3I_2\rightarrow 2XI_3+3Cl_2[/tex]

Let the molar mass of [tex]XCl_3[/tex] be M.

Let the molar mass of [tex]XI_3[/tex] be M'.

Moles of [tex]XCl_3=\frac{0.760 g}{M}=n[/tex]

Moles of [tex]XI_3=\frac{1.610g}{M'}=n'[/tex]

According to reaction , 2 moles of [tex]XCl_3[/tex] gives 2 moles of [tex]XI_3[/tex], then n moles [tex]XCl_3[/tex] will give:

[tex]\frac{1}{1}\times n=n[/tex] moles of [tex]XI_3[/tex]

[tex]n=n'[/tex]

[tex]\frac{0.760 g}{M}=\frac{1.610g}{M'}[/tex]

Atomic mass of iodine = 127 g/mol

Atomic mass of chlorine = 35.5 g/mol

Atomic mass of X = x

[tex]\frac{0.760 g}{x+3\times 35.5 g/mol}=\frac{1.610g}{x+3\times 127 g/mol}[/tex]

Solving for x:

x = 138.9 g/mol

The value of atomic mass of X  corresponds to compound named lanthanum.

La is the chemical symbol for this element.

Answer:

The chemical symbol for this element is La

Explanation:

Step 1: Data given

Mass of XCl3 = 0.760 grams

Mass of XI3 = 1.610 grams

Molar mass Cl = 35.45 g/mol

Step 2: The balanced equation

2XCl3 + 3I2 → 2XI3 + 3Cl2

The mol ratio for XCl3: XI3 = 2:2 or 1:1

Step 3: Calculate moles

Moles = mass / molar mass

Moles XCl3 = mass XCl3 / molar mass XCl3

Moles XCl3 = 0.760 grams / (X + 3*35.45 g/mol)

Moles XI3 = 1.610 grams / (X + 3*126.9 g/mol)

0.760 grams / (X + 3*35.45 g/mol) = 1.610 grams / (X + 3*126.9 g/mol)

0.760 / (X + 106.35) = 1.610 / (X + 380.7)

0.760 (X +380.7) = 1.610 ( X + 106.35)

0.760X + 289.3 = 1.610X + 171.2

118.1 = 0.85X

X = 138.9 g/mol

If we look for an element with atomic mass of 138.9 g/mol we  find Lanthanum (La)

2LaCl3 + 3I2 → 2LaI3 + 3Cl2

Answer: 95%

Explanation:

We first write down the balanced reaction equation as shown in the image attached. Next we identify the limiting reactant from the given data. Oxygen is the limiting reactant in this case and it is the mass of oxygen reacted that is used in the estimation of the theoretical yield as shown in the image attached. The percentage yield is then calculated according to the formula shown in the image attachment.

Answer:

3.5 g

Explanation:

The density of water is 1 g/mL. The mass (m) corresponding to 20.0 mL is 20.0 g.

We can calculate the heat (Q) required to raise the temperature of 20.0 mL of water 1 °C (ΔT).

Q = c × m × ΔT = 1 cal/g.°C × 20.0 g × 1 °C = 20 cal

where,

c is the specific heat capacity of water

There are 160 calories in 28 g of Cheetos. The mass that releases 20 cal is:

20 cal × (28 g/160 cal) = 3.5 g

Final answer:

To raise the temperature of 20.0 mL of water by 1°C, 0.35 grams of Flamin' Hot Cheetos must be burned, utilizing the concept of specific heat capacity and energy content of the Cheetos.

Explanation:

The question asks how many grams of Flamin' Hot Cheetos one must burn to raise the temperature of 20.0 mL (which translates to 20.0 grams, assuming the density of water is 1 g/mL) of water by 1°C. To solve this, we first acknowledge that the specific heat capacity of water is about 1 calorie per gram per Celsius degree (1 cal/g°C). Therefore, to raise 20.0 grams of water by 1°C, it requires 20.0 calories. Given the conversion factor that 1 Calorie (kcal, with a capital 'C', equivalent to food calories) = 1000 calories (small 'c'), we deduce that 20.0 calories = 0.02 Kcal.

From the question's premise, 28 grams of Flamin' Hot Cheetos contain 160 Calories (160 Kcal). To find how many grams are needed to produce 0.02 Kcal, we set up a proportion: 160 Kcal per 28 grams = 0.02 Kcal per x grams. Solving for x, we find that x = (0.02 Kcal * 28 grams) / 160 Kcal = 0.35 grams of Flamin' Hot Cheetos are needed to raise the temperature of 20.0 mL of water by 1°C.

The sphingolipid is the lipid with this composition.

Option: C

Explanation:

The complex lipid with  one mole of fatty acid per mole of inorganic phosphate has been Sphingolipid. Thus, option C is correct.

The lipids are biomolecules with the ability to bind with the nonpolar surfaces. The lipids have been bound with other biomolecules to form complex lipids.

Thus, the complex lipid with  one mole of fatty acid per mole of inorganic phosphate has been Sphingolipid. Thus, option C is correct.

For more information about lipids, refer to the link:

https://brainly.com/question/233734

Answer:

Removing O₂, means removing one of the reactants and the system would counteract this effect by producing more O₂, thereby shifting the equilibrium position to the left and favouring the backward reaction.

Explanation:

The principle that explains how changes in temperature, Concentration and Pressure of reactants or products of a reaction at equilibrium affect the equilibrium position of the reaction is the Le Chatelier's principle.

The Principle explains that a system/process if a system/process which is at equilibrium is disturbed/perturbed/constrained by one or more changes (in concentration, pressure or temperature), the system would shift the equilibrium position to counteract the effects of this change.

Removing O₂, means removing one of the reactants (changing its concentration) and the system would counteract this effect by producing more O₂, thereby shifting the equilibrium position to the left and favouring the backward reaction.

Final answer:

Removing O₂(g) from the equilibrium of the exothermic reaction 2 SO₂(g) + O₂(g) <=> 2 SO₃(g) shifts the equilibrium towards the reactants' side, increasing the concentration of SO₂(g) and decreasing the concentration of SO₃(g).

Explanation:

The question revolves around the effect of removing O₂(g) from the equilibrium system of the reaction 2 SO₂(g) + O₂(g) ⇌ 2 SO₃(g), which is exothermic. According to Le Châtelier's Principle, when a change is made to a system in equilibrium, the system adjusts to counteract that change. In this case, removing O₂(g) (oxygen) would decrease its concentration, prompting the equilibrium to shift towards the reactants' side to increase the concentration of O₂(g) and restore equilibrium. This means that the concentration of SO₂(g) will increase, and the concentration of SO₃(g) will decrease as the reaction shifts left to form more reactants.

Final answer:

The estimated pKa of the weak monoprotic acid is 3.42, as this value is equal to the pH at the halfway point to the equivalence point during a titration with a strong base where the amounts of the weak acid and its conjugate base are equal.

Explanation:

The question addresses the titration of a weak monoprotic acid with a strong base and involves finding the pKa of the acid using pH measurements.

To estimate the pKa of the weak acid, we use the information that at the halfway point of the titration (when half the equivalent amount of base has been added), the pH of the solution equals the pKa of the acid. This is because, at the halfway point, the concentrations of the acid (HA) and its conjugate base (A-) are equal.

Given that 25.0 mL of 0.100 M NaOH is the halfway point since it takes 50.0 mL of NaOH to reach the equivalence point, and the pH at this stage is 3.42, we can directly say that the pKa of the weak acid is approximately 3.42.

This is because at the halfway point of the titration, the amount of acid that has been neutralized by the base is equal to the amount of acid that remains un-neutralized. In such a scenario, according to the Henderson-Hasselbalch equation:

pH = pKa + log([A-]/[HA]) and since [A-] = [HA] at the halfway point, we get:

Thus, the estimated pKa value of the weak acid is 3.42.

Explanation:

It is known that at the equivalence point,

     Equivalent of acid = equivalent of base ......... (A)

and,     Equivalent = [tex]\text{Molarity} \times n_{f} \times V[/tex]

Therefore, equivalent of acid is calculated as follows.

     Equivalent of acid = [tex]M \times 1 \times 4[/tex] .......... (1)

     Equivalent of base = [tex]0.05 \times 1 \times 12.8[/tex] ............ (2)

Hence, using equation (A) we will calculate the concentration as follows.

           [tex]M \times 4 = 0.05 \times 12.8[/tex]

                       M = 0.16 M

Thus, we can conclude that concentration of the unknown weak acid solution 0.16 M.                    

Answer:

See explanation below

Explanation:

In this case, let's write the equation again:

A <------> B     Keq = ?

As we are using standard conditions, we can assume we have a temperature of 0 °C (273 K) and 1 atm.

To get the equilibrium constant we only do the following:

Keq = [B] / [A]

However, the problem is asking the reverse equilibrium constant (because of the ' in Keq'), so, we have to do the reverse division:

Keq' = [A]/[B]

Replacing the given values of A and B:

Keq' = 1.5/0.5 = 3

We have the equilibrium constant, we can calculate now the gibbs free energy with the following expression:

ΔG°' = -RTlnKeq'

As Keq' is > 1, the negative logaritm will result into a negative result or a number < 0, so, calculating this we have:

ΔG°' = -8.31 * 273 ln3

ΔG°' = -2.492.34 J

Explanation:

Spilling room temperature water over your skin on a hot day will cook the body down. This is because water has a low heat of vapourization( water can evaporate into gas molecules easily). This evaporation causes a cooling effect on the skin surface and it requires heat energy as liquid is converted to gas. This is a typical example of an endothermic process. BUT spilling vegetable oil of the same temperature as the water over the skin will not cool the body down because oil has a high heat of vapourization and doesn't evaporate because it is a viscous liquid and the molecules are tightly bound to each other. I hope this helps.

Answer:

[tex]COD=2030\frac{mg}{L}[/tex]

Explanation:

Hello,

In this case, considering the given information the redox reaction is:

[tex]Fe^{+2}+Cr_2O_7^{-2}\rightarrow Fe^{+3}+Cr^{+3}[/tex]

Which properly balanced turns out:

[tex]Fe^{+2}\rightarrow Fe^{+3}+1e^-\\Cr^{+6}_2O_7^{-2}+14H^++6e^-\rightarrow 2Cr^{+3}+7H_2O\\\\\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \downarrow\\6Fe^{+2}+Cr_2O_7^{-2}+14H^+\rightarrow 6Fe^{+3}+2Cr^{+3}+7H_2O[/tex]

In such a way, one sees a 6 to 1 molar relationship between the standard iron (II) solution and the dichromate, therefore, by using the following equation it is possible to determine the oxygen as shown below:

[tex]n_{Fe^{+2}}=n_{Cr_2O_7^{-2}}[/tex]

Thus, the moles of iron (II) solution are:

[tex]n_{Fe^{+2}}=0.1511\frac{molFe^{+2}}{L_{sln}}*0.02684L_{sln}=0.00406molFe^{+2}[/tex]

Moreover, the moles of dichormate result:

[tex]n_{Cr_2O_7^{-2}}=0.00406molFe^{+2}*\frac{1molCr_2O_7^{-2}}{6molFe^{+2}}=6.76x10^{-4}}molCr_2O_7^{-2}[/tex]

Thereby, the volume of the sample is:

[tex]V_{sample}=\frac{n_{Cr_2O_7^{-2}}}{M_{Cr_2O_7^{-2}}}=\frac{6.76x10^{-4}molCr_2O_7^{-2}}{0.0181\frac{molCr_2O_7^{-2}}{L_{sln}} } =0.0373L_{sample}[/tex]

Finally, the chemical oxygen demand result:

[tex]COD=6.76x10^{-4}molCr_2O_7^{-2}*\frac{7molO}{1molCr_2O_7^{-2}}*\frac{16gO}{1molO}*\frac{1000mgO}{1gO}*\frac{1}{0.0373L_{sln}} \\COD=2030\frac{mg}{L}[/tex]

Best regards.

Answer:

Answer for the question:

You replicate the CEC analysis of a secondary alcohol you performed in the lab using a reverse phase TLC plate producing the TLC plate below. Based on this TLC plate and the mnemonic in your notes, what can you conclude about the stereochemistry of the alcohol? (1 pts)

is given below which explains the best option for the answer.

Explanation:

The enantiomer of the alcohol cannot be determined.

Explanation:

Below is an attachment containing the solution.

Answer:

0.00875 moles Cu(NO3)2

a) 0.0175 moles NO3-

b) We should use 0.14L

Explanation:

Step 1: Data given

Volume = 25 mL = 0.025 L

Molarity of a Cu(NO3)2 solution = 0.35 M

Step 2: Calculate moles Cu(NO3)2

Moles Cu(NO3)2 = molarity * volume

Moles Cu(NO3)2 = 0.35 M * 0.025 L

Moles Cu(NO3)2 = 0.00875 moles

Step 3: Calculate moles NO3-

Cu(NO3)2 → Cu^2+ + 2NO3-

In 1 mol Cu(NO3)2 we have 2 moles NO3-

For 0.00875 moles Cu(NO3)2 we'll have 2*0.00875 = 0.0175 moles NO3-

Step 4: What volume of this solution should be used to get 0.050 moles of Cu(NO3)2?

Volume =  moles / molarity

Volume = 0.050 moles / 0.35 M

Volume = 0.14L

Answer:

Mg and Zn

Explanation:

In cathodic protection, the sacrificial anode corrodes instead of the cathode which it protects. The anode is usually higher than the cathode in the electrochemical series. This also means that the reduction potential of the sacrificial anode is more negative than that of the cathode. Consider the reduction potentials of the metals listed in the question:

Mg=-1.185V

Zn= -0.7618V

Ag= +0.7996V

Au= +1.629V

Ni= -0.251V

The reduction potential of the cathode stated in the question is -0.447V hence only magnesium and zinc can function as sacrificial anode.

The metals that can be used as sacrificial anodes in the cathodic protection of an underground steel storage tank are silver (Ag), magnesium (Mg), nickel (Ni), and zinc (Zn).

The metals that can be used as sacrificial anodes in the cathodic protection of an underground steel storage tank are the ones with a lower standard reduction potential (E°) than steel. In this case, we need to compare the reduction potentials of steel to the standard reduction potentials of the given metals.

Therefore, the metals that could be used as sacrificial anodes in the cathodic protection of an underground steel storage tank are silver (Ag), magnesium (Mg), nickel (Ni), and zinc (Zn).

https://brainly.com/question/32659293

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