Driving 1000 miles a month is not unusual for a short-distance commuter. If your vehicle gets 19.70 mpg, you would use approximately 50.76 gallons of gasoline every month. If gasoline is approximated as C8H18 (density = 0.703 g/mL)...?

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Driving 1000 miles a month is not unusual for a short-distance commuter. If your vehicle gets 19.70 mpg, you would use approximately 50.76 gallons of gasoline every month. If gasoline is approximated as C8H18 (density = 0.703 g/mL)...?

How many grams of carbon dioxide does your vehicle emit every month?

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Answer 1 · 2017-10-17T02:19:55

Each month, the car will produce 417 120 g of $CO_2$

Explanation:

First, let's get all the unit sorted out.

Assuming this is a US gallon, it will be equivalent to 3785 mL, and since the density of octane (representing the gasoline) is 0.703 g/mL, the one gallon would be

$3785 mLxx0.703g/(mL)=2661 g$ per gallon

You have used 50.76 gallons each month, so

$50.76xx2661 = 135 072$ grams each month.

The reaction that produces $CO_2$ is

$2C_8H_18+25O_2rarr16CO_2+18H_2O$

so, we need to change those grams of gasoline into moles of octane:

Moles = $135 072g-:114g/"mol" = 1185 "mol"$

According to the reaction, we get 8 moles of $CO_2$ for every 1 mole of $C_8H_18$ , so the number of moles of $CO_2$ produced will be

$1185xx8=9480$ moles of $CO_2$

Since each mole of $CO_2$ has a mass of 44.0 g, the total monthly output of $CO_2$ will be...

$9480 "mol" xx 44.0 g/"mol"=417 120$ g or 417.1 kg

Answer 2 · 2017-10-17T02:56:05

About $4.171xx10^5$ grams of $CO_2$ is emitted.

Explanation:

[Step1] First, calculate the volume of gasoline $V$ to drive 1000 miles.

$V= 50.76$ (gallons)
Assuming gallon to be the US gallon( $1$ US gal = $3.785$ L),
$V=50.76 * 3.785 = 192.1$ (L)

[Step2] Then, calculate the mass(g) and amount of substance(mol) of $C_3H_8$ (octane).

The mass is $192.1 * 10^3$ (mL) $* 0.703$ (g/mL) $= 1.351xx10^5$ (g).

Since the molar mass of $C_8H_18$ (octane) is $12*8+1*18=114$ (g/mol) , the amount of substance of octane is $(1.351xx10^5)/114= 1.185xx10^3$ (mol)

[Step3] Calculate the $CO_2$ emission.
The chemical equation for burning $C_8H_18$ is
$2C_8H_18 + 25O_2 -> 16CO_2 + 18H_2O$ . Eight moles of carbon dioxcide is emitted per one mole of octane.

Thus the amount of substance for $CO_2$ is $1.185xx10^3*8=9.480*10^3$ (mol).
The molar mass of $CO_2$ is $12*1+16*2 =44$ .
Therefore, the mass of $CO_2$ emitted in a month is $9.480xx10^3*44 =4.171xx10^5$ (g).

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Driving 1000 miles a month is not unusual for a short-distance commuter. If your vehicle gets 19.70 mpg, you would use approximately 50.76 gallons of gasoline every month. If gasoline is approximated as C8H18 (density = 0.703 g/mL)...?

How many grams of carbon dioxide does your vehicle emit every month?

2 Answers

Explanation:

Explanation:

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