Question #cf926

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Question #cf926

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Answer 1 · 2016-11-14T00:04:48

Balance the chemical equation!

Explanation:

All you really have to do here is balance the chemical equation that describes the combustion of octane, $C_{8} H_{18}$ $"C"_8"H"_18$ .

As you know, the complete combustion of octane involves burning this hydrocarbon in the presence of excess oxygen, $O_{2}$ $"O"_2$ . Since octane is a hydrocarbon, i.e. a compound that contains only carbon and hydrogen, the reaction will produce two products

carbon dioxide, ${CO}_{2}$ $"CO"_2$

water, $H_{2} O$ $"H"_2"O"$

The unbalanced chemical equation that describes the combustion of octane will thus be

$C_{8} H_{18 (l)} + O_{2 (g)} \to {CO}_{2 (g)} + H_{2} O_{(l)}$ $"C"_ 8"H"_ (18(l)) + "O"_ (2(g)) -> "CO"_ (2(g)) + "H"_ 2"O"_ ((l))$

Now just balance this equation like you would fo any chemical equation.

Start with the atoms of carbon. You have $8$ $8$ present on the reactants' side, so multiply the carbon dioxide by $8$ $8$ to get $8$ $8$ atoms of carbon on the products' side

$C_{8} H_{18 (l)} + O_{2 (g)} \to 8 {CO}_{2 (g)} + H_{2} O_{(l)}$ $"C"_ 8"H"_ (18(l)) + "O"_ (2(g)) -> 8"CO"_ (2(g)) + "H"_ 2"O"_ ((l))$

Now look at the atoms of hydrogen. You have $18$ $18$ on the reactants' side and $2$ $2$ on the products' side, so multiply the water molecule by $9$ $9$ to get

$C_{8} H_{18 (l)} + O_{2 (g)} \to 8 {CO}_{2 (g)} + 9 H_{2} O_{(l)}$ $"C"_ 8"H"_ (18(l)) + "O"_ (2(g)) -> 8"CO"_ (2(g)) + 9"H"_ 2"O"_ ((l))$

Finally, focus on the atoms of oxygen. You have $2$ $2$ on the reactants' side and

$overbrace(8 xx "2 atoms O")^(color(blue)("from 8CO"_2)) + overbrace(9 xx "1 atom O")^(color(purple)("from 9H"_2"O")) = "25 atoms O"$

At this point, you can use a little trick to make the balancing easier. Notice that you can add a Fractional coefficient to $"O"_2$ to get

$"C"_ 8"H"_ (18(l)) + 25/2"O"_ (2(g)) -> 8"CO"_ (2(g)) + 9"H"_ 2"O"_ ((l))$

The reactants' side now has

$25/2 xx "2 atoms O" = "25 atoms O"$

the same number of atoms of oxygen as the products' side. To get rid of the fractional coefficient, simply multiply all the coefficients by $color(red)(2)$

$color(red)(2)"C"_ 8"H"_ (18(l)) + (25/2 xx color(red)(2))"O"_ (2(g)) -> (8 xx color(red)(2))"CO"_ (2(g)) + (9 xx color(red)(2))"H"_ 2"O"_ ((l))$

The balanced chemical equation will thus be

$2"C"_ 8"H"_ (18(l)) + 25"O"_ (2(g)) -> 16"CO"_ (2(g)) + 18"H"_ 2"O"_ ((l))$

Now simply add the coefficients to get their sum

$sum"coefficients" = 2 + 25 + 16 + 18 = color(darkgreen)(ul(color(black)(61)))$

Answer 2 · 2016-11-14T05:35:16

I shall first try to find out a general formula to know the sum of the coefficients of reactants and products for the combustion raction of any alkane.

The general molecular formula of an alkane is $C_xH_(2x+2)$ and the blanced equation of its combustion reaction is as follows

$C_xH_(2x+2)+1/2(3x+1)O_2->xCO_2+(x+1)H_2O$

So the sum of the coefficients becomes

$S=1+1/2(3x+1)+x+(x+1)$

$=>S=1+2x+1/2(3x+1+2)$

$=>S=1+2x+3/2(x+1)$

It is obvious from above relation that the Sum (S) will always be a whole number if x is odd

Otherwise to get the sum as whole number for even value of x we are to multiply the value of S by 2

In case of octane x = 8.

So the required sum is

$=2xxS=2(1+2x+3/2(x+1))$

$=2(1+2xx8+3/2(8+1))=2+32+27=61$

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