Question #3269e

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Question #3269e

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Answer 1 · 2017-07-08T00:56:00

Here's what I got.

Explanation:

I'm going to assume that you're interested in determining the amount of heat needed to convert $89.5 g$ $"89.5 g"$ of liquid water at its normal melting point of $0^{\circ} C$ $0^@"C"$ to liquid water at its normal boiling point of $100^{\circ} C$ $100^@"C"$ .

In other words, I will assume that you don't have to go from solid water at $0^{\circ} C$ $0^@"C"$ to water vapor at $100^{\circ} C$ $100^@"C"$ , i.e. that no phase change is involved here.

Now, the specific heat of water, which tells you the amount of heat needed to increase the temperature of $1 g$ $"1 g"$ of water by $1^{\circ} C$ $1^@"C"$ , is equal to ${4.18 J g}^{- 1}^{\circ} C^{- 1}$ $"4.18 J g"^(-1)""^@"C"^(-1)$ . This means that in order to increase the temperature of $1 g$ $"1 g"$ of liquid water by $1^{\circ} C$ $1^@"C"$ , you need to provide it with $4.18 J$ $"4.18 J"$ of heat.

In your case, you would need

$89.5 color(red)(cancel(color(black)("g"))) * "4.18 J"/(1color(red)(cancel(color(black)("g"))) * 1^@"C") = "374.11 J"""^@"C"^(-1)$

in order to increase the temperature of your sample of water. This value tells you that every $1^@"C"$ increase in the temperature of your sample requires $"374.11 J"$ of heat.

You can thus say that a change in temperature of

$100^@"C" - 0^@"C" = 100^@"C"$

will require

$100 color(red)(cancel(color(black)(""^@"C"))) * overbrace("374.11 J"/(1color(red)(cancel(color(black)(""^@"C")))))^(color(blue)("for 89.5 g of water")) = "37,411 J"$

of heat. Rounded to three sig figs, the number of significant figures you have for the mass of water, and expressed in kilojoules, the answer will be

$color(darkgreen)(ul(color(black)("heat needed = 37.4 kJ")))$

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Question #3269e

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