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13 votes
You order a glass of lemonade, 150 mL, in a restaurant only to discover that it is warm and too sweet. The sugar concentration of the lemonade is 2.27 M but you would like it to be reduced to a concentration of 1.88 M.How many grams of ice should you add to the lemonade, knowing that only a third of the ice will melt before you take your first sip? (Assume the density of water is 1.00 g/mL)

User MarkB
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1 Answer

19 votes
19 votes

Since no sugar will be added or removed, the number or moles of it in the glas won't change.

Let's call this quantity:


n_s

The molar concetrnation can be written as the followin equation:


C=(n_s)/(V)

Where C is the concentration given the number of moles of sugar and the volume V.

We can rewrite this as:


n_s=C\cdot V

Now, before the ice melts, the volume of the lemonate is 150 mL and the sugar concentration is 2.27 mol/L. Let's call this situation 1:


n_s=C_1\cdot V_1

After the ice melt the one third it will, we will have a certain volume and the concentration we want 1.88 mol/L. Let's call this situation 2:


n_s=C_2\cdot V_2

Now, we can put thouse tofether:


\begin{gathered} n_s=n_s \\ C_1\cdot V_1=C_2\cdot V_2 \end{gathered}

And we can solve for the unknown volume of situation 2:


V_2=(C_1\cdot V_1)/(C_2)=(2.27M\cdot150mL)/(1.88M)=(340.5)/(1.88)mL=181.117\ldots mL\approx181mL

Since the final volume is approximately 181 mL, the difference between it and the initial volume is the volume of water that came from the melted part of the ice:


181mL-150mL=31mL

Since we assume that the density of the water is 1.00 g/mL, we can calculate the mass it represents:


\begin{gathered} \rho=(m)/(V)_{} \\ m=\rho\cdot V=1.00g/mL\cdot31mL=31g \end{gathered}

And since this is only 1 third of the ice (the rest won;t melt), we know that the whole ice will have three times this mass:


m_(ice)=3\cdot31g=93g

So, it should be added approximatelt 93 grams of ice.

User Idm
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