AMC 8 · 2007 · #17

Grade 6 rate-ratio

Archetype Arithmetic Expression Decomposition └ Sub-archetype Fraction / Expression Sum Evaluation

percentageratio-proportionfraction-arithmetic identify-subproblems ↑ Prerequisites: percentagefraction-arithmetic

📏 Short solution 💡 2 insights

Problem

A mixture of $30$ liters of paint is $25\%$ red tint, $30\%$ yellow
tint and $45\%$ water. Five liters of yellow tint are added to
the original mixture. What is the percent of yellow tint
in the new mixture?

Pick an answer.

(A)

(B)

(C)

(D)

(E)

AMC 8 2007 problem © Mathematical Association of America (MAA AMC). Reproduced for educational use.

Try it yourself first — the explanation is most useful after you’ve attempted it.

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Toolkit + CCSS Solution

Understand

Restated: A $30$-liter paint mixture is $25\%$ red tint, $30\%$ yellow tint, and $45\%$ water. Five more liters of pure yellow tint are stirred in. What percent of the new mixture is yellow tint?

Givens: Original mixture: $30$ liters total; Original composition: $25\%$ red tint, $30\%$ yellow tint, $45\%$ water; $5$ liters of pure yellow tint are added; Answer choices: (A) $25$, (B) $35$, (C) $40$, (D) $45$, (E) $50$

Unknowns: The percent of yellow tint in the new mixture

Understand

Restated: A $30$-liter paint mixture is $25\%$ red tint, $30\%$ yellow tint, and $45\%$ water. Five more liters of pure yellow tint are stirred in. What percent of the new mixture is yellow tint?

Plan

Primary tool: #7 Identify Subproblems

Secondary: #1 Draw a Diagram

The trap in this problem is reasoning with the percent $30\%$ directly — when you add liquid to one part, both the part and the whole change, so the percent does not just go up by some neat number. Tool #7 (Identify Subproblems) handles this by splitting the work into three independent steps: (a) convert the $30\%$ to actual liters of yellow, (b) update the liters of yellow and the total liters after the pour, and (c) convert back to a percent. Each step is one arithmetic move. Tool #1 (Draw a Diagram) supports this with a part-whole bar that makes the "yellow piece grows, total bar grows" picture explicit. We deliberately avoid Tool #13 (Algebra) because no equation is needed — just three lines of arithmetic on amounts.

Execute — Answer: C

#7 Identify Subproblems 6.RP.A.3 Step 1

Convert the starting percent to liters of yellow.
Of the $30$ liters of original mixture, $30\%$ is yellow tint, so use the "percent of" calculation.

$$\text{yellow}_{\text{old}} = 30\% \times 30 = 0.30 \times 30 = 9 \text{ liters}$$

💡 $30\%$ of $30$ is the same as $\tfrac{3}{10}$ of $30$, which is $9$ — a straight Grade 6 "percent of a quantity" move.

#1 Draw a Diagram 4.OA.A.3 Step 2

Update the yellow amount after pouring in $5$ more liters of pure yellow tint.
Only the yellow changes; red and water stay put.

$$\text{yellow}_{\text{new}} = 9 + 5 = 14 \text{ liters}$$

💡 On a part-whole bar, the yellow stripe stretches by $5$ liters while the red and water stripes do not move.

#1 Draw a Diagram 4.OA.A.3 Step 3

Update the total volume.
The added $5$ liters bumps the total mixture from $30$ liters up to $35$ liters.

$$\text{total}_{\text{new}} = 30 + 5 = 35 \text{ liters}$$

💡 The whole bar gets longer by exactly the $5$ liters that were poured in — nothing left the container.

#7 Identify Subproblems 6.RP.A.3 Step 4

Convert back to a percent.
Divide the new yellow amount by the new total amount.

$$\dfrac{\text{yellow}_{\text{new}}}{\text{total}_{\text{new}}} = \dfrac{14}{35} = \dfrac{2}{5} = 40\% \;\Rightarrow\; \textbf{(C)}$$

💡 Both $14$ and $35$ share the factor $7$, so $\tfrac{14}{35}$ simplifies to $\tfrac{2}{5}$, which every Grade 6 student knows as $40\%$.

[1] #7 6.RP.A.3 Convert the starting percent to liters of yellow. Of the $30$ liters of original

[2] #1 4.OA.A.3 Update the yellow amount after pouring in $5$ more liters of pure yellow tint. O

[3] #1 4.OA.A.3 Update the total volume. The added $5$ liters bumps the total mixture from $30$

[4] #7 6.RP.A.3 Convert back to a percent. Divide the new yellow amount by the new total amount.

Review

Reasonableness: Sanity-check the size of the answer. The yellow share started at $30\%$ and we added more yellow, so the new percent must be greater than $30\%$ — this rules out (A) $25$. But the addition is only $5$ liters compared to a total of $35$, so the jump cannot be huge — $50\%$ would mean half the mixture is yellow, which would need $17.5$ liters of yellow, far more than the $14$ we have. The actual jump from $30\%$ to $40\%$ is exactly $10$ percentage points, which fits the modest size of the pour. As a final check: the red tint and water keep their original amounts ($25\% \times 30 = 7.5$ and $45\% \times 30 = 13.5$), and $7.5 + 13.5 + 14 = 35$ matches the new total.

Alternative: Tool #1 (Draw a Diagram) on its own: draw a bar of length $30$ split into stripes of $7.5$ (red), $9$ (yellow), $13.5$ (water). Then glue a $5$-unit stripe onto the yellow end. The bar is now $35$ long with a yellow piece of $14$. Reading the yellow fraction off the bar gives $\tfrac{14}{35} = \tfrac{2}{5} = 40\%$ — answer (C).

CCSS standards used (min grade 6)

6.RP.A.3 Use ratio and rate reasoning to solve real-world and mathematical problems, including percent problems (Converting $30\%$ of $30$ liters into $9$ liters of yellow tint, and converting the final ratio $\tfrac{14}{35}$ back into the percent $40\%$.)
4.OA.A.3 Solve multi-step word problems with whole numbers using the four operations (Adding $5$ liters to both the yellow amount ($9 + 5 = 14$) and the total amount ($30 + 5 = 35$) to update the mixture after the pour.)

⭐ When a mixture problem asks about percent, work in actual amounts first — turn $30\%$ into $9$ liters, do the addition, then turn the answer back into a percent. The numbers do the rest.

Problem

Toolkit + CCSS Solution

Understand

Plan

Execute — Answer: C

Review

CCSS standards used (min grade 6)

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