AMC 8 · 2002 · #7

Grade 6 rate-ratio

Archetype Arithmetic Expression Decomposition

percentagegraph-readingfraction-arithmetic identify-subproblems ↑ Prerequisites: fraction-arithmeticpercentage

📏 Short solution 💡 2 insights 📊 Diagram

Problem

The students in Mrs. Sawyer's class were asked to do a taste test of five kinds of candy. Each student chose one kind of candy. A bar graph of their preferences is shown. What percent of her class chose candy E?

Pick an answer.

(A)

(B)

(C)

(D)

(E)

View mode:

Toolkit + CCSS Solution

Understand

Restated: Mrs. Sawyer's class voted between five kinds of candy ($A$ through $E$), and the results are shown on a bar graph. Reading the bars: $A = 6$, $B = 8$, $C = 4$, $D = 2$, $E = 5$ students. What percent of the class chose candy $E$?

Givens: Five candies labeled $A, B, C, D, E$, each chosen by some students; Bar heights on the graph: $A = 6$, $B = 8$, $C = 4$, $D = 2$, $E = 5$; Every student picks exactly one candy, so the bars together account for the whole class; Answer choices: (A) $5$, (B) $12$, (C) $15$, (D) $16$, (E) $20$ (percent)

Unknowns: The percent of the class that chose candy $E$

Understand

Plan

Primary tool: #7 Identify Subproblems

Secondary: #5 Look for a Pattern

The work splits cleanly into Tool #7 subproblems: (1) read the five bar heights, (2) add them to get the class total, (3) form the fraction $\tfrac{E}{\text{total}}$ and convert to a percent. Tool #5 (Look for a Pattern) finishes the last step quickly — $5$ out of $25$ is the familiar $\tfrac{1}{5} = 20\%$ pattern, so no long division is needed.

Execute — Answer: E

#7 Identify Subproblems 3.MD.B.3 Step 1

Read the five bar heights off the graph.
Each bar's top reaches a horizontal gridline that tells how many students picked that candy.

$$A = 6, \quad B = 8, \quad C = 4, \quad D = 2, \quad E = 5$$

💡 Reading values off a scaled bar graph is the Grade 3 "draw and interpret a scaled bar graph" skill.

#7 Identify Subproblems 4.OA.A.3 Step 2

Add the five bar heights to get the total number of students.
Each student is counted exactly once, so this sum is the size of Mrs.
Sawyer's class.

$6 + 8 + 4 + 2 + 5 = 25$ students

💡 Combining several known quantities to get a total is the Grade 4 multi-step word-problem move.

#5 Look for a Pattern 6.RP.A.3 Step 3

Write the percent of the class that chose $E$ as a fraction over the class total, then convert to a percent.

$$\text{percent for } E = \dfrac{5}{25} \times 100\%$$

💡 Choosing the class total as the base of the percent (the "whole") is the key Grade 6 ratio move.

#5 Look for a Pattern 6.RP.A.3 Step 4

Simplify the fraction and convert.
$\tfrac{5}{25} = \tfrac{1}{5}$, and $\tfrac{1}{5}$ is the well-known $20\%$ pattern.

$$\dfrac{5}{25} \times 100\% = \dfrac{1}{5} \times 100\% = 20\% \;\Rightarrow\; \textbf{(E)}$$

💡 Recognizing $\tfrac{1}{5} = 20\%$ without long division is the Grade 6 percent-pattern shortcut.

[1] #7 3.MD.B.3 Read the five bar heights off the graph. Each bar's top reaches a horizontal gri

[2] #7 4.OA.A.3 Add the five bar heights to get the total number of students. Each student is co

[3] #5 6.RP.A.3 Write the percent of the class that chose $E$ as a fraction over the class total

[4] #5 6.RP.A.3 Simplify the fraction and convert. $\tfrac{5}{25} = \tfrac{1}{5}$, and $\tfrac{1

Review

Reasonableness: Sanity check by comparing $E$ to the rest. $E = 5$ students out of $25$ is one-fifth, and one-fifth of $100\%$ is $20\%$, which lands on (E). Also, $E$'s bar is shorter than $A$ and $B$ but taller than $D$, so $E$ should account for a middling slice of the class — well below $A$'s $\tfrac{6}{25} = 24\%$ and well above $D$'s $\tfrac{2}{25} = 8\%$. Twenty percent sits exactly in that window. Finally, the five percentages $24, 32, 16, 8, 20$ add to $100\%$, confirming the class total of $25$ is correct.

Alternative: Tool #6 (Guess and Check) on the choices: for each candidate $p$, the number of $E$-voters would be $25 \times p/100$. (A) $5\% \to 1.25$, (B) $12\% \to 3$, (C) $15\% \to 3.75$, (D) $16\% \to 4$, (E) $20\% \to 5$. Only (E) produces the bar height of $5$ students, so (E) is the answer.

CCSS standards used (min grade 6)

3.MD.B.3 Draw and interpret scaled picture graphs and bar graphs (Reading the five bar heights ($A = 6, B = 8, C = 4, D = 2, E = 5$) off the scaled bar graph.)
4.OA.A.3 Solve multistep word problems using the four operations (Adding the five bar heights $6 + 8 + 4 + 2 + 5 = 25$ to find the class total.)
6.RP.A.3 Use ratio and rate reasoning to solve real-world and mathematical problems, including percent problems (Forming the part-to-whole ratio $\tfrac{5}{25}$ and converting it to the percent $20\%$.)

⭐ Read each bar, add them for the class total, then write the $E$-share as a fraction and turn it into a percent — a Grade 6 part-to-whole move that turns an AMC 8 problem into one step of arithmetic.

Problem

Toolkit + CCSS Solution

Understand

Plan

Execute — Answer: E

Review

CCSS standards used (min grade 6)

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