AMC 8 · 2006 · #8
Grade 6 arithmeticProblem
The table shows some of the results of a survey by radiostation KACL. What percentage of the males surveyed listen to the station?
\begin{tabular}{|c|c|c|c|}\hline & Listen & Don't Listen & Total\\ \hline Males & ? & 26 & ?\\ \hline Females & 58 & ? & 96\\ \hline Total & 136 & 64 & 200\\ \hline\end{tabular}
Pick an answer.
Toolkit + CCSS Solution
Understand
Restated: A radio station survey is partly recorded in a two-way table. The grand total is $200$ people: $136$ listen and $64$ don't. The female row totals $96$, with $58$ listeners. The male "Don't Listen" cell is $26$. What percent of the males surveyed listen to the station?
Givens: Grand total: $200$ people surveyed; Total listeners: $136$; total non-listeners: $64$; Females: $58$ listen, total $96$; Males: $26$ don't listen; Answer choices: (A) $39$, (B) $48$, (C) $52$, (D) $55$, (E) $75$
Unknowns: The percentage of males surveyed who listen to the station
Understand
Restated: A radio station survey is partly recorded in a two-way table. The grand total is $200$ people: $136$ listen and $64$ don't. The female row totals $96$, with $58$ listeners. The male "Don't Listen" cell is $26$. What percent of the males surveyed listen to the station?
Givens: Grand total: $200$ people surveyed; Total listeners: $136$; total non-listeners: $64$; Females: $58$ listen, total $96$; Males: $26$ don't listen; Answer choices: (A) $39$, (B) $48$, (C) $52$, (D) $55$, (E) $75$
Plan
Primary tool: #2 Make an Organized List/Table
Secondary: #11 Find an Invariant
The problem is literally a partly filled table, so Tool #2 (Make an Organized List/Table) is the natural fit — copy the table and fill the blanks. The reason we can fill the blanks at all is Tool #11 (Find an Invariant): every row and every column has to add to its given total, and both row totals and column totals must sum to the same grand total of $200$. Those add-up rules are the invariants that pin down each missing cell with a single subtraction. Once the male row is complete, the requested percent is just (male listeners) $\div$ (male total) expressed out of $100$.
Execute — Answer: E
3.OA.D.8 Step 1 - Find the male total.
- The male row and the female row together make the grand total of $200$, and the female total is $96$.
- Subtract.
💡 Row totals must sum to the grand total. That is the invariant the table is built on.
3.OA.D.8 Step 2 - Find the male listeners.
- The male row now reads: listeners $+$ $26$ $=$ $104$.
- Subtract to get the missing cell.
💡 Within a row, the two cells add to the row total — fill the table one subtraction at a time.
6.RP.A.3 Step 3 - Convert the male listener fraction into a percent.
- The male row has $78$ listeners out of $104$ total males.
- Write this as a fraction and scale to a denominator of $100$.
💡 Simplify $\tfrac{78}{104}$ by dividing top and bottom by $26$ to get $\tfrac{3}{4}$, then read $\tfrac{3}{4}$ as $75$ per $100$.
6.RP.A.3 Step 4 Pick the answer choice that matches.
💡 $75\%$ matches choice (E) exactly.
3.OA.D.8 Find the male total. The male row and the female row together make the grand tot 3.OA.D.8 Find the male listeners. The male row now reads: listeners $+$ $26$ $=$ $104$. S 6.RP.A.3 Convert the male listener fraction into a percent. The male row has $78$ listene 6.RP.A.3 Pick the answer choice that matches. Review
Reasonableness: Cross-check by completing the rest of the table and seeing that every row and every column adds up. Female non-listeners $= 96 - 58 = 38$. Now check the columns: listeners $= 78 + 58 = 136$ (matches), non-listeners $= 26 + 38 = 64$ (matches). The grand total $104 + 96 = 200$ (matches). Every invariant holds, so the male listener count of $78$ is right, and $\tfrac{78}{104} = 75\%$ stands. A quick sanity look at the choices: only $26$ males don't listen out of $104$, which is a quarter, so listeners must be three-quarters — choices (A)-(D) all undershoot.
Alternative: Tool #9 (Try an Easier Problem): you don't need every cell. Just compute males total $= 200 - 96 = 104$, notice that male non-listeners $= 26$ is exactly a quarter of $104$, and conclude that male listeners are the other three quarters, i.e. $75\%$. This shortcut skips finding $78$ and goes straight from "$26$ is $\tfrac{1}{4}$ of $104$" to the answer.
CCSS standards used (min grade 6)
3.OA.D.8Solve two-step word problems using the four operations (Subtracting $200 - 96 = 104$ and $104 - 26 = 78$ to recover the missing row total and missing cell of the table.)6.RP.A.3Use ratio and rate reasoning to solve real-world and mathematical problems, including finding a percent of a quantity (Turning the ratio $\tfrac{78}{104}$ of male listeners to male total into the percent $75\%$.)
⭐ When a table has missing cells, lean on the rule that every row and column must add up to its total. Each missing number costs you one subtraction, and then a percent is just a fraction rewritten with denominator $100$.
⭐ When a table has missing cells, lean on the rule that every row and column must add up to its total. Each missing number costs you one subtraction, and then a percent is just a fraction rewritten with denominator $100$.
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