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AMC 8 · 2013 · #4

Easy mode Grade 5
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Problem

Eight friends had dinner together. They agreed to split the total bill into 88 equal parts.

But Judi forgot her money. So the other 77 friends covered her share. Each of those 77 friends paid an extra $2.50\$2.50 on top of their own equal share.

What was the total bill?

Pick an answer.

(A)
$\text{ extdollar}120$
(B)
$\text{ extdollar}128$
(C)
$\text{ extdollar}140$
(D)
$\text{ extdollar}144$
(E)
$\text{ extdollar}160$
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Toolkit + CCSS Solution

Understand

Restated: Eight friends split a restaurant bill into $8$ equal shares. Judi forgot her money, so the other $7$ friends covered Judi's share by each paying an extra $\$2.50$ on top of their own share. Find the total bill.

Givens: There are $8$ friends in total, and the bill is split into $8$ equal shares; Judi pays nothing; the remaining $7$ friends cover her share; Each of those $7$ friends pays an extra $\$2.50$ beyond their own share; Answer choices: (A) $\$120$, (B) $\$128$, (C) $\$140$, (D) $\$144$, (E) $\$160$

Unknowns: The total bill in dollars

Understand

Restated: Eight friends split a restaurant bill into $8$ equal shares. Judi forgot her money, so the other $7$ friends covered Judi's share by each paying an extra $\$2.50$ on top of their own share. Find the total bill.

Givens: There are $8$ friends in total, and the bill is split into $8$ equal shares; Judi pays nothing; the remaining $7$ friends cover her share; Each of those $7$ friends pays an extra $\$2.50$ beyond their own share; Answer choices: (A) $\$120$, (B) $\$128$, (C) $\$140$, (D) $\$144$, (E) $\$160$

Plan

Primary tool: #7 Identify Subproblems

Secondary: #6 Guess and Check

The bill is hidden behind two layers, so Tool #7 (Identify Subproblems) splits the work cleanly. Subproblem A: the $7$ extra payments of $\$2.50$ together fill in Judi's one missing share, so we can find one person's share. Subproblem B: once we know one share, the total bill is just $8$ shares. Tool #6 (Guess and Check) is a good backup: with only five answer choices, we can divide each by $8$ and see which one makes Judi's share equal $7 \times \$2.50 = \$17.50$.

Execute — Answer: C

#7 Identify Subproblems 3.OA.A.3 Step 1
  • Subproblem A — find Judi's share.
  • The $7$ friends each chip in $\$2.50$ extra, and those extras together must equal exactly one share (Judi's). So Judi's share is $7 \times \$2.50$.
$7 \times \$2.50 = \$17.50$

💡 Equal-groups multiplication: $7$ groups of $\$2.50$ — a Grade 3 multiplication word-problem idea.

#7 Identify Subproblems 3.OA.A.3 Step 2
  • Because every share is equal, Judi's share is the same as each person's share.
  • So one share is $\$17.50$.
$\text{one share} = \$17.50$

💡 "Equal shares" means we can use Judi's share as the size of any share.

#7 Identify Subproblems 5.NBT.B.7 Step 3
  • Subproblem B — scale up to the total bill.
  • The bill is $8$ equal shares, so multiply one share by $8$.
$8 \times \$17.50 = 8 \times 17 + 8 \times 0.5 = 136 + 4 = \$140$

💡 Breaking $17.50$ into $17 + 0.5$ keeps the decimal multiplication friendly — Grade 5 decimals.

#7 Identify Subproblems 5.NBT.B.7 Step 4

Match $\$140$ to the answer choices.

$\$140 \;\Rightarrow\; \textbf{(C)}$

💡 Final value matches choice (C).

[1] #7 3.OA.A.3 Subproblem A — find Judi's share. The $7$ friends each chip in $\$2.50$ extra, a
[2] #7 3.OA.A.3 Because every share is equal, Judi's share is the same as each person's share. S
[3] #7 5.NBT.B.7 Subproblem B — scale up to the total bill. The bill is $8$ equal shares, so mult
[4] #7 5.NBT.B.7 Match $\$140$ to the answer choices.

Review

Reasonableness: Sanity check the extras. With a $\$140$ bill split $8$ ways, each share is $\$140 \div 8 = \$17.50$. If $7$ friends absorb Judi's $\$17.50$, each pays an extra $\$17.50 \div 7 = \$2.50$ — exactly what the problem says. Numbers loop back consistently, and $\$140$ is a reasonable restaurant tab for $8$ people (about $\$17.50$ each).

Alternative: Tool #6 (Guess and Check) on the choices: divide each by $8$ to get one share, then multiply that share by $7$, and see which choice makes the result $7 \times \$2.50 = \$17.50$ short of itself by exactly one share. (A) $\$120 / 8 = \$15$, extras would be $\$15 / 7 \approx \$2.14$. (B) $\$128 / 8 = \$16$, extras $\approx \$2.29$. (C) $\$140 / 8 = \$17.50$, extras $= \$2.50$ ✓. (D) $\$144 / 8 = \$18$, extras $\approx \$2.57$. (E) $\$160 / 8 = \$20$, extras $\approx \$2.86$. Only (C) matches.

CCSS standards used (min grade 5)

  • 3.OA.A.3 Use multiplication and division within 100 to solve word problems involving equal groups (Computing Judi's share as $7$ equal groups of $\$2.50$: $7 \times \$2.50 = \$17.50$, and recognizing all $8$ shares are equal.)
  • 5.NBT.B.7 Add, subtract, multiply, and divide decimals to hundredths (Multiplying $8 \times \$17.50 = \$140$ (and the alternative-approach divisions of each choice by $8$).)

⭐ Once you see that the $7$ extra payments add up to exactly Judi's one share, the rest is just Grade 5 decimal multiplication: $8$ shares of $\$17.50$ make $\$140$.

⭐ Once you see that the $7$ extra payments add up to exactly Judi's one share, the rest is just Grade 5 decimal multiplication: $8$ shares of $\$17.50$ make $\$140$.

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