Difference between revisions of "2023 AMC 12B Problems/Problem 18"

m (Video Solution)
m (Solution 2)
Line 36: Line 36:
 
Answer choice D is satisfied by <math>(y_1,y_2,z_1,z_2) = (7,5,5,7)</math>.
 
Answer choice D is satisfied by <math>(y_1,y_2,z_1,z_2) = (7,5,5,7)</math>.
  
Therefore the answer is <math>\boxed{(\text{A})}</math>.
+
Therefore the answer is <math>\boxed{\textbf{(A)}~\text{Yolanda's quiz average for the academic year was 22 points higher than Zelda's.}}</math>
  
 
~cantalon
 
~cantalon

Revision as of 08:51, 4 December 2023

Problem

Last academic year Yolanda and Zelda took different courses that did not necessarily administer the same number of quizzes during each of the two semesters. Yolanda's average on all the quizzes she took during the first semester was $3$ points higher than Zelda's average on all the quizzes she took during the first semester. Yolanda's average on all the quizzes she took during the second semester was $18$ points higher than her average for the first semester and was again $3$ points higher than Zelda's average on all the quizzes Zelda took during her second semester. Which one of the following statements cannot possibly be true?

$\textbf{(A)}$ Yolanda's quiz average for the academic year was $22$ points higher than Zelda's.

$\textbf{(B)}$ Zelda's quiz average for the academic year was higher than Yolanda's.

$\textbf{(C)}$ Yolanda's quiz average for the academic year was $3$ points higher than Zelda's.

$\textbf{(D)}$ Zelda's quiz average for the academic year equaled Yolanda's.

$\textbf{(E)}$ If Zelda had scored $3$ points higher on each quiz she took, then she would have had the same average for the academic year as Yolanda.

Solution 1

Denote by $A_i$ the average of person with initial $A$ in semester $i \in \left\{1, 2 \right\}$ Thus, $Y_1 = Z_1 + 3$, $Y_2 = Y_1 + 18$, $Y_2 = Z_2 + 3$.

Denote by $A_{12}$ the average of person with initial $A$ in the full year. Thus, $Y_{12}$ can be any number in $\left( Y_1 , Y_2 \right)$ and $Z_{12}$ can be any number in $\left( Z_1 , Z_2 \right)$.

Therefore, the impossible solution is $\boxed{\textbf{(A)}~\text{Yolanda's quiz average for the academic year was 22 points higher than Zelda's.}}$

~Steven Chen (Professor Chen Education Palace, www.professorchenedu.com)

Solution 2

We can use process of elimination by finding possible solutions to answer choices. Let $y_1$ and $y_2$ be the number of quizzes Yolanda took in the first and second semesters, respectively. Define $z_1$ and $z_2$ similarly for Zelda.

Answer choice B is satisfied by $(y_1,y_2,z_1,z_2) = (289,1,1,289)$.

Answer choice C and E are both satisfied by $(y_1,y_2,z_1,z_2) = (17,17,17,17)$.

Answer choice D is satisfied by $(y_1,y_2,z_1,z_2) = (7,5,5,7)$.

Therefore the answer is $\boxed{\textbf{(A)}~\text{Yolanda's quiz average for the academic year was 22 points higher than Zelda's.}}$

~cantalon

Solution 3 (Algebra)

Let Yolanda's average for semester $1$ be $y_1$, the number of quizzes Yolanda took in semester $1$ be $n_1$, Zelda's average for semester $1$ be $z_1$, the number of quizzes Zelda took in semester $1$ be $k_1$, Yolanda's average for semester $2$ be $y_2$, the number of quizzes Yolanda took in semester $2$ be $n_2$, Zelda's average for semester $2$ be $z_2$, the number of quizzes Zelda took in semester $2$ be $k_2$, Yolanda's average for the entire year be $y$, Zelda's average for the entire year be $z$.

From the problem we know that

\[y_1 = z_1 + 3, \quad y_2 = z_2 + 3\]

\[y_2 = y_1 + 18, \quad z_2 = z_1 + 18\]

\[y = \frac{ y_1 n_1 + y_2 n_2 }{ n_1 + n_2} = \frac{ y_1 n_1 + (y_1 + 18) n_2 }{ n_1 + n_2} = y_1 + \frac{18 y_2 }{ n_1 + n_2}\]

\[z = \frac{ z_1 k_1 + z_2 k_2 }{ k_1 + k_2} = \frac{ z_1 k_1 + (z_1 + 18) k_2 }{ k_1 + k_2} = z_1 = \frac{ 18 k_2 }{ k_1 + k_2}\]

\[y - z = y_1 + \frac{18 y_2 }{ n_1 + n_2} - z_1  - \frac{ 18 k_2 }{ k_1 + k_2} = y_1 - z_1 + 18 \left( \frac{y_2 }{ n_1 + n_2} - \frac{k_2 }{ k_1 + k_2} \right) = 3 + 18 \left( \frac{y_2 }{ n_1 + n_2} - \frac{k_2 }{ k_1 + k_2} \right)\]

$\frac{y_2 }{ n_1 + n_2}$ at most is $1$, $\frac{k_2 }{ k_1 + k_2}$ is at least $0$, meaning that $\frac{y_2 }{ n_1 + n_2} - \frac{k_2 }{ k_1 + k_2}$ is at most $1$.

Therefore, \[y - z \le 3 + 18 = 21\]

Hence, $\boxed{\textbf{(A)}~\text{Yolanda's quiz average for the academic year was 22 points higher than Zelda's}}$ is not possible.

~isabelchen

Video Solution 1 by OmegaLearn

https://youtu.be/BlJ-ArZ6JEw

Video Solution 2

https://youtu.be/A9ywJSZgD6c

~Steven Chen (Professor Chen Education Palace, www.professorchenedu.com)

See Also

2023 AMC 12B (ProblemsAnswer KeyResources)
Preceded by
Problem 17
Followed by
Problem 19
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
All AMC 12 Problems and Solutions

The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. AMC logo.png