Forum Home > GMAT > Quantitative > Problem Solving (PS)
Events & Promotions
|
|
GMAT Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.
Customized
for You
Track
Your Progress
Practice
Pays
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Dec 1310:00 AM EST
-12:00 PM EST
Have you ever wondered how to score a PERFECT 805 on the GMAT? Meet Julia, a banking professional who used the Target Test Prep course to achieve this incredible feat. Julia's story is nothing short of an inspiration.
Dec 1410:00 AM EST
-12:00 PM EST
Think a 100% GMAT Verbal score is out of your reach? Target Test Prep will make you think again! Our course uses techniques such as topical study and spaced repetition to maximize knowledge retention and make studying simple and fun.
Dec 1411:00 AM IST
-01:00 PM IST
Attend this session to learn how to Deconstruct arguments, Pre-Think Author’s Assumptions, and apply Negation Test.- Dec 15
11:00 AM IST
-01:00 PM IST
Attend this free GMAT Algebra Webinar and learn how to master the most challenging Inequalities and Absolute Value problems with ease. 
Dec 1608:00 AM PST
-11:59 PM PST
GMAT Club 12 Days of Christmas is a 4th Annual GMAT Club Winter Competition based on solving questions. This is the Winter GMAT competition on GMAT Club with an amazing opportunity to win over $40,000 worth of prizes!
27 Apr 2015, 04:33
Kudos
Bookmarks
B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
61% (02:46) correct
39%
(02:35)
wrong
based on 292
sessions
History
Date
Time
Result
Not Attempted Yet
A particular gymnastics tournament awards a gold, a silver, and a bronze medal in each of four events: Floor, Beam, Bars, and Vault. A platinum Best All-Around medal is awarded to the competitor who gains the most points from winning the other medals: 3 points for gold, 2 points for silver, 1 point for bronze. If McKenzie won the Best All-Around medal, and no one can win more than one medal in any of the four events, did she win at least one gold medal?
(1) All of the gold, silver, and bronze medals were won by fewer than six competitors, including McKenzie
(2) Another competitor in the tournament has 8 points.
Kudos for a correct solution.
(1) All of the gold, silver, and bronze medals were won by fewer than six competitors, including McKenzie
(2) Another competitor in the tournament has 8 points.
Kudos for a correct solution.
27 Apr 2015, 07:24
Kudos
Bookmarks
Bunuel
A particular gymnastics tournament awards a gold, a silver, and a bronze medal in each of four events: Floor, Beam, Bars, and Vault. A platinum Best All-Around medal is awarded to the competitor who gains the most points from winning the other medals: 3 points for gold, 2 points for silver, 1 point for bronze. If McKenzie won the Best All-Around medal, and no one can win more than one medal in any of the four events, did she win at least one gold medal?
(1) All of the gold, silver, and bronze medals were won by fewer than six competitors, including McKenzie
(2) Another competitor in the tournament has 8 points.
Kudos for a correct solution.
(1) All of the gold, silver, and bronze medals were won by fewer than six competitors, including McKenzie
(2) Another competitor in the tournament has 8 points.
Kudos for a correct solution.
1) McKenzie can have 4 silver medals and other 4 competitor gold + bronze medal. So McKenzie = 8 scores and other = 4 scores.
or maybe McKenzie has 1 gold and 3 silver medals. Insufficient
2) If another competitor has 8 points than we can infer that this sompetitor has 4 silver medals and McKenzie should have at least 3 gold medals = 9 scores.
Sufficient
Answer is B
27 Apr 2015, 07:39
Kudos
Bookmarks
Total medals - 12, total points - 24, every person can get between 1 and 12 points
#1 - McKenzie + 4 or less competitors (c1, c2, c3, c4)
Lets try to pick some numbers: say, McKenzie got 8 points (4 silver), if we come up with a combination of points for others so McKenzie is still a winner, the statement will be insufficient. Lets do it: say, other 4 competitors won 1 gold and 1 bronze each (4 points each) which easily keeps McKenzie a winner, thus insufficient
#2 - 8 points is max u can get w/o earning a gold medal. If McKenzie was a winner, she must've had more than 8 thus must've got a gold medal, sufficient.
B that is
#1 - McKenzie + 4 or less competitors (c1, c2, c3, c4)
Lets try to pick some numbers: say, McKenzie got 8 points (4 silver), if we come up with a combination of points for others so McKenzie is still a winner, the statement will be insufficient. Lets do it: say, other 4 competitors won 1 gold and 1 bronze each (4 points each) which easily keeps McKenzie a winner, thus insufficient
#2 - 8 points is max u can get w/o earning a gold medal. If McKenzie was a winner, she must've had more than 8 thus must've got a gold medal, sufficient.
B that is
