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.
Apr 2301:30 AM EDT
-02:30 AM EDT
Struggling with GMAT Verbal as a non-native speaker? Harsh improved his score from 595 to 695 in just 45 days—and scored a 99 %ile in Verbal (V88)! Learn how smart strategy, clarity, and guided prep helped him gain 100 points.
Apr 2308:00 PM PDT
-09:00 PM PDT
Video explanations + diagnosis of 10 weakest areas + 150+ short videos + study plan!
Apr 2212:30 AM EDT
-01:30 AM EDT
At one point, she believed GMAT wasn’t for her. After scoring 595, self-doubt crept in and she questioned her potential. But instead of quitting, she made the right strategic changes. The result? A remarkable comeback to 695. Check out how Saakshi did it.
Apr 2610:00 AM EDT
-11:00 AM EDT
The Target Test Prep course represents a quantum leap forward in GMAT preparation, a radical reinterpretation of the way that students should study. Try before you buy with a 5-day, full-access trial of the course for FREE!
Apr 2711:00 AM EDT
-12:00 PM EDT
Prefer video-based learning? The Target Test Prep OnDemand course is a one-of-a-kind video masterclass featuring 400 hours of lecture-style teaching by Scott Woodbury-Stewart, founder of Target Test Prep and one of the most accomplished GMAT instructors
Apr 2808:00 AM PDT
-11:00 AM PDT
Whether you are just beginning your MBA journey or fine-tuning your path to a 700+ score, GMAT Day is designed to give you a competitive edge.
A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
54% (02:38) correct
46%
(02:41)
wrong
based on 3614
sessions
History
Date
Time
Result
Not Attempted Yet
A certain musical scale has has 13 notes, each having a different frequency, measured in cycles per second. In the scale, the notes are ordered by increasing frequency, and the highest frequency is twice the lowest. For each of the 12 lower frequencies, the ratio of a frequency to the next higher frequency is a fixed constant. If the lowest frequency is 440 cycles per second, then the frequency of the 7th note in the scale is how many cycles per second?
A. \(440 * \sqrt 2\)
B. \(440 * \sqrt {2^7}\)
C. \(440 * \sqrt {2^{12}}\)
D. \(440 * \sqrt[12]{2^7}\)
E. \(440 * \sqrt[7]{2^{12}}\)
A. \(440 * \sqrt 2\)
B. \(440 * \sqrt {2^7}\)
C. \(440 * \sqrt {2^{12}}\)
D. \(440 * \sqrt[12]{2^7}\)
E. \(440 * \sqrt[7]{2^{12}}\)
13 Jul 2013, 00:38
Kudos
Bookmarks
A certain musical scale has has 13 notes, each having a different frequency, measured in cycles per second. In the scale, the notes are ordered by increasing frequency, and the highest frequency is twice the lowest. For each of the 12 lower frequencies, the ratio of a frequency to the next higher frequency is a fixed constant. If the lowest frequency is 440 cycles per second, then the frequency of the 7th note in the scale is how many cycles per second?
A. \(440 * \sqrt 2\)
B. \(440 * \sqrt {2^7}\)
C. \(440 * \sqrt {2^{12}}\)
D. \(440 * \sqrt[12]{2^7}\)
E. \(440 * \sqrt[7]{2^{12}}\)
Say the notes are:
We are told that "for each of the 12 lower frequencies, the ratio of a frequency to the next higher frequency is a fixed constant". So the ratio of 12th lowest frequency (\(n_{12}\)) to the next higher frequency (which would be \(n_{13}\)) is constant. Basically we are told that:
We have a geometric progression with the first, the lowest term (\(n_1\)) equal to 440:
The stem also says that "the highest frequency is twice the lowest":
The question asks to find the value of \(n_7\):
Answer: A.
Hope it's clear.
A. \(440 * \sqrt 2\)
B. \(440 * \sqrt {2^7}\)
C. \(440 * \sqrt {2^{12}}\)
D. \(440 * \sqrt[12]{2^7}\)
E. \(440 * \sqrt[7]{2^{12}}\)
Say the notes are:
- \(n_1, \ n_2, \ n_3, \ ..., \ n_{12}, n_{13}\)
We are told that "for each of the 12 lower frequencies, the ratio of a frequency to the next higher frequency is a fixed constant". So the ratio of 12th lowest frequency (\(n_{12}\)) to the next higher frequency (which would be \(n_{13}\)) is constant. Basically we are told that:
- \(\frac{n_1}{n_2}= \frac{n_2}{n_3}= \frac{n_3}{n_4}=...=\frac{n_{12}}{n_{13}}=constant\) (notice that this perfectly follows info given in the stem: "for each of the 12 lower frequencies, the ratio of a frequency to the next higher frequency is a fixed constant").
We have a geometric progression with the first, the lowest term (\(n_1\)) equal to 440:
- \(n_1=440\);
\(n_2=440k\);
\(n_3=440k^2\);
...
\(n_7=440k^6\);
...
\(n_{13}=440k^{12}\)
The stem also says that "the highest frequency is twice the lowest":
- \(n_{13}=2*n_1\)
\(440k^{12}=2*440\)
\(k^{12}=2\);
\(k=\sqrt[12]{2}\).
The question asks to find the value of \(n_7\):
- \(n_7=440k^6=440(\sqrt[12]{2})^6=440\sqrt{2}\).
Answer: A.
Hope it's clear.
23 Nov 2004, 17:52
Kudos
Bookmarks
A quick gut check on this problem is that every choice but A is way more than 880. Logically the 7th note must have a smaller value(the problem also states 'lower' frequency) than than the 13th. If crunched for time, good guess would be A.
