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

we will pick new questions that match your level based on your Timer History

Track Your Progress

every week, we’ll send you an estimated GMAT score based on your performance

Practice Pays

we will pick new questions that match your level based on your Timer History

Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.

It appears that you are browsing the GMAT Club forum unregistered!

Signing up is free, quick, and confidential.
Join other 350,000 members and get the full benefits of GMAT Club

Registration gives you:

Tests

Take 11 tests and quizzes from GMAT Club and leading GMAT prep companies such as Manhattan GMAT,
Knewton, and others. All are free for GMAT Club members.

Applicant Stats

View detailed applicant stats such as GPA, GMAT score, work experience, location, application
status, and more

Books/Downloads

Download thousands of study notes,
question collections, GMAT Club’s
Grammar and Math books.
All are free!

Thank you for using the timer!
We noticed you are actually not timing your practice. Click the START button first next time you use the timer.
There are many benefits to timing your practice, including:

A scientist is studying bacteria whose cell population [#permalink]
01 Jul 2008, 13:32

1

This post was BOOKMARKED

00:00

A

B

C

D

E

Difficulty:

95% (hard)

Question Stats:

24% (02:32) correct
76% (01:49) wrong based on 74 sessions

A scientist is studying bacteria whose cell population doubles at constant intervals, at which times each cell in the population divides simultaneously. Four hours from now, immediately after the population doubles, the scientist will destroy the entire sample. How many cells will the population contain when the bacteria is destroyed?

(1) Since the population divided two hours ago, the population has quadrupled, increasing by 3,750 cells.

(2) The population will double to 40,000 cells with one hour remaining until the scientist destroys the sample.

given: population double every constant time interval. 1) population has quadrupled (double * double) in last two hours. => popuoation doubles every hr lets say original population was x then now it is x+3750 and 3x=3750 therefore current population = 3750*4/3 hence the current population is know at the time interval when it double is known=1hr therefore we can guess the population after 4hrs

2) if the population doubles 1 hr before the destruction then the constant time interval at which population increases is 3hr. so the next split would be after 6hrs.... but the destruction was to happen aftr 4hr??? there is a contradiction over here. and hence we should ignore point (2

1) number of bacteria two hours ago was 1,250 and interval c: c > 2/3 and c <=1 -> insufficient 2) bacteria doubles at 3 hours, the number is equal to 40,000 -> insufficient

1&2: since bacteria doubles 2 hours before 0 and 3 hours after 0 -> 5*c = integer -> c = integer/5

since 40,000/1,250 = 32 = 2^5 -> bacteria doubled 5 times in 5 hours -> c = 5 -> sufficient

Re: A scientist is studying bacteria whose cell population [#permalink]
19 Aug 2013, 11:19

Question mentions about events 2 hours ago, now, and 4 hours from now… So the total time we’ll consider here will be 6 hours

(1) Let population 2 hours ago be P.

Population increases by 3750 and becomes 4 times in last 2 hours. (But we don’t know exactly when it divided)

4P = P + 3750 P = 1250 And, 4P = 5000

This means the population after 2 hours have passed is 5000.

Can we find how much the population will be in next 4 hours? No we can’t; Because we don’t know whether the population doubles every 0.5 hours, 1 hours, 2 hours, etc.

Insufficient.

(2) With 1 hour remaining, it means it’s been 6 – 1 = 5 hours.

In 5 hours, the population is 40000.

Can we find how much the population will be in next 4 hours? No we can’t; Because we don’t know whether the population doubles every 0.5 hours, 1 hours, 2 hours, etc.

Insufficient.

Consider 1 and 2 together.

In 2 hours, population = 5000 ….. ….. In 5 hours, population = 40000

And we know that the population always doubles. It never becomes 1.2 or 1.5 times. It ALWAYS becomes 2 times.

Using this information, can we fill in the blanks above?

Yes we can,

In 2 hours, population = 5000 In 3 hours, population = 10000 In 4 hours, population = 20000 In 5 hours, population = 40000

This shows that the population doubles every 1 hour.

So in 6 hours (before the sample is destroyed), population will be 2 * 40000 = 80000.

Re: A scientist is studying bacteria whose cell population [#permalink]
19 Aug 2013, 17:20

A two hrs ago 1250 ....now 5000...as the ques says it doubles at constant time period.... if it has bcum 4 times in two hrs means it doubles every hour so aftr 4 hr 5000 *2^4+= 80,000- SUFFICIENT B only tells the number of cell after 3 hrs ....the rate at wich it doubles no info-insuffcient

Re: A scientist is studying bacteria whose cell population [#permalink]
19 Aug 2013, 17:26

ashishbakshi9 wrote:

Question mentions about events 2 hours ago, now, and 4 hours from now… So the total time we’ll consider here will be 6 hours

(1) Let population 2 hours ago be P.

Population increases by 3750 and becomes 4 times in last 2 hours. (But we don’t know exactly when it divided)

4P = P + 3750 P = 1250 And, 4P = 5000

This means the population after 2 hours have passed is 5000.

Can we find how much the population will be in next 4 hours? No we can’t; Because we don’t know whether the population doubles every 0.5 hours, 1 hours, 2 hours, etc.

Insufficient.

(2) With 1 hour remaining, it means it’s been 6 – 1 = 5 hours.

In 5 hours, the population is 40000.

Can we find how much the population will be in next 4 hours? No we can’t; Because we don’t know whether the population doubles every 0.5 hours, 1 hours, 2 hours, etc.

Insufficient.

Consider 1 and 2 together.

In 2 hours, population = 5000 ….. ….. In 5 hours, population = 40000

And we know that the population always doubles. It never becomes 1.2 or 1.5 times. It ALWAYS becomes 2 times.

Using this information, can we fill in the blanks above?

Yes we can,

In 2 hours, population = 5000 In 3 hours, population = 10000 In 4 hours, population = 20000 In 5 hours, population = 40000

This shows that the population doubles every 1 hour.

So in 6 hours (before the sample is destroyed), population will be 2 * 40000 = 80000.

Answer C

Isnt the first statement enough to tell us that the population

: Social ventures, both non-profits and for-profits, seek to better the world in such industries as education, microfinance, workforce development, public health and community development, among others. Organizations that...

Essay B for Stanford GSB will essentially ask you to explain why you’re doing what you’re doing. Namely, the essay wants to know, A) why you’re seeking...

Over the last week my Facebook wall has been flooded with most positive, almost euphoric emotions: “End of a fantastic school year”, “What a life-changing year it’s been”, “My...