## Search found 404 matches

##### Re: If x < y and y < 10, what is the greatest possible integer value of x + y?

Easy to make the assumption that since the question is seeking an integer value that the individual values must also be integers, but that is not stated as a limitation. So the goal is to maximize both X and Y to maximize their sum. Clearly each can be >9 and every amount below 10 that Y is must be ...

- by regor60

Tue May 10, 2022 1:37 pm- Forum: Problem Solving
- Topic: If x < y and y < 10, what is the greatest possible integer value of x + y?
- Replies:
**1** - Views:
**179**

#### At a local office, each trainee can stuff 2/3 as many envelopes per day as a full time worker. If there are 2525 as

###### Problem Solving

##### Re: At a local office, each trainee can stuff 2/3 as many envelopes per day as a full time worker. If there are 2525 as

Question appears to be transcribed incorrectly since the correct answer isn't among the choices

- by regor60

Thu May 05, 2022 12:31 pm- Forum: Problem Solving
- Topic: At a local office, each trainee can stuff 2/3 as many envelopes per day as a full time worker. If there are 2525 as
- Replies:
**1** - Views:
**138**

#### If Enid and Topanga each roll a single ten-sided die (which has sides numbered 1 through 10), what is the probability

###### Problem Solving

##### Re: If Enid and Topanga each roll a single ten-sided die (which has sides numbered 1 through 10), what is the probabilit

Don't forget ties.

The odds of a tie are one rolls a number and the other has 1/10 chance of matching, so

1/10 chance of tie

This leaves 9/10 chance to roll different numbers.

Half the time a given person will roll higher than the other, so

1/2*9/10 = [spoiler]9/20, B[/spoiler]

- by regor60

Wed Apr 06, 2022 11:32 am- Forum: Problem Solving
- Topic: If Enid and Topanga each roll a single ten-sided die (which has sides numbered 1 through 10), what is the probability
- Replies:
**1** - Views:
**286**

#### On each of the first three days of the month, Danny ate twice the number of apples he had eaten the day before. The rati

###### Problem Solving

##### Re: On each of the first three days of the month, Danny ate twice the number of apples he had eaten the day before. The

Let X equal the number of apples eaten on the first day. So the second day he ate 2X apples and the third day 4X. Let the number of apples he ate on the 4th day equal Y. The ratio of the number of apples eaten on the third day to the number eaten on the 4th day is then: 4X/Y = 3/5 Y is then equal to...

- by regor60

Tue Mar 29, 2022 10:32 am- Forum: Problem Solving
- Topic: On each of the first three days of the month, Danny ate twice the number of apples he had eaten the day before. The rati
- Replies:
**1** - Views:
**351**

#### \(n\) is a positive integer, and \(k\) is the product of all integers from \(1\) to \(n\) inclusive. If \(k\) is a multi

###### Problem Solving

##### Re: \(n\) is a positive integer, and \(k\) is the product of all integers from \(1\) to \(n\) inclusive. If \(k\) is a m

\(n\) is a positive integer, and \(k\) is the product of all integers from \(1\) to \(n\) inclusive. If \(k\) is a multiple of \(1440,\) then the smallest possible value of \(n\) is A. 8 B. 12 C. 16 D. 18 E. 24 Answer: A Source: Magoosh The problem is saying that K=N! The smallest multiple of 1440 ...

- by regor60

Sun Mar 20, 2022 12:09 pm- Forum: Problem Solving
- Topic: \(n\) is a positive integer, and \(k\) is the product of all integers from \(1\) to \(n\) inclusive. If \(k\) is a multi
- Replies:
**1** - Views:
**437**

#### A college admissions officer predicts that 20 of the students who are accepted willl not attend the college. According

###### Problem Solving

##### Re: A college admissions officer predicts that 20 of the students who are accepted willl not attend the college. Accordi

If 20% of those accepted don't enroll, then 100%-20% = 80% of those accepted actually enroll. Setting A = accepted students and X = enrolled students, the above is: (80/100)* A = X With the goal of enrolling X students, the number of students needing to be accepted is A= X*(100/80) = X * (5/4) = 1.2...

- by regor60

Sun Mar 20, 2022 5:49 am- Forum: Problem Solving
- Topic: A college admissions officer predicts that 20 of the students who are accepted willl not attend the college. According
- Replies:
**2** - Views:
**311**

#### If a six sided die is rolled three times, what is the probability of getting at least one even number and at least one

###### Problem Solving

##### Re: If a six sided die is rolled three times, what is the probability of getting at least one even number and at least o

If a six sided die is rolled three times, what is the probability of getting at least one even number and at least one odd number? A. 1/8 B. 1/4 C. 1/2 D. 3/4 E. 7/8 OA D Source: Princeton Review Satisfying the requirement would mean the following possible outcomes without regard to order: OOE OR E...

- by regor60

Fri Mar 18, 2022 4:18 am- Forum: Problem Solving
- Topic: If a six sided die is rolled three times, what is the probability of getting at least one even number and at least one
- Replies:
**1** - Views:
**320**

#### Two equally sized jugs full of water are each emptied into two separate unequally sized empty jugs, X and Y.

###### Problem Solving

##### Re: Two equally sized jugs full of water are each emptied into two separate unequally sized empty jugs, X and Y.

Set the volumes of the equal jugs = A

So A= X/5 and 2Y/3. So Y= 3X/10

To fill Y from X requires Y-2Y/3 or Y/3 additional water.

Y/3 = (3X/10)/3 = X/10

Water remaining in X after this is poured into Y is then

X/5 - X/10 = [spoiler]X/10, D[/spoiler]

- by regor60

Thu Mar 17, 2022 11:14 am- Forum: Problem Solving
- Topic: Two equally sized jugs full of water are each emptied into two separate unequally sized empty jugs, X and Y.
- Replies:
**1** - Views:
**244**

#### Victor's job requires him to complete a series of identical jobs. If Victor is supervised at work, he finishes each job

###### Problem Solving

##### Re: Victor's job requires him to complete a series of identical jobs. If Victor is supervised at work, he finishes each

This problem seems to be transcribed incorrectly, with the given answer being correct only if 3 "saved" represents hours, not days, as stated

- by regor60

Sat Mar 05, 2022 11:48 am- Forum: Problem Solving
- Topic: Victor's job requires him to complete a series of identical jobs. If Victor is supervised at work, he finishes each job
- Replies:
**1** - Views:
**257**

##### Re: Which of the following fractions is closest to \(\dfrac12?\)

Looking at the answer choices, each of A, B ,C and D are 1/2 point away in the numerator from making the division equal to 1/2. So, A, B and C can be eliminated because with their lower denominators compared to D, the 1/2 point difference in the numerator will render them farther away from 1/2 than ...

- by regor60

Sun Feb 27, 2022 6:11 am- Forum: Problem Solving
- Topic: Which of the following fractions is closest to \(\dfrac12?\)
- Replies:
**2** - Views:
**291**

#### The mean of twenty-five consecutive positive integers numbers is what percent of the total?

###### Problem Solving

##### Re: The mean of twenty-five consecutive positive integers numbers is what percent of the total?

Call the sum of the 25 integers S.

So the mean of the integers is:

S/25

The mean is what percent of S ?

(S/25)/S = 1/25 = 4/100 =[spoiler]4%,A[/spoiler]

- by regor60

Fri Feb 25, 2022 3:56 pm- Forum: Problem Solving
- Topic: The mean of twenty-five consecutive positive integers numbers is what percent of the total?
- Replies:
**2** - Views:
**276**

#### Taylor is making a bracelet. He Starts with 4 blue knots, 6 red knots, and 2 yellow knots, in that order, and repeats

###### Problem Solving

##### Re: Taylor is making a bracelet. He Starts with 4 blue knots, 6 red knots, and 2 yellow knots, in that order, and repeat

There are 12 knots in each complete series of knots. So, if the last knot is yellow, the total number of knots could be a multiple of 12. However, the last knot being yellow could also mean that the last series contains 11 knots with 1 yellow, if the total number of available yellow knots is not a m...

- by regor60

Fri Feb 25, 2022 12:19 pm- Forum: Problem Solving
- Topic: Taylor is making a bracelet. He Starts with 4 blue knots, 6 red knots, and 2 yellow knots, in that order, and repeats
- Replies:
**1** - Views:
**198**

##### Re: How many roots does the equation \(\sqrt{x^2+1}+\sqrt{x^2+2}=2\) have?

The X^2 inside the radicals means the left side is always increasing with increasing X and symmetrical around the Y axis, which also means that the left side -2 is always increasing. If the Y intercept is 0 or greater, then the curve doesn't intercept the X axis since the curve would be entirely abo...

- by regor60

Wed Feb 23, 2022 5:35 am- Forum: Problem Solving
- Topic: How many roots does the equation \(\sqrt{x^2+1}+\sqrt{x^2+2}=2\) have?
- Replies:
**1** - Views:
**152**

#### If \(x^{a+3}=y^{b+2},\) where \(x\) and \(y\) are distinct prime numbers, what is the value of \(ab?\)

###### Problem Solving

##### Re: If \(x^{a+3}=y^{b+2},\) where \(x\) and \(y\) are distinct prime numbers, what is the value of \(ab?\)

A prime number raised to a power has only that prime number and powers of that number as factors, except when that power is 0, in which case any prime number raised to that power equals 1.

So X^(a+3)=1=Y^(b+2)

a+3= 0=b+2

a=-3 and b=-2

ab=6,D

- by regor60

Sun Feb 13, 2022 10:15 am- Forum: Problem Solving
- Topic: If \(x^{a+3}=y^{b+2},\) where \(x\) and \(y\) are distinct prime numbers, what is the value of \(ab?\)
- Replies:
**1** - Views:
**219**

##### Re: If \(3^x+3^x+3^x=1,\) what is \(x?\)

If 3 of the same thing add to 1, then each thing must be 1/3, meaning X=-1,A

- by regor60

Sun Feb 13, 2022 9:59 am- Forum: Problem Solving
- Topic: If \(3^x+3^x+3^x=1,\) what is \(x?\)
- Replies:
**1** - Views:
**189**