A certain store sells only jacks and marbles. A single jack costs 19

Hi

j - # of jacks, m - # of marbles

0.19j + 0.25m = 10

19j + 25m = 1000

19j = 1000 - 25m

m = 40 - 19n

j = 25n

where n is integer >=0, because we are not told that at lest one of each needs to be bought.

Hence only possible options fo n are 0, 1 and 2.

Answer D.

Hi, can you please explain how you got these two equations:

m = 40 - 19n

j = 25n

Hi

19j = 1000 - 25m

19j = 25(40 - m)

j is a multiple of 25 and (40 - m) is a multiple of 19 -----> j=25n and 40 - m = 19n or m = 40 - 19n

starting from n=3 our expression 40 - 19n < 0, hence we have only 3 possibilities for n = 0, 1 and 2.

Hope this helps

Regards

Hi,

The equation is 19x+25y=1000...
Since 25y and 1000 are multiple of 25, 19x is also multiple of 25..
What all values can 19x or 19*25*z take..
Z can be 0,1 or 2.. so THREE values..
When z=3, 19*25*3>1000..

D

19x+25y=1000

We need multiples of 25 since 19 does not divide evenly into 1000 ($10).

One obvious choice is x=0.

The LCM of 19 and 25 is 475. So 19*25=475 which means in this instance y=21 (19(25)+25(21)=1000). So x can be 25 to complete the equation.

Now 19*25*2=950 is another multiple of 25 that is less than 1000.

So x can be 0, 1 or 2 since 19*25*3=1475 which is more than the $10 spent at the store.

D.

I do know that these type of problems can be solved by interchanging the constant values of a equation. Also, because of value of marbles 25 cents i got - C - 2 as the answer but the answer is D - 3. I wasted a lot of time on this question still got it wrong. Can someone suggest a simpler or straight forward method to solve this and these types of questions?
Thanks

Hi,

I usually solve these questions as per following approach:

We are given 19j+25m=1000.

I can write this equation as:

m = \(1000/25\) - \(19j/25\)

Now the number of Jacks and marbles must be integral. So, we can substitute values for j to get m as a non negative integer.(Note: I am including 0 also here.)

Only 3 values of j will work here. ( j=0,25 and 50) for which we will get (m = 40, 21 and 2 respectively.).

I hope it is clear now. It won't take more than 30 secs of your time to solve these question.

Check: https://anaprep.com/algebra-integer-sol ... variables/

Hi manishtank1988,

From the answer choices, we know that there cannot be that many ways to get a total of $10.00 when adding a multiple of $0.19 and a multiple of $0.25....

A multiple of $0.25 will always end in one of the following.... .00, .25, .50 or .75... so we really just need to determine in how many ways the $0.19 ends in a 'compliment' (re: .75, .50, .25 or .00) to that number so that the total = $10.00.

To end in a 0 or a 5, we need to multiply $0.19 by a multiple of 5)....

($0.19)(0) = $0... so the 'complement' would be ($0.25)(40). This IS an option.
($0.19)(5) = $0.95... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
($0.19)(10) = $1.90... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
($0.19)(15) = $2.85... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.

At this point, you should notice that we're just adding $0.95 to the prior sum, so doing lots of multiplication is NOT necessary....

$3.80... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$4.75... so the 'complement' would be ($0.25)(21). This IS an option.
$5.70... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$6.65... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$7.60... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$8.55... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$9.50... so the 'complement' would be ($0.25)(2). This IS an option.

Total options = 3

Final Answer:

GMAT assassins aren't born, they're made,
Rich

Official solution from Veritas Prep.

We can translate this problem algebraically as 0.19j + 0.25m = 10.00. To get rid of the decimals, multiply through by 100 and we’ll be working with the equation 19j + 25m = 1000. Note also that j and m must both be non-negative integers.

We’re now dealing with something known as a Linear Diophantine Equation. That may sound intimidating, but it’s really just an equation of the form Ax + By = C in which A, B, C, x, and y are all integers. What makes Diophantine Equations interesting (aside from the fact that they pop up from time to time on the GMAT) is that such integer-valued equations can sometimes allow you to solve for more variables than you have equations. That is, you might be able to solve for both x and y using only a single equation, because of the non-negative integer restriction implicit in the idea of jacks and marbles.

Furthermore, if such an equation has multiple solutions, there is an easy and important relationship among all of the different solutions to the equation. Specifically, the key is to look at common multiples of the constants A and B (in this case A = 19 and B = 25). It turns out that each possible solution can produce all other solutions by exchanging items whose total values are common multiples of those constants. In other words, the LCM of 19 and 25 – two numbers that share no common factors besides 1 – is simply 19 * 25 = 475, so $4.75 worth of items can be produced by taking either 25 of the 19-cent jacks or else 19 of the 25-cent marbles. And once an initial solution is identified, we can produce all other solutions by swapping out jacks for marbles in these increments.

At this point it’s worth noting that the easiest way to make it to exactly $10 is to just buy marbles, since $0.25 divides evenly (and easily) into $10.00. $10.00/$0.25 = 40, and 0 jacks/40 marbles is our first solution. Now we trade out 19 of our 25-cent marbles ($4.75 worth of marbles) for 25 of the 19-cent jacks ($4.75 worth of jacks), giving a second solution of 25 jacks/21 marbles. Now we trade out 19 more of our 25-cent marbles for 25 more of the 19-cent jacks, giving a third solution of 50 jacks, 2 marbles. Since we don’t have enough marbles to continue making trades in this manner, there are no more solutions to the equation. All told, then, there are three ways to spend exactly $10 at this store. The answer is D.

Hi All,

From the answer choices, we know that there cannot be that many ways to get a total of $10.00 when adding a multiple of $0.19 and a multiple of $0.25....

A multiple of $0.25 will always end in one of the following.... .00, .25, .50 or .75... so we really just need to determine in how many ways the $0.19 ends in a 'compliment' (re: .75, .50, .25 or .00) to that number so that the total = $10.00.

To end in a 0 or a 5, we need to multiply $0.19 by a multiple of 5)....

($0.19)(0) = $0... so the 'complement' would be ($0.25)(40). This IS an option.
($0.19)(5) = $0.95... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
($0.19)(10) = $1.90... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
($0.19)(15) = $2.85... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.

At this point, you should notice that we're just adding $0.95 to the prior sum, so doing lots of multiplication is NOT necessary....

$3.80... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$4.75... so the 'complement' would be ($0.25)(21). This IS an option.
$5.70... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$6.65... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$7.60... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$8.55... but we can't get a 'complement' from a multiple of $0.25 to total $10. This is NOT an option.
$9.50... so the 'complement' would be ($0.25)(2). This IS an option.

Total options = 3

Final Answer:

GMAT assassins aren't born, they're made,
Rich

The question itself will supply the relative conversions. Though you should have a few basic ones memorized: 1 hour = 60 minutes, ... I guess if $1 = 100 cents is not a common knowledge, then this also will be provided.

Let X is number of Jack and Y is number of Marbel . X and Y both has to an +ve Integer .

19X+25Y=1000
25Y=1000-19X
Y=40-(19/25)*X--> For Y to be integer , X must be multiple of 25
=> (X=0 Y=40),(X=25,Y=21),(X=50,Y=2) are the three options we have .

I cannot figure out where the 40 is coming from. Please help me understand this. Thanks!

Hi rnz,

We're told that single marbles cost $0.25 each. Thus, if you spend ALL $10 on just marbles, then you could purchase exactly 40 marbles (and 0 jacks).

GMAT assassins aren't born, they're made,
Rich

cost per pair=44
22 pairs=968; remainder=32 no
21 pairs=924; remainder=76 yes
76/19=4 jacks
25 jacks+21 marbles=1000
adding 25 jacks, 50 jacks+2 marbles=1000
subtracting 25 jacks, 40 marbles=1000
3 ways
D

We can let the number of jacks purchased = x and the number of marbles purchased = y. We are given that a jack costs 19 cents and a marble costs 25 cents. We need to determine how many different ways one can purchase 10 dollars’ worth, or 1,000 cents’ worth, of jacks and marbles.
Let’s create an equation:

19x + 25y = 1000

19x = 1000 - 25y

19x = 25(40 - y)

x = [25(40 - y)]/19

We see that 25(40 - y) must be a multiple of 19. However, since 19 does not evenly divide 25, we see that 19 must divide (40 - y). Thus, the possible values of y are 2, 21, and 40, and, thus, there are 3 ways one can spend exactly 10 dollars (or 1000 cents) at the store.

Answer: D