How to find X, knowing the rate of change between two numbers?

[TheCosmicBird]

Hi,

I'm prepping for an interview, and was asked this math question and was stumped on how to approach it:

In Data Set 1, it took 177 minutes in total for Software A to analyze 12 files and Software B to analyze 15 files.
In Data Set 2, it took 633 minutes in total for Software A to analyze 60 files and Software B to analyze 39 files.

Using the above, in Data Set 3, how many minutes will it take in total for Software A to analyze 25 files and Software B to analyze 34 files?

It seems after finding the rate of change, I would somehow use proportions to find X, but I'm getting stumped on the specifics of how to approach this problem to find X.

I sincerely appreciate any insight anyone can provide.

Thank you!
~Cosmic

 

[Harry_the_cat]

You need to assume Software A takes a constant amount of time to analyse a file, and same for Software B.

Let "a" be the amount of time Software A takes to analyse a file.
Let "b" be the amount of time Software B takes to analyse a file.

Can you form and equation for "In Data Set 1, it took 177 minutes in total for Software A to analyze 12 files and Software B to analyze 15 files."?
And do the same for the other piece of info you are given.

Solve simultaneously for "a" and "b".

Then you can answer the question.

 

[TheCosmicBird]

Hi Harry,

Thank you for the tip, that makes sense. So using what you said, an equation I would make for both data sets is:

12a + 15b = 177
60a + 39b = 633

With "a" being the time it takes to Software A to analyze a file and "b" being the amount of time Software B takes to analyze a file. And if I were able to solve for "a" and "b", then I could easily solve the answer for Data Set 3 with the equation:

25a + 34b = X minutes.

So, the concept makes complete sense to me...I'm just stumped on the actual specifics of how to approach the math on this. In other words haha, I understand "what" I have to do and "why" I have to do it...I'm unsure of the "how".

Thank you again for taking the time to engage with a complete stranger on this!
~Cosmic

 

[Deleted member 4993]

Hi Harry,

Thank you for the tip, that makes sense. So using what you said, an equation I would make for both data sets is:

12a + 15b = 177
60a + 39b = 633

With "a" being the time it takes to Software A to analyze a file and "b" being the amount of time Software B takes to analyze a file. And if I were able to solve for "a" and "b", then I could easily solve the answer for Data Set 3 with the equation:

25a + 34b = X minutes.

So, the concept makes complete sense to me...I'm just stumped on the actual specifics of how to approach the math on this. In other words haha, I understand "what" I have to do and "why" I have to do it...I'm unsure of the "how".

Thank you again for taking the time to engage with a complete stranger on this!
~Cosmic

Do a google search for:

solution of two linear equations and two unknowns​

​

You'll find millions of websites ready to help you - with videos.

 

[TheCosmicBird]

Ah that's exactly what I needed, thanks Khan! Ok, googled "solution of two linear equations and two unknowns" and was able to figure out the answer. It's 388 minutes. Thanks again!

 

[Harry_the_cat]

Well done. 388 is correct. Good luck with the interview.