If a and b are positive integers such that a/4b = 6.35, which of the following could be the remainder when 4a is divided by 2b?

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards
From $9.99Unlock all

Prepare for the e-GMAT Exam. Study with flashcards and multiple choice questions, each question offers detailed hints and explanations. Equip yourself for success!

Multiple Choice

If a and b are positive integers such that a/4b = 6.35, which of the following could be the remainder when 4a is divided by 2b?

Explanation:
To find the remainder when \(4a\) is divided by \(2b\), we start from the given equation \( \frac{a}{4b} = 6.35 \). Rearranging, we have: \[ a = 6.35 \times 4b = 25.4b \] Since \(a\) and \(b\) are both positive integers, \(b\) must be chosen such that \(25.4b\) is also an integer. This is only possible if \(b\) is a multiple of \(10\) because \(25.4\) can be expressed as \( \frac{254}{10} \). Therefore, \(b\) can take values like \(10, 20, 30, \ldots\). Next, we can express \(4a\): \[ 4a = 4(25.4b) = 101.6b \] Now, we need to divide \(4a\) by \(2b\): \[ 2b = 2b \] Now, let’s divide \(4a\) by \(2b\): \[ \frac{4a

To find the remainder when (4a) is divided by (2b), we start from the given equation ( \frac{a}{4b} = 6.35 ). Rearranging, we have:

[

a = 6.35 \times 4b = 25.4b

]

Since (a) and (b) are both positive integers, (b) must be chosen such that (25.4b) is also an integer. This is only possible if (b) is a multiple of (10) because (25.4) can be expressed as ( \frac{254}{10} ). Therefore, (b) can take values like (10, 20, 30, \ldots).

Next, we can express (4a):

[

4a = 4(25.4b) = 101.6b

]

Now, we need to divide (4a) by (2b):

[

2b = 2b

]

Now, let’s divide (4a) by (2b):

[

\frac{4a

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy