Blog

The Quest for 700: Weekly GMAT Challenge (Answer)

Yesterday, Manhattan GMAT posted a GMAT question on our blog. Today, they have followed up with the answer:

The fastest way to solve this problem is first to recognize that an algebraic approach will take a little time. Essentially, we will have to multiply through by the product (x – 2)(x + 2)(x – 1), then simplify.

If, instead, we glance at the answer choices, we see that 3 of them make one of the denominators zero, a result that is not allowed (we cannot divide by zero). Specifically, x cannot be –2 because one denominator is x + 2; likewise, x cannot be 1 or 2, since we have x – 1 and x – 2 as denominators as well.

Thus, the only two possible answers are –1 and 0. We try each in turn.

If x = –1, then we have the following:

1/(–3) = 1/(1) + 1/(–2)?

–1/3 = 1 – 1/2?

This is not true.

However, if x = 0, then we have the following:

1/(–2) = 1/(2) + 1/(–1)?

–1/2 = 1/2 – 1?

–1/2 = –1/2?

This is true, so x can be equal to 0.

Alternatively, we could take the algebraic approach.

First, we multiply through by the product (x – 2)(x + 2)(x – 1) to eliminate denominators.

(x – 1)(x + 2) = (x – 2)(x – 1) + (x – 2)(x + 2)

x2 + x – 2 = x2 – 3x + 2 + x2 – 4

0 = x2 – 4x

0 = x(x – 4)

x = 0 or x = 4

The correct answer is (C).



onTrack by mbaMission

A first-of-its-kind, on-demand MBA application experience that delivers a personalized curriculum for you and leverages interactive tools to guide you through the entire MBA application process.

Get Started!


Upcoming Events


Upcoming Deadlines

  • LBS (Round 2)
  • Penn Wharton (Round 2)
  • Ohio Fisher (Round 2)
  • Cambridge Judge (Round 3)
  • Carnegie Mellon Tepper (Round 2)
  • Dartmouth Tuck (Round 2)
  • Emory Goizueta (Round 2)
  • Georgetown McDonough (Round 2)
  • Harvard Business School (Round 2)
  • Michigan Ross (Round 2)
  • Ocford Saïd (Round 4)
  • UCLA Anderson (Round 2)
  • UW Foster (Round 2)

Click here to see the complete deadlines


2024–2025 MBA Essay Tips

Click here for the 2023–2024 MBA Essay Tips


MBA Program Updates

Explore onTrack — mbaMission’s newest offering allowing you to learn at your own pace through video. Learn more