Stanford GSB | Mr. Low GPA To Stanford
GMAT 770, GPA 2.7
Harvard | Mr. Air Force Seeking Feedback
GRE 329, GPA 3.2
Berkeley Haas | Mr. Colombian Sales Leader
GMAT 610, GPA 2.78
Darden | Mr. Anxious One
GRE 323, GPA 3.85
Stanford GSB | Mr. Hopeful B School Investment Analyst
GRE 327, GPA 3.52
Stanford GSB | Ms. Eyebrows Say It All
GRE 299, GPA 8.2/10
Emory Goizueta | Mr. Family Business Turned Consultant
GMAT 640, GPA 3.0
Tuck | Ms. BFA To MBA
GMAT 700, GPA 3.96
Stanford GSB | Mr. Deferred MBA Candidate
GMAT 760, GPA 4.0
Berkeley Haas | Mr. Hanging By A Thread
GMAT 710, GPA 3.8
Harvard | Ms. Hollywood To Healthcare
GMAT 730, GPA 2.5
Kellogg | Ms. Indian Entrepreneur
GMAT 750, GPA 3.3
Tuck | Ms. Confused One
GMAT 740, GPA 7.3/10
McCombs School of Business | Ms. Registered Nurse Entrepreneur
GMAT 630, GPA 3.59
Stanford GSB | Ms. Tech Consulting
GMAT 700, GPA 3.53
Kellogg | Mr. Danish Raised, US Based
GMAT 710, GPA 10.6 out of 12
Kellogg | Mr. Indian Engine Guy
GMAT 740, GPA 7.96 Eq to 3.7
INSEAD | Mr. Big Chill 770
GMAT 770, GPA 3-3.2
Yale | Mr. Whizzy
GMAT 720, GPA 4.22
Stanford GSB | Ms. Government To EdTech
GRE 323, GPA 14/20 (B equivalent)
Duke Fuqua | Ms. Venture Investments & Start-Ups In China
Wharton | Mr. Army Officer in Tech
GRE 322, GPA 3.1
INSEAD | Mr. Naval Engineer
GMAT 710, GPA 3.3
Tepper | Mr. Midwest Or Bust
GMAT 740, GPA 3.2
Kellogg | Mr. Structural Engineer
GMAT 680, GPA 3.2
Darden | Ms. Environmental Engineer
GMAT 710, GPA 3.3
Harvard | Mr. Sovereign Wealth Fund
GMAT 730, GPA 3.55

Common GRE Math Mistakes

General Mistake #1: Not reading the problem carefully

Under timed conditions, you may feel compelled to rush. But remember, by misreading a word (or not reading it entirely), you can make a relatively straightforward problem seem intractable. You may flail about the answer choices, picking one – usually the incorrect one – that happens to be somewhat close to your answer.

Worse yet, you may get a numeric entry question and blithely enter in the wrong answer, something you could easily have avoided doing had you read the question carefully.

General Mistake #2: Flubbing the Math

Many math mistakes result from forgetting something so minor as write a negative sign. Other times, simple mathematical errors, like thinking that 16 x 5 = 90 can be very costly. Math is about precision so use your prep time to become an efficient and unerring human calculator.

Specific Mistakes

Below are two common mistakes and oversights, along with problems that test those mistakes. See if you can avoid these common GRE mistakes.

  1. 1.     Prime Numbers

2 is the smallest prime number. It is the only even prime. 1 is NOT a prime.

  1. 2.     Don’t Forget 0 and 1

Especially in Quantitative Comparison, you always want to make sure to plug in 0 and 1 if the constraints permit doing so. Oftentimes plugging in a 0 or 1 will prove the exception, thus making the answer (D): “The relationship cannot be determined from the information given”.

  1. 3.     Must Be vs. Could Be

There is a subtle, but important difference here. If a question is phrased ‘must be’, then the answer you choose must always hold true for the conditions stated in the problem.

‘Could be’ means that in certain instances, i.e. for certain numbers.

All of this makes a lot more sense when in the context of the problem. So let’s take a look at a practice question.

1. c and d are prime numbers. If c – d is an odd prime, then which of the following must be true?

(A)  c is even

(B)  d is odd

(C)  c x d is odd

(D) d is even

(E)  c x d – c is even


First off, don’t let the variables throw you. There is an answer, so there must be some pattern that you have to discern.

If you remember, I mentioned that ‘2’ is the only even prime. Thus the rest are all odds. The question says that c – d is an odd prime. The only way to get an odd number when we subtract two numbers is that one number must be odd and one must be even.

Since ‘2’ is the only even prime we know that ‘2’ must be d. (c cannot equal ‘2’ because c – d would end up being negative number, and primes can’t be negative).

We don’t have to know what exact number c equals. As long as c – d equals an odd prime. c = 5 is perfect. We plug in those values into the question.

Only D works. And we know that d must be even, because d must equal 2, an even number.


Keep both the general and specific mistakes in mind when you take the actual GRE, but also as you’re doing practice questions as you study– build good habits now so you don’t lose easy points on the day of the exam!

This was written by Chris Lele, GRE Expert at Magoosh GRE Prep, and originally posted here