McGraw-Hill Education GRE 2019

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Exercise Answers


Discrete Quantitative Questions



  1. D Simplify the equation by dividing both sides by 2: x^2 + 10x = −24. Since you
    have a quadratic, you should set it equal to zero: x^2 + 10x + 24 = 0. Now factor
    the quadratic: (x + 6)(x + 4) = 0. Either factor can equal zero, so:
    (x + 6) = 0
    x = −6 or (x + 4) = 0
    x = −4

  2. D Notice that a^2 − 2ab + b^2 is one of the special products. The expression
    factors to (a − b)^2. If (a − b) = 4, then (a − b)^2 = 16.

  3. B Note that the given equation is quadratic. There will thus be two solutions
    for (x + 3): the positive square root of 81 and the negative square root of 81.
    Thus (x + 3) = 9 → x = 6 or (x + 3) = −9 → x = −12.

  4. 72 Since x^2 − y^2 is a difference of squares, you can factor the original equation
    to (x + y)(x − y) = 12. Substitute 4 for (x + y) in the original equation:
    4(x − y) = 12. Divide both sides of the equation by 4: (x − y) = 3. So you know
    that x − y = 3 and that x + y = 4. To solve for x, you will add the equations:
    x − y = 3
    x + y = 4
    2 x = 7

    x =^72

  5. D Expand the expression on the left side of the first equation: a^2 + 2ab + b^2 = 36.
    Substitute 4 for ab: a^2 + 8 + b^2 = 36. Subtract 8 from both sides to solve for (a^2

    • b^2 ): a^2 + b^2 = 28.



  6. B To isolate the variables, multiply both sides of the equation by (2x −2y):
    (2x + 2y)(2x − 2y) = 1. Notice that (2x + 2y)(2x − 2y) is in the form of (a + b)(a
    − b). Since (a + b)(a − b) becomes a^2 − b^2 after applying FOIL, (2x + 2y)
    (2x − 2y) becomes (2x)^2 − (2y)^2 = 4x^2 − 4y^2 after applying FOIL. The equation
    is now 4x^2 − 4y^2 = 1. Factor 4 from both terms on the left side: 4(x^2 − y^2 ) = 1.
    Divide by 4: x^2 − y^2 =^14.

  7. − 180 Notice that the right side of the equation is the factored form of the left
    side. How do you factor a common quadratic? Think of a simpler situation: x^2

    • 5x + 6 = (x + 3)(x +2). Why? Because 3 and 2 multiply to yield 6 and add to
      yield 5. So in the original equation, −10 and 18 multiply to yield k. k = −18 0.



  8. D Notice that the right side of the equation is the factored form of the left side.
    How do you factor a common quadratic? Think of a simpler situation: x^2 + 5x

    • 6 = (x + 3)(x +2). Why? Because 3 and 2 multiply to yield 6 and add to yield



    1. So in the original equation, −z and q multiply to yield b. Thus b = −qz.



  9. A Note that the expression on the left side of the equation is the factored form
    of a difference of squares: (x + y)(x − y) = x^2 − y^2 , so (√a − √b)(√a + √b) =
    √a


2
− √b

2
= a − b. Thus a − b = 12. Isolate a: a = b + 12.

290 PART 4 ■ MATH REVIEW

03-GRE-Test-2018_173-312.indd 290 12/05/17 11:55 am

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