McGraw-Hill Education GRE 2019

(singke) #1
xa = 1
a > 0
QUANTITY A QUANTITY B


  1. x 1 A B C D


b
√c = a
QUANTITY A QUANTITY B


  1. ba^22 c A B C D


Exercise Answers


Discrete Quantitative Questions



  1. E To solve for x, you should express all the terms with a base of 2: 4^2 = (2^2 )^2 =
    24. 16^5 = (2^4 )^5 = 2^20. Thus:
    (2^4 )(2^20 ) = 2^24 = 2x

    x = 24

  2. 5 When simplifying exponential expressions, you should express all bases in
    their prime forms. Express 21 in terms of base 7 and 3: 211,003 = (7 × 3)1,003 =
    (71,003)(31,003). The fraction now reads:
    (71,003)(31,003)
    (31,002)(71,001) = (7


(^2) )3 = 147



  1. C Note that you are adding the same term (5x) five times. Thus:
    5 x + 5x + 5x + 5x + 5x = 5(5x) = (5^1 )(5x) = 5(x+1) = 5^6
    x + 1 = 6
    x = 5

  2. B Since the two sides of this equation are equal, they must have the same
    prime factorization. Thus the exponent on the 2 on the left side of the equation
    represents the number of times 2 appears in the prime factorization of 576,
    and the exponent on the 3 on the left side of the equation represents the
    number of times that 3 appears in the prime factorization of 576. To solve for
    these exponents, you should express 576 in terms of base 2 and 3:
    576 = 2(288)
    576 = (2)(2)(14 4)
    576 = (2)(2)(12)(12)
    576 = (2)(2)(4 × 3)(4 × 3)
    576 = (2)(2)(2 × 2 × 3)(2 × 2 × 3)
    576 = (2^6 )(3^2 )


280 PART 4 ■ MATH REVIEW

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