McGraw-Hill Education GRE 2019

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Exercise Answers


Discrete Quantitative Questions



  1. B Let e = the edge of the cube. Using the formulas for surface area and
    volume, divide both sides by e^2 : ee^32 =^6 ee 22 → e = 6
    e^3 = 6e^2
    e = 6

  2. C To solve for surface area, use the formula surface area of a cube = 6e^2 , where
    e = edge length. If the volume is 125, then
    e^3 = 125
    e = 5
    Substitute e into the formula for surface area: 6(5)^2 = 150.

  3. 13,824 cubic inches First, convert from feet to inches. 2 feet = 24 inches.
    The volume of the cube, in cubic inches, is thus 24^3 = 13,824 cubic inches.

  4. D Let e = the length of the cube’s edge. Thus the radius of the cylinder
    also = e. Now create an equation: π(e^2 )h = e^3. Isolate h: h = eπ.

  5. D Recall that the length of the diagonal of a cube = e√3, where e = length of
    an edge of the cube. To solve for the edge of the cube, we’ll use the fact that the
    surface area of the cube = 216.
    Use the formula for surface area to solve for the edge:
    6 e^2 = 216
    e^2 = 36
    e = 6
    Now, substitute 6 for e into the formula for the diagonal of a cube to arrive
    at 6√ 3.

  6. C The volume of the tank is π(r^2 )h = π(5^2 )10 = 250π. To solve for time, use the
    r × t = w formula, where the rate is 75 cubic feet/second, and the work is 250π:
    r × t = w
    75 t = 250π
    T = 250π/75 ≈ 10.5 seconds
    The closest answer is C.

  7. 18 Plug in numbers. Let the edge of cube y = 4. The edge of Cube X is thus 2. In
    this case, the volume of Cube Y is 4^3 = 64, and the volume of Cube X is 2^3 = 8.
    Volume of X
    Volume of Y^ =


8
64 =

1
8.


  1. D Plug in numbers. Let the original length = 2, the original width = 3, and
    the original height = 4. The original volume is thus 2 × 3 × 4 = 24. The new
    length will be 2 × 2 = 4. The new width will be 3 × 3 = 9. The new height will
    be 4 × 4 = 16. The new volume is thus 4 × 9 × 16 = 576. Now use the percent
    greater formula: Percent of – 100%: (^57624 × 100) – 100 = 2,300%.


CHAPTER 13 ■ GEOMETRY 429

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