McGraw-Hill Education GRE 2019

(singke) #1

  1. A First, determine the equation for the line. Since the slope is^23 , the equation
    initially reads: y =^23 x + b. To solve for b, substitute the coordinates (6,14) into
    the equation:
    y =^23 x + b
    14 =^23 (6) + b
    14 = 4 + b
    b = 10
    The equation for the line is thus y =^23 x + 10. Since the x-intercept represents
    the point at which the line intersects the x-axis, the y-coordinate of that
    point will be zero. Thus substitute 0 for y into the equation to determine the
    x-intercept:
    0 =^23 x + 10
    −10 =^23 x
    −10 (^32 ) = x
    −15 = x

  2. D Draw the diagram and connect the points (0,0) and (−5,5). The resulting
    line will be the hypotenuse of a right triangle whose legs each have a length
    of 5.


(–5, 5)^5

25√ 5

Since this is an isosceles right triangle, the hypotenuse will be 5√ 2.


  1. B and D Any line with a negative slope will intercept quadrants II and IV.
    Whether the line intercepts Quadrant I or III depends on the line’s y-intercept.
    Since you are not given information about the line’s y-intercept, you cannot
    determine whether it will pass through the other quadrants or the origin. The
    correct answer is II and IV. For illustration, see the following figure:


444 PART 4 ■ MATH REVIEW

04-GRE-Test-2018_313-462.indd 444 12/05/17 12:07 pm

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