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GRE Math Strategies

Subjects : gre, math

Instructions:

Answer 50 questions in 15 minutes.
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Match each statement with the correct term.
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This is a study tool. The 3 wrong answers for each question are randomly chosen from answers to other questions. So, you might find at times the answers obvious, but you will see it re-enforces your understanding as you take the test each time.

1. 1.each pair of opposite sides are equal 2. the diagonals bisect eachother 3. the opposite angles are equal 4. one diagonal divides it into two congruent triangles and two diagonals divides it into two pairs of congruent triangles
hexagon
x>y>0 and w>z>0
properties of parallelograms
and

2. If ?B > ?A - then
then side b > side a
when finding a solution set
area of a triangle
diameter of circle

3. The case where the two equations are equivalent (just two different forms of the same mathematical relation). Any point that satisfies either of the equations - automatically satisfies both
a side< b side
the sum of its digits is divisible by 3
coinciding lines
1 - 3 - 5 - 7 - 9

4. The length of a segment whose endpoints are (x1 -y1) and (x2 -y2)
xy + xz
percent
v(x2-x1)²+ (y2-y1)²
equal

5. The percent increase from x to y (y>x)
x²-y²
diameter of circle
(y-x/x)100
set

6. Any integer is divisible by 5 if
rectangle
-y
any variable
the last digit is either 0 or 5

7. The difference between x and y
then side b > side a
x - y
properties of a square
hexagon

8. Any integer is divisible by 10 - if
itself
1
the last digit is 0
x-y/xy

9. If two lines are perpendicular - the slope of one is the
±vx
equal to the sum of the measures of the remote exterior angles
negative reciprocal of the other
22/7 or 3.14

10. One angle is equal 90° and the other two angles are equal to the sum of 90°
right triangle
vertical angles
1.7
range of a relation

11. 1. round each number being added to one more place than it is being asked. 2. add the rounded numbers. 3. round off the sum to the desired number of places
consistent lines
approx sums
x+y/xy
the last digit is either 0 or 5

12. 1. subtract each number from the average of the numbers 2. square the result of each of the numbers 3. add all those results and then divide by how many numbers you originally had. 4. take the square root of that result
x%
always positive or zero
x²+ 2xy+y²
standard deviation

13. Wx>wy
w>0 and x>y
negative reciprocal of the other
odd
reflex angle

14. Pairs of opposite angles formed by the intersection of two straight lines. always equal to each other
distributive axiom
vertical angles
x>y and w>z
x intercept

15. The increase from x to y
y-x
v2/2 or .71
right triangle
properties of a square

16. When two parallel lines are crossed by a third straight line (transversal) - then
the last three numbers are divisible by 8
all acute angles are equal and all obtuse angles are equal
angle
altitude of a triangle

17. N= combinations taken (order does not matter) r= rate at a time nCr or C(n -r) = (n)!/(r)! (remember to cancel out common numbers)
angle
or
the last digit is 0
combinations

18. Area= 1/2h(b1+b2) perimeter= b1+b2+c+d
trapezoid
sphere
x intercept
22/7 or 3.14

19. All odd numbers end in the digits of
obtuse angle
1 - 3 - 5 - 7 - 9
rectangular solid
two solutions

20. Of
right triangle
1
medians of a triangle
times

21. Any number squared or raised to an even power is
1
range of a relation
always positive or zero
set

22. Is a rectangular rhombus 1. all four sides are equal 2. opposite pairs of sides are parallel 3. diagonals are equal - are perpendicular to each other - and bisect each other. 4. all the angles are right triangles 5. diagonals intersect the vertices a
equals
properties of a square
1.4
1

23. 1. solve the equation or inequality 2. use ONLY the solutions which satisfy the condition required - the set of all x such that x is greater than or equal to 10 R= {x: x=10}
when finding a solution set
perpendicular
two solutions
right triangle

24. Sin 45°
equilateral triangle
xy>0
v2/2 or .71
rectangular solid

25. Area= s² perimeter= 4s
1.7
pythagorean theorem
square
360 degrees

26. Is a subset of every set
null set
domain of a relation
the square of x
distributive axiom

27. 1-1-v2 (90-45-45)
when finding a solution set
22/7 or 3.14
right triangle
+y

28. Write down every member that the two sets have in common. The intersection of the sets A and B is a set written AnB
cube
find the intersection of two sets
then side b > side a
range of a relation

29. In a triangle - if ?c(interior angle in triangle) and ?d(exterior angle out of triangle) are supplmentary angles - than ?a and ?b are remote interior angles to <d - thus - a +b+c = 180 (triangle) c+d = 180 (supplementary angles)
n percent greater than x
always positive or zero
similar triangles
angle a and angle b = angle d

30. x(y-z)
x - y
xy-xz
vertical angles
relation

31. Area= bh perimeter= 2a +2b
parallelogram
positive
0 - 2 - 4 - 6 - 8
equilateral triangle

32. V3
obtuse angle
times
combinations
1.7

33. Have two equal sides and two equal angles formed by the equal sides and the unequal side.
supplementary angles
equilateral triangle
isosceles triangle
consistent lines

34. Two tangents to a circle from the same point outside of the circle are always
equal
central angle
w>0 and x>y
a?n

35. Angle whose sides are two radii of the circle. The vertex of this angle is the center of the circle. The number of degrees is equal to the amount of arc length that the radd intercept.
midpoint of a line segment joining 2 parts
central angle
c x (john'S age)
x + y

36. Volume= 4/3?r² surface area= 4?r²
22/7 or 3.14
right triangle
sphere
v2/2 or .71

37. Ax= by + C
Axioms
x²+ 2xy+y²
equals
simultaneous equations in 2 unknowns

38. Area= 1/2bh perimeter= a+b+c
triangle
cube
square
triangle or straight line

39. ?
perpendicular
b is the y-intercept
x + y
x²-y²

40. The product of an odd number of negative numbers is
x%
percent
x<0
negative

41. 3-4-5
simultaneous equations
isosceles triangle
v3/2 or .87
right triangle

42. x - (n/100)x
n percent less than x
angle inscribed in semicircle
percent
acute angle

43. 360°
radius of a circle
one solution
circle
right triangle

44. Side a +side b of a ? is
square
it is also divisible by 2 and 3
greater than c
properties of a square

45. Any integer is divisible by 8 if
the last three numbers are divisible by 8
approx products
altitude of a triangle
rectangle

46. | |
equals
parallel
v3/2 or .87
±vx

47. If two lines are parallel - the slope of one is
equal to the slope of the other
a set
x²-2xy+y²
xy

48. x more than y
associative axiom of addition and multiplication
x + y
isosceles
(x-y/x)100

49. y<x
approx products
even
x>y
isosceles

50. In a triangle - the greatest angles lies
a side< b side
right triangle
opposite the greatest side
the last three numbers are divisible by 8

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GRE Math Strategies

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