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GRE Math Strategies

Subjects : gre, math

Instructions:

Answer 50 questions in 15 minutes.
If you are not ready to take this test, you can study here.
Match each statement with the correct term.
Don't refresh. All questions and answers are randomly picked and ordered every time you load a test.

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. Volume= e(edge)³ surface area= 6e²
cube
1/2
the sum of its digits is divisible by 9
circle

2. 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}
y angle< x angle
when finding a solution set
commutative axiom of addition and multiplication
implies

3. If under the operation - any two members of the set constitute an element of the set ( * the product of the elements multiplied by themselves must also be an element of the set*)
x²+ 2xy+y²
xy>0
trapezoid
closed set

4. x +z > y+z
x>y
equal to the sum of the measures of the remote exterior angles
1.7
inconsistent lines

5. Angles that equal 180 degrees
the last two digits of the number make a number that is divisible by 4
supplementary angles
perpendicular bisectors
the percent of decrease

6. Any integer is divisible by 9 - if
y-x
chord
the sum of its digits is divisible by 9
x+y/xy

7. One angle is equal 90° and the other two angles are equal to the sum of 90°
probability
x + y
permutations
right triangle

8. y<x
x-y/xy
x>y
tangent
negative

9. All odd numbers end in the digits of
standard deviation
supplementary angles
opposite the greatest side
1 - 3 - 5 - 7 - 9

10. (3+5) +6= 3+ (5+6) and (3x5)6= 3(5x6)
equal to the slope of the other
semicircle
associative axiom of addition and multiplication
itself

11. Is the relation with ALL ordered pairs REVERSED.
midpoint of a line segment joining 2 parts
regular polygon properties
x>y>0 and w>z>0
inverse of a relation

12. Volume=lwh surface area= 2wh + 2hl + 2lw
rectangular solid
properties of a rhombus
the perpendicular distance
n percent less than x

13. 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
even
x<0
midpoint of a line segment joining 2 parts
properties of parallelograms

14. V10
3.16
the percent of increase
x>y>0 and w>z>0
c x (john'S age)

15. The product of x and y
xy
right triangle
-y
+y

16. B>c+ d>e
tangent
b+d>c+e
right angle
x + y

17. Any integer is divisible by 5 if
v(x2-x1)²+ (y2-y1)²
the last digit is either 0 or 5
the last digit is 0
standard deviation

18. Ax= by + C
triangle
b is the y-intercept
equal
simultaneous equations in 2 unknowns

19. ?
and
x is greater than y
even
xy + xz

20. x + y
a+b+d=c+d
never divide by zero
square
x and y

21. Area= s² perimeter= 4s
when finding a solution set
square
determining if a number is prime
acute angle

22. x older than y
permutations
x + y
the percent of decrease
quadratic equations

23. Then their intersection is the null or empty set - written as Ø
x - y
parallel
right angle
if two sets have no elements in common

24. Any arc length is less than
360 degrees
supplementary angles
xy>0
x>y and w>z

25. x younger than y
0 - 2 - 4 - 6 - 8
x + y
x - y
v(x2-x1)²+ (y2-y1)²

26. 180°
odd
straight angle
n= mx/100
negative

27. C times as old as john

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28. 2k + 1
approx products
percent
n= mx/100
expression of an odd number

29. 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
pythagorean theorem
quadratic equations
properties of a square
polygon

30. 1/2bh
area of a triangle
equilateral triangle
a?n
belongs to

31. The percent increase from x to y (y>x)
(y-x/x)100
greater than c
a?n
x + y

32. A°
equal angles
1.4
approx square roots
1

33. x more than y
vertical angles
the last three numbers are divisible by 8
a<x<b
x + y

34. x/100
angle inscribed in semicircle
x percent
the percent of increase
x + y

35. 1-v3- 2 (90-30-60)
determining if a number is prime
right triangle
x + y
isosceles triangle

36. Angle whose sides are two chords. The vertex of the angles lies on the circumference of the circle. The number of degrees of the angle is equal to 1/2 the intercepted arc
tangent
the sum of its digits is divisible by 9
inscribed angle
inverse of a relation

37. When two parallel lines are crossed by a third straight line (transversal) - then
22/7 or 3.14
the last three numbers are divisible by 8
xy>0
all acute angles are equal and all obtuse angles are equal

38. 8-15-17
even
associative axiom of addition and multiplication
Axioms
right triangle

39. xw> yz
negative
vertical angles
x>y>0 and w>z>0
w<0 and x>y

40. Product of an even number and any other number is
hemisphere
relation
cylinder
even

41. x>z
x is less than y
x>y and y>z
360 degrees
the sum of parts

42. If two lines are parallel - the slope of one is
times
equal to the slope of the other
-y
the sum of its digits is divisible by 3

43. x - (n/100)x
x²-2xy+y²
n percent less than x
pythagorean theorem
cube

44. Distributive axiom - commutative axiom of addition and multiplication - associative axioms of addition and multiplication
Axioms
triangle
domain of a relation
hexagon

45. Are the lines that bisect and are perpendicular to each of the three sides. The point where they meet is the center of the circumscribed circle.
1 - 3 - 5 - 7 - 9
or
perpendicular bisectors
permutations

46. ?
odd
angle
times
hexagon

47. The increase from x to y
w>0 and x>y
semicircle
slope of a line joining two points
y-x

48. 1-1-1 (60-60-60)
equilateral triangle
even
relation
average

49. ? if a side is equal to b side then - the opposite corresponding angles are
right triangle
positive
one solution
equal

50. Diagonals are perpendicular to each other and bisect the vertex angles 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 diagonal
properties of a rhombus
even
slope of a line joining two points
x>y