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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. A chord through the center of the circle
a
diameter
inscribed angle
commutative axiom of addition and multiplication

2. 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)
x>y
altitude of a triangle
square
angle a and angle b = angle d

3. 1/2d
inconsistent lines
radius of a circle
the last digit is either 0 or 5
the percent of increase

4. When two parallel lines are crossed by a third straight line (transversal) - then
inverse of a relation
all acute angles are equal and all obtuse angles are equal
x-y
isosceles

5. x > y or y< x
x is greater than y
Axioms
n percent less than x
a set

6. If the base angles of a triangle are equal - the triangle is
isosceles
1.7
(x/100)m= n
the sum of its digits is divisible by 9

7. x - (n/100)x
y intercept
inconsistent lines
right triangle
n percent less than x

8. If ?B > ?A - then
a?n
properties of a rhombus
then side b > side a
opposite the greatest side

9. Any number squared or raised to an even power is
x is greater than y
w>0 and x>y
always positive or zero
the perpendicular distance

10. 1/y-1/x x -y ? 0
acute angle
b is the y-intercept
x-y/xy
commutative axiom of addition and multiplication

11. All sides are equal and all of whose angles are equal. 1. can be inscribed in a circle and can be circumscribed about another circle. 2. each angle is equal to the sum of the angles divided by the number of sides 180(n-2)°/n.
quadratic equations
1.7
circle
regular polygon properties

12. N is what % of m
acute angle
any variable
0 - 2 - 4 - 6 - 8
n= mx/100

13. x older than y
x + y
y-x
opposite the greatest side
find the intersection of two sets

14. V2/2- v2/2 - 1 (90-45-45)
the last two digits of the number make a number that is divisible by 4
22/7 or 3.14
diameter of circle
isosceles triangle

15. ? if a side is equal to b side then - the opposite corresponding angles are
consistent lines
null set
equal
determining if a number is prime

16. 3(4+1)= 3 x 4 + 3 x 1
a
distributive axiom
central angle
combinations

17. Product of an even number and any other number is
even
isosceles triangle
probability
a

18. B²-4ac = 0 there is
one solution
circle
percent
obtuse angle

19. Area = ?r² circumference(perimeter)= 2?r
right triangle
determining if a number is prime
circle
equal to the sum of the measures of the remote exterior angles

20. Set of solutions to an equation
x+y/xy
the last digit is either 0 or 5
solution set
x percent

21. x>0 and y<0 or x<0 and y >0
inscribed angle
Axioms
xy< 0
the last digit is either 0 or 5

22. Sum of two even numbers is
n percent less than x
even
set
inverse of a relation

23. x+w> y+z
x-y/xy
right triangle
x>y and w>z
consistent lines

24. The product of an even number of negative numbers is
rectangular solid
consistent lines
positive
n= mx/100

25. /100 (the ______ number over 100)
circle
percent
w<0 and x>y
inconsistent lines

26. The lines that divide each angle of the triangle into two equal parts. these lines meet in a point that is the center of a circle inscribed in the triangle.
rectangular solid
equal
0 - 2 - 4 - 6 - 8
angle bisector

27. The percent increase from x to y (y>x)
360 degrees
equal to the sum of the measures of the remote exterior angles
(y-x/x)100
cube

28. x>z
angle bisector
x>y and y>z
chord
x²+ 2xy+y²

29. Less than 90°
acute angle
determining if a number is prime
the last digit is 0
the sum of its digits is divisible by 9

30. Area= 1/2h(b1+b2) perimeter= b1+b2+c+d
determining if a number is prime
trapezoid
equal to the sum of the measures of the remote exterior angles
or

31. 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.
angle a and angle b = angle d
a<x<b
perpendicular bisectors
diagonal of a square

32. V10
the sum of its digits is divisible by 3
3.16
even
central angle

33. Every set is a subset of
x + y
relation
itself
180 degrees

34. The product of x and y
-y
3.16
xy
x²-2xy+y²

35. 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
semicircle
similar triangles
properties of a square
x-y/xy

36. B>c+ d>e
diameter of circle
b+d>c+e
odd
solution set

37. 1-v3- 2 (90-30-60)
right triangle
implies
180 degrees
(x-y/x)100

38. (amount of increase/original amount) x 100
(x/100)m= n
solution set
the percent of increase
if two sets have no elements in common

39. ?
is a subset of
inscribed angle
right triangle
v3/2 or .87

40. All odd numbers end in the digits of
(x-y/x)100
1 - 3 - 5 - 7 - 9
the percent of decrease
properties of parallelograms

41. 9-40-41
quadratic equations
right triangle
the third side
rectangular solid

42. A/A¹ = B/B¹= C/C¹
standard deviation
a
vertical angles
similar triangles

43. 3-4-5
xy
set
right triangle
when finding a solution set

44. 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*)
b+d>c+e
parallel
closed set
angle bisector

45. 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
n percent less than x
vertical angles
properties of parallelograms
never divide by zero

46. In transversals
right triangle
all acute angles are equal and all obtuse angles are equal
w<0 and x>y
implies

47. M=number of favorable ways n= total number of ways (two events occurring is the prob of the first times the prob of the second)
hexagon
equal to the sum of the measures of the remote exterior angles
probability
solution set

48. The distance from the center of the circle
greater than c
radius
standard deviation
the sum of its digits is divisible by 3

49. x + y
slope of a line joining two points
x + y
x and y
times

50. Is the relation with ALL ordered pairs REVERSED.
1
inverse of a relation
closed set
perpendicular