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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. What % of m is n
times
angle a and angle b = angle d
approx square roots
(x/100)m= n

2. x= -b + vb²-4ac/2a and x = -b - vb²-4ac/2a
xy
quadratic equations
x²+ 2xy+y²
finding the union of sets

3. If the each element of the domain occurs only once as a FIRST component
acute angle
itself
a relation is a function
equal to the slope of the other

4. In a triangle - the greatest angles lies
opposite the greatest side
medians of a triangle
diagonal of a square
inconsistent lines

5. B>c+ d>e
xy
b+d>c+e
x>y and y>z
equal

6. Any line that connects two points on a circle.
chord
properties of parallelograms
polygon
the last digit is 0

7. The distance between two parallel lines or from a point to a line always means
the last two digits of the number make a number that is divisible by 4
even
null set
the perpendicular distance

8. Diagonal= sv2
semicircle
diagonal of a square
expression of an odd number
right triangle

9. 1/y-1/x x -y ? 0
x-y/xy
sphere
odd
triangle or straight line

10. If ?B > ?A - then
consistent lines
all acute angles are equal and all obtuse angles are equal
then side b > side a
x and y

11. A chord through the center of the circle
simultaneous equations in 2 unknowns
square
diameter
obtuse angle

12. 1. determine a rough approximation of the square root of the number. 2. divide the number by all the primes that are less than the approx square root. If the number is not divisible by ANY of the these primes - then it is prime. If it IS divisible -
b+d>c+e
domain of a relation
inconsistent lines
determining if a number is prime

13. (x-y)(x-y) = (x-y)²
equilateral triangle
+y
x²-2xy+y²
regular polygon properties

14. Two tangents to a circle from the same point outside of the circle are always
null set
even
polygon
equal

15. V3
1/2
1.7
v(x2-x1)²+ (y2-y1)²
odd

16. Area= 1/2?r2 length= 1/2?d= ?r perimeter= d(1/2? +1)
v(x2-x1)²+ (y2-y1)²
semicircle
expression of an even number
regular polygon properties

17. In transversals
inverse of a relation
right triangle
standard deviation
all acute angles are equal and all obtuse angles are equal

18. N= number of objects (order matters!!!) k= rate at a time nPk= n!/(n-k)! (remember to cancel common numbers)
probability
permutations
negative
y intercept

19. A¹
if two sets have no elements in common
a
angle a and angle b = angle d
±vx

20. The measure of an interior angle is
equal to the sum of the measures of the remote exterior angles
x<0 and z=x+y
odd
the square of x

21. The point where the line crosses the x-axis - y will always = 0 in this case
it is also divisible by 2 and 3
x²+ 2xy+y²
x>y and y>z
x intercept

22. The increase from x to y
commutative axiom of addition and multiplication
closed set
y-x
x<0

23. Write down every member in one or both of the sets - the union of two sets is a new set. the union of set A and B is written as A?B
finding the union of sets
xy
opposite the greatest side
a<x<b

24. ?
range of a relation
set
(y-x/x)100
angle

25. Parallel and never intersect - they have no solution at all - they are parallel with the same slope
medians of a triangle
inconsistent lines
the square of x
if two sets have no elements in common

26. y years ago
-y
one solution
simultaneous equations
even

27. A line that is perpendicular to a radius and that passes through only one point of the circle.
isosceles triangle
tangent
equal angles
y angle< x angle

28. All angles are right angles and diagonals are equal 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
180 degrees
properties of a rectangle
1.7
equal

29. R²
vertical angles
diameter of circle
always positive or zero
v2/2 or .71

30. C²= a²+b² and angle x and y are equal to 90°
parallelogram
find the intersection of two sets
right triangle
all acute angles are equal and all obtuse angles are equal

31. Between 90° and 180°
obtuse angle
diameter
straight angle
medians of a triangle

32. Any number squared or raised to an even power is
distributive axiom
x>y and w>z
always positive or zero
cube

33. Sin 60°
similar triangles
v3/2 or .87
semicircle
standard deviation

34. The product of an even number of negative numbers is
hexagon
negative reciprocal of the other
the sum of its digits is divisible by 9
positive

35. ?if y angle< x angle - then
null set
isosceles
a side< b side
two solutions

36. Area= s² perimeter= 4s
square
x>y
x + y
negative reciprocal of the other

37. x(y-z)
xy-xz
v(x2-x1)²+ (y2-y1)²
commutative axiom of addition and multiplication
properties of parallelograms

38. If two lines are perpendicular - the slope of one is the
1.4
quadratic equations
negative reciprocal of the other
central angle

39. 3(4+1)= 3 x 4 + 3 x 1
rectangular solid
(y-x/x)100
distributive axiom
pythagorean theorem

40. Are the lines drawn from each vertex to the midpoint of its opposite side. they cross at a point that divides each individual ______into two parts.
(x/100)m= n
x percent
medians of a triangle
y-x

41. 1-1-v2 (90-45-45)
regular polygon properties
properties of a square
expression of an odd number
right triangle

42. y years from now
+y
-y
parallel
odd

43. The difference between x and y
properties of a rhombus
odd
odd
x - y

44. x +z > y+z
right triangle
+y
x>y
when finding a solution set

45. Sin 45°
or
equilateral triangle
v2/2 or .71
isosceles

46. 1-1-1 (60-60-60)
3.16
x+y/xy
equilateral triangle
regular polygon properties

47. Product of two odd numbers is
equilateral triangle
1 - 3 - 5 - 7 - 9
odd
chord

48. x+w> y+z
simultaneous equations
x intercept
determining if a number is prime
x>y and w>z

49. Then their intersection is the null or empty set - written as Ø
if two sets have no elements in common
one solution
properties of parallelograms
a<x<b

50. Any integer is divisible by 3 - if
one solution
a
null set
the sum of its digits is divisible by 3