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Test your basic knowledge |
GRE Math 2
Start Test
Study First
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 is the area of a sector?
(n degrees/360) * (pi)r^2
Pi*r^2
The factorial of a number is that number times every positive whole number smaller than that number - down to 1. Example: 6! means the factorial of 6 - which = 65432*1 = 720.
Last term
2. Area of a sector
?d OR 2?r
The average - mean - median - or mode.
x°/360 times (?r²) - where x is the degrees in the angle
The length of any one side of a triangle must be less than the sum of the other two sides. It must also be greater than the difference between the other two sides. So - 'A' will always be < B+C - and > B-C or C-B.
3. Area of Circles
Opens up
Proportionate values are equivalent. Example: 1/2 and 4/8 are proportionate - but 1/2 and 2/3 are not.
4s (where s = length of a side)
A=?r2
4. What is one misleading characteristic of quadratic equations that will be exploited on the GRE?
Sqr( x2 -x1) + (y2- y1)
2pi*r
That they often have not just one answer - but two. For example - solving x² -10x + 24 = 0 factors to (x-4)(x-6)=0 - which means x could equal either 4 or 6. Just accept it.
y2-y1/x2-x1
5. How do you find the sum of an arithmetic sequence?
Opens down
Number of desired outcomes/number of total outcomes
(n/2) * (t1+tn)
A circle'S perimeter is roughly 3x its diameter (the formula is pd).
6. Area of Trapezoid
Ac+ad+bc+bd
Groups - teams - or committees.
Less
1/2 h (b1 + b2)
7. How do you calculate the probability of EITHER one event OR another event happening? (Probability of A or B)
Multiply each numerator by the other fraction'S denominator. Example: 3/7 and 7/12. Multiply 312 = 36 - and 77 = 49. If you completed the full calculation - you'd also cross-multiply the denominators - but you don'T have to in order to compare values
The average - mean - median - or mode.
Probability A + Probability B
Lwh
8. Quadratic Formula
Proportionate values are equivalent. Example: 1/2 and 4/8 are proportionate - but 1/2 and 2/3 are not.
The part of a circle that looks like a piece of pie. A sector is bounded by 2 radii and an arc of the circle.
b±[vb²-4ac]/2a
Less
9. Volume of sphere
1/3Bh
4/3pir^3
Middle term
Slope = rise/run. Find the change in y-coordinates (rise) and the change in x-coordinates (run) to calculate.
10. In a parabola - if the first term is positive - the parabola ________.
(n/2) * (t1+tn)
1/3pir^2*h
½(base x height) [or (base x height)÷2]
Opens up
11. If something is certain to happen - how is the probability of this event expressed mathematically?
1/1
(n degrees/360) * 2(pi)r
1.4
4/3pir^3
12. x^-a =
2Length + 2width [or (length + width) x 2]
1/x^a
Bh
The set of points which are all the same distance (the radius) from a certain point (the center).
13. If an event can happen N ways - and another can happen M ways - then both events together can happen in ____ ways.
(x+y)(x-y)
Opens down
y = mx + b -- where: x -y are the coordinates of any point on the line (allows you to locate) m is the slope of the line b is the intercept (where the line crosses the y-axis) - Sometimes on the GRE - 'a' is substituted for 'm' - as in 'y = ax + b'.
N x M
14. When a line crosses two parallel lines - ________.
(n/2) * (t1+tn)
Ac+ad+bc+bd
1.7
The four big angles are equal and the four small angles are equal
15. How do you find the sum of a geometric sequence?
1/x^a
T1 * r^(n-1)/(r-1)
1/3Bh
Middle term
16. Rough est. of v3 =
1.7
Lw
A segment connecting the center of a circle to any point on the circle
(x+y)²
17. What is the sum of the inside angles of an n-sided polygon?
(n-2)180
The part of a circle that looks like a piece of pie. A sector is bounded by 2 radii and an arc of the circle.
2l+2w
1. Factored: x² - y² Unfactored: (x+y)(x-y) 2. Factored: (x+y)² Unfactored: x² + 2xy + y² 3. Factored: (x-y)² Unfactored: x² - 2xy + y²
18. What do combination problems usually ask for?
x°/360 times (2 pi r) - where x is the degrees in the angle
Subtract the exponents - retain the base For example - x? ÷ x4 = x?-4 = x5
1/3Bh
Groups - teams - or committees.
19. Area of a triangle
A(b+c) = ab + ac a(b-c) = ab - ac For example - 12(66) + 12(24) is the same as 12(66+24) - or 12(90) = 1 -080.
Lw
½(base x height) [or (base x height)÷2]
The set of points which are all the same distance (the radius) from a certain point (the center).
20. Define the 'Third side' rule for triangles
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21. Volume of Cone
1/x^a
?d OR 2?r
1/3pir^2*h
S² - where s = length of a side
22. Does order matter for a permutation? How about for a combination?
That they often have not just one answer - but two. For example - solving x² -10x + 24 = 0 factors to (x-4)(x-6)=0 - which means x could equal either 4 or 6. Just accept it.
2(pi)r(r+h)
2Length + 2width [or (length + width) x 2]
Order does matter for a permutation - but does not matter for a combination.
23. What do permutation problems often ask for?
Sum of the lengths of the sides
Arrangements - orders - schedules - or lists.
(n degrees/360) * (pi)r^2
Quadrant 1 is top right. Q 2 is top left. Q 3 is bottom left. Q 4 is bottom right.
24. Sector
A digit is a number that makes up other numbers. There are ten digits: 0 -1 -2 -3 -4 -5 -6 -7 -8 -9. Every 'number' is made up of one or more digits. For example - the number 528 is made up of three digits - a 5 - a 2 - and an 8.
(a-b)(a²+ab+b²)
The part of a circle that looks like a piece of pie. A sector is bounded by 2 radii and an arc of the circle.
Absolute value is a number'S distance away from zero on the number line. It is always positive - regardless of whether the number is positive or negative. It is represented with | |. For example - |-5| = 5 - and |5| = 5.
25. (a+b)(a-b)=
Pi*r^2
Opens up
A²-b²
A=bh
26. Circumference of a circle using radius
?d OR 2?r
The total # of possible outcomes.
2pi*r
Lwh
27. What is the formula for the diagonal of any square?
x²-y²
S*v2
2(pi)r(r+h)
1/3Bh
28. What is the area of a triangle?
An ange whose vertex is the center of the circle
2 pi r
C =?d
1/2bh
29. Perimeter of a rectangle
(a-b)²
T1 + (n-1)d
2Length + 2width [or (length + width) x 2]
The total # of possible outcomes.
30. Perimeter of polygon
Subtract the exponents - retain the base For example - x? ÷ x4 = x?-4 = x5
½(base x height) [or (base x height)÷2]
Interior angles are equal: 60:60:60 degrees each. All sides are equal length.
Sum of the lengths of the sides
31. What is a '30:60:90' triangle?
This is an equilateral triangle that has been divided along its height. Interior angles are 30:60:90 degrees. Ratio of sides is x:xv3:2x - where x is the base - xv3 is the height - and 2x is the hypotenuse. This allows you to deduce any side - given
(n degrees/360) * 2(pi)r
y = mx + b -- where: x -y are the coordinates of any point on the line (allows you to locate) m is the slope of the line b is the intercept (where the line crosses the y-axis) - Sometimes on the GRE - 'a' is substituted for 'm' - as in 'y = ax + b'.
x°/360 times (?r²) - where x is the degrees in the angle
32. Volume of pyramid
2(pi)r(r+h)
1/3Bh
A²-b²
Arrangements - orders - schedules - or lists.
33. How do you solve a permutation?
1. Figure out how many slots you have (i.e. there are 3 winning positions in a race - 1st - 2nd - and 3rd) 2. Write down the number of possible options for each slot (i.e. 5 runners in the race - so 5 options for the 1st slot - 4 options for the 2nd
Pi*d
Sum of terms/number of terms
Lwh
34. What is the average speed?
(n/2) * (t1+tn)
Multiply all elements of both sides of the equation by 2 (the denominator of the fraction). This will produce 10x + 3 = 14x. Solve from there: 3 = 4x - x = 3/4.
Total distance/total time
Arrangements - orders - schedules - or lists.
35. What is the probability?
y2-y1/x2-x1
Number of desired outcomes/number of total outcomes
2Length + 2width [or (length + width) x 2]
The length of any one side of a triangle must be less than the sum of the other two sides. It must also be greater than the difference between the other two sides. So - 'A' will always be < B+C - and > B-C or C-B.
36. Explain the special properties of zero.
½(base x height) [or (base x height)÷2]
An isoceles right angle. Remember that interior angles are 90:45:45 degrees. The ratio of sides is x:x:xv2 - where xv2 is the hypotenuse.
Pi*d
Zero is even. It is an integer. It is neither positive nor negative. Zero multiplied by any other number = zero. You cannot divide by zero.
37. Circumference of a circle
4s (where s = length of a side)
Middle term
(x+y)²
?d OR 2?r
38. How do you find the nth term of a geometric sequence?
Pir^2h
(n degrees/360) * 2(pi)r
?r²
T1 * r^(n-1)
39. What is the distance formula?
A segment connecting the center of a circle to any point on the circle
(x1+x2)/2 - (y1+y2)/2
N x M
Sqr( x2 -x1) + (y2- y1)
40. Rough est. of v1 =
1
y-y1=m(x-x1)
1/2 h (b1 + b2)
1.4
41. Diameter
The distance across the circle through the center of the circle.The diameter is twice the radius.
y = k/x
(pi)r^2
1/2 h (b1 + b2)
42. Define the median of a set of numbers - and how to find it for an odd and even number of values in a set.
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43. What is an 'equilateral' triangle?
Interior angles are equal: 60:60:60 degrees each. All sides are equal length.
The part of a circle that looks like a piece of pie. A sector is bounded by 2 radii and an arc of the circle.
(pi)r^2
Equal
44. What is 'absolute value' - and how is it represented?
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45. Arc
Part of a circle connecting two points on the circle.
1. Factored: x² - y² Unfactored: (x+y)(x-y) 2. Factored: (x+y)² Unfactored: x² + 2xy + y² 3. Factored: (x-y)² Unfactored: x² - 2xy + y²
y = kx
The distance from one point on the circle to another point on the circle.
46. How do you calculate the surface area of a rectangular box?
Calculate and add the areas of all of 6 its sides.Example: for a rectangle with dimensions 2 x 3 x 4 - there will be 2 sides each - for each combination of these dimensions. That is - 2 each of 2x3 - 2 each of 3x4 - and 2 each of 4x2.
(a+b)(a²-ab+b²)
?d OR 2?r
Add the exponents - retain the base. for example - x² + x5 = x²+5 = x7
47. a³-b³
2pi*r
Part of a circle connecting two points on the circle.
(a-b)(a²+ab+b²)
T1 * r^(n-1)/(r-1)
48. What is the factored version of (x+y)(x-y) ?
Proportionate values are equivalent. Example: 1/2 and 4/8 are proportionate - but 1/2 and 2/3 are not.
This triangle is a square divided along its diagonal. Interior angles are 90:45:45 degrees. The ratio of sides is x:x:xv2 - where xv2 is the hypotenuse.
N x M
x²-y²
49. In a parabola - if the first term is negative - the parabola ________.
Opens down
x°/360 times (2 pi r) - where x is the degrees in the angle
2l+2w
(a-b)(a²+ab+b²)
50. Area of a trapezoid
½(b1 +b2) x h [or (b1 +b2) x h÷2]
Opens down
4s
The set of points which are all the same distance (the radius) from a certain point (the center).