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Test your basic knowledge |
SAT Math: Concepts And Tricks
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Subjects
:
sat
,
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. Similar triangles have the same shape: corresponding angles are equal and corresponding sides are proportional
Solving a System of Equations
Average Rate
Similar Triangles
Adding and Subtraction Polynomials
2. To find the slope of a line from an equation - put the equation into slope-intercept form (m is the slope): y=mx+b
Multiples of 3 and 9
Even/Odd
Using an Equation to Find the Slope
Average of Evenly Spaced Numbers
3. Use special triangles - pythagorean theorem - or distance formula: v(x2-x1)²+(y2-y1)²
Finding the Distance Between Two Points
Average of Evenly Spaced Numbers
Median and Mode
Combined Percent Increase and Decrease
4. Direct variation: equation: y=kx - where k is a nonzero constant trick: y changes directly as x does inverse variation: equation: xy=k trick: y doubles as x halves and vice-versa
Combined Percent Increase and Decrease
Direct and Inverse Variation
Domain and Range of a Function
Adding/Subtracting Signed Numbers
5. To divide fractions - invert the second one and multiply
Percent Increase and Decrease
Determining Absolute Value
Average Rate
Dividing Fractions
6. Add up numbers and divide by the number of numbers - Average=(sum of terms)/(# of terms)
Solving an Inequality
Rate
Average Formula -
Area of a Sector
7. Divisible by 3 if: sum of it's digits is divisible by 3 - divisible by 9 if: sum of digits is divisible by 9
Finding the midpoint
Area of a Sector
Multiples of 3 and 9
Percent Increase and Decrease
8. The 3 angles of any triangle add up to 180 degrees - an exterior angles of a triangle is equal to the sum of the remote interior angles - the 3 exterior angles add up to 360 degrees
Interior and Exterior Angles of a Triangle
Adding/Subtracting Fractions
Adding and Subtracting monomials
Tangency
9. Factor out the perfect squares
Area of a Sector
Simplifying Square Roots
Probability
Characteristics of a Rectangle
10. All acute angles are = all obtuse angles are = any obtuse angle+any acute angle= 180
Parallel Lines and Transversals
Prime Factorization
Number Categories
Triangle Inequality Theorem
11. Subtract the smallest from the largest and add 1
Finding the Original Whole
Counting Consecutive Integers
Multiples of 2 and 4
Adding/Subtracting Signed Numbers
12. Use this example: Example: after a 5% increase - the population was 59 -346. What was the population before the increase? Work: 1.05x=59 -346 Answer: 56 -520
Using an Equation to Find the Slope
Parallel Lines and Transversals
Prime Factorization
Finding the Original Whole
13. When two lines intersect - adjacent angles (angles next to each other) are supplementary (=180) and vertical angles are equal
Intersecting Lines
Reducing Fractions
Using Two Points to Find the Slope
Using the Average to Find the Sum
14. The whole # left over after division
Using an Equation to Find the Slope
Solving a System of Equations
Using the Average to Find the Sum
Remainders
15. To evaluate an algebraic expression - plug in the given values for the unknowns and calculate according to PEMDAS
Evaluating an Expression
Simplifying Square Roots
Domain and Range of a Function
Similar Triangles
16. 1. Re-express them with common denominators 2. Convert them to decimals
Multiplying/Dividing Signed Numbers
Counting the Possibilities
Comparing Fractions
Remainders
17. When a line is tangent to a circle the radius of the circles perpendicular to the line at the point of contact
Length of an Arc
Tangency
Average Formula -
Percent Increase and Decrease
18. The largest factor that two or more numbers have in common.
Greatest Common Factor
Multiplying and Dividing Powers
Adding/Subtracting Fractions
Volume of a Rectangular Solid
19. To multiply fractions - multiply the numerators and multiply the denominators
Tangency
Multiplying Monomials
Solving a Proportion
Multiplying Fractions
20. An isosceles triangle has 2 equal sides and the angles opposite the equal sides (base angles) are also equal - an equaliteral is a triangle where all 3 sides are equal - thus the angles are equal - regardless of side length the angle is always 60 deg
Area of a Sector
Union of Sets
Rate
Isosceles and Equilateral triangles
21. A rectangle is a four-sided figure with four right angles opposite sides are equal - diagonals are equal; Area of Rectangle = length x width
Characteristics of a Rectangle
Union of Sets
Pythagorean Theorem
Number Categories
22. To solve a proportion - cross multiply
Solving a Proportion
Intersecting Lines
Counting Consecutive Integers
Raising Powers to Powers
23. Integers are whole numbers; they include negtavie whole numbers and zero - Rational numbers can be expressed as a ratio of two integers - irration numbers are real numbers that cant be expressed precisely as a fraction or decimal.
Average Rate
Identifying the Parts and the Whole
Exponential Growth
Number Categories
24. Use units to keep things straight (make sure you use 1 unit for each thing) Example: use just inches in your cross multiplication - not inches and feet
Length of an Arc
Rate
PEMDAS
Mixed Numbers and Improper Fractions
25. If a right triangle's leg-to-leg ratio is 3:4 - or if the leg-to-hypotenuse ratio is 3:5 or 4:5 - it's a 3-4-5 triangle and you don't need to use the Pythagorean theorem to find the third side
The 3-4-5 Triangle
Using an Equation to Find an Intercept
Determining Absolute Value
Counting the Possibilities
26. Multiplying: multiply the #s inside the root - but KEEP the ROOT sign - dividing: divide the #s inside the root - but KEEP the ROOT sign
Multiplying and Dividing Roots
Exponential Growth
The 3-4-5 Triangle
Comparing Fractions
27. Multiply the exponents
Area of a Sector
Finding the Original Whole
Raising Powers to Powers
Factor/Multiple
28. The absolute value of a number is the distance of the number from zero - since absolute value is distance it is always positive
Raising Powers to Powers
Determining Absolute Value
Volume of a Rectangular Solid
Solving a System of Equations
29. Domain: all possible values of x for a function range: all possible outputs of a function
(Least) Common Multiple
Domain and Range of a Function
Comparing Fractions
Finding the Missing Number
30. A decimal with a sequence of digits that repeats itself indefinitely; to find a particular digit in the repetition - use the example: if there are 3 digits that repeat - every 3rd digit is the same. If you want the 31st digit - then the 30th digit is
Using an Equation to Find the Slope
Area of a Sector
Repeating Decimal
Average Rate
31. Growth pattern in which the individuals in a population reproduce at a constant rate; j-curve graph-- logarithmic - FORMULA: y=a(1+r)^ EXPLANATION: a = initial amount before measuring growth/decay r = growth/decay rate (often a percent) x = number of
Interior and Exterior Angles of a Triangle
Multiples of 2 and 4
Multiplying and Dividing Powers
Exponential Growth
32. An arc is a piece of the circumference. If n is the degree measure of the arc's central angle - then the formula is: Length of an Arc = 1 (n/360) (2pr)
Similar Triangles
Length of an Arc
Adding and Subtracting Roots
Finding the Original Whole
33. The smallest multiple (other than zero) that two or more numbers have in common.
Area of a Triangle
Function - Notation - and Evaulation
(Least) Common Multiple
Reciprocal
34. Add the exponents and keep the same base
Multiplying and Dividing Powers
Finding the Missing Number
Dividing Fractions
Counting Consecutive Integers
35. If there are m ways one event can happen and n ways a second event can happen - then there are m × n ways for the 2 events to happen
Pythagorean Theorem
Average Rate
Factor/Multiple
Counting the Possibilities
36. The sum of the measures of the interior angles of a polygon = (n - 2) × 180 - where n is the number of sides
Interior Angles of a Polygon
Remainders
Factor/Multiple
Number Categories
37. The length of one side of a triangle must be greater than the difference and less than the sum of the lengths of the other two sides
Area of a Circle
Percent Increase and Decrease
Raising Powers to Powers
Triangle Inequality Theorem
38. Average A per B: (total A)/(total B) - Example: average speed formula - total distance/ total time - Basically: Don't just average the 2 speeds
Average Rate
Parallel Lines and Transversals
Adding and Subtraction Polynomials
Solving a Quadratic Equation
39. The median is the value that falls in the middle of the set - the mode is the value that appears most often
(Least) Common Multiple
Multiplying Monomials
Using an Equation to Find an Intercept
Median and Mode
40. Integers that have no common factor other than 1 - to determine whether two integers are relative primes break them both down to their prime factorizations
Domain and Range of a Function
Relative Primes
PEMDAS
Area of a Triangle
41. Change in y/ change in x rise/run
Multiplying Fractions
Comparing Fractions
Using Two Points to Find the Slope
Multiplying/Dividing Signed Numbers
42. A square is a rectangle with four equal sides; Area of Square = side*side
Characteristics of a Square
Negative Exponent and Rational Exponent
Multiplying Fractions
Characteristics of a Parallelogram
43. Part = Percent x Whole
Reducing Fractions
Prime Factorization
Domain and Range of a Function
Percent Formula
44. Probability= Favorable Outcomes/Total Possible Outcomes
Adding and Subtraction Polynomials
Solving a Quadratic Equation
Probability
Solving an Inequality
45. To find the reciprocal of a fraction switch the numerator and the denominator
Finding the Missing Number
Surface Area of a Rectangular Solid
Characteristics of a Square
Reciprocal
46. To reduce a fraction to lowest terms - factor out and cancel all factors the numerator and denominator have in common
Tangency
Simplifying Square Roots
Reducing Fractions
Multiplying and Dividing Roots
47. 2pr
Circumference of a Circle
Identifying the Parts and the Whole
Relative Primes
Using the Average to Find the Sum
48. Start with 100 as a starting value - Example: A price rises by 10% one year and by 20% the next. What's the combined percent increase? - Say the original price is $100. Year one: $100 + (10% of 100) = 100 + 10 = 110 Year two: 110 + (20% of 110) = 110
Counting the Possibilities
Combined Percent Increase and Decrease
Dividing Fractions
Reducing Fractions
49. # associated with of on top - # associated with to on bottom Example: ratio of 20 oranges to 12 apples? Work: 20/12 Answer: 5/3
Setting up a Ratio
Number Categories
Function - Notation - and Evaulation
Circumference of a Circle
50. A sector is a piece of the area of a circle. If n is the degree measure of the sector's central angle then the formula is: Area of a Sector = (n/360) (pr^2)
Multiplying Fractions
Adding/Subtracting Fractions
Area of a Sector
Average of Evenly Spaced Numbers