Math Concepts

Question 1

Prime Number

Answer 1

Number that has exactly 2 factors.
Only positive integers.
2 is the only prime number. Every even prime number greater than 2 has at least 3 factors.
First 8 prime numbers: 2,3,5,7,11,13,17,19

Question 2

Factor Foundation Rule

Answer 2

If c is divisible by primes a and b, then c is divisible by (a*b)

Question 3

“Greatest number than x must be divisible by”

Answer 3

LCM

Question 4

Double Cross Method

Answer 4

Use when adding fractions and when finding when a fraction is greater than or equal to other fractions

Question 5

What percent

Answer 5

x/100

Question 6

What percent of

Answer 6

turn what percent into x/100, then multiply.

ex: What percent of 200 is 60 = (x/100)200=60

Question 7

x% of

Answer 7

1) Convert x% into decimal/fraction
2) Multiply, or
1) find a power of 10 of x%
2) multiple/divide to get to x%

ex: 30% of 200 = 0.30x200 = 60
30% = 20x3 = 60

Question 8

percent change formula

Answer 8

Percent change (as percent of original)
=
Change in value/Original Value

Question 9

Unknown Multiplier

Answer 9

The number by which you multiply the ratio to get to the actual number.

*Always the same for all parts of a ratio

Question 10

Least common multiple (LCM)

Answer 10

The LCM of 2 numbers is the smallest number that is a multiple of both numbers

i.e: 3 & 10 = 30
6 & 9 = 18

*If x is divisibke by A & by B, then x is divisible by the LCM of A & B no matter what

Question 11

The double cross Method

Answer 11

1) Draw arrows and multiple
2) Add the numerators
3) Simplify

ex: 5/6 + 3/8 = ((58) + (36))/(6*8) = (40 + 18)/48 = 58/48=29/24

Question 12

Double Cross Fraction Comparison

Answer 12

1) set the fractions up near each other
2) Multiple “up” the arrows. Be sure to put the resulting number at the top of each respective error
3) Compare the numbers. The side with the bigger number is the bigger fraction

ex: 3/5 and 4/7
(37) and (45) = 21 and 20.
Since 21 is greater than 20, 3/5 is greater than 4/7

Question 13

Improper fraction to mixed number

Answer 13

1) rewrite the number as a sum
2) Split the fraction

ex:

1) 13/4 = 12/4 + 1/4 = 3 + 1/4 =3 1/4
2) 11/6 = 6/6 + 5/6 = 1 5/6
3) 100/11 = 99/11 + 1/11 = 99 1/11

Question 14

Mixed Number to Improper fraction

Answer 14

Shortcut:
((denom) (integer) + num)/denom

ex:
7 3/8 => ((8) (7) +3)/8= 59/8

Note: I already do it this way

Question 15

% decrease of 50%

Answer 15

= New percent of 50%

= Multiple original value by 0.5 or 1/2

Question 16

Divide a number by (+) 10^-x

Answer 16

When dividing any number by a negative power of 10, move the decimal to the right

ex:
53.0447/10^-2 = 5304.47

Question 17

Multiple a number by (+)10^x

Answer 17

When multiplying any number by a positive power of 10, move the decimal to the right of the specified number of places

ex:
3.9742 x 10^3 = 3,974.2

Question 18

Multiple a Decimal & a Big Number

Answer 18

When one number is very big and the other is very small, you can trade powers of 10 from the big one to the small one.

Similar to: Move one decimal point to the left and the other to the right.

ex:
4,000,000 x 0.0003 = 400 x 3 = 120
50,000 x 0.007 = 50 x 7 = 350

Question 19

Numerator and Denominator Rules

Answer 19

1) (up arrow) numerator, -denom => (up arrow) fraction
2) (up arrow) denom, =numer => (down arrow) fraction
3) adding same value to both numer & denom => fraction goes toward 1

a) if fraction <1, then fraction increases as it approaches 1
b) if fraction >1, then fraction decreases as it approaches 1

Question 20

Interest Formula

Answer 20

Total Amount = P(1 + r/n)^nt

P = Principal, r = rate (in decimal form), n = number of times/year, t= number of years

Question 21

Multiply a number by (+) 10^-x

Answer 21

When multiplying any number by a negative power of 10, move the decimal to the left

e.x: 6782.01 x 10^-3 =6.78201

Question 22

Exponent base

Answer 22

Fractional Base: When base id (+) proper decimal/fraction, the exponent (up arrow) the value of the expression (down arrow)

Compound base: an exponent can be distributed a product (10^3 = (2x5)^3 = 2^3 x 5^3)

Base of -1: (-1)^odd = -1
(-1)^even = 1

Negative base: the exponent does not distribute unless the (-)ve sign is inside the parenthesis

Question 23

Combining exponential terms

Answer 23

When multiplying 2 exponential terms, w/the same base, add the exponents

When dividing 2 exponential terms w/the same base, subtract the exponent

Any base to the 0 power = 1

0^0 is undefined

X^-3 = 1/x^3

When you raise an exponential term, multiply the exponents

Question 24

Divide 2 decimals

Answer 24

Write the division as a fraction

Move the decimals in the same direction on the top and the bottom

Ex.: 300/0.05 = 30,000/5 = 6000
12.39/0.003 = 12,390/3=4130

Question 25

Expression

Answer 25

Represents a value

Does not contain an equal sign

To simplify:
1)	Combine like terms
2)	Find a common denominator
3)	Pull out a common factor
Cancel common factors

Question 26

High school algebra rule

Answer 26

1) N variables require N equations to solve
2) Good to use when P.S.
Does not always work w/D.S

Question 27

Odd exponents

Answer 27

Less than -1=> result is smaller
Between -1 and 0 =>result is bigger
Between 0 and 1 =>result is smaller
Greater than 1 => result is bigger

Odd exponents preserve the sign of the original expression

Question 28

Even exponents

Answer 28

Less than -1=> result is bigger
Between -1 and 0 => result I bigger
Between 0 and 1 => result is smaller
Greater than 1 => result is bigger

Even exponents hide the sign of the original number

An integer raised to a positive even power, is always a perfect square

Question 29

Equation I xI = a

Answer 29

When you have an equation in the form I x I =a with a>0, then x=+/- a

Question 30

Divide a number by (+) 10^x

Answer 30

When dividing any number by a positive power of 10, move the decimal to the left the specified number of places.

e.x: 4,162.9 /10^2 = 41.629

Question 31

Sector Area/Circle Area=

Answer 31

Arc Length/Circumference

Question 32

The Triangle Inequality Theorem

Answer 32

The sum of any 2 sides of a triangle must be greater than the measure of the third side

Question 33

Relationship between triangle side lengths and angles

Answer 33

Sides correspond to their opposite angles. The longest side is opposite the largest angle, and the smallest side is opposite the smallest angle.

Question 34

Parallelogram

Answer 34

Any 4-sided figure in which the opposite sides and a parallel and equal. Opposite angles are also equal, and adjacent angles add up to 180 degrees.

Perimeter=Sum of all sides
Area=base x height

Question 35

For any even number of consecutive integers,

Answer 35

the sum of all the integers is never a multiple of the number of integers

Question 36

Triple Venn diagrams can be solved with the following formula:

Answer 36

Sum of totals in three individual categories – (sum of items in exactly two categories) - (2 * number of items in all three categories) + Neither = Total