Chapter 1-7

x*-m/n

((x*1/n)*m)*-1

what is the reciprocal way of rewriting the expression x^-m/n

((x^-1)^m)^1/n

(b*m)(b*n)

b*m+n

b*m/b*n

b*m-n

quotient of powers

b*m/b*n

domain of f(x)=-x^8

set of all real numbers

what do you know about the points that make up a function

they can form a horizontal line, but not verticle

what is the nth root way of rewriting the expression x^-m/n

((x^1/n)^m)^-1

what is the mth power way of rewriting the expression x^-m/n

((x^m)^1/n)^-1

the graph of a direct variation function goes through

(0,0)

what point does every power function f(x)=x^n pass through

(0,0) the origin

(ab)*m

(a*m)(b*m)

power of a quotient

(a/b)*m

power of a quotient postulate

(a/b)^m = a^m/b^m

power of a product

(ab)*m

power of a product postulate

(ab)^m = a^m b^m

product of powers

(b*m)(b*n)

power of a power

(b*m)*n

powers of powers postulate

(b^m)^n = b^m*n

i*2

-1

explicit formula

an=a1+(n-1)d

domain of f(x)=-x^9

set of all real numbers

A u B -or/union

the union of sets A and B. Draw all on one graph and leave as is

what is the vertex

(h,k)

what is the vertex of y-k = a(x-h)*2

(h,k)

w varies directly as a variable t

(t,w) w=dependent t=independent

what is a perfect square trinomial

(the square of a binomial) x*2 + 2hx + h*2

y-k=a(x-h)*2

(vertex form for the equation of a parabola) h greater than 0 moves right, h less than 0 moves left, k greater than 0 moves up, k less than 0 moves down

binomial square theorem

(x + y)*2 = x*2 + 2xy + y*2

x*m/n

(x*1/n)*m

discrete domain

not all numbers between

in the direct variation function y=kx what does the constant of variation represent

the slope

natural numbers

1,2,3

(a/b)*m

a*m/b*m

generic notation for is y a function of x

(x, y)

integers

-2,-1,0,1,2

every negative real number has

0 real nth roots when n is even 1 real nth root when n is odd

b*2-4ac is less than 0

0 x intercepts, two non real solutions

whole numbers

0,1,2,3

real numbers

0,1,27,2.34,pie, square root of 5 (all rational and irrationals)

b*2-4ac is equal to 0

1 x intercept, 1 real solution

steps for graphing a linear inequality in the coordinate plane

1-graph the appropriate boundary line (greater than is dashed, greater than or equal to is solid) 2-test (0,0) and see if it satisfies the inequality 3-shade the 1/2 plane that satisfies the inequality

how do we use the linear combination method when there are three equations in standard forms

1-take any pair of equations and eliminate 1 of the variables 2-tale another pair of equation and eliminate the same variable

what is the four step algorithm for using variation functions to predict values

1-write an equation that describes the variation 2-find the constant of variation 3-rewrite the variation functions using the constant of variation 4-evaluate the function for the desired value of the independent variable

how many points determine a line

2

every positive real number has

2 real nth roots when n is even 1 real nth root when n is odd

b*2-4ac is greater than 0

2 x intercepts, 2 real solutions

how many data points do you need in order to fit a quadratic model to data

3 non colinear points, no 2 on the same vertical line

annual compounding interest formula

A(t) = P(1+r/n)^nt a=total amount p=amount invested r=rate compounded t=time in years n=number of times compounded per year

standard form for the equation of a linear function

Ax+By=C

quadratic formula theorem

X=-b+or- the square root of b*2-4ac/2a

what is the complex conjugate of a + bi

a - bi

what is a linear function

a function with an equation in the form of y=mx+b and graphs into a line

what is a scatter plot

a graph of all the ordered pairs in a set of data

what is the range of ax*2 + bx + c

a greater than 0=up, y greater than or equal to k a less than 0=down, y less than or equal to k

what is the range of y-k = a(x-h)*2

a greater than 0=up, y greater than or equal to k a less than 0=down, y less than or equal to k

what is the graph of Ax+By=C when A and B are not both zero

a line

what type of function can always be used to model a constant increase or decrease situation

a linear equation f(x)=mx+b

what is the result of fitting a line to data

a linear model that can be used to estimate the relation in the data

what is a arithmetic sequence

a list of numbers in which the order matters and which has a constant difference between successive terms

what is a geometric sequence

a list of numbers in which the order matters and which has a constant multiplier between successive terms

definition of a complex number

a number in the form a + bi, where a and b are real numbers and i = the square root of -1, a is called the real part and bi is called the imaginary part

what is the curve of a direct variation function called

a parabola

sequence

a pattern (1,3,6,10,15)

what does pitch mean

a ratio

what is a system

a set of conditions (usually expressed as equations or inequalities) joined by the word AND

what is a consistent system of equations

a system which has 1 or more solutions

what is an inconsistent system of equations

a system which has no solutions

rational numbers

a/b when a and b a re both integers, and b does not equal 0

recursive formula

a1=__first term___ an=a(n-1)+d

what is the solution to the simplest quadratic equation x*2 = k

abesolute value of x*2 = square root of k, x = square root of k or x = negative square root of k

what is the piecewise algebraic definition for the absolute value of a number x?

absolute value of x = x for x greater than or equal to 0, -x for x less than 0

how to complete the square of a binomial on x*2 + bx

add (1/2 b)*2 to both sides

how do we add or subtract complex numbers

add or subtract the real parts and add or subtract the imaginary parts, then put in a + bi form

range for the absolute value of x

all nonnegative real numbers

continuous domain

all numbers between

find the domain of a relation

all numbers of the independent variable (x)

domain for the abesolute value of x

all real numbers

domain of the direct variation function y=kx*2 when k is greater than 0

all real numbers

domain of the direct variation function y=kx*2 when k is less than 0

all real numbers

what is the domain and range of an oblique line

all real numbers

what is the domain of ax*2 + bx + c

all real numbers

what is the domain of y-k = a(x-h)*2

all real numbers

find the range of a relation

all the numbers of the dependent variable (y)

correlation coefficent

an r value of ____ would indicate a ___strong/weak, positive/negative___ correlation between the __independent variable__ and the ___dependent variable___

in a geometric sequence what can you tell about the sequence when r is less than 0

as n increases gn alternates between positive and negative numbers

in a geometric sequence what can you tell about the sequence when r is greater than 0 and less than 1

as n increases, gn decreases

in a geometric sequence what can you tell about the sequence when r is greater than 1

as n increases, gn increases

statement for when something is not a function

at least one value of the domain corresponds to more than one value of the range

what is the general quadratic expression

ax*2 + bx + c

what is the general quadratic equation

ax*2 + bx + c = 0

discriminant of the quadratic equation

b*2-4ac

(b*m)*n

b*mXn

negative exponent theorem

b^-n = 1/b^n

product of powers postulate

b^m * b^n = b^m+n

quotient of powers postulate

b^m/b^n = b^m-n

zero exponent theorm

b^n/b^n = b^n-n = b^0 = 1

what is the y intercept of ax*2 + bx + c

c

rewrite d=k/w without fractions

d=kw^-1

the _______ variable is a function of the _________ variable

dependent, independent

y=kx

direct variation, k is the slope, points make an oblique line, domain/range = all real numbers, goes through origin, ordered pain (1,k), do not have asymptotes, k + slope = line going up, k - slope = line going down

which direction does the parabola open when k is less than 0

down

term of a sequence

each number in a sequence 1st=1 2nd=3 3rd=6 4th=10 5th=15

statement for when something is a function

each value of the domain corresponds to exactly one value of the range

what is the general quadratic function

f(x) = ax*2 + bx + c

recursive formula for a geometric sequence

g1=_____ gn = rg(n-1) for integers greater than or equal to 2

in order to write a linear equation in slope-intecept form we need to...

get the y value alone

explicit formula for a geometric sequence

gn = g1(r)^n-1 for integers greater than or equal to 1

equation for free falling objects

h = -1/2 g t*2 + v t + h g=acceleration due to gravity (9.8 m/sec, 32ft/sec) t=time v=initial velocity h= initial height

formula for the amount of time pasturized milk will stay fresh

h(t) = 349 * 10^-.02t

when the rate of change for a linear situation is zero, what type of line do we have

horizontal

y=k/x

hyperbola, inverse variation, vertical asymptote x=0, horizontal asymptote y=0, domain=all real numbers except 0, range=all real numbers except 0, there is no y or x intercepts, graphs into a hyperbola, symmetry line y=x and y=-x

all square roots of negative numbers are multiples of

i

negative exponent

if b does not equal 0, b*-n = 1/b*n

zero exponent

if b does not equal 0, b*0 = 1

how do we know if a system is inconsistent

if the statement has no solutions

parabola congruency

if they have the same a value they are congruent

y=k/x*2

inverse variation, vertical asymptote x=0, horizontal asymptote y=0, domain=all real numbers except 0, range k greater than 0=all real positive numbers except 0, range k less than 0=all real negative numbers except 0, symmetry is y axis (x=0)

what can you conclude about the slope of the direct variation function y=kx

it is constant slope k

what do you know about the rate of change for the direct variation function y=kx*2

it is not constant (the graph is not linear, there is not one slope

in an arithmetic sequence what is true about the difference between any term and the preceding term

it will be the same for every adjacent pair in that sequence. the constant difference

slope of a direct variation function y=kx

k

definition of a direct variation function

k is a non zero constant, called the constant variation, and n is a positive number (y=kx*n)

what is the constant of variation in the definition of direct variation above

k-nonzero constant

what is the graph of the solution to an inequality

linear

how to create a quadratic model for data using your calculator

lists and spreadsheets, enter data, statistics, stat calc., quadratic

the graph of an absolute value

makes a v with 2 straight lines

does the direct variation function have a min or max point when k is less than 0

maximum

does the direct variation function have a min or max point when k is greater than 0

minimum

how do we handle dividing by non real complex numbers

multiply both the numerator and the denominator by the complex conjugate of the denominator. Divide each term in the numerator by the real number result

how to clear fractions

multiply each side of the equation by the least common denominator

what is the range of every power function

n is even = the set of nonnegative real numbers n is odd = the set of all real numbers

parallel lines

no intersection implies the system is inconsistent, no solutions

can you raise a positive number to a power so that the result is negative?

no they just get closer to 0

vertical line test for functions

no vertical line intersects the graph of a function in more than 1 point

what kind of numbers have square roots that are irrational numbers

non perfect squares, square roots that are irrational

range of the direct variation function y=kx*2 when k is greater than 0

nonnegative real numbers

range of the direct variation function y=kx*2 when k is less than 0

nonpositive real numbers

y=kx*2

not linear, graph is a parabola, direct variation, does through origin, ordered pair (1,k), doesn't have one slope, never has asymptotes, ling of symmetry x=0, domain = all real numbers, range k greater than 0= all numbers greater than or equal to 0, range k less than 0= all numbers less than or equal to 0

joint variation

one quantity varies directly as the product of 2 or more independent variables (no division)

the slopes of perpendicular lines are

opposite reciprocals

what do you know if a is less than 0

parabola opens down, graph has a maximum y value (k), the range is less than or equal to k (y is less than or equal to k)

what do you know if a is greater than 0

parabola opens up, y coordinate of the vertex is the minimum y value (k), the range is greater than or equal to k (y greater than or equal to k)

what kinds of numbers have square roots that are rational numbers

perfect square integers (1, 4, 9, 16, 25, 36, 49, 64, 81, 100, 121, 144)

how to find the constant of variation for a particular situation

plug know values into y=kx*n and solve for k

what is another term used for the slope of a linear function

rate of change

if a,b,c are rational numbers and b*2-4ac is a perfect square then then solutions will be

rational

symmetry if n is even

reflection symmetric over the y axis

symmetry if n is odd

rotation symmetry at a 180 degree rotation around the origin

range of f(x)=x^8

set of al nonnegative real numbers y greater than or equal to 0

range of f(x)=-x^8

set of all nonpositive real numbers y less than or equal to 0

domain of f(x)=x^8

set of all real numbers

domain of f(x)=x^9

set of all real numbers

range of f(x)=-x^9

set of all real numbers

range of f(x)=x^9

set of all real numbers

domain of direct variation y=kx

set of real numbers

range of direct variation y=kx

set of real numbers

what translation does the notation T(h,k) indicate

slides a figure h units horizontally, and k units vertically

vertical line

slope is undefined

horizontal line

slope is zero

i

square root of -1

irrational numbers

square root of 2, any square root of a non perfect square, non ending numbers

index

subscript

how do we find the y intercept

substitute 0 for x

how do we find the x intercept

substitute 0 for y

the substitution method for solving systems of equations uses what property of equaltiy

substitution property of equality

what does the word quadratic refer to

sum of possibly constant, possibly term with a variable to the first power, and definitely a term with a variable to the second power with no higher power

linear programming theorem

the feasible region of every linear programming problem is convex, and the maximum or minimum quantity is determined at one of the vertices of this feasible region

what does the phrase "in terms of" mean

the first variable is isolated, and the other side of the sentence includes the "in terms of" variable

A n B -and

the intersection of sets A and B. Draw 2 separate lines and then find what lies on both

what is the solution set for a system

the intersection of the relations (all common ordered pairs)

describe the solution set of a compound sentence which uses the work and to connect two inequalities

the intersection of the solution sets to the individual sentences. Values common to both sets

what does a line graphed in a plane do to the plane

the line separates the plane into 2 distinct regions called half planes, the line is called the boundary line

subscript

the number written below/to the right of a variable tn

what is a piece-wise linear function

the rate of change is constant, but then changes to another constant rate

what is the domain of every power function

the set of all real numbers

define what is meant by a lattice of points

the solution set consists of points whose coordinates are integers are called lattice points

what does it mean when the linear combination method results in a sentence like 0=12

the statement is inconsistent and has no solutions

what does it mean when the linear combination method results in a sentence like 12=12

the system is consistent and has infinitely many solutions

2 intersections

the system is consistent with 2 solutions

same equation

the system is consistent with infinite solutions

no intersections

the system is inconsistent, no solutions

subscripted variable

the variable and its subscript (tn)

which direction does the parabola open when k is greater than 0

up

how do we multiply complex numbers

use the distributive property, then simplify

explicit formula

used to calculate any term in a sequence by substituting a value for n t(n)=n(n+1)/2

how are complex numbers formed

when a real number and an imaginary number are added

what does the term combined variation refer to

when direct and inverse variations occur together

when is a mathematical sentence called an inequality

when it contains one of the symbols (greater than, less than, greater than or equal to, less than or equal to, or not equal)

exponent theorem

when x is greater than or equal to 0 and n is an integer greater than 1, 1/x^n is an nth root of x

when solving inequalities when are we required to reverse the inequality sign

when you multiply or divide by a negative

negative rational exponents

x*-m/n

what is the simplest quadratic expression

x*2

rational exponents

x*m/n

equation for the axis of symmetry of the parabola

x=0

what is the axis of symmetry of y-k = a(x-h)*2

x=h

what is the line of symmetry

x=h

point slope form

y-y1=m(x-x1)

definition of slope

y2-y1/x2-x1

a hyperbola is the graph of what function

y=k/x

inverse

y=k/x*n (if x is multiplied by nonzero constant c, y is divided by c*n)

definition of inverse variation function

y=k/x*n k does not = 0 and n is greater than 0

direct

y=kx*n (if x is multiplied by c, y is multiplied by c*n)

is y a function of x

yes, the graph of an oblique line passes the vertical line test