UGA Math Placement Test

in quadratics, (x,y) are equal to what in standard form

(h,k)

x to the p/n

(n square root) to p

axis of symmetry equals

-b/2a

h equals

-b/2a

sin(-t), cos(-t), tan(-t)

-sin(t), -cos(t), -tan(t)

logb(1)

0

4=5 (lin equation)

0 solutions

logb(B)

1

sin squared plus cos squared

1

x to the -n

1 divided by x to the n

x=5 (lin equation)

1 solution

sec

1/cos

sin

1/cos

cot

1/cot

tan

1/cot

cos

1/sin

csc

1/sin

velocity equals what when units are in feet

16

cos(2x)

2cos squared x minus 1

sin(2x)

2sin(x)cos(x)

tan(2x)

2tan(x)/ 1-tan^2(x)

velocity equals what when units are in meters

4.9

b^logb(A)

A

logb(B^A)

A

Interval notation

Bracket= definite, parentheses = indefinite

logb(A^C)

ClogbA

rational expression

a fraction where the numerator and denominator are polynomials

Standard Form of a Line

ax plus by equals c

standard form of quadratic equation

ax^2 + bx +c = 0

cos(a + b)

cos(A)cos(B) + sin(a)sin(b)

cot(x) =

cos/sin

1 plus cot squared

csc squared

distance formula

d squared= delta x squared plus delta y squared

k equals

f(h)

Rational Function Formula

f(x)=a/b(x-h) +k

if dividing an inequality by a negative number

flip the sign

5=5 (lin equation)

infinite solutions

f(x + or - b)

left/right

if slopes are equal

lines are parallel

if slopes are opposite reciprocals

lines are perpendicular

a^b=c

log base a C = b

logbA + logbC

logb(A x C)

logbA - logbC

logb(A/C)

logb(A x C)

logbA + logbC

logb(A/C)

logbA - logbC

an increase in b

moves function inward

an increase in h

moves function left/right

an increase in a

moves function outward

a change in k

moves function up/down

x to the 1/n

n root x

x to zero

one

cos (x/2)

plus or minus square root 1+cos(x)/2

sin (x/2)

plus or minus square root 1-cos(x)/2

-f(x)

reflects over x axis

f(-x)

reflects over y axis

if an object strikes the ground that means

s(t)=0

tan squared plus 1

sec squared

sin(a + b)

sin(a)cos(b) + cos(a)sin(b)

tan (x/2)

sin(x)/ 1-cos(x)

tan(x) =

sin/cos

tan(a +b)

tan(a) + tan(b)/ 1-tan(a)tan(b)

k equals

the constant of variation

the maximum of a negative quadratic is located at

the vertex

f(x) + or - b

up/down

Quadratic Formula

x equals -b plus or minus the square root of b squared minus four ac over 2a

(x/y) to the a

x to the a divided by x to the b

x to the a / x to the b

x to the a minus b

x to the a times x to the b

x to the a plus b

(xy) to the a

x to the a times x to the b

Two Point Formula

y-y1=(y2-y1)/(x2-x1) x (x-x1)

Point Slope Formula

y-y1=m(x-x1)

vertex form of a quadratic

y= a(x-h)^2 + k

the rule that generates a function is

y=f(x)

Slope Intercept Formula

y=mx+b