unit 3 test math

sin(pi)

0

sin(pi/2)

1

Pythagorean Identity

1+tan^2x=sec^2x

sin(pi/6)

1/2

the conventional domain for y=cos(x) is restricted to [0,pi] in order to define y=cos^-1(x) as a function. what intervals could also be the restricted domain of y=cos(x) in order for it to be invertible, making y=cos^-1(x) its inverse function

[-2pi, -pi] [-pi, 0] [pi, 2pi]

not an identity

cos(-x)=-cos(x)

half angle formula

cos(a/2)=+/- sqrt (1+cosa/2)

complementary angle theorem

cos(pi/2-x)=sinx

cos(a-b)

cosAcosB+sinAsinB

cos(a+b)

cosAcosB-sinAsinB

Reciprocal Identity

cotx=1/tanx

(cosa-cosB)^2+(sina-sinB)^2=(cos(a-B)-1)^2+(sin(a-B)-0)^2

equation comes from the fact that the red line on the left is the same length as the red line on the right

in quad 2 the secant is negative and the tangent is positive

false

in quad 4 the cotangent is positive and the cosecant is negative

false

secant and tangent never have the same sign

false

sine and cosine never have the same sign

false

2*sqrt5/5

find the exact value of sin(tan-1(2))

cos=sec

pi, 2pi

sin(x)=1/2

pi/6, 5pi/6

1

simplify (cos^4(x)-sin^4(x))/(cos2x)

2sinxsiny

simplify cos(x-y)-cos(x+y)

0.23+/- 0.04

simplify tan(sin^-1(2/9))

0.31

simplify tan(sin^-1(3/10))

double angle formula

sin2x=2sinxcosx

sin(a+b)

sinAcosB+cosAsinB

sin(a-b)

sinAcosB-cosAsinB

false

t/f? sin^-1(sin(3pi/4))=3pi/4

even-odd identity

tan(-x)=-tan(x)

7sin(x)+x=1 solutions

there are two negative solutions and three positive solutions

cotangent and tangent always have the same sign where they are both defined

true

in quad 1 and 2 the tangent and cosine have the same sign where they are both defined

true

in quad 2 the sine is positive and the cosine is negative

true

in quad 4 the sine is negative and the secant is positive

true

the sine and the cosecant always have the same sign where they are both defined

true

1.23

use a calculator to find the value of the expression sec-1(3)

negative

when using the half angle formula to compute cos(17pi/12), will you use the positive root or negative root?

the inverse sine function is given by the equation y=sin^-1(x). find the equivalent

x=sin(y)

sin(pi/4)

√2/2

sin(pi/3)

√3/2