5th Hour Honors Algebra 2 (Spring 2012): April 2012

Sunday, April 29, 2012

7.6: The Inverse of Trigonometric Functions

Recall from Chapter 3.8 the definition of an inverse function:

Let f be a one-to-one function with domain D and range R. A function g with domain R and range D is the inverse function of f.

In Chapter 7.6, we will take the inverse of trigonometric functions sine, cosine, and tangent. These are denoted several ways:

Sine:
$sin^{-1}(x)$
$arcsin(x)$

Cosine:
$cos^{-1}(x)$
$arccos(x)$
Tangent:
$tan^{-1}(x)$
$arctan(x)$

Because you can only take the inverse of a one-to-one function, we must restrict the domain of the trigonometric functions, since they are not one-to-one.

Sine

$\left [ -\frac{\pi}{2}_,\frac{\pi}{2} \right ]$

Cosine

$\left [ 0, \pi \right ]$

Tangent

$\left [ -\frac{\pi}{2}_,\frac{\pi}{2} \right ]$

Although we alter the domains, the ranges remain the same.

Sine: -1 ≤ x ≤ 1

Cosine: -1 ≤ x ≤ 1

Tangent: -∞ < x < ∞

Properties of the inverse sine:

$\sin (\sin^{-1}x)=\sin (\arcsin x)=x$

$-1\leq x\leq 1$

$\sin^{-1}(\sin y)=\arcsin (\sin y)=y$

$-\frac{\pi}{2}\leq y\leq \frac{\pi}{2}$

Properties of the inverse cosine:

$\cos (\cos^{-1}x)=\cos (\arccos x)=x$

$-1\leq x\leq 1$

$\cos^{-1}(\cos y)=\arccos (\cos y)=y$

$0\leq y\leq \pi$

Properties of the inverse tangent:

$\tan (\tan^{-1}x)=\tan (\arctan x)=x$

$-\infty < x< \infty$

$\tan^{-1}(\tan y)=\arctan (\tan y)=y$

$-\frac{\pi}{2}\leq y\leq \frac{\pi}{2}$

- Olivia Darany

Tuesday, April 24, 2012

7.3

7.3 The Addition and Subtraction Formulas

Addition and subtraction formulas can help you to find exact values of trigonometric equations, solve for identities, etc.

http://math.ucsd.edu/~wgarner/math4c/textbook/chapter6/addsubformulas.htm <= good site to see how these formulas are derived

Cosine Formulas
cos(x + y) = cosx cosy - sinx siny
cos(x - y) = cosx cosy + sinx siny

Sine Formulas
sin(x + y) = siny cosx + cosy sinx
sin(x - y) = siny cosx - cosy sinx

Tangent Formlas
$tan(x-y)= \tfrac{tanx-tany}{1+tanx tany}$

$tan(x+y)= \tfrac{tanx+tany}{1-tanx tany}$

Examples of how to apply the formulas:

Cofunction Formulas: In these formulas, 'u' is a variable that is taking place for a real number or radian measure of an angle

-Hannah

7.4:Multiple-Angle Formulas

7.4: Multiple-Angle Formulas
Hi! In this chapter we mostly just derived a bunch of new identites (below). Hope it's helpful.

Double Angle Identities:

This identity is derived using an addition formula (sin(x+y)=sinxcosy+cosxsiny).

Like the identity above, this one also uses an addition formula.

To derive this identity, we used the formula from #2 and substituted in one minus cosine theta squared in place of sine theta squared (trigonometric identity).

We derived this identity using the addition formula for tangents.

Power Reducing Identities:

1. To derive this identity, we used a previous identity that had sine squared in it, we then solved for sine squared.
2. This one is very similar to the first but with cosine instead.
3. For tangent squared, we substituted in equations equal to sine squared over cosine squared.

Half-Angle Identities:

1. To verify this identity we substituted u in for two theta.
2. (typo- last line should be: cos(u/2)=+/- V(1+cosu)/2 )
3. Solved by putting the identity we solved for sin(u/2) over the identity for cos(u/2).

Identities!!

Monday, April 16, 2012

7.1 Verifying Trigonometric Identities

Trigonometric Expression- Contains symbols involving trigonometric functions.

When verifying an identity, there are 3 things to keep in mind:

Reciprocal identities

Tangent and cotangent identities

Pythagorean identities

It's also important to remember to cancel out factors, don't cancel out terms.

It's easier to start with the more complicated side of the equation so you can transform it into the other side using basic identities.

Here's an example that was in our homework:

(sin(θ))4 +2(sin(θ))2(cos(θ))2 + (cos(θ))4 = 1

((sin(θ))2 + (cos(θ))2) ((sin(θ))2 + (cos(θ))2) = 1 -----------> FOIL

(1)(1) = 1 --------------->pythagorean identity

This section is basically all review and we've already learned how to do this, so I'm not sure what else to say. Sorry if this is slackerish!

Megan

Tuesday, April 10, 2012

6.5 Trigonometric Graphs (sine and cosine)

This section was about the trigonometric graphs of sine and cosine.

To start off with, we have the graph of f(x) = sin x:

adding a value in front of sin we can stretch or compress the graph vertically, such as with

f(x) = 2sin x

we call this 'a' in the formula f(x) = a sin (bx-c)+d. b will stretch or compress vertically (although smaller numbers stretch and larger numbers compress), c will transform the graph horizontally (like b, it is counter intuitive), and d will transform vertically. For example, the graph of

f(x) = sin x+5

is shifted 5 up from f(x) = sin x, and f(x) =3 sin (1/3x-3)

is stretched vertically by a factor of 3, stretched horizontally by a factor of 3 and moved 3 to the right.

If a is negative, that will flip the graph over the midline, and if b is negative, that will flip the graph over the y-axis.

You can use the formula to draw the graph by knowing that |a|= amplitude and period = 2

π/| b|.

You can also use the amplitude and period to figure out the original values of a and b in the function by taking the measurements of the amplitude and period.

All of these rules apply to cosine, but f(x) = cos x looks like

Thanks for reading, and i apologize for my abysmal post writing skills.

Dan