Alright well this week we learned identities and equations. At first it was really hard for me until I learned my trig identities. Here are the steps to solving these equations:
1. check identities
2. algebra
3. identities
These are the identities to memorize:
Reciprocal Relationships:
cscΘ=1/sinΘ
secΘ=1/cosΘ
cotΘ=1/tanΘ
Relationships with Negatives:
sin -Θ= -sinΘ and cos -Θ= -cosΘ
csc -Θ= -cscΘ and sec -Θ= -secΘ
tan -Θ= -tanΘ and cot -Θ= -cotΘ
Pythagorean Relationships:
sin²Θ+cos²Θ=1
1+tan²Θ=sec²Θ
1+cot²Θ=csc²Θ
Cofunction Relationships:
sinΘ=cos(90°-Θ) and cosΘ=sin(90°-Θ)
tanΘ=cot(90°-Θ) and cotΘ=tan(90°-Θ)
secΘ=csc(90°-Θ) and cscΘ=sec(90°-Θ)
***Cautions***
You cannot divide trig functions to cancel them
You can move everything to one side and factor out a trig function
You can divide by a trig function to create a new one
Helpful information:
I - II : make negative then add 180
I- III : add 180
I - IV : make negative then add 360
Sin- positive in 1 and 2... negative in 3 and 4
Cos- positive in 1 and 4. ..negative in 2 and 3
Tan- positive in 1 and 3... negative in 2 and 4
I could use some help with proving equations in section 8-4 if anyone has any helpful hints!!
Goodluck on the Chapter 8 Test tomorrow :)
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Proving equations is pretty easy. All you do is solve the problem to make it make the equation make since.
ReplyDeleteok for proving equations you're pretty much just showing work...
ReplyDeleteExample: prove
cotA(1+tan^2A)/tanA=csc^2A
cotA(sec^2A)/tanA
cosA/sinA(1/cos^2A)/sinA/cosA
cosA/sinAcos^2A/sinA/cosA
cos^2A/sin^2AcosA
1/sin^2A
csc^2A
proving something is just another way to say "SHOW ME WHAT YOU DID" the goal of proving is to show you didnt make a mistake and that you know the steps forward and backward so work out each problem carefully and keep consice work for each problem and you'll be fine
ReplyDelete