This week, we looked at Sine and Cosine Functions.
We had a look again at the identities of the Sine and Cosine Functions from last year.
Just one thing before we start: COS= x Sin= y.
Below is a graph of what of a triangle and how sine and cosine works.
On the side are a few of the Identities:
sin θ = opp/ hyp csc θ = hyp/ opp
cos θ = adj/ hyp sec θ = hyp/ adj
tan θ = opp/ adj cot θ = adj/ opp
other identites:
tan θ= sin θ / cos θ
cot θ= cos θ / sin θ
csc θ= 1 / sin θ
sec θ= 1 / cos θ
An important identity is the pythagorean thereom: a^2+b^2= c^2
It practically is
x^2+y^2=r^2
x^2+y^2=1
this can translate to
cos^2 θ + sin^2 θ = 1
This is called the Pythagorean Identity.
After this we looked at the acrynom: All Students Take Calc.
From this acrynom, it states where the functions are postive. in the A box, all the functions are positive. In S, Sine and cosecant are positive. In T, tangent and cotangent are positive. In C, Cosine and Secant are positive.
Next we looked at reference angles: To find the reference angle, you just drop a line from the angle and you find the measurement from the angle.
Some More Identities:
cos(-t) = cos t
sin(-t) = -sin t
cos(π/2 -t)=sin t sin(π/2 -t)= cos t
cos(t + π) = -cos t sin(t+π) = -sin t
cos(π - t) = -cos t sin(π - t) = sin t
Now to solve problems:
ex 1:
If you were looking for sin θ: cos θ= -2/5
Point, P in II Quadrant
1. you first sketch it on a graph
2. sinθ =O/H
a^2+ (-2)^2 = 5^2
a^2 + 4 = 25
a^2 =21
a^2 = √21
sinθ = √21 / 5
ex 2: Angle: -7π/4 Find the Reference Angle
1. Drop a line to the x-axis from the angle
It would then be 9π/20.
This is what is Sine and Cosine Functions are like.
SEE YOU NEXT WEEK!
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