Asked by Boitshepo
Given that sin(2/(√229))and that 0∘0∘ < θθ < 90∘90∘, with the aid of a diagram and without the use of a calculator determine:
a) cosθcosθ =
b) tanθtanθ =
c) tanθ÷cscθtanθ÷cscθ =
d) sinθ÷cosθsinθ÷cosθ =
e) tanθ secθtanθ secθ =
f) 8sinθ −1cos2θ8sinθ −1cos2θ =
a) cosθcosθ =
b) tanθtanθ =
c) tanθ÷cscθtanθ÷cscθ =
d) sinθ÷cosθsinθ÷cosθ =
e) tanθ secθtanθ secθ =
f) 8sinθ −1cos2θ8sinθ −1cos2θ =
Answers
Answered by
Steve - ouch!
Your triangle has
y=2
r=√229
so, x=15
Now, all you need to remember is that
sinθ = y/r
cosθ = x/r
tanθ = y/x
Now just plug and chug, remembering your double-angle identities.
y=2
r=√229
so, x=15
Now, all you need to remember is that
sinθ = y/r
cosθ = x/r
tanθ = y/x
Now just plug and chug, remembering your double-angle identities.
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