Solve the given trigonometry problem

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chwala
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Homework Statement
If ##x=\sec θ + \tan θ##, then show that ##\dfrac {1}{x}=\sec θ - \tan θ##
Relevant Equations
Trigonometry
My take;

##x^2=\dfrac{(1+\sin θ)^2}{cos^2θ}=\dfrac{(1+\sin θ)^2}{1-\sin ^2θ}=\dfrac{1+\sin θ}{1-\sin θ}##

we know that, ##x=\dfrac{1+\sin θ}{\cos θ}##

##⇒1+\sin θ=x\cos θ##

therefore,

##x^2=\dfrac{x\cos θ}{1-\sin θ}##

##\dfrac{x}{x^2}=\dfrac{1-\sin θ}{\cos θ}##

##\dfrac{1}{x}=\dfrac{1}{\cos θ}-\dfrac{\sin θ}{\cos θ}=\sec θ-\tan θ##

there may be another approach to this problem. Your input highly appreciated...
 
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BvU said:
How about ##x{1\over x} = 1## and comparing that with ##\sec^2 \theta -\tan^2 \theta = 1 ## ?

##\ ##
That is fine, comparing may mean eliminating ##x## from the equation and end up showing that the lhs=rhs in reference to the trig. identities; but that is not what we want. We need ##x## to be part of the problem.
 
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But it is ! If you need it spelled out:$$(\sec + \tan)(\sec-\tan) = x(\sec-tan)=1 \ \& \ x{1\over x}=1 \Rightarrow (\sec-\tan)={1\over x}\\ $$
 
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chwala said:
Ok @BvU ....I will check. Thanks mate.
Or ...
A variation, inspired by @BvU :

##\displaystyle x= \sec\theta + \tan\theta##

##\displaystyle x(\sec\theta - \tan\theta)= (\sec\theta + \tan\theta)(\sec\theta - \tan\theta) ##

##\displaystyle \quad \quad \quad \quad \quad \quad \quad =\sec^2\theta - \tan^2\theta ##

##\displaystyle \quad \quad \quad \quad \quad \quad \quad = 1##

Thus: ##\displaystyle \quad \sec\theta - \tan\theta = \dfrac 1 x ##
 
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Thanks answer :cool:
use for my ticher
 
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