Question 1

$Evaluate: \sqrt{ \frac {1 - sin(x)}{1 + sin(x)}} \\$

Solve this problem please..

Question 2

$\large\underline{\sf{Solution-}}$

We have to evaluate the given expression.

$\rm = \sqrt{ (1 - \sin(x) )/(1 + \sin(x) ) }$

If we multiple both numerator and denominator by 1 - sin(x), then the value remains same. Let's do that.

$\rm = \sqrt{ ([1 - \sin(x)][1 - \sin(x) ])/([1 + \sin(x)][1 - \sin(x) ]) }$

$\rm = \sqrt{ ([1 - \sin(x)]^(2))/(1- \sin^(2) (x) ) }$

We know that:

$\rm \longmapsto { \sin}^(2)(x) + \cos^(2)(x) = 1$

$\rm \longmapsto \cos^(2)(x) = 1 - { \sin}^(2)(x)$

Therefore, the expression becomes:

$\rm = \sqrt{ ([1 - \sin(x)]^(2))/(\cos^(2) (x))}$

$\rm = (1 - \sin(x))/(\cos(x))$

$\rm = (1)/(\cos(x)) - ( \sin(x) )/( \cos(x) )$

$\rm = \sec(x) - \tan(x)$

Question 3

$\sqrt{ ( \cos(n) )/(1 + \: \sin(n) ) }$

see the attachment!!

hope it helps

#carryolearning

$Evaluate: \sqrt{ \frac {1 - sin(x)}{1 + sin(x)}} \\ Solve this problem please..-example-1$

$Evaluate: \sqrt{ \frac {1 - sin(x)}{1 + sin(x)}} \\ Solve this problem please..-example-2$

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