Math, asked by potlurilakshmi19, 9 months ago

if tan theta =a/b find the value of cos theta+sin theta/cos theta-sin theta​

Answers

Answered by premtejreddy
0

Answer:

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Answered by kunjmishra75
0

Answer:

The result of \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta }

cosθ−sinθ

cosθ+sinθ

is found out to be \frac { \mathrm { a } + \mathrm { b } } { \mathrm { b } - \mathrm { a } }

b−a

a+b

To find:

The result of \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta }

cosθ−sinθ

cosθ+sinθ

when \tan \theta = \frac { \mathrm { a } } { \mathrm { b } }tanθ=

b

a

Solution:

Given that the value of \tan \theta = \frac { \mathrm { a } } { \mathrm { b } }tanθ=

b

a

The value of \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta }

cosθ−sinθ

cosθ+sinθ

is determined by dividing the numerator and denominator by \cos \thetacosθ

\begin{lgathered}\begin{array} { c } { \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta } = \frac { \frac { \cos \theta } { \cos \theta } + \frac { \sin \theta } { \cos \theta } } { \frac { \cos \theta } { \cos \theta } - \frac { \sin \theta } { \cos \theta } } } \\\\ { = \frac { 1 + \tan \theta } { 1 - \tan \theta } } \end{array}\end{lgathered}

cosθ−sinθ

cosθ+sinθ

=

cosθ

cosθ

cosθ

sinθ

cosθ

cosθ

+

cosθ

sinθ

=

1−tanθ

1+tanθ

We know that \tan \theta = \frac { \mathrm { a } } { \mathrm { b } }tanθ=

b

a

, as per the given question,

\begin{lgathered}\begin{aligned} & = \frac { 1 + \frac { \mathrm { a } } { \mathrm { b } } } { 1 - \frac { \mathrm { a } } { \mathrm { a } } } \\\\ & = \frac { \frac { \mathrm { b } + \mathrm { a } } { \mathrm { b } } } { \frac { \mathrm { b } - \mathrm { a } } { \mathrm { b } } } \\\\ = & \frac { \mathrm { b } + \mathrm { a } } { \mathrm { b } - \mathrm { a } } \\ \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta } & = \frac { \mathrm { a } + \mathrm { b } } { \mathrm { b } - \mathrm { a } } \end{aligned}\end{lgathered}

=

cosθ−sinθ

cosθ+sinθ

=

1−

a

a

1+

b

a

=

b

b−a

b

b+a

b−a

b+a

=

b−a

a+b

Thus, the value of \frac { \cos \theta + \sin \theta } { \cos \theta - \sin \theta } = \frac { a + b } { b - a }

cosθ−sinθ

cosθ+sinθ

=

b−a

a+b

when \tan \theta = \frac { a } { b }tanθ=

b

a

Step-by-step explanation:

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