Math, asked by sandhyabharamade, 10 months ago

4. Given 15 cot A-8, find sin A and sec A.​

Answers

Answered by puneetbajwa55
2

Answer:

sin A = 15/17

and sec A =17/8

Attachments:
Answered by Disha976
6

Given that,

\rm { \qquad • 15 cot \: A = 8 }

_________

We have to find,

\rm { \qquad • sin \: A \: and \: sec \: A }

_________

Solution,

If \rm {15 cot \: A = 8 } , then \rm { cot \: A = \dfrac{8}{15} }

We know that ,

\rm { \qquad • cot \: A = \dfrac{Base}{Perpendicular}}

Hence,

\rm { \qquad • Base = 8 }

\rm { \qquad • Perpendicular = 15 }

____________

Applying pythagoras property-

\rm\red { {H}^{2} = {B}^{2}+{P}^{2} }

\rm\leadsto { {H}^{2} = {8}^{2}+{15}^{2} }

\rm\leadsto { {H}^{2} = 64+ 225}

\rm\leadsto { {H }^{2} = 289}

\leadsto\rm\blue { H = \sqrt{289} = 17}

_____________

\rm { \qquad • Base = 8 }

\rm { \qquad • Perpendicular = 15 }

\rm { \qquad • Hypotenuse = 17 }

\qquad

\rm\red { \leadsto sin \: A = \dfrac{ Perpendicular}{Hypotenuse} =\dfrac{15}{17} }

\qquad

\rm\red { \leadsto sec \: A = \dfrac{ Hypotenuse}{Base} =\dfrac{17}{8} }

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