Math, asked by poojanetam1469, 5 months ago

Sin (90° – A) and cos A are:
1 point
(a)Different
(b)Same
(c)Not related
(d)None of the above​

Answers

Answered by tanvichavan1515
0

Answer:

b) same

................

Answered by pranabsingh
0

Answer:

b )same

bcause

It's a generic right triangle, with a

90

o

angle as indicated by the little box and an acute angle

a

. We know the angles in a right triangle, and a triangle in general, must add to

180

o

, so if we have an angle of

90

and an angle of

a

, our other angle must be

90

a

:

(

a

)

+

(

90

a

)

+

(

90

)

=

180

180

=

180

We can see that the angles in our triangle do indeed add to

180

, so we're on the right track.

Now, let's add some variables for side length onto our triangle.

enter image source here

The variable

s

stands for the hypotenuse,

l

stands for length, and

h

stands for height.

We can start on the juicy part now: the proof.

Note that

sin

a

, which is defined as opposite (

h

) divided by hypotenuse (

s

) , equals

h

s

in the diagram:

sin

a

=

h

s

Note also that the cosine of the top angle,

90

a

, equals the adjacent side (

h

) divided by the hypotenuse (

s

):

cos

(

90

a

)

=

h

s

So if

sin

a

=

h

s

, and

cos

(

90

a

)

=

h

s

...

Then

sin

a

must equal

cos

(

90

a

)

!

sin

a

=

cos

(

90

a

)

And boom, proof complete.

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