Math, asked by ad5553854, 5 hours ago

cos(A+B)=21/29, cos(A-B) =12/13, tan2B?​

Answers

Answered by nimaichandramondal20
0

Answer:

Cos(A+B)=4/5= 0.8

A+B =36.87

Sin(A-B)=5/13 = 0.3846

A-B = 22.62

by adding

2A =36.87 + 22.62 = 59.49

tan 2A = tan 59.49= 1.6969

Answered by rishavjaat71
1

Answer:

Since sin A = 3/5, the opposite side of the

right triangle is 3 and the hypotenuse is 5.

The missing adjacent side must then be 4.

So cos(A) = 4/5

Likewise, since cosine of B is 12/13, this

right triangle has hypotenuse 13 and adjacent

side 12. The missing opposite side is

5. So the sin(B) = 5/13

Deriving the angle subtraction formula for sine:

sin(A-B) = sin (A + -B)

= sin(A)cos(-B) + sin(-B)cos(A)

= sin(A)cos(B) - sin(B)cos(A) negative sign while sine is an odd

function; so sine spits out the negative

= (3/5)(12/13) - (5/13)(4/5)

= 36/65 - 20/65

= 16/65

= 0.2461538

Alternatively, you get the same answer using inverse trig functions:

A = inverse-sine (3/5) = 36.87

B = inverse-cosine(12/13) = 22.619865

A-B = 14.250135

sin(A-B) = 0.246155576724839

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