Math, asked by maya01, 9 months ago

If A+B+C=180 prove that sin 2A+sin 2B-sin 2C=4 cos A cosB sin C

Answers

Answered by Anonymous
25

Hope that helps you mate ✔️✔️

Attachments:
Answered by Siddharta7
7

Step-by-step explanation:

Given:

A+B+C = 180°

=> A+B = 180° - C

=> sin(A+B) = sin(180-C)

= sinC -----(1)

We know that,

i))SinC - SinD = 2cos[(C+D)/2]sin[(C-D)/2]

ii) SinC + sinD = 2sin[(C+D)/2]cos[(C+D)/2]

iii) Sin2B = 2sinBcosB

Here,

LHS = sin2A+sin2B-sin2C

= sin2A-sin2C+sin2B

=2cos[(2A+2C)/2]sin[(2A-2C)/2]+sin2B

= 2cos(A+C)sin(A-C)+2sinBcosB

= -2cosBsin(A-C)+2sinBcosB

= (2cosB)[-sin(A-C)-sinB]

= 2cosB[-sin(A-C)+sin(A+C)]

= 2cosB[sin(A+C)-sin(A-C)]

= 2cosB{2cos[(A+C+A-C)/2]sin[(A+C-A+C)/2]}

= 4cosBcosAsinC

= 4cosAcosBsinC

Hope it helps!

Similar questions