if A+B+C=90 then pt sin2a+sin2b+cos2c=1+4sina sinb sinc
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Answer:
a+b+c =90 then question not understand
I hope you know the basics of trigonometry. And of course there are many ways to solve a trigonometric problem and this is one of them.
the objective is to simplify
(SinA)^2 + (SinB)^2 + (SinC)^2 (I hope you meant this question only and NOT sin2A + sin2B + sin 2C)
Because it is difficult to directly differentiate a 3 variable function. We must bring it into simplfied form.
and the condition is A + B + C = 90°
Now apply this formula (SinA)^2 = (1 - Cos2A)/2, then
= (1/2) (1 - Cos2A + 1 - Cos2B + 1 - Cos2C)
= (1/2) (3 - (Cos2A + Cos2B + Cos2C)) ... (i)
Now apply these formulae
Cos2A + Cos2B = 2 cos((2A+2B)/2) cos((2A-2B)/2) =2 cos(A+B) cos(A-B)
and
Cos2C = 1 - 2 (sinC)^2
Also A+B = 90° - C
so cos(A+B) = SinC
Substituting all these conditions in Cos2A + Cos2B + Cos2C we get
= 2 cos(A+B) cos(A-B) + 1 - 2 (sinC)^2
= 2 sinC cos(A-B) + 1 - 2 (sinC)^2
= 1 + 2 sinC ( cos(A-B) - sin C )
= 1 + 2 sinC ( cos(A-B) - cos(A+B) )
= 1 + 2 sinC (2 sinA sinB) ( We all know this standard formula)
= 1 + 4 sinA sinB sinC .(ii)
substitute (ii) in (i) then we get
= (1/2) (3 - (1 + 4 sinA sinB sinC))
= (1/2) (2 - 4 sinA sinB sinC)
= 1 - 2 sin A sin B sin C
And that's the required simplified form.
So if A + B + C = 90° then,
(SinA)^2 + (SinB)^2 + (SinC)^2 = 1 - 2 sin A sin B sin C.
Now we can easily guess maximum and minimum value of this function without calculus.