(i) For a triangle with sides a,b and c and angles A, B and C the cosine rule states:
a^2 = b^2 + c^2 - 2bc cos A
Applying in DeltaDBC where angle D=theta
x^2 = x^2 + 4^2 - 2xx x xx4 cos theta, rearranging and solving for cos theta
=>8x cos theta=16
=>cos theta=16/(8x)
=>cos theta=2/x, Proved.
(ii) In Delta ABC
sin AhatCB="perpendicular"/"hypotenuse"=(sqrt15 x)/(4x)=sqrt15/4
(iii) For a triangle with sides a,b and c and angles A, B and C the sine rule states:
sinA/a = sinB/b = sinC/c
In DeltaBCD applying the law of sines for angles D and C and using value from (ii) we get
sintheta/x = (sqrt15/4)/4
sintheta = (sqrt15 x)/16
(iv) LHS =sin^2theta+cos^2theta Inserting values as obtained above
=>LHS=((sqrt15 x)/16 )^2+(2/x)^2
=(15 x^2)/256 +4/x^2, Setting it equal to RHS=1 we obtain
(15 x^2)/256 +4/x^2=1
=>(15 x^2)/256 +4/x^2-1=0
Rearranging and multiplying both sides with LCM of all the denominators, we obtain
256x^2[(15 x^2)/256 -1+4/x^2=0]
=>15x^4-256x^2+1024=0, Proved
