Trig. identities-problem??

2 ANSWERS

1. 
   

   Gee it took me like 25 mins to finally get this one out. You need to think of how to bring in the identity sin²Ɵ + cos²Ɵ = 1.
   
   xsinƟ + ycos³Ɵ = sinƟcosƟ -------1
   
   xsinƟ = ycosƟ ----------------------------2
   
   So start with equation 1 and aim to eliminate y:
   
   xsin³Ɵ + ycos³Ɵ = sinƟcosƟ
   
   xsinƟsin²Ɵ + ycosƟcos²Ɵ = sinƟcosƟ
   
   xsinƟsin²Ɵ + xsinƟcos²Ɵ = sinƟcosƟ   --------> as ycosƟ = xsinƟ
   
   xsin²Ɵ + xcos²Ɵ = cosƟ   --------> after dividing through by sinƟ
   
   x(sin²Ɵ + cos²Ɵ) = cosƟ
   
   x = cosƟ --------> as sin²Ɵ + cos²Ɵ = 1.
   
   Start with equation 1 again but now aim to eliminate x just as you did y above:
   
   xsin³Ɵ + ycos³Ɵ = sinƟcosƟ
   
   xsinƟsin²Ɵ + ycosƟcos²Ɵ = sinƟcosƟ
   
   ycosƟsin²Ɵ + ycosƟcos²Ɵ = sinƟcosƟ -----> as xsinƟ = ycosƟ
   
   ysin²Ɵ + ycos²Ɵ = sinƟ ------>after dividing through by cosƟ
   
   y(sin²Ɵ + cos²Ɵ) = sinƟ
   
   y = sinƟ  -------> as sin²Ɵ + cos²Ɵ = 1
   
   So we found that:
   
   y = sinƟ
   
   x = cosƟ
   
   Therefore we can say upon cubing both of these expressions that:
   
   y³ = sin³Ɵ
   
   x³ = cos³Ɵ
   
   Now just put these four results back into equation 1:
   
   xsin³Ɵ + ycos³Ɵ = sinƟcosƟ
   
   x(y³) + y(x³) = xy
   
   y² + x² = 1 -----> after dividing through by xy
   
   x² + y² = 1
   
   Hope this helped!

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2. 
   

   (1) xsin^3(θ) + ycos^3(θ) = sin(θ)cos(θ)
   
   (2) xsin(θ) = ycos(θ)
   
   From (2),
   
   y = xsin(θ) / cos(θ)
   
   Substitute into (1) :
   
   xsin^3(θ) + [xsin(θ) / cos(θ)]cos^3(θ) = sin(θ)cos(θ)
   
   Cancel cos(θ) from the second term :
   
   xsin^3(θ) + xsin(θ)cos^2(θ) = sin(θ)cos(θ)
   
   Divide through by sin(θ) :
   
   xsin^2(θ) + xcos^2(θ) = cos(θ)
   
   Take out the factor, x :
   
   x[sin^2(θ) + cos^2(θ)] = cos(θ)
   
   But sin^2(θ) + cos^2(θ) = 1 (identity)
   
   Therefore, x = cos(θ)
   
   Substitute into (2) to find that y = sin(θ)
   
   Now, x^2 + y^2 = cos^2(θ) + sin^2(θ) = 1, as required.
   
   

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