Question which the teacher cant help with

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The discussion revolves around solving two mathematical problems involving secant and tangent functions. Part (a) was easily resolved, while part (b) posed challenges for the class, particularly in demonstrating that secA - tanA equals 1/2 given that secA + tanA equals 2. The solution involves manipulating the equations using trigonometric identities, leading to the conclusion that secA - tanA simplifies correctly. Participants noted that a change in perspective helped clarify the problem. Overall, the thread emphasizes the importance of approaching trigonometric equations from different angles to find solutions.
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a)state the value of sec^2x-tan^2x
b) the angle A is such that secA + tanA = 2. show that secA-tanA=1/2, and hence find the exact value of cos A.

part a was a doddle so to speak, however, part b was on the contrary; it took our class half an hour, but to avail

if someone could shed light on this problem, i would be much obliged

thank you in advance
 
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Not all that difficult, surely.
sec A= \frac{1}{cos A} and tan A\frac{sin A}{cos A}
so sec A+ tan A= \frac{1+ sin A}{cos A}= 2
Looks to me like an obvious thing to try is to multiply numerator and denominator of that equation by 1- sin A:
\frac{(1+ sin A)(1- sin A)}{(cos A)(1- sin A)}= 2
\frac{1- sin^2 A}{(cos A)(1- sin A)}= \frac{cos^2 A}{(cos A)(1- sin A)}= \frac{cos A}{1- sin A}= 2
Then
\frac{1- sin A}{cos A}= \frac{1}{2}
\frac{1}{cos A}- \frac{sin A}{cos A}= sec A- tan A= \frac{1}{2}.
Add the two equations to eliminate tan A and then invert.
 
thanks. i think we were all just looking at it form the wron perspective. much obliged
 

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