If sec θ + tan θ = p, obtain the values of sec θ, tan θ and sin θ

Q) If sec θ + tan θ = p, obtain the values of sec θ, tan θ and sin θ in terms of p.

Ans:

sec θ + tan θ = p ………….. (i)

∵ sec²θ – tan²θ = 1

∴ (secθ + tanθ) (secθ – tanθ) = 1

∴ p (secθ – tanθ) = 1

∴ secθ – tanθ = $\frac{1}{p}$ ………… (ii)

By adding equations (i) and (ii), we get:

2 sec θ = p + $\frac{1}{p}$ = $\frac{1 + p^2}{p}$

∴ sec θ = $\frac{1 + p^2}{2 p}$

By subtracting equation (ii) from (i), we get:

2 tan θ = p – $\frac{1}{p}$ = $\frac{p^2 - 1}{p}$

∴ tan θ = $\frac{p^2 - 1}{2 p}$

∴ tan θ = $\frac{p^2 - 1}{2 p}$

∴ $\frac{sin \theta}{cos \theta} = \frac{p^2 - 1}{2 p}$

∴ sin θ x sec θ = $\frac{p^2 - 1}{2 p}$

∴ sin θ x $\frac{1 + p^2}{2 p}$ = $\frac{p^2 - 1}{2 p}$

∴ sin θ = $\frac{\frac{p^2 - 1}{2 p}}{\frac{p^2 + 1}{2 p}}$

∴ sin θ = $\frac{p^2 - 1}{p^2 + 1}$

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