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If sec θ + tan θ = sqrt(3), complete the activity to find the value of sec θ – tan θ. Activity: square = 1 + tan^2θ ...[Fundamental trigonometric identity] square – tan^2θ = 1

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प्रश्न

If `sec θ + tan θ = sqrt(3)`, complete the activity to find the value of sec θ – tan θ.

Activity:

`square = 1 + tan^2θ`   ...[Fundamental trigonometric identity]

`square - tan^2θ = 1`

`(sec θ + tan θ) . (sec θ - tan θ) = square`

`sqrt(3)  . (sec θ - tan θ) = 1`

`(sec θ - tan θ) = square`

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योग
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उत्तर

\[\boxed{\text{sec}^2θ} = 1 + \text{tan}^2θ\]   ...[Fundamental trigonometric identity]

\[\boxed{\text{sec}^2θ} - \text{tan}^2θ = 1\]

(sec θ + tan θ) . (sec θ – tan θ) = \[\boxed{1}\]

`sqrt(3)  . (sectheta - tan theta)` = 1

\[(\text{sec} θ - \text{tan} θ) = \boxed{\frac{1}{\sqrt3}}\] 

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अध्याय 6: Trigonometry - Exercise

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sin2 A cot2 A + cos2 A tan2 A = 1


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`sqrt((1 + sin A)/(1 - sin A)) = sec A + tan A`


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If x = acosθ , y = bcotθ , prove that `a^2/x^2 - b^2/y^2 = 1.`


Prove that:
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Prove the following identities: cot θ - tan θ = `(2 cos^2 θ - 1)/(sin θ cos θ)`.


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1 + `square` = cosec2θ

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∴ sin θ =  `9/41`

The value is cosec θ = `41/9`, and sin θ = `9/41`


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