Solve for 'θ': sin θ 3 = 1 - Mathematics

Solve for 'θ': `sin θ/(3)` = 1

योग

`sin θ/(3)` = 1

⇒ `sin θ/(3)` = sin 90°

⇒ `θ/(3)` = 90°
⇒ θ = 270°.

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Trigonometric Equation Problem and Solution

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अध्याय 27: Trigonometrical Ratios of Standard Angles - Exercise 27.1

अध्याय 27 Trigonometrical Ratios of Standard Angles
Exercise 27.1 | Q 7.1

Use the given figure to find:
(i) tanθ°
(ii) θ°
(iii) sin²θ° - cos²θ°(iv) Use sin θ° to find the value of x.

Solve for x : cos (2x - 30°) = 0

Solve for x : sin² x + sin² 30° = 1

Find the value of 'A', if (1 - cosec A)(2 - sec A) = 0

If `sqrt(3)` sec 2θ = 2 and θ< 90°, find the value of

cos 3θ

Find the value of 'x' in each of the following:

Find the value of 'y' if `sqrt(3)` = 1.723.
Given your answer correct to 2 decimal places.

Express each of the following in terms of trigonometric ratios of angles between 0° and 45°: sin53° + sec66° - sin50°

Evaluate the following: sin35° sin45° sec55° sec45°

Prove the following: `(tan(90° - θ)cotθ)/("cosec"^2 θ)` = cos²θ