The least value of 8 cosec2θ + 25 sin2 θ is:

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The least value of 8 cosec²θ + 25 sin² θ is:

A $10\sqrt{2}$

B $40\sqrt{2}$

C $20\sqrt{2}$

D $30\sqrt{2}$

Answer:

20\sqrt{2}

Given:

8 cosec²θ + 25 sin² θ

Formula:

The minimum value of "a cosec²θ + b sin² θ" is given by $2\sqrt{ab}$

Calculation:

Minimum Value of 8 cosec²θ + 25 sin² θ $=2\sqrt{(8\times{25}})$

$=2\sqrt{200}$

$=2\sqrt{(100\times{2}})$

$=2\times{10}\sqrt{2}$

$=20\sqrt{2}$

Related Questions:

In the figure AB= BC=CD=DE=AE. <C=<D=90°. what is the measure of <C?

$\frac{cosec\theta}{sec\theta}=?$

Conert Radian to Degree :

$\frac{9\pi}{3}$