1 Answer

Brandonwie · Answer 1 · 2021-07-14T09:05:57+0000

Cos 2 A =
(7)/(25) for the given.

Explanation:

Given:

$\cos A=-(4)/(5)$

We know the formula,

$\cos ^(2) A+\sin ^(2) A=1$

$\sin ^(2) A=1-\cos ^(2) A$

$\sin ^(2) A=1-\left(-(4)/(5)\right)^(2)=1-(16)/(25)=(25-16)/(25)=(9)/(25)$

Taking square root, we get

$\sin A=\sqrt{(9)/(25)}=\pm (3)/(5)$

Hence,

$\sin A=+(3)/(5) \text { and } \sin A=-(3)/(5)$

Given as ‘A’ is in second quadrant, so sine value is positive. Therefore,

$\sin A=+(3)/(5)$

The formula for Cos 2 A is given as

$\cos 2 A=\cos ^(2) A-\sin ^(2) A$

Substitute the values, we get

$\cos 2 A=\left(-(4)/(5)\right)^(2)-\left(+(3)/(5)\right)^(2)$

$\cos 2 A=(16)/(25)-(9)/(25)=(16-9)/(25)=(7)/(25)$

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