French, asked by MissShyShy, 3 months ago

if cos theta + sin theta = root2 cos Theta, show that cos theta - sin theta = root2 sin theta

Answers

Answered by Fαírү

29

$\textsf{We\:have :- }$

$\cos\theta + \sin \theta = \sqrt{2} \cos \theta \\ \\ \implies( \cos \theta + \sin \theta {)}^{2} = 2 { \cos}^{2} \: \theta \\ \\ \implies \ { \cos}^{2} \theta + { \sin}^{2} \theta + 2 \cos \theta \sin \theta = 2 { \cos}^{2} \theta \\ \\ \implies { \cos}^{2} \theta - 2 \cos \theta \sin \theta = { \sin}^{2} \theta \\ \\ \implies { \cos}^{2} \theta - 2 \cos \theta \sin \theta + { \sin}^{2} \theta = 2 { \sin}^{2} \theta \\ \\ \implies( \cos \theta - \sin \theta {)}^{2} = 2 { \sin}^{2} \theta \\ \\ \implies \cos \theta - \sin \theta = \sqrt{2} \sin \theta$

$\textsf{Hence\:Shown.}$

Answered by Anonymous

10

$\textsf{We\:have :-}$

$\cos\theta + \sin \theta = \sqrt{2} \cos \theta \\ \\ \implies( \cos \theta + \sin \theta {)}^{2} = 2 { \cos}^{2} \: \theta \\ \\ \implies \ { \cos}^{2} \theta + { \sin}^{2} \theta + 2 \cos \theta \sin \theta = 2 { \cos}^{2} \theta \\ \\ \implies { \cos}^{2} \theta - 2 \cos \theta \sin \theta = { \sin}^{2} \theta \\ \\ \implies { \cos}^{2} \theta - 2 \cos \theta \sin \theta + { \sin}^{2} \theta = 2 { \sin}^{2} \theta \\ \\ \implies( \cos \theta - \sin \theta {)}^{2} = 2 { \sin}^{2} \theta \\ \\ \implies \cos \theta - \sin \theta = \sqrt{2} \sin \theta$

$\textsf{Hence\:Shown.}$

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