What is the value of cos^2θ – sin^2θ if the length of the opposite side is 20 units and the length of the hypotenuse is 29 units?(a) \(\frac {- 41}{841}\)(b) \(\frac {- 41}{840}\)(c) \(\frac {41}{841}\)(d) \(\frac {41}{840}\)I have been asked this question in an interview.The question is from Trigonometric Ratios topic in portion Trigonometry of Mathematics – Class 10

What is the value of cos^2θ – sin^2θ if the length of the opposite

1.	What is the value of cos^2θ – sin^2θ if the length of the opposite side is 20 units and the length of the hypotenuse is 29 units?(a) \(\frac {- 41}{841}\)(b) \(\frac {- 41}{840}\)(c) \(\frac {41}{841}\)(d) \(\frac {41}{840}\)I have been asked this question in an interview.The question is from Trigonometric Ratios topic in portion Trigonometry of Mathematics – Class 10
Answer» CORRECT choice is (a) \(\FRAC {- 41}{841}\) The best explanation: From Pythagoras theorem, (Hypotenuse)^2 = (OPPOSITE side)^2 + (Adjacent side)^2 (Adjacent side)^2 = (Hypotenuse)^2 – (Opposite side)^2 Adjacent side = √441 = 21 Cosθ = \(\frac {Length \, of \, the \, adjacent \, side}{Length \, of \, the \, hypotenuse} = \frac {21}{29}\), Sinθ = \(\frac {Length \, of \, the \, opposite \, side}{Length \, of \, the \, hypotenuse} = \frac {20}{29} \) cos^2θ – sin^2θ = (\(\frac {21}{29}\))^2 + (\(\frac {20}{29} \))^2 = \(\frac {- 41}{841}\)

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