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If tan theta = 2ab / a2-b2 then find all other trigonometric ratios ​

User Cerealex
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Answer:


\displaystyle{\sin \theta = (2ab)/(a^2+b^2)}\\\\\displaystyle{\cos \theta = (a^2-b^2)/(a^2+b^2)}\\\\\displaystyle{\csc \theta = (a^2+b^2)/(2ab)}\\\\\displaystyle{\sec \theta = (a^2+b^2)/(a^2-b^2)}\\\\\displaystyle{\cot \theta = (a^2-b^2)/(2ab)}

Explanation:

We are given that:


\displaystyle{\tan \theta = (2ab)/(a^2-b^2)}

To find other trigonometric ratios, first, we have to know that there are total 6 trigonometric ratios:


\displaystyle{\sin \theta = \sf (opposite)/(hypotenuse) = (y)/(r)}\\\\\displaystyle{\cos \theta = \sf (adjacent)/(hypotenuse) = (x)/(r)}\\\\\displaystyle{\tan \theta = \sf (opposite)/(adjacent) = (y)/(x)}\\\\\displaystyle{\csc \theta = \sf (hypotenuse)/(opposite) = (r)/(y)}\\\\\displaystyle{\sec \theta = \sf (hypotenuse)/(adjacent) = (r)/(x)}\\\\\displaystyle{\cot \theta = \sf (adjacent)/(opposite) = (x)/(y)}

Since we are given tangent relation, we know that
\displaystyle{y = 2ab} and
\displaystyle{x = a^2-b^2}, all we have to do is to find hypotenuse or radius (r) which you can find by applying Pythagoras Theorem.


\displaystyle{r=√(x^2+y^2)}

Therefore:


\displaystyle{r=√((a^2-b^2)^2+(2ab)^2)}\\\\\displaystyle{r=√(a^4-2a^2b^2+b^4+4a^2b^2)}\\\\\displaystyle{r=√(a^4+2a^2b^2+b^4)}\\\\\displaystyle{r=√((a^2+b^2)^2)}\\\\\displaystyle{r=a^2+b^2}

Now we can find other trigonometric ratios by simply substituting the given information below:


  • \displaystyle{x = a^2-b^2}

  • \displaystyle{y = 2ab}

  • \displaystyle{r = a^2+b^2}

Hence:


\displaystyle{\sin \theta = (y)/(r) = (2ab)/(a^2+b^2)}\\\\\displaystyle{\cos \theta = (x)/(r) = (a^2-b^2)/(a^2+b^2)}\\\\\displaystyle{\csc \theta = (r)/(y) = (a^2+b^2)/(2ab)}\\\\\displaystyle{\sec \theta = (r)/(x) = (a^2+b^2)/(a^2-b^2)}\\\\\displaystyle{\cot \theta = (x)/(y) = (a^2-b^2)/(2ab)}

will be other trigonometric ratios.

User Afamee
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