Proving these two angles are equal

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The discussion focuses on proving the equality of two angles defined by arctan expressions for strictly positive x. The first expression is arctan(x) - arctan(x^3 + 2x - ((x^2 + 1)^(3/2))), and the second is -arctan(x) + arctan(x^3 + 2x + ((x^2 + 1)^(3/2))). A suggested approach involves taking the tangent of both expressions and applying the tangent addition formula to derive a ratio of polynomials. By obtaining a common denominator and simplifying, it can be shown that the tangents of both angles are equal, confirming their equality. This method effectively resolves the problem.
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I'm researching an abstract geometric property and I've discovered the problem depends on showing these two angles are equal for strictly positive x:

arctan(x) - arctan(x^3 +2x -((x^2 + 1)^(3/2)))

and

-arctan(x) + arctan(x^3 +2x + ((x^2 + 1)^(3/2)))

Any help would be greatly appreciated, I've been trying this for hours and I think I'm stuck in a rut.

Many Thanks!
 
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Suggestion: take the tangent of each expression and use the formula for tan(A+B) to get a ratio of polynomials. Multiply top and bottom of each one by the denominator of the other expression to get them over a common denominator and multiply out the numerators.
 
Thanks and we get tan of both are equal and we know both must be less than pi/2, problem solved!
 

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