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How to bypass the angles at which the function tan (x) is not defined, ie x != Pi/2 + k * PI ?

I tried to use the condition:

(x != 0) && (2 * x / M_PI - (int)(2 * x / M_PI ) ) < epsilon,

but it represents a condition

x != Pi/2 + k * PI / 2.

Thanx for your help.

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Also note that some mathematical algorithms may require the value of tangent, when cos(x) = 0 - you may want to implement your own variant of tan(x), which would yield something like numeric_limits<double>::infinity() for that case. – Yippie-Ki-Yay Nov 3 '10 at 21:36

The same condition can be used to determine which values of cos(x) will be zero. Thanks to that wonderful fact, you can simply do the following (pseudocode):

    if (cos(x) < epsilon) { /* handle the error */ }
    else { return tan(x); }

Edit: As In silico points out, this is a result of the trigonometric identity:

tan(x) = sin(x) / cos(x)

In this form, you can see that the undefined values will appear wherever cos(x) = 0 because of the division by zero.

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This works because tan(x) = sin(x) / cos(x). When cos(x) is zero the tangent will be undefined. Of course we use an epsilon here because we're working with floating point. – In silico Nov 3 '10 at 21:16
+1 simplify the maths first, then a simple program will follow – jk. Nov 3 '10 at 21:56

How about trying

(x - PI/2) % PI != 0

Will find check for the values of x that cause tan(x) to be undefined.

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Don't use tangent? It can be more performant than using a (sine, cosine) pair, but usually you can use a (sine, cosine) pair without worrying about discontinuities.

What are you using tangent for?

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