How do you solve cosx=0?

1 Answer
José F.
Apr 1, 2016

x=pi/2+kpi, k in ZZ

Explanation:

In the trigonometric circle you will notice that cos(x)=0 corresponds to x=pi/2 and also x=-pi/2. Additionally to these all the angles that make a complete turn of the circle (2kpi) plus +-pi/2 correspond to cos(x)=0. So you have:

x=+-pi/2+2kpi, k in ZZ

If you try to see which are the first elements (from k =0, 1,2...of this series you will find that they are:

-pi/2;pi/2; (3pi)/2; (5pi)/2; (7pi)/2...., which can be described by:

x=pi/2+kpi, k in ZZ

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