Find all x-intercepts? #f(x)=cos(pi/2x)+1#

#f(x)=cos(pi/2x)+1#

1 Answer
Jun 12, 2018

The set of x-intercepts is #S={4n+2 | n in ZZ}#.

Explanation:

The x-intercepts of a function #f# is given by the values of #x# where #f# strikes through (or is tangent to) the x-axis. In other words, they are the solution to the equation

#f(x)=0#

also called the roots of #f#.

In our case, #f(x)=cos(pi/2x)+1#.

#f(x) = 0#

#cos(pi/2x)+1 = 0 => cos(pi/2x) = -1#

Let #pi/2x = z#. We have

#cos(z) = -1#

We know that #z=pi# is a solution of this equation, and since the cosine function is periodic with period #rho = 2npi#, where #n# is an integer, the general solution is

#z=(2n+1)pi#

#pi/2x=z =>x=(2z)/pi=((4n+2)pi)/pi=4n+2#

As such, the set of solutions is

#S={4n+2 | n in ZZ}#