Question

How do you graph, identify the domain, range, and asymptotes for `y=(1/2)sec2(x-pi/2)+1`?

Answer 1

See graph and explanation.

Explanation:

`y = 1/2 sec( 2 ( x - pi/2 ) + 1 = 1/2 sec( 2 x - pi ) + 1`

`= 1/2 sec( pi - 2 x ) + 1`

`= 1/2 sec ( 2 x ) + 1`.

`= 1/(2 cos ( 2 x )) + 1`.

The period = period of cos( 2 x ) = `2pi )/2 = pi`.

The asymptotes are given by `cos ( 2 x ) = 0`

`rArr 2 x = ( 2 k + 1 )pi/2 rArr x = ( 2 k + 1 )pi/4`,

`k == 0, +-1, +-2, +-3,...` So, the domain is

`x in ...U (-5/4pi, -3/4pi ) U (-3/4pi, -pi/4 ) U (-pi/4, pi/4 )`

`U ( pi/4, 3pi/4 ) U (3pi/4, 5pi/4 ) U ...`

Range is given by

`y notin ( -1/2 + 1,1/2 + 1 ) = ( 1/2, 3/2 )`.

See illustrative graph, indicating range and two asymptotes,

near O..
graph{(2(y-1) cos (2x)-1)(y-1/2)(y-3/2)(x^2-(pi)^2/16 )=0[-8 8 -3 5]}