Question

How do you find all solutions of the equations `secx+tanx=1` in the interval `[0,2pi)`?

Answer 1

The solutions are `S={0}` for `x in [0, 2pi)`

Explanation:

We need

`secx=1/cosx`

`tanx=sinx/cosx`

Therefore,

`secx+tanx=1`

`1/cosx+sinx/cosx=1`

Simplifying

1+sinx=cosx#

`cosx-sinx=1`

We will apply

`rcos(x+a)=r(cosxcosa-sinxsina)`

`rcosa=1`

`rsina=1`

`r^2(sin^2a+cos^2a)=1+1=2`

Therefore,

`r^2=2`, `=>`, `r=sqrt2`

`cosa=1/sqrt2`, `=>`, `a=1/4pi`

`sina=1/sqrt2`, `=>`, `a=1/4pi`

`sqrt2(1/sqrt2cosx-1/sqrt2cosx)=1`

`cos(x+1/4pi)=1/sqrt2`

`x+1/4pi=1/4pi+2kpi` and `x+1/4pi=-1/4pi+2kpi`

`x=2kpi` and `x=-1/2pi+2kpi`

When `x=3/2pi`, `=>`, `x in O/`

Answer 2

`x=0.`

Explanation:

Given that, `secx+tanx=1......................................(1).`

We know that, `sec^2x-tan^2x=1, i.e.,`

`(secx+tanx)(secx-tanx)=1.`

`:. (1)(secx-tanx)=1..................................[because, (1)],`

`:. secx-tanx=1............................................................(2).`

`:. (1)+(2) rArr 2secx=2, or, secx=1.`

`rArr cosx=1=cos0.........................................................(3).`

Since, `costheta=cosalpha rArr theta=2kpi+-alpha, k in ZZ,` we have,

from `(3), x =2kpi, k in ZZ.`

Hence, the reqd. soln. in `[0,2pi)` is, `x=0.`