crammy90
Member
- Joined
- Mar 26, 2006
- Messages
- 264
- Gender
- Male
- HSC
- 2008
2004 HSC Q9 a ii
so r is -tan^2(theta)
for what values of theta in the interval -pi/2 < theta < pi/2 does the limiting sum of the series exist.
i get the working up upto here
-1< tan^2(theta) < 1
then i dont get this...
"since tan^2(theta) > 0, only need to solve tan^(theta) <1
:SSSSSS
and then
"when tan(theta) = +- 1, theta = +-(pi/4)
since y = tan theta is an increasing fuction, this means the solution is:
-pi/4 < theta < pi/4
what are they doing ? why is it only need to solve 1 side of the eqality thing and where do they get the +-1
thanks
so r is -tan^2(theta)
for what values of theta in the interval -pi/2 < theta < pi/2 does the limiting sum of the series exist.
i get the working up upto here
-1< tan^2(theta) < 1
then i dont get this...
"since tan^2(theta) > 0, only need to solve tan^(theta) <1
:SSSSSS
and then
"when tan(theta) = +- 1, theta = +-(pi/4)
since y = tan theta is an increasing fuction, this means the solution is:
-pi/4 < theta < pi/4
what are they doing ? why is it only need to solve 1 side of the eqality thing and where do they get the +-1
thanks
