Find #x# in degrees radians (either one is fine)? #tanxsinx-tanx=0# Thanks in advance
So I think you're supposed to factor the #tanx# first, so #tanx# would equal #0# and #sinx-1=0# ... but my final answer isn't right...
I know the answer is #0# and #pi# (that's in radians)
So I think you're supposed to factor the
I know the answer is
1 Answer
Mar 29, 2018
Well...since you have a good idea of the problem, let's see where you made a mistake
Explanation:
Given problem:
1.Factoring as you did:
-
Set factors equal to 0, as you did:
#tanx=0#
#sinx=1# -
Solutions in the interval
#[0,2pi)# which seems like what you were trying to find:
#x=0, pi# for#tanx=0#
#x=pi/2# for#sinx=1# -
Now
#x=pi/2# is not a solution because tangent is undefined at#pi/2# which is likely why your final answer has one extra solution -
Graph
graph{tanxsinx-tanx [-3.352, 4.11, -0.995, 2.735]}
