general solution of trigonometric equations?? - special cases (1 Viewer)

[sazkim]

so far I've learnt that the formulas to the general solutions of trigonometric equations which are:-
sinx = a + k360, (180-a) + k360
cosx = +/-a + k360
tanx = a + k180

but these formulas don't seem to apply in every case
for example, using the formula, the solution to cosx = 0 would be +/-90 + k360
but instead it is 90 + k180

I understand how 90 + k180 is the answer by looking at the cosx graph but does that mean there are special cases that we need to memorise for these general solutions

thank you!!

 

[KingOfActing]

The solution sets are the same.

90 + 360k = 90(4k+1)
-90 + 360k = 90(4k-1)
90 + 180k = 90(2k+1)

Note that in the last equation, if k is even then we get 90(2(2m) +1) = 90(4m + 1) and if k is odd we get 90(2(2m-1)+1) = 90(4m-1)

 

[InteGrand]

so far I've learnt that the formulas to the general solutions of trigonometric equations which are:-
sinx = a + k360, (180-a) + k360
cosx = +/-a + k360
tanx = a + k180

but these formulas don't seem to apply in every case
for example, using the formula, the solution to cosx = 0 would be +/-90 + k360
but instead it is 90 + k180

I understand how 90 + k180 is the answer by looking at the cosx graph but does that mean there are special cases that we need to memorise for these general solutions

thank you!!