Didn't know that (or at least, didn't realise).Originally posted by CM_Tutor
Mojako, it isn't necessary to transform this equation to see a max tp at the origin - Any even function which is continuous and differentiable at x = 0 must have a turning point at its y-intercept. Similarly, any odd function that is continuous and differentiable at x = 0 must have an inflexion at the origin.
Ohh sorry. I got the impression from one of the other posts that you were a teacher, or a private tutor at least.Originally posted by CM_Tutor
Also, I'm not a Capital-T Teacher - I don't work at a school. I am a PhD student at USyd, studying Chemistry Education, and at the same time doing a Masters degree in Education in the field of Teaching and Curriculum Studies.
What do you study in the Masters degree in Education in the field of teaching and curriculum studies (a long name...)? What can the graduates (I mean, those who complete the Masters degree) work as?
Here is one way I'm aware of. CM_Tutor may add.Originally posted by Grey
btw, how do you know if an equation is even or odd? I mean, I know that if f(x) = f(-x) then its even, but how do you see something like x^2 / (x^2 - 4) and know that its an even function?
-> Of course you can find f(x) and then find f(-x) and see if f(-x) equals f(x) or -f(x). (Remember the lesson on that?)
-> By observation, a function will definitely be odd if all the x-terms are raised to an even power (2, 4, 6) or to even roots (or whatever it's called) like square roots, fourth root...
-> A function will definitely be odd.. hmm (not sure about "definitely") ... I think.. if all x-terms are raised to odd powers or odd roots (remember, constants like "4" is "4*x^0", and 0 is an even power).
Well, I don't think 0 is even by definition, but just consider it to be so for this purpose.