Question

How many common points have `f` and `g` function graphs in the interval `<0;2pi>` ?

a)
`f(x)=cosx`
`g(x)=1-sinx`

I can do this by graphing, but I want to know how to do this without graphs.

Answer 1

intersection points are `(0, 1)` and `(pi/2, 0)`

Explanation:

We can solve algebraically. We know that `y = cosx` and `y = 1- sinx`, so we can substitute `f(x)` into `g(x)` or vice versa.

`cosx =1 - sinx`

`cosx + sinx = 1`

`cos^2x + sin^2x + 2sinxcosx = 1`

`1 + 2sinxcosx = 1`

`2sinxcosx = 0`

`sin(2x) = 0`

`2x = 0 or pi`

`x = 0 or pi/2`

We check to make sure neither roots are extraneous:

`cos(0) + sin(0) =^? 1`

`1 + 0 = 1 color(green)(√)`

ALSO

`cos(pi/2) + sin(pi/2) =^? 1`

`0 + 1 = 1 color(green)(√)`

Hence, the graphs intersect at `(0, 1)` and `(pi/2, 0)`. The graph confirms.

Hopefully this helps!