Few questions:
=\sqrt{9-x^2} \;for \;e \;[-3,3])
and =\sqrt{x})
for x e [0,infinite), then )=\sqrt{9-x})
is defined over what domain?
I thought since they are both defined over [0,3], that would be the new domain but it is [0,9]
So I graphed the new function and it is from (-infinite,9] but why is that limited at 0? edit: is 0 the lowest because  = \sqrt{x}?)
How do I work out these questions?
2. =3sin(2x), 0 \le x \le \pi)
and  = 1-x^2)
for x e R.
a) show g(f(x)) exists - done
b) write down the rule for g(f(x)) and state domain - done BUT - I got the domain by saying they were both defined over [0,pi] ? It worked for this Q but not for others.
c) Find the range - How do I get this? I tried to do what I did with the domain (-infinite,1] for one and [-3,3] for the other, giving me [-3,1]. range is [-8,1]
And say if you have the domain and sub it into the equation to find the y-value, is there any way to see whether this is the lowest/highest y-value?
3. Find all values of k such that equation  = 1)
has exactly one solution.
I tried discriminant and ended up with K = -0.25 but then also got k>0?
Basically, I let u = 2^x so I had 
used discriminant to get 1+4k = 0, k = -1/4
and if I use the quadratic formula, I get
)
so doesn't 
have to be greater than 0? If I solve it, then I get k > 0
Q1)
It would probably be best if you left
=\sqrt{9-(\sqrt{x}\;)^2} \;)
.
This states that x > 0. As for why x can now extend up to 9 that does seem a bit weird, but, I think because for f(x)'s domain being there because they are the only values that keeps it in the real field. Now x can equal 9 and the function will still exist.
So with this x is an element of [0,9]
Q2)
b) so g o f = 1 - 9sin^2(2x)
if x in f(x) is restricted to 0 < x < pi, then g o f is restricted to 0 < x < pi, since, these are the only values that will map out a value.
What do you mean by "others"?
c) The range is simply the value restriction for g o f. With your graphics calculator graph 'g o f' in 0 < x < pi and find out the maximum and minimum value g o f will give and this is [-8,1].
3)
here you simply take the discriminant and state:
1 + 4k = 0 => k = -0.25
what you continued on doing was pretty weird.
basically with your quadratic formula you have:
discriminant < 0, Complex solution zone
discriminant = 0
discriminant > 0
so for x to be defined the discriminant must be equal to 0 or greater than 0, but, we are told that the discriminant must equal zero.
If we didn't have any restrictions we could say that there will be atleast one solution to the given equation if K is ≥ -0.25.
with exponentials x
ϵ ℝ.
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