Thanks guys for the help 
Stuck on a question from my textbook though 
maths quest 11 mm
exercise 2.4
11.A hybrid function is defined by
f(x) = x+a, for (-infinity, -8]
x^(1/3)+2 for (-8, 8]
b/x for (8, infinity)
a. determine the values of a and b so that the function is continuous for x Ɛ R, and for these values, sketch the graph of y = f(x)
Use the values of a and b from part a for the remainder of this question
i've found a = 8, and b = 32, and sketched the graph
b. Deteremine the values of k for which the equation f(x) =k has:
i. no solutions
ii. one solution
iii. two solutions
c. find {x: f(x) = 1}
I'm not sure how to do part b and c, would appreciate if someone can help out 
EDIT: it's from maths quest 12 mm textbook
as if i'm still in year 11 anymore 
, year's 12's the big year 
for b) I think the best way to do it is simply find it from the graph.
i) For the part where f(x) = x+8, as x goes to negative infinity so does y, so the min y value is -infinity. You can see from the graph that the maximum y value is at the intersection between x
1/3+2 and \( \frac{32}{x}\), where x=8 hence y=4 is the max y value.
So There are no solutions for k (ie the y value) belongs to (4, infinity)
ii) The graph should help you out here a lot
When x=8, y=4 and as x approaches infinity, y approaches 0.
As x approaches -8 (from the direction of x=8), y approaches 0.
So we can see there are two solutions for x belongs to (-8, infinity) ie k belongs to (0, 4]
And one solution for everything else; x belongs to (-infinity, -8] ie k belongs to (-infinity, 0]
c) I'd simply solve for each of the parts of the function and eliminate any impossible answers
eg for the first part, solve x+8=1
x=-7. Discard this answer as it is outside the range of (-infinity, -8]
And continue for the other parts
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