Consider thefunction f(x) = arcsin(1 - x^2).
(a) What is the largest domain over which this function is defined?
(b) For this domain, what is the corresponding range of thefunction?
(c) If this function is one-to-one, find the inverse function f^-1(x), and state thedomain of this inverse function. Otherwise, find a suitabl
1 Use the graph to find a reasonable estimate of f(-2). Graph is included in the attached document.
2 What is thedomain of f (x)
3 What is therange of f (x)
4 Explain why f represents the graph of a function
1. Determine whether the following relation represents a function. If the relation is a functionthen state domainandrange?
Does the given relation represent a function?
2.Determine whether the following relation represents a function. If the relation is a functionthen state domainandrange?
Determine whether each relation is a function:
x^2 = 1 + y^2
y = (square root of x + 5)
Determine thedomainandrange of each relation
y = 2x - 3
Graph each functionand state thedomainandrange
y = 0.3x
y = l x-2 l
1. Find the values which satisfy the given relations.
(a) |x-4| = 6
(b) |2y + 3| > 5
(c) |4u-1|<= 3
2. Give thedomainandrange of each function
(a) f(x) = (9 - x^2)^.5
(b) f(x) = 2/x^2
(c) f(x) = ((2x-5)/(x-3))^.5
3. Sketch the graph of f(x) = 2=x. Using this as a starting point, and using translations,