Question 727186: given h(x)= square root of x and g{ (1,-2) (2,2) (3,-4) (4,3)
a)determine a point which when added to g changes the set of ordered pairs from a function to a relation
b)3h(16)-4
c)g-1(3)
d) the range of g
e)value "a" such that h-1(a) does not exist
2. Sketch g(x)= *square root of x* -2 ---note that -2 is not include into root of-and state the domain and range
3. State inverse of the graph (-4,-3) (-1,-2)(2,2)(5,-1)
is inverse a function if not restrict the domain of f so the inverse is a function
4.The graph of f is (-9,-5) (-8,10) (-6,10) (-5.5,1) (-5,4)
The graph of g is (-4,3) (-1,2) (2,-2) (3,1) (4,0)
a-State all transformations that occur from graph f to g,
b-write the transformations in the right order which they occur
c-write the equation which maps onto f into g
5- consider the sequence below\-8,-11,-14,-17
a) determine a formula for the general term Tn
6.Write the correct sequence of transformations that could be used to transform f into g. Also include a input and output diagram
graph g is : (-9,2) (-8,2) (-8,10) (-6,-6) (-4,-6)
graph f is : (-2,4) ( 2,4) (6,0) (7,2) (8,2)
7.givin f(x)=3x2-2x and h={(3,-22),(0,1) (-2,5)(-10,3)}
a) determine a point when added to h changes the set of ordered pairs from a function to a relation
b) -2f(-1)+1
c)h-1(3)-----aka inverse h(3)
d)the range of h
e)the values of "a" givin f(a)=40
8.given h(x)= square root of x and g{ (1,-2) (2,2) (3,-4) (4,3)
a)determine a point which when added to g changes the set of ordered pairs from a function to a relation
b)3h(16)-4
c)g-1(3)
d) the range of g
e)value "a" such that h-1(a) does not exist
Answer by lynnlo(4176)   (Show Source):
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