The graphs of y = sin − 1 x , y = cos − 1 x , and y = tan − 1 x are shown in Table 5.10 on page 640. In Exercises 75-84, use transformations (vertical shifts, horizontal shifts, reflections, stretching, or shrinking) of these graphs to graph each function. Then use interval notation to give the function's domain and range. g ( x ) = sin − 1 ( x + 1 )
The graphs of y = sin − 1 x , y = cos − 1 x , and y = tan − 1 x are shown in Table 5.10 on page 640. In Exercises 75-84, use transformations (vertical shifts, horizontal shifts, reflections, stretching, or shrinking) of these graphs to graph each function. Then use interval notation to give the function's domain and range. g ( x ) = sin − 1 ( x + 1 )
Solution Summary: The author analyzes the graph of the inverse trigonometric function, g(x)=mathrmsin-1x.
The graphs of
y
=
sin
−
1
x
,
y
=
cos
−
1
x
, and
y
=
tan
−
1
x
are shown in Table 5.10 on page 640. In Exercises 75-84, use transformations (vertical shifts, horizontal shifts, reflections, stretching, or shrinking) of these graphs to graph each function. Then use interval notation to give the function's domain and range.
Suppose you flip a fair two-sided coin four times and record the result.
a). List the sample space of this experiment. That is, list all possible outcomes that could
occur when flipping a fair two-sided coin four total times. Assume the two sides of the coin are
Heads (H) and Tails (T).
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