For each relation below:
\left\{\left(16, 14\right), \left(8, 28\right), \left( - 15 , 14\right), \left( - 20 , - 28 \right)\right\}
x | 7 | 7 | 8 | 5 | 3 |
---|---|---|---|---|---|
y | 1 | 9 | 3 | 2 | 6 |
Consider the function graphed:
State the domain.
State the range.
Consider the graph of y = \sqrt[3]{ - x }:
State the domain.
State the range.
The function f \left(x\right) = \sqrt{x + 1} has been graphed below:
State the domain.
Is there a value of x in the domain that can produce a function value of - 2?
Consider the graph of the function y = f \left( x \right):
State the maximum value.
State the range.
State the domain.
The function y = \sqrt{x} has a domain of x \geq 0 and a range of y \geq 0. State the domain and range of y = \sqrt{x} - 2.
State the natural domain of the the following functions:
f \left( x \right) = \dfrac{1}{\sqrt{x}}
State the domain of the following functions using interval notation:
For each graph below, state the following using interval notation.
The domain
The range
Use the graph of f to find:
The domain.
The range.
f \left( 0 \right)
f \left( 1 \right) - f \left( 7 \right)