What is the range of the function represented by the graph?
[-1, infinite sign)
[-0.7, 3.7]
[-1/4, infinite sign)
(-infinite sign, infinite sign)
The range of the function represented by the graph is [-1, infinite sign).
(-infinite sign, infinite sign)
Apologies for the confusion. The range of the function represented by the graph cannot be determined based on the given options. More information or details about the graph are needed to accurately determine the range.
the graph is a parabola y-axis point 2 x-axis 1,2
Thank you for providing additional information about the graph. Based on the given information, the range of the function represented by the graph is (-∞, 2].
To determine the range of a function, we need to consider the set of all possible output values of the function. Looking at the given options:
1. [-1, ∞): This represents all real numbers greater than or equal to -1, so the range includes all values larger than or equal to -1.
2. [-0.7, 3.7]: This range specifies that the output values of the function lie between -0.7 and 3.7 (inclusive).
3. [-1/4, ∞): Similar to the first option, this represents all real numbers greater than or equal to -1/4.
4. (-∞, ∞): This range indicates that the output values have no bounds and can be any real number.
Based on these options, the function represented by the graph has an unlimited range, meaning it can have any real number as its output. Therefore, the correct answer is (-∞, ∞).
To determine the range of a function represented by a graph, we need to find the set of all possible output values (y-values) of the function.
For the given options:
1. [-1, ∞) represents a closed interval starting at -1 and extending to positive infinity. This means that the function includes all values greater than or equal to -1.
2. [-0.7, 3.7] represents a closed interval starting at -0.7 and ending at 3.7. This means that the function includes all values between -0.7 and 3.7, inclusively.
3. [-1/4, ∞) represents a closed interval starting at -1/4 and extending to positive infinity. This means that the function includes all values greater than or equal to -1/4.
4. (-∞, ∞) represents the entire real number line, including all possible values from negative infinity to positive infinity.
To determine the range of the function, we need to identify the y-values that are included in each option. Since the question doesn't provide a specific graph or equation, we cannot make a definitive determination.
Please provide more specific information, such as the equation or a visual representation of the graph, for me to assist you in finding the correct range.