Domain :(−∞,∞), Range :(−∞,1] Domain :(−∞,1], Range :(−∞,∞) Domain :(−∞,∞), Range :(−∞,1) Domain :(−∞,1), Range :(−∞,∞) 4. Choose the correct domain and range of the graph below. Write the answer in interval notation. ...
【题目】Directions: Given the domain and range of the graph in interval notation. Determine whether e ach relation is a function R= 答案 【解析】{|≤7}{yy≤0}yes相关推荐 1【题目】Directions: Given the domain and range of the graph in interval notation. Determine whether e ach relation is...
Answer to: Find the domain and the range and sketch the graph of the function. G(x) = \dfrac{3x + |x|}{x} By signing up, you'll get thousands of...
Domain and Range of a Function:The domain of a function is the input values, which are represented on the x-axis. The range is the output values and is represented on the y-axis. We can identify the domain and range of a function if we have its graph. If the graph has filled ...
The domain of the graphed function, the union of the domains of each curve, is(−∞,2)∪[4,∞). Step 2:There is no simplification that can be done to the domain found inStep 1. Step 3:To find the range of the graphed function, we start at the bottom of the...
Any real number can be substituted for x and get a meaningful output. For any real number, you can always find an x value that gives you that number for the output. Unless a linear function is a constant, such as f(x)=2f(x)=2, there is no restriction on the range. The domain ...
In this section, we will investigate methods for determining the domain and range of functions such as these.Figure 1. Based on data compiled by www.the-numbers.com.[1]Finding the Domain of a Function Defined by an Equation In Functions and Function Notation, we were introduced to the ...
Determine the domain and the range of the given graph of a function. The domain of the graph of the function is (Type your answer in interval notation.) There are 2 steps to solve this one. Solution
Determine the domain and range for function whose graph is given, and use this information to state the domain and range of the inverse function. Then sketch in the line $y = x$, estimate the location of two or more points on the graph, and use these to graph $f ^{-1} (x)$ on...
When you have a function where y equals a constant, your graph is a truly horizontal line, like the graph below of y=3y=3. In that case, the range is just that one and only value. No other possible values can come out of that function!