QUESTION IMAGE
Question
- determine whether each graph represents the graph of a function. if so, determine whether the graph is the graph of a one - to - one function.
(a)
(b)
(c)
(d)
To determine if a graph represents a function, we use the vertical line test: a graph is a function if no vertical line intersects it more than once. To determine if a function is one - to - one, we use the horizontal line test: a function is one - to - one if no horizontal line intersects its graph more than once.
Part (a)
Step 1: Vertical Line Test
If we draw a vertical line (parallel to the \(y\) - axis) anywhere on the graph, it will intersect the graph at more than one point. So, by the vertical line test, the graph in (a) does not represent a function.
Step 2: Conclusion for One - to - One
Since it is not a function, we do not need to check for one - to - one.
Part (b)
Step 1: Vertical Line Test
For the parabola - shaped graph (opening downwards), any vertical line will intersect the graph at most once. So, by the vertical line test, this graph represents a function.
Step 2: Horizontal Line Test
If we draw a horizontal line (parallel to the \(x\) - axis), it will intersect the graph of the downward - opening parabola at two points (except at the vertex). So, by the horizontal line test, the function is not one - to - one.
Part (c)
Step 1: Vertical Line Test
If we draw a vertical line, it will intersect the graph at more than one point. So, by the vertical line test, the graph in (c) does not represent a function.
Step 2: Conclusion for One - to - One
Since it is not a function, we do not need to check for one - to - one.
Part (d)
Step 1: Vertical Line Test
Any vertical line drawn on this graph will intersect it at most once. So, by the vertical line test, the graph represents a function.
Step 2: Horizontal Line Test
Any horizontal line drawn on this graph will intersect it at most once. So, by the horizontal line test, the function is one - to - one.
Final Answers:
- (a): Not a function.
- (b): Function, but not one - to - one.
- (c): Not a function.
- (d): Function and one - to - one.
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To determine if a graph represents a function, we use the vertical line test: a graph is a function if no vertical line intersects it more than once. To determine if a function is one - to - one, we use the horizontal line test: a function is one - to - one if no horizontal line intersects its graph more than once.
Part (a)
Step 1: Vertical Line Test
If we draw a vertical line (parallel to the \(y\) - axis) anywhere on the graph, it will intersect the graph at more than one point. So, by the vertical line test, the graph in (a) does not represent a function.
Step 2: Conclusion for One - to - One
Since it is not a function, we do not need to check for one - to - one.
Part (b)
Step 1: Vertical Line Test
For the parabola - shaped graph (opening downwards), any vertical line will intersect the graph at most once. So, by the vertical line test, this graph represents a function.
Step 2: Horizontal Line Test
If we draw a horizontal line (parallel to the \(x\) - axis), it will intersect the graph of the downward - opening parabola at two points (except at the vertex). So, by the horizontal line test, the function is not one - to - one.
Part (c)
Step 1: Vertical Line Test
If we draw a vertical line, it will intersect the graph at more than one point. So, by the vertical line test, the graph in (c) does not represent a function.
Step 2: Conclusion for One - to - One
Since it is not a function, we do not need to check for one - to - one.
Part (d)
Step 1: Vertical Line Test
Any vertical line drawn on this graph will intersect it at most once. So, by the vertical line test, the graph represents a function.
Step 2: Horizontal Line Test
Any horizontal line drawn on this graph will intersect it at most once. So, by the horizontal line test, the function is one - to - one.
Final Answers:
- (a): Not a function.
- (b): Function, but not one - to - one.
- (c): Not a function.
- (d): Function and one - to - one.