A
Graph g
The Rate of change is a little right triangle that is drawn from to to three parallel to the x axis and from about 45 to 60 on the y axis.
The square brackets means the the endpoints are included.
So the rate of change is [tex] \frac{\Delta y}{\Delta x} = \frac{60-45}{3 - 2} = \text{15} [/tex]
Graph h
[tex] \text{rate of change = } \frac{\Delta y}{\Delta x} = \frac{35 - 20}{3 - 2} = 15 [/tex]
Graph f
[tex] \text{rate of change = } \frac{\Delta y}{\Delta x} = \frac{35 - 10}{3 - 2} = 25 [/tex]
Conclusion
This is very hard to call. There are two the same (two of them being g and h) It's a graph and so it is nearly impossible to differentiate. I would say the statement is false but be prepared to get it wrong. Draw g and h for yourself and see what you think. If you get the two of them different, go with your answer.
B
Another tough one to call. f and g cross at four. It is true f and h. The value of f(4) > h(4). Again, if you do this and disagree, then go with your answer. Mine is false.
C
It is very difficult to reproduce this graph on desmos so that you get a clear cut answer from the graph. I cheated and used a calculator. f(x) is over 6000 and h(x) = 168. This statement is also not true.
D
Here again this is false. g's rate of change is a constant. Eventually f will have the same slope as bitcoin's value which is in the range of about 6000. So this statement is false as well.
E
See the comment about F in the answer for D. This statement is true.
F
This is definitely a true statement.
Conclusion or answer
E and F <<<<<<< True should be checked.
I would check the first two statements with a calculator. I did them with a graph.
