Answer:
Tree diagrams are most effective for complex probability calculations with multiple AND statements
Step-by-step explanation:
The given statements truths are;
A probability calculation can be calculated by using more than one model, which are dependent on the given parameters which can be either a graphical model such as a tree diagram, or an analytical model such as the systematic list model
A systematic list model is one that lists the possible outcomes of simple events
Area models are used for the representation of simple probabilities
Tree diagram models are helpful in graphically displaying complex probabilities, to aid visualization of the solution.
Answer:
Horizontal shift by -1 OR Horizontal shift to the left by 1
Vertical shift by 3 OR Vertical shift up by 3
(both on the left or both on the right)
Step-by-step explanation:
First, identify what changed from f(x) to g(x), which is the + 1 inside of what's being raised to the 4th and the + 3 outside of it. Inside the parentheses means a horizontal shift to the left if positive and right if negative, while outside the parentheses means a vertical shift upwards if positive and downwards if negative. In this case, we have a +1 and a +3 respectively, giving the answer above. The differences are just matters of teacher preference; the one on the right is more basic while the one on the left is more advanced. If you can remember, do it how your teacher did it in class.
For question 1 it would be 10 hundreds and 2 tens for the second question it would be 13 hundreds
Answer:
C. Both ends increase
Step-by-step explanation:
The end behavior of a function can be evaluated using limits by letting the independent variable x approach positive or negative infinity. An alternative to this approach is the graphical method. We graph the function, then study it's characteristics and then determine its end behavior.
We can graph the given function using graphing utilities, Desmos graphing being the most common and preferred graphing tool for its ease of use. The graph of the function as obtained from desmos graphing tool is shown in the attachment below.
From the graph, the function increases in the interval [0.4, ∞) since the y values keep getting bigger. Nevertheless, the function is also increasing on the interval (0.2, 0.4]. The value of y when x = 0.2 is a point of discontinuity.