Answer:
A frequency distribution lists the<u> number</u> of occurrences of each category of data, while a relative frequency distribution lists the <u>proportion</u> of occurrences of each category of data.
Explanation:
A "frequency distribution" is one of the ways in organizing a data, either by <em>listing the information, putting them in a table or showing them in a graph.</em> The items in the list (distinct values) are then counted when it comes to the number of times they've occurred.
Thus, this explains the first answer, "number."
On the other hand, a "relative frequency distribution" refers to the proportion of the overall number of observations in a particular category. <u>You can get this by dividing each frequency with the total number of data in a sample.</u>
Thus, this explains the second answer, "proportion."
What is the question?
I'm assuming it is to find the length and width.
+_= plus or minus
(X+36)
____________
| |
(X) | |
|____________|
X^2+36X-2040<0
X<-36+_(36^2-4*-2040)^(1/2)
-----------------------------------
2
X<-18+_2((591)^(1/2))
This is probably not what you wanted, sorry
Answer:
1). Shifted 2 units right.
2). Shifted 2 units left.
3). Shifted 2 units up.
4). Shifted 2 units down.
Step-by-step explanation:
Parent quadratic function is,
y = x²
1). When curved pit of the parent function is shifted 2 units right,
Translated function will be,
y = (x - 2)²
2). The curved pit is shifted 2 units left,
y = (x + 2)²
3). The curved pit is shifted 2 units up,
y = x² + 2
4). The curved pit is shifted 2 units down,
y = x² - 2
