Answer:
1/6
Step-by-step explanation:
assuming a fair die with 6 sides numbered 1-6,
since there are a total of 6 sides, the total possible numbers landing face up are 1,2,3,4,5,6 (i.e 6 possible outcomes)
we are asked to find the probability when the number 6 lands face up. Realize that there is only one way in which this can happen. hence the number of favorable outcomes is only 1.
Hence the probability of rolling a 6,
= number of favorable outcomes / number of possible outcomes
= 1/6
Answer:
π
The desired formula is y = 3cos(----- t) + 5
5
Step-by-step explanation:
From maximum point to minimum point, the change in x is 5 and the change in y (min to mx) is (8 - 2), or 6. The graph repeats itself beginning at x = 6 and thus has period 10 (e. g., from first max to next max).
2π
Period and frequency are related through period = ------
b
and so if the period is 10 (as it is here),
2π 2π π
period = 10 = ------------ Therefore, b = ------- = -------
b 10 5
π
The desired formula is y = 3cos(----- t) + 5
5
3 is the amplitude and 5 is the vertical offset from y = 0.
Answer:
i'm SORRY but where is the linear model
Step-by-step explanation:
Answer:
66.67 %
Step-by-step explanation:
As we can see from the figure
We are given a bar graph in which bars represent the number of reserved campsites at a camp ground for one week from Monday to Sunday.
First of all
Lets the count the total number of reservations made by campsites during the week.
Total Number of campsite reservations = 5+3+4+7+26+30+9
Total Number of campsite reservations =84
Now
we have to calculate what percent of reservations were made for friday or saturday.
% of reservations made on friday or saturday = 
% of reservations made on friday or saturday = 
% of reservations made on friday or saturday = 
% of reservations made on friday or saturday = 66.67 %
So in total 66.67 % reservations are on friday and saturday.
The base requires (4 ft)*(3 ft) = 12 ft^2.
The sides require (2 ft)*(2*(4 ft +3 ft)) = 28 ft^2.
The total area of the box is (12 +28) ft^2 = 40 ft^2. . . . . . . . . 1st selection
