Answer:
k=4/3
Step-by-step explanation:
5(2k-1)-k=7
10k-5-k=7
9k=12
k=4/3
Answer:
P is 12
Step-by-step explanation:
It is just 20-8, which is 12
Answer:
1/ 8 pounds of dog food
Step-by-step explanation:
Given that:
7/8 pounds of dog food shared equally into 7 containers ;
Number of dog food in each container will be :
Total dog food / Number of containers
(7/8) ÷ 7
(7 /8) * 1/ 7
7 / 56
= 1/8 pounds of dog food
Skewed
B)
Uniform
C)
Symmetric, bimodal
D)
Non-symmetric, bimodal
Answer:
c
Step-by-step explanation:
The distribution is skewed.
The question asks about the description of the distribution of a dataset. To determine how the data is distributed, we need to analyze the shape of the graph or histogram representing the data.
If the dataset is skewed, it means that the data is not evenly distributed and there is a tail on one side. So, option A is correct. If the dataset had a bell-shaped graph with a single peak, it would be symmetric, but since it is bimodal, with two distinct peaks, option D is not accurate. The options B and C are not applicable based on the given information.
Therefore, the best description for the distribution is skewed.
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Answer:
answer:
answe:
answ:
ans:
an:
as:
a:
:
What equation expresses the requirement that the solution touches the t-axis?
a. y(t)= 0
b. y'(t)= 0
c. y''(t)= 0
Answer:
a. y(t) = 0
Step-by-step explanation:
There are two axis on the graph. One is x-axis which is horizontal line on the graph and the other is y-axis which is vertical side of the graph. The point where x-axis and y-axis meet is origin which has value 0. The equation to write the points of the graph is represented by y(x) = 0. In the given equation there is t variable used in the values.
The requirement that the solution of the given initial value problem 'touches' the t-axis is represented by the equation y(t) = 0. This is because the output of the function is zero at that specific value of t. Contrastingly, y'(t) = 0 and y''(t) = 0 indicate conditions of slope and rate of slope change.
In the given initial value problem, the requirement that the solution 'touches' the t-axis is represented by the equation y(t) = 0. This is because when the function Touches the t-axis, the y-value (output of the function) is zero for that specific value of t.
It's worth noting that y'(t) = 0 and y''(t) = 0 represent the conditions where the slope of a function is zero (which corresponds to a localminimum or maximum), and where the rate of change of the slope is zero (which can indicate a point of inflection), respectively.
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