Answer:
x = n/2 - 1/4
Step-by-step explanation:
isolate the variable by dividing each side by factors that don't contain the variable
Answer:
The correct answer is;
Series 2 of the attached plot.
Step-by-step explanation:
In the plot, since series 2 has the higher mean and the lower median, it is the plot with that most likely fit the result of Samantha's statistic results.
The mean
The mean is also known as the average which is found by dividing the sum of all data points values by the total number of data points. In statistics, the mean is the most frequently used measure of central tendency and its value is considerably affected by the maximum and minimum values in the data set.
The Median
The median is the value of the data point separating the higher half of data point values from the lower half of data point values in a data set or population. The advantage of the median over the mean is that it is not easily affected by outliers that have values that are significantly larger than the majority of the values of the other data points in the set.
Answer:
x= -12
Step-by-step explanation:
Simplifying
4x + 10 = 2x + -14
Reorder the terms:
10 + 4x = 2x + -14
Reorder the terms:
10 + 4x = -14 + 2x
Solving
10 + 4x = -14 + 2x
Solving for variable 'x'.
Move all terms containing x to the left, all other terms to the right.
Add '-2x' to each side of the equation.
10 + 4x + -2x = -14 + 2x + -2x
Combine like terms: 4x + -2x = 2x
10 + 2x = -14 + 2x + -2x
Combine like terms: 2x + -2x = 0
10 + 2x = -14 + 0
10 + 2x = -14
Add '-10' to each side of the equation.
10 + -10 + 2x = -14 + -10
Combine like terms: 10 + -10 = 0
0 + 2x = -14 + -10
2x = -14 + -10
Combine like terms: -14 + -10 = -24
2x = -24
Divide each side by '2'.
x = -12
Simplifying
x = -12
It means that the rental truck cost 60 dollars.
Explanation:
If c(x) means the cost of the rental trucks, then in the chart it means that it cost 60 dollars to be rented for 3 days.
Hope this helped :)
We have a total set of 15 people, we need to arrange them in 4 spots, where each individual must be unique. Therefore we have:
There are 32760 possible solutions.
We then need to choose 12 appetizers from a set of 16 appetizers, where each individual appetizer must be unique, so we have:
There are 871782912000 possible solutions.