well, they have said that
The amount of milk produced each month depends on the number of dairy cows
so what do you think?
The number of dairy cows in a farm can vary from month to month. The amount of milk produced each month depends on the number of dairy cows on the farm. If g is the number of gallons of milk produced and n is the number of dairy cows on the farm, which of the following statement or statements are true about the variables? Select two answers.
A.
g is the independent variable
B.
g is the dependent variable
C.
n is the independent variable
D.
n is the dependent variable
13 answers
is g the dependant and n the independant?
So what is it?
this test is 15 questions
can someone please help
869 People have seen this and still no answers i will give them after the test
(873)
hi
i will give the answers after the test.
hope it will help.
hope it will help.
Marco is putting some sweaters into storage for the winter he has 10 sweaters and he can fit 6 sweaters into a box how many different groups of 6 sweaters can marco pack into a box
Marco can pack $\boxed{252}$ different groups of 6 sweaters into a box.
We can use combinations to solve this problem. The number of ways to choose 6 sweaters out of 10 is $\binom{10}{6}=\frac{10!}{6!4!} = 210$, which represents the number of different unordered groups of 6 sweaters that Marco can select. However, the order in which the sweaters are selected does not matter for packing purposes. Therefore, the number of different groups of 6 sweaters Marco can pack into a box is the same as the number of different combinations of 6 sweaters, which is also $\binom{10}{6}=252$.
We can use combinations to solve this problem. The number of ways to choose 6 sweaters out of 10 is $\binom{10}{6}=\frac{10!}{6!4!} = 210$, which represents the number of different unordered groups of 6 sweaters that Marco can select. However, the order in which the sweaters are selected does not matter for packing purposes. Therefore, the number of different groups of 6 sweaters Marco can pack into a box is the same as the number of different combinations of 6 sweaters, which is also $\binom{10}{6}=252$.
Marco is putting some sweaters into storage for the winter he has 10 sweaters and he can fit 6 sweaters into a box how many different groups of 6 sweaters can marco pack into a box
A. 210
B. 5,040
C. 7,560
D. 151,200
A. 210
B. 5,040
C. 7,560
D. 151,200
The correct answer is A. 210.
To find out how many different groups of 6 sweaters Marco can pack into a box, we need to use combinations. The formula for combinations is $\binom{n}{k} = \frac{n!}{k!(n-k)!}$ where $n$ is the total number of items and $k$ is the number of items being chosen.
In this case, $n = 10$ (the total number of sweaters) and $k = 6$ (the number of sweaters that can be packed into a box).
So, the number of different groups of 6 sweaters that Marco can pack into a box is:
$\binom{10}{6} = \frac{10!}{6!4!} = \frac{10 \times 9 \times 8 \times 7}{4 \times 3 \times 2 \times 1} = 210$
Therefore, the answer is A. 210.
To find out how many different groups of 6 sweaters Marco can pack into a box, we need to use combinations. The formula for combinations is $\binom{n}{k} = \frac{n!}{k!(n-k)!}$ where $n$ is the total number of items and $k$ is the number of items being chosen.
In this case, $n = 10$ (the total number of sweaters) and $k = 6$ (the number of sweaters that can be packed into a box).
So, the number of different groups of 6 sweaters that Marco can pack into a box is:
$\binom{10}{6} = \frac{10!}{6!4!} = \frac{10 \times 9 \times 8 \times 7}{4 \times 3 \times 2 \times 1} = 210$
Therefore, the answer is A. 210.