What is the initial value of the following equation? Y=1/2x-4

Suppose tan(b) = -2, and the terminal side of b is located in quadrant II, then  cot(b) = -1/2

Note that:

tan(b) =  Opposite/Adjacent

Comparing the above relationship with tan(b) = -2/1:

Opposite = -2

Adjacent = 1

Also note that:

cot(b) = 1/tan(b)

cot(b) = Adjacent/Opposite

Substitute opposite = -2 and adjacent = 1 into the expression for cot(b)

cot(b) = -1/2

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Answer:

0.6 repeated

Step-by-step explanation:

Answer:

option A

I hope it helps

Answer:

F(-6) = 2*(-6) + 1

            5*(-6) -2

= -11  

  -32

=   11    

      32

Answer:

 300,000 is less than 352,000

Step-by-step explanation:

A few huge businesses control an industry Answer:

Step-by-step explanation:

Econ

3.1415926535897932384626433832795. But it's approximately 1.77

Answer:

Step-by-step explanation:

Solving in steps:

Correct option is 1.

Answer:

1/12

Step-by-step explanation:

Answer:

6x3=x

x=18

Step-by-step explanation: plzz mark brainliest

Answer:

Step-by-step explanation:

I think it's the loan balances decreases $500 per month because every month it starts decreasing down by 500

Answer:

Answer is B

Step-by-step explanation:

Answer:

N = 16

Step-by-step explanation:

[tex]72 \div 9 = N \div 2 \\ \\ \frac{72}{9} = \frac{N}{2} \\ \\ \frac{8}{1} = \frac{N}{2} \\ \\ N = 2 \times 8 \\ \\ \huge \orange{ \boxed{ N = 16}}[/tex]

Answer:

Kindly check explanation

Step-by-step explanation:

Given the data:

X : 18.0, 30.7, 19.8, 27.1, 22.3, 18.8, 31.8, 23.4, 21.2, 27.9, 31.9, 27.1, 25.0, 24.7, 26.9, 21.8, 29.2, 34.8, 26.7,31.6

True standard deviation (σ) = 4

α = 0.01

Mean (m) of the data:

Σ(X) /n = 520.7/20

m = 26.035 = 26.04

Uaing calculator :

Sample standard deviation (s) = 4.785

Null hypothesis : μ = 25

Alternative hypothesis : μ > 25

Test statistic (t) : (m - μ) / (s/√n)

t = (26.04 - 25) / (4.785/√20)

t = 0.972

We can obtain the p value using the pvalue from t score calculator :

df = n - 1 = 20 - 1 = 19

Decision:

If p < 0.01 ; reject null

p(0.972, 19) = 0.1716

Since p > 0.1716 ; we fail to reject the Null

Answer-

The slope of the line that passes through the points is

Solution-

As there is a single line passing through all these points, so taking any two points and then applying the formula for slope will give the slope of the line.

The points are,

(-14, 8), (-7, 6), (0, 4), (7, 2), (14, 0)

Taking two points as, (0, 4), (7, 2)

x₁ = 0

y₁ = 4

x₂ = 7

y₂ = 2

Putting the values,

Therefore, the slope of the line that passes through the points is

Step-by-step explanation:

The slope of the line that passes through the points in the table is -2/7.

Slope of a line is the ratio of the change in y coordinates to the change in the x coordinates of two points given.

Given a table which shows the points on the line.

Slope of a line passing through two points (x, y) and (x', y') is,

Slope = (y' - y) / (x' - x)

Take any two points on the line.

(0, 4) and (7, 2).

Slope = (2 - 4) / (7 - 0) = -2/7

Hence the slope of the line is -2/7.

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Answer:

Let X1 be the number of decorative wood frame doors and X2 be the number of windows.  

The profit earned from selling each door is $500 and the profit earned from selling of each window is $400.  

The Sanderson Manufacturer wants to maximize their profit. So for this model, the objective function is

Max: 500X1 + 400X2

Now the total time available for cutting of door and window are 2400 minutes.  

so the time taken in cutting should be less than or equal to 2400.  

60X1 + 30X2 ≤ 2400  

The total available time for sanding of door and window are 2400 minutes. Therefore, the time taken in sanding will be less than or equal to 2400.   30X1 + 45X2 ≤ 2400  

The total time available for finishing of door and window is 3600 hours. Therefore, the time taken in finishing will be less than or equal to 3600. 30X1 + 60X2 ≤ 3600  

As the number of decorative wood frame door and the number of windows cannot be negative.  

Therefore, X1, X2 ≥ 0

so the question s

a)

The LP mode for this model is;

Max: 500X1 + 400X2  

Subject to:  

60X1 + 30X2 ≤ 2400  

]30X1 +45X2 ≤ 2400  

30X1 + 60X2 ≤ 3600  

X1, X2 ≥ 0  

b) Plot the graph of the LP  

Max: 500X1+ 400X2  

Subject to:  

60X1 + 30X2 ≤ 2400  

30X1 + 45X2 ≤ 2400  

30X1 + 60X2 ≤ 3600

X1,X2  

≥ 0

In the uploaded image of the graph, the shaded region in the graph is the feasible region.  

c) Consider the following corner point's (0,0), (0, 53.33), (20, 40) and (40, 0) of the feasible region from the graph  

At point (0, 0), the objective function,  

500X1 + 400X2 = 500 × 0 + 400 × 0  

= 0

At point (0, 53.33), the value of objective function,

500X1 + 400X2 = 500 × 0 + 400 × 53.33 = 21332  

At point (40, 0), the value of objective function,  

500X1 + 400X2 = 500 × 40 + 400 × 0 = 20000  

At point (20, 40), the value of objective function

500X1 + 400X2 = 500 × 20 + 400 × 40 = 26000  

The maximum value of the objective function is  

26000 at corner point ( 20, 40 )

Hence, the optimal solution of this problem is  

X1 = 20, X2 = 40 and the objective is 26000

Answer:

a- A system of linear equations contains two or more equations e.g. y=0.5x+2 and y=x-2.

b- a financial gain, especially the difference between the amount earned and the amount spent in buying, operating, or producing something.

c- income, especially when of a company or organization and of a substantial nature.

d- (of an object or action) require the payment of (a specified sum of money) before it can be acquired or done.

e- The standard form for linear equations in two variables is Ax+By=C. For example, 2x+3y=5 is a linear equation in standard form.

f- The substitution method is a way of solving a system of equations by expressing the equations in terms of only one variable.

g- The elimination method is where you actually eliminate one of the variables by adding the two equations.

h- Solving one particular problem without regard to related issues.

i- the point or state at which a person or company breaks even.

j- The domain of a function is the complete set of possible values of the independent variable.

k- The Range is the difference between the lowest and highest values. Example: In {4, 6, 9, 3, 7} the lowest value is 3, and the highest is 9. So the range is 9 − 3 = 6.

Step-by-step explanation: Please mark brainliest

65 m/h

The formula we use for speed is Distance ÷ Time so, 260 miles ÷ 4 hours = 65 miles per hour.

Answer:

The value is  [tex]Z = 1120 \  eight -digit \ code [/tex]  

Step-by-step explanation:

From the question we are told that

    The birth date of  Shannon is  12/21/1982

 Generally the number of digits present in her birth date is N = 8

  Looking at the date we can see that  1 repeated  3 times

                                                                2 repeated 3 times

 Generally the total number eight -digit code that she could make using her birthday given  the total  number of digits that make up her birth date is N = 8

is mathematically represented as

            K =  8!

but but given that  digit 1 repeated itself 3 times , and 2 repeated itself 3 times then the total number of eight -digit code that she could make using her birthday will be mathematically evaluated as

            [tex]Z =  \frac{K}{3 ! *  3!}[/tex]

=>         [tex]Z =  \frac{8!}{3 ! *  3!}[/tex]

=>       [tex]Z =  \frac{8*  7*6*5* 4 * 3!}{3 ! *  3* 2*1 }[/tex]    

=>         [tex]Z = 1120 \  eight -digit \ code [/tex]  

Shannon could make 40,320 eight-digit codes using her digits in her birthday.

Given that Shannon was born on 12/21/1982, to determine how many eight-digit codes could she make using the digits in her birthday, the following calculation must be performed:

Therefore, Shannon could make 40,320 eight-digit codes using her digits in her birthday.

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Answer:

42.72

Step-by-step explanation:

Answer:

5.28

Step-by-step explanation:

100%-89%=11%

48x11%=5.28

Answer:

The correct options are A and C.

Step-by-step explanation:

A Binomial experiment has the following properties:

If a random variable X is used in an experiment and the experiment has all the above mentioned properties, then the random variable X is known as a binomial random variable.

(A)

Selecting five cards, one at a time without replacement, from a standard deck of cards. The random variable is the number of face cards obtained.

X = number of face cards .

There are n = 52 cards in a standard deck of cards.

There are 12 face cards in the standard deck of cards.

The probability of selecting a face card is, [tex]p=\frac{12}{52}=0.231[/tex].

The selection is done without replacement.

Thus, the experiment is a binomial experiment.

(C)

Survey 150 college students to see whether they are enrolled as new students. The random variable represents the number of students enrolled as a new student.

X = number of students enrolled as a new student.

The number of students selected for the survey, n = 150.

Each students response is independent of the others.

Thus, the experiment is a binomial experiment.

Answer:

32

Step-by-step explanation:

Answer:

D

Step-by-step explanation:

minus 18 both side, then divide it by -2. If you're going to divide by a negative you switches the sign.

Answer:

ī=80; s = 10

Step-by-step explanation:

When the standard deviation is from a finite group it is denoted by s. The number of transactions from an atm are countable in a day. So the standard deviation will be represented by s.

and ī represents the mean.

The other choices are incorrect because mean is usually represented by a bar over the alphabet such as x.

a simple alphabet does not denote the mean of the sample or population.

Parameters are the characteristics used to define a dataset.

The representation of the parameters are: [tex]\bar x = 80[/tex] and  [tex]s = 10[/tex]

From the question, we have:

[tex]Mean = 80[/tex]

[tex]Standard\ Deviation = 10[/tex]

Mean is represented as: [tex]\bar x[/tex]

So, we have:

[tex]\bar x = 80[/tex]

Standard deviation is represented as [tex]\sigma[/tex] of s.

So, we have:

[tex]s = 10[/tex]

Hence, the representation of the parameters are:

[tex]\bar x = 80[/tex] and  [tex]s = 10[/tex]

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Answer:

A) Slope =

[tex]m = \frac{1}{4} x[/tex]

explanation:

Take 2 random points off the line, I used (4,1) & (8,2)

The formula to find the slope when given 2 points is

[tex]m = \frac{rise}{run} = \frac{y2 - y1}{x2 - x1} [/tex]

so in this case x1 & y1 are assigned to (4,1)

and x2 & y2 are assigned to (8,2)

so substitute the numbers into the formula and solve !

[tex] m= \frac{y2 - y1}{x2 - x1} = \frac{2 - 1}{8 - 4} = \frac{1}{4} [/tex]

this will result in the answer I got above!!

B) yes it does show a constant rate of change cause it's increasing in 1/4x intervals

C) just because you move the placement of a line on the graph doesn't mean it's going to effect the slope as long as the numbers on the axis don't change!!

Answer:

correct answer: a.

Step-by-step explanation:

y = tan2x graph should have right side headed up, because it's positive.

however, the graph's frequency should be changed.

Since the normal period of y = tan x graph is pi/|b|,

the period for this graph should be pi/2.

We can see that graph (a) is meeting all the needs.

Given:

The given equation is

[tex]y-3=(2-x)^2[/tex]

To find:

The vertex, focus, and directrix.

Solution:

The equation of a parabola is

[tex]y-k=a(x-h)^2[/tex]     ...(i)

where, (h,k) is vertex, [tex]\left(h,k+\dfrac{1}{4a}\right)[/tex] and directrix is [tex]y=k-\dfrac{1}{4a}[/tex]

We have,

[tex]y-3=(2-x)^2[/tex]

It can be written as

[tex]y-3=(-(x-2))^2[/tex]

[tex]y-3=(x-2)^2[/tex]    ...(ii)

On comparing (i) and (ii), we get

[tex]h=2,k=3,a=1[/tex]

Vertex of the parabola is (2,3).

[tex]Focus=\left(2,3+\dfrac{1}{4(1)}\right)[/tex]

[tex]Focus=\left(2,3+\dfrac{1}{4}\right)[/tex]

[tex]Focus=\left(2,\dfrac{13}{4}\right)[/tex]

Therefore, the focus of the parabola is [tex]\left(2,\dfrac{13}{4}\right)[/tex].

Directrix of the parabola is

[tex]y=3-\dfrac{1}{4(1)}[/tex]

[tex]y=3-\dfrac{1}{4}[/tex]

[tex]y=\dfrac{11}{4}[/tex]

Therefore, the directrix of the parabola is [tex]y=\dfrac{11}{4}[/tex].