How Do You Sell More Walnuts In A Perfectly Competitive Market?
If the equilibrium price in a perfectly competitive market for walnuts
is $4.99 per pound,then an individual firm in this market can

A. Not sell additional walnuts unless the firm lowers its price.
B. Not sell additional walnuts at any price because the market is at equilibrium.
C. Sell an additional pound of walnuts at $4.99.
D. Sell more only by increasing its advertising budget.
the subject is Economics.

Answer: the answer is $26,400

Step-by-step explanation:

Answer: The answer should be D(x=5 1/2)

Step-by-step explanation:

Trust me I did the equation and work.

the fraction is 180/365

this can get reduced to 36/73

Answer:

A = 114°, B = C = 33°

Step-by-step explanation:

The triangle relationships let you write two equations:

A+B+C = 180

B=C

Substituting the expressions for A, B, and C, you have ...

(x+7y+41) +(2y+13) +(6x+15) = 180

7x +9y +69 = 180

7x +9y = 111

And the second equation gives ...

(2y+13) = (6x+15)

6x -2y =-2

3x -y = -1

Now, we can add 9 times this second equation to the first to eliminate the y-variable.

(7x +9y) +9(3x -y) = (111) +9(-1)

34x = 102

x = 3

Then the angle measures are ..

B = C = 6·3+15 = 33

A = 180 -2·33 = 114

The angles in the triangle are (A, B, C) = (114°, 33°, 33°).

The value of 6 (3/4) divided by 1 (7/8) is 3 (3/5).

A fraction is a part of the whole represented by a/b, where a and b are any integers

The given numbers are 6 (3/4) and 1 (7/8).

Simplify the mixed fractions:

6(3/4) = 27/4 and 1 (7/8) = 15/8

Now, divide 27/4 by 15/8:

27/4 ÷ 15/8

= 27/4 × 8/15

= 18/5

= 3 (3/5)

Hence, The value of 6 (3/4) divided by 1 (7/8) is 3 (3/5).

Learn more on fractions here:

brainly.com/question/10354322

#SPJ3

By moving from a 5% interest rate to a 5.5% interest rate, you would need to deposit $372.84 less today for your savings goal of $25,000 in 6 years.

When planning for a savings goal, we use the formula for the future value of a single amount which is FV = PV * [tex](1 + r)^n[/tex], where PV is the present value or the amount you need to deposit today, FV is the future value or the goal of $25,000, r is the interest rate, and n is the number of years.

First, let's calculate how much you need to deposit today with an interest rate of 5% (r = 0.05), the formula will be rearranged to solve for PV which is PV = FV / [tex](1 + r)^n[/tex]:

PV = 25000 / [tex](1 + 0.05)^6[/tex] = $18724.08

Next, calculate the deposit for an interest rate of 5.5% (r = 0.055) using the same formula:

PV = 25000 / [tex](1 + 0.055)^6[/tex] = $18351.24

The difference between these two amounts is $18724.08 - $18351.24 = $372.84.

So, with an interest rate of 5.5% rather than 5%, you would need to deposit $372.84 less today to reach your goal of $25,000 in 6 years.

https://brainly.com/question/31411395

#SPJ2

Try graphing y=x^3.  It crosses the x-axis at (0,0), and this point represents the one and only real root.

Every form of a cubic function has a graph that crosses the x-axis in 1 or 3 places. 

Thus, the correct answers to this particular problem are B and C.

Additionally, certain cubic function forms have graphs that cross the x-axis in one unique place, but which touch (but do not cross) the x-axis.  Here you have one unique real root plus one repeated (duplicated) real root, for a total of 3 roots.

Using these facts, decide which of the four given answers are correct.

Answer with explanation:

It is given that, Angle  θ is in standard position.

A line from origin O to point , P(8,-15) is joined and then perpendicular to x and y axis, is drawn cutting X axis at Point M and Y axis at point N.

OM= 8 units

ON=P M=15 units

By Pythagorean Theorem

[tex]OM^2 + PM^2=OP^2\\\\ 8^2 +15^2=OP^2\\\\ OP^2=64 +225\\\\OP^2=289\\\\OP^2=17^2\\\\OP=17\\\\ Sin (\theta)=\frac{\text{Perpendicular}}{\text{Hypotenuse}}=\frac{-15}{17}\\\\Cos(\theta)=\frac{\text{Base}}{Hypotenuse}=\frac{8}{17}\\\\Tan(\theta)=\frac{\text{Perpendicular}}{Base}=\frac{-15}{8}\\\\ Cosec(\theta)=\frac{1}{Sin(\theta)}=\frac{-17}{15}\\\\ Sec(\theta)=\frac{1}{Cos(\theta)}=\frac{17}{8}\\\\ Cot (\theta)=\frac{1}{Tan(\theta)}=\frac{-8}{15}[/tex]

Point(8,-15), lies in Quadrant four. In Quadrant four Cosine and Secant Function are positive and all other trigonometric functions, Sine,Cosecant, Tangent,and Cotangent are Negative.

Answer:

The answer is 36 children

Step-by-step explanation:

There were 36 children at the game

The number of children who went to the game was 36

What is Linear Equation in 2 variables?

An equation is said to be linear equation in two variables if it is written in the form of ax + by + c = 0, where a, b & c are real numbers and the coefficients of x and y, i.e a and b respectively, are not equal to zero.

Given data ,

Let the number of children be = x

Let the number of adults be = y

Cost of ticket for 1 child = $ 3

Cost of ticket for 1 adult = $ 6

Total number of people who went to the game = 120

So , x + y = 120

Total earnings for the ticket sales = $ 612

Total earnings =
( Cost of one child x Number of children ) + ( Cost of one adult x Number of adult)

Total earnings = 3x + 6y

Now , we have 2 equations to solve

x + y = 120   be equation (1)

3x + 6y = 612   be equation (2)

Multiply equation (1) by 3 , we get

3x + 3y = 360   be equation (3)

Subtract equation (3) from equation (2)

3x + 6y - ( 3x + 3y ) = 612 - 360

3y = 252

Divide by 3 on both sides , we get

y = 84

So , the number of children who went to the game will be

x + y = 120

x + 84 = 120

Subtract 84 on both sides , we get

x = 36

Hence , the number of children who were at the game was 36

To learn more about linear equation in 2 variables click :

https://brainly.com/question/11897796

#SPJ6

To solve the equation l = 14j + 3k for j, subtract 3k from both sides and then divide by 14, giving j = (l - 3k) / 14.

To solve the equation l=14j+3k for j, you need to isolate j on one side of the equation. Here's how it is done step by step:

Therefore, the solution to the equation for j is: j = (l - 3k) / 14.

https://brainly.com/question/18262581

#SPJ2

The properties that were used to derive the properties of logarithms are the properties of exponent because logarithms are exponents. The properties of exponents are: product of powers, power to a power, quotient of powers, power f a product and power of a quotient.

As an example, the log property log(a^k) = k log (a) can be derived from the exponential property (b^a)^k = b^(ak).

Likewise,

log (ab) = log (a) + log (b) comes from c^(a+b) = c^a*c^b

Proof:

Let x = c^a and y=c^b

Then, 

log (x) = a and log (y) = b (base c)

log (xy) = log (c^a * c^b) = log (c^(a+b)) = a+b = log(x) + log (y)

Charles has 2/3 of bob

 bob has 27

 so 2/3*27 = 27 *2 = 54/3 = 18

Charles has 18

Jim has 3 times as many as Charles so he has 3 x 18 = 54

 jim has 54 comic books

His work should have looked like this.

2x + y = 5
x − 2y = 10

y = 5 − 2x
x − 2(5 − 2x) = 10
x − 10 + 4x = 10
5x − 10 = 10                  When he added in both sides, he subtracted 10 from 10,
5x = 20                      instead of adding 10 from 10 to make 20.
x = 4
2(4) + y = 5
8 + y = 5

y = -3

Answer:

5/ 2 x

Step-by-step explanation:

First floor:

paint department 1,575 square feet

space engine department 2,925 square feet

Total = 4,500 square feet

Second floor:

space window department 1,845 square feet

electrical department 765 square feet

accessory department 1,890 square feet

Total = 4,500 square feet

Since 70% is allocated to the 1st floor, therefore the floor is receiving:

First floor expense = $110,000 * 0.70 = $77,000

Second floor expense = $110,000 - $77,000 = $33,000

The expense for each department is the proportion on the total expense per floor.

First floor:

paint department = (1575/4500) * 77,000 = $26,950

space engine department = 77,000 – 26,950 = $50,050

Second floor:

space window department = (1845/4500) * 33,000 = $13,530

electrical department = (765/4500) * 33,000 = $5,610

accessory department = 33,000 – 13530 – 5610 = $13,860

Value of Aurora's benefits as 30percent of her salary is equals to $7500.

" Percentage is defined as the hundredth part of the given whole number."

According to the question,

Salary amount of Aurora = $25,000

Benefit value = 30 percent of ( $25,000)

Therefore,

30 percent of ( $25,000) = 30% of 25,000

                                          =  [tex]\frac{(30) * (25,000)}{100}[/tex]

                                          = $7,500

Hence, value of Aurora's benefits as 30percent of her salary is equals to $7500.

Learn more about percentage here

https://brainly.com/question/13450942

#SPJ2

In this problem, it is TRUE that the instructor would need to use a t distribution with 10 degrees of freedom to be able to test whether any improved occurred.

In order to check for its correctness, we need to measure the absolute difference between the mean value in two groups in a clinical trial by using the mean difference. Next, we check for the degrees of freedom. The degrees of freedom are the number of independent pieces of information that went into calculating the estimate.

You have to subtract 1 from the number of items to be able to get the df for the estimate. Let’s check this scenario:

Let’s say you need to find the mean weight loss for a low carbohydrate diet. You can use 4 people and giving 3 degrees of freedom (4 -1 = 3), in turn, you can also use 100 people with a df of = 99.

1/5 = 0.20

25% = 0.25

 therefore 1/5 is not the same as 25%

Answer:

(8, 17)

Step-by-step explanation:

Here you have two functions equalling y.

To find x, we set these two functions equal to one another, which eliminates y:  

3x - 7 = 2x + 1.

Find x.  To do this, subtract 2x from both sides, obtaining x - 7 = 1.

Next, add 7 to both sides:  x = 8.

Finally, find y.  Do this by subbing 8 for x in either of the two given equations.

Working with the 2nd equation:  y = 2(8) + 1 = 17

Thus, the solution is (8, 17).

I believe the answer is (8 , 17)

Answer:

13 cm

Step-by-step explanation:

Area of the square is [tex]169 \:\:cm^{2}[/tex]

The square is rotated to form a cylinder. Now, we first need to find the side of the square, the cylinder is formed by rotating along its side.

Now area of square [tex]169 \:\:cm^{2}[/tex]

We know that area of square is [tex]\text{side}\times\text{side}[/tex]

So, [tex]\text{side}\times\text{side}=169[/tex]

[tex]\text{side}\times \text{side}=13\times13[/tex]

[tex]\text{side}=13 \:\text{cm}[/tex]

Now, as the cylinder is formed by rotating along its length, and we know that all the sides of a square is equal.

So, one side becomes the height of the cylinder and the other becomes the circumference.

Hence, the height of the cylinder is 13 cm.