It is 4 o’clock. What is the measure of the angle formed between the hour hand and the minute hand?

Answer:

(a)

Use random selection to pick 10 calves to inoculate.(you didn't mention this option in the question instead you mix it with other option)

(B).No placebo is being used.

(F).After inoculation, test all calves to see if there is a difference in resistance to infection between the two groups.

(b)

(C).No placebo is being used.

(E).Use random selection to pick nine schools to visit.

(A).After the police visits, survey all the schools to see if there is a difference in views between the two groups.

(c)

(F.)A placebo patch is used for the remaining 35 volunteers in the second group.

(E).Use random selection to pick 40 volunteers for the skin patch with the drug.

(G).Then record the smoking habits of all volunteers to see if a difference exists between the two groups.

Step-by-step explanation:

In question one the answer is mixed with other option so the correct answer statements are provided along with the option for all questions. Placebo is not used in question (a) scenario because it is mentioned in the statement that there is enough vaccine is present and sample of 10 calves is selected from 22 calves and we test all calves after the inoculation because it is mention that blood test should be done on all calves.

Placebo is not used in question (b) scenario because it is mentioned in the statement that the police department can visit half of 18 schools and random sample of 9 schools are selected and it is mentioned in the statement that survey is sent to all 18 school so after the police visit all schools are surveyed to see the difference in views

Placebo patch is used in question (c) because it is mentioned in the statement that 40 out of 75 received the new skin patch so, the remaining 35 received placebo patch and random sample of 40 volunteers are selected for new skin patch. It is mentioned in the statement that each subject is survey so in the end smoking habits of all volunteers are recorded.

In the given settings, a completely randomized experiment can be used to test the effects of different interventions. Placebo is not being used in these experiments.

In a completely randomized experiment, the researcher randomly assigns subjects to different treatment groups to determine the effect of the treatment. In the given settings:

(a) A veterinarian wants to test a strain of antibiotic on calves. A completely randomized experiment can be conducted by randomly selecting 5 calves from the pasture to inoculate with the antibiotic while the remaining 17 serve as the control group with no placebo being used. After inoculation, the resistance to infection can be tested on both groups to compare the difference.

(b) The Denver Police Department wants to improve its image with teenagers. A completely randomized experiment can be conducted by randomly selecting half of the 18 schools to receive the visits from the police officer while the other half serve as the control group with no placebo being used. Then, a survey can be sent to all 18 schools at the end of the semester to compare the views between the two groups.

(c) A skin patch contains a new drug to help people quit smoking. A completely randomized experiment can be conducted by randomly selecting 40 volunteers to receive the skin patch with the drug while the remaining 35 volunteers receive the placebo patch with no drugs. The smoking habits of both groups can be surveyed at the end of the two months to see if a difference exists between the two groups.

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Answer:

  see attached

Step-by-step explanation:

For the figure A, the figure is symmetrical about a vertical line through its center. It has line symmetry.

__

For the figure O, it is symmetrical about both vertical and horizontal lines, as well as being symmetrical about its center point. It has line and point symmetry.

Answer:

The expression written by Emma  to represent the amount of the money that Juan earned  is WRONG.

Step-by-step explanation:

Here, the amount earned by Juan by walking dogs = w

The amount earned byJuan lowing lawns  = (2w - 6)

Now, the total amount earned by Juan

= Amount  earned from (Mowing Lawn +  Walking dogs)

= w +  (2 w - 6)

On further simplification, we get:

w +  (2 w - 6)  =  w +  2w - 6   =  3w-6 =  3(w-2)

So, the total amount earned by Juan = 3(w-2)

Now, the expression written by Emma = 2(3w-6)

and 2(3w-6) ≠ 3(w-2)

Hence, the expression written by Emma  to represent the amount of the money that Juan earned  is WRONG.

Answer:

$1,828,669

Step-by-step explanation:

For the original lump sum of $28,000 is our principal, P, the annual interest rate r, compounded monthly for n=12 months throughout  a period of 35 years (t) will have a final Accrued Amount of investment A given by the formula:

A= (Principal + Interest)  = P(1 + r/n)^nt  =28000(1+0.12/12)^35*12

=28000(1.01)^420=

28000*65.3096= $1828669

We know that 70 sixth graders had an average weight of 90 pounds, and 30 seventh graders had an average weight of 100 pounds.

We know that the weight of all 70 sixth graders will be 70*90, since we're multiplying the total amount of students by the average.

Using this same logic tells us that the total weight for the 30 seventh graders is 30*100

The average weight for all 100 students will be the total weight of the sixth graders (which is 70*90) added with the total weight of the seventh graders (which is 30*100), then finally divided by the total amount of students in the sample space (which is 100).

[tex]\dfrac{70(90)+30(100)}{100}[/tex]

[tex]=\dfrac{6300+3000}{100}[/tex]

[tex]=\dfrac{9300}{100}[/tex]

[tex]=93[/tex]

The average of all 100 students is 93 pounds.

Let me know if you need any clarifications, thanks!

Answer:

True, see proof below.

Step-by-step explanation:

Remember two theorems about continuity:

If f is differentiable in [0,4], then f is continuous in [0,4] (by 1). Now, f(0)=-1<0 and f(4)=3>0. Thus, we have the inequality f(0)<0<f(4). By Bolzano's theorem, there exists some c∈[0,4] such that f(c)=0.

The question is about the intermediate value theorem in calculus, which states a function takes on every value between f(a) and f(b) in a closed interval [a, b]. Given the function's values at 0 and 4, it must cross the x-axis, or equal zero, somewhere in the interval [0, 4].

This is a question about intermediate value theorem, a fundamental theorem in calculus. The intermediate value theorem states that if a function is continuous on a closed interval [a, b], then it takes on every value between f(a) and f(b) at some point within that interval. If we know that f(0) = -1 and f(4) = 3, this means the function f crosses the x-axis (or, in other words, f(c) = 0 for some c) somewhere in the interval [0, 4] because zero lies between -1 and 3 (the function's values at 0 and 4 respectively).

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Answer:

Solar Eclipse will required 30 mins to travel Distance of 1150 miles.

Step-by-step explanation:

Given:

Total Distance = 2300 miles

Time required = 1 hr

we will convert hour in minutes.

1 hr = 60 mins

hence Time = 60 mins

We need to find the time required to travel 1150 miles.

We will first find the speed at which solar eclipse travels.

Speed can be calculated by dividing Distance with time.

Speed = [tex]\frac{Distance}{time}[/tex]

Substituting the values we get;

Speed = [tex]\frac{2300}{60}=38.33\ mi/hr[/tex]

Now to find Time required to travel 1150 miles we will divide 1150 miles with Speed.

Time required to travel 1150 miles = [tex]\frac{1150}{38.33}= 30\ mins[/tex]

Hence Solar Eclipse will required 30 mins to travel Distance of 1150 miles.

Yes. Micheal and Ashley bought same amount of turkey which is 6 pounds.

Step-by-step explanation:

The question requires to you to form simultaneous equations and solve them.

Take the number of pounds for turkey to be x and that for ham to be y

For store A where michael spent $18

turkey cost $3 per pound ---- 3x

ham cost $4 per pound------4x

The equation for cost will be ; 3x+4y =18

For store B where Ashley spent $27

turkey cost $4.5 per pound

ham cost $6 per pound

The equation for cost is : 4.5x +6y=27

The two equations are;

3x+4y=18

4.5x+6y=27

Solving the equations by graph you get ;

x=6 and y=4.5 for both linear graphs. This means both equations produce similar amounts of turkey and ham . Micheal and Ashley bought same amount of turkey which is 6 pounds.

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Answer:

8:30 AM

Step-by-step explanation:

Given:

Bus 143 stops every 30 minutes on its express route to downtown

and  Bus 62 stops there every 8 minutes on its west side route

both meet at the bus stop at 6.30 AM

to find when they would meet the second time we need to find LCM( 30,8)

= 120

Hence the two buses would meet after 120 minutes that is 2 hours.

Hence they would be meet at 6.30+2= 8.30 AM

Answer:

The description of the company's is marketing mix.

Step-by-step explanation:

Consider the provided information.

Jakubowski Farms Gourmet Bread Base is the brand name for a mix designed for use in bread making machines which is the product.

We have given that the price is $14.99 plus shipping.

The promotion is word of mouth and public demonstrations.

The place is mail.

The marketing mix is defined as the set of actions or tactics that a company uses to market its brand or product. The 4Ps constitute a standard marketing mix-price, product, promotion and venue.

These four elements are the marketing mix—product, price, promotion, and place.

Hence, the description of the company's is marketing mix.

At t = 4, the distance traveled is 68 miles. This means that after the break, Joanna traveled 48 miles.

A function is an assertion, concept, or principle that establishes an association between two variables. Functions may be found throughout mathematics and are essential for the development of significant links.

The linear function is given below.

d(t) = 12t + 20

The distance traveled when t = 4 is calculated as,

d(4) = 12 x 4 + 20

d(4) = 48 + 20

d(4) = 68 miles

So, at t = 4, the distance traveled is 68 miles. This means that after the break, Joanna traveled 48 miles.

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Answer:

x = 3, x = -3

Step-by-step explanation:

The denominator of f(x) cannot be zero as this would make f(x) undefined. Equating the denominator to zero and solving gives the values that x cannot be and if the numerator is non zero for these values then they are vertical asymptotes.

Solve : x² - 9 = 0 ⇒ x² = 9 ⇒ x = ± 3

The vertical asymptotes are x = - 3 and x = 3

The vertical asymptotes of the rational function F(x) = (x - 6)(x + 6)/(x^2 - 9) are x = -3 and x = 3.

The rational function F(x) = (x - 6)(x + 6)/(x^2 - 9) has vertical asymptotes at x = -3 and x = 3.

To find the vertical asymptotes, we need to determine the values of x that make the denominator equal to zero. In this case, the denominator is x^2 - 9, which can be factored as (x - 3)(x + 3).

Therefore, the vertical asymptotes occur at x = -3 and x = 3, since these are the values that make the denominator zero.

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Answer: the number is 3

Step-by-step explanation:

Let the number be represented by x.

If 4 more than 4 times a certain number is the same as 4 more than the product of 3 and 4, it means that

4x + 4 = 4 + 3×4

4x + 4 = 4 + 12

4x + 4 = 16

Subtracting 4 from the left hand side and the right hand side of the equation, it becomes

4x + 4 - 4 = 16 - 4

4x = 12

Dividing the left hand side and the right hand side of the equation by 4, it becomes

x = 12/4 = 3

Answer:

76302 grams

Step-by-step explanation:

Diameter of the balloon = 9 m

Density of the gas (weight occupied per m³) = 200 g per m³

Volume of the spherical balloon = [tex]\frac{4}{3}\pi r^{3}[/tex]

Here r = 4.5 m

Then V= [tex]\frac{4}{3}\times\ 3.14 \times (4.5)^{3}[/tex]

V = 381.51 m³

Total weight = Total volume occupied * Density

                     = 381.51*200 = 76302 grams.

Final answer:

The total weight of the gas in a filled balloon with a 9-meter diameter is 76,340.25 grams, calculated by first finding the volume of the balloon and then multiplying it by the weight of the gas per cubic meter.

Explanation:

To find the total weight of the gas in a filled spherical balloon, first, we need to find the volume of the balloon using the formula for the volume of a sphere, which is V = (4/3)πr³. The diameter of the balloon is given as 9 meters, so the radius r is 9/2 meters or 4.5 meters.

Calculating the volume of the balloon:

Now, we'll multiply the volume of the balloon by the weight per cubic meter of the gas to get the total weight of the gas:

Answer: x = 28/33, y = 25/23

( 28/23, 25/23)

Step-by-step explanation:

3x + 4y = 8 ----------------------(1)

-2x + 5y = 3 ---------------------(2)

Using elimination method

Consider the coefficient of y in equation 1 and 2

Therefore multiply as follows

(1) x 5 -------- 15x + 20y = 40.

(2) x 4 -------- -8x + 20y = 12

Therefore carry out subtraction on the two equations

23x + 0y = 28

23x = 28

x = 28/23.

Now substitute for x in any of the equations above to get y

3(28/23) +4y = 8

84/23 +4y = 8

Multiply through by 23 to have s simple linear equation

84 + 92y = 184

Collect like terms

92y = 184 - 84

92y = 100

y = 100/92

Reduce to lowest term by dividing by 4

y = 25/33.

(28/23, 25/23)------ solution

Check

Substitute for x and y values in any equations above.

3(28/23) + 4(25/23)

84/23 + 100/23

Resolved into fraction with 23 as the common LCM

184/23

= 8

Answer:

Choice B

Step-by-step explanation:

Looks like interest isn't being used, so that makes it simple.

Every week the same amount is added, that means  we can use a linear equation, which is what it is asking us to pick between so it all works out, awesome.

Now, we need two things to make an equation.  the slope and two points.  Definitely have points so we need the slope.  

The slope is found by taking any two points and finding the difference of their y values and dividing that by the distance of their x values.  so find two points (x1, y1) and (x2, y2) and then use the formula(y2-y1)/(x2-x1)  Also, we will say number of weeks is the x and the amount of money is y

No matter which point you use you will get the slope is 55

From there we find the function with the formula y - y1 = m(x - x1)

We know m and I reccomend using (0, 100) as our x1 y1 because 0 will usually make things easier.

y - y1 = m(x - x1)

y - 100 = 55(x-0)

y = 55x + 100

you could have used any point again, 0 just means it goes away if you add 0 or subtract 0.  Of course your problem uses n so just replace x with n.  and y is the value we want to end at, which is 825

825 = 55n + 100, or arranging it so it's the same as the option, 55*n + 100 = 825, so that's choice B

The equation that calculates the weeks it would take to reach the target is : 55n = 825.

Given is the table shows the amount of money in your savings account over a period of 6 weeks and you plan to keep saving at the same rate until you have $825 in the account.

Assume that it would take [n] weeks to reach the target. The unit rate from the given table can be calculated as -

m = (155 - 100)/(1 - 0)

m = 55

So, we can write the equation as -

55n = 825

Therefore, the equation that calculates the weeks it would take to reach the target is : 55n = 825.

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Complete answer:

Fulfill the requirements for a certain degree, a student can choose to take any 7 out of a list of 20 courses, with the constraint that at least 1 of the 7 courses must be a statistics course. Suppose that 5 of the 20 courses are statistics courses.

(a) How many choices are there for which 7 courses to take?

(b) Explain intuitively why the answer to (a) is not [tex] \binom{5}{1}\binom{19}{6} [/tex]

Answer:

a) 71085 choices

b) See below

Step-by-step explanation:

a) First we're going to calculate in how many ways you can take 7 courses from a list of 20 without the constraint that at least 1 of the 7 courses must be a statistics course, that's simply a combination of elements without repetition so it's: [tex]\binom{20}{7} [/tex], but now we should subtract from that all the possibilities when none of the courses chose are a statistic course, that's is [tex]\binom{15}{7} [/tex] because 15 courses are not statistics and 7 are the ways to arrange them. So finally, the choices for which 7 courses to take with the constraint that at least 1 of the 7 courses must be a statistics course are:

[tex]\binom{20}{7}-\binom{15}{7}=71085 [/tex]

b) It's important to note that the constraint at least 1 of the 7 courses must be a statistics course make the possible events dependent, we can not only fix an statistic course and choose the others willingly ( that is what [tex] \binom{5}{1}\binom{19}{6} [/tex] means) because the selection of one course affect the other choices.

In this exercise, we have to use our knowledge of statistics to calculate how many options can be chosen for a course, so we find that:

a) 169 choices

b) 1 of the 7 courses must be a statistics course, because the selection of one course affect the other choices.

So from the data reported in the exercise we can say that:

a) First we're going to calculate in how many ways you can take 7 courses from a list of 20 without the constraint that at least 1 of the 7 courses must be a statistics course, that's simply a combination of elements without repetition so it's.  So we have that;

[tex]C=\frac{m!}{p!(m-p)!}\\C=\frac{20!}{7!(20-7)!}\\C=169[/tex]

b) It's influential to note that the restraint not completely 1 of the 7 courses must be a enumeration course form the attainable occurrence determined by, we can not only fix a statistic course and select the possible choice gladly because the preference from among choices of individual course influence the added selection.

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Answer:

B. 7 in.

Step-by-step explanation:

Area = A =pi r^2

r^2 = A / pi

r = √(A / 3.14)

= √(153.9 / 3.14)

= 7 in.

Answer:

The Conclusion is

Diagonals AC and BD,

a. Bisect each other

b. Not Congruent

c. Not Perpendicular

Step-by-step explanation:

Given:

[]ABCD is Quadrilateral having Vertices as

A(-1, 1),

B(2, 3),

C(6, 0) and

D(3, -2).

So the Diagonal are AC and BD

To Check

The diagonals AC and BD

a. Bisect each other. B. Are congruent. C. Are perpendicular.

Solution:

For a. Bisect each other

We will use Mid Point Formula,

If The mid point of diagonals AC and BD are Same Then

Diagonal, Bisect each other,

For mid point of AC

[tex]Mid\ point(AC)=(\dfrac{x_{1}+x_{2} }{2},\dfrac{y_{1}+y_{2} }{2})[/tex]

Substituting the coordinates of A and C we get

[tex]Mid\ point(AC)=(\dfrac{-1+6}{2},\dfrac{1+0}{2})=(\dfrac{5}{2},\dfrac{1}{2})[/tex]

Similarly, For mid point of BD

Substituting the coordinates of B and D we get

[tex]Mid\ point(BD)=(\dfrac{2+3}{2},\dfrac{3-2}{2})=(\dfrac{5}{2},\dfrac{1}{2})[/tex]

Therefore The Mid point of diagonals AC and BD are Same

Hence Diagonals,

a. Bisect each other

B. Are congruent

For Diagonals to be Congruent We use Distance Formula

For Diagonal AC

[tex]l(AC) = \sqrt{((x_{2}-x_{1})^{2}+(y_{2}-y_{1})^{2} )}[/tex]

Substituting A and C we get

[tex]l(AC) = \sqrt{((6-(-1))^{2}+(0-1)^{2} )}=\sqrt{(49+1)}=\sqrt{50}[/tex]

Similarly ,For Diagonal BD

Substituting Band D we get

[tex]l(BD) = \sqrt{((3-2))^{2}+(-2-3)^{2} )}=\sqrt{(1+25)}=\sqrt{26}[/tex]

Therefore Diagonals Not Congruent

For C. Are perpendicular.

For Diagonals to be perpendicular we need to have the Product of slopes must be - 1

For Slope we have

[tex]Slope(AC)=\dfrac{y_{2}-y_{1} }{x_{2}-x_{1} }[/tex]

Substituting A and C we get

[tex]Slope(AC)=\dfrac{0-1}{6--1}\\\\Slope(AC)=\dfrac{-1}{7}[/tex]

Similarly, for BD we have

[tex]Slope(BD)=\dfrac{-2-3}{3-2}\\\\Slope(BD)=\dfrac{-5}{1}[/tex]

The Product of slope is not -1

Hence Diagonals are Not Perpendicular.

Answer:

894.19 mi/hr

Step-by-step explanation:

Total distance of the trip = 3990 mi

Let the speed of the sound be 'x' miles per hour

Now,

Total distance = Speed × Time

Therefore,

According to the question

3,990 mi = [ ( x - 120 ) × 0.1 ] + [ ( x + 410 ) × 3.0 ]

or

3,990 mi = 0.1x - 12 + 3x + 1230

or

0.1x + 3x = 2772

or

3.1x = 2772

or

x = 894.19 mi/hr

Answer: the low temperature on Tuesday is 0 degree Fahrenheit

Step-by-step explanation:

The low temperature on Monday was 6 degrees warmer than Sunday's low of -9°F. This means that the temperature on Monday would be

- 9 + 6 = - 3 degrees Fahrenheit

The low temperature on Tuesday was 3 degrees warmer than Monday's low temperature. This means that the low temperature on Tuesday would be

- 3 + 3 = 0 degree Fahrenheit

Final answer:

By sequentially adding the temperature differences to each day's low, we find that Sunday's low was -9°F, Monday's was -3°F, and Tuesday's was 0°F.  So the low temperature on Tuesday was 0°F.

Explanation:

The student's question involves calculating temperature changes over consecutive days. Here's the step-by-step explanation:

The low temperature on Sunday was -9°F.

Monday's low was 6 degrees warmer than Sunday's, so we add 6 to -9°F, resulting in -3°F for Monday's low.

Tuesday's low was 3 degrees warmer than Monday's, so we add 3 to -3°F, which is 0°F.

Therefore, the low temperature on Tuesday was 0°F.

The function graphed below is

y = x³ - 3, x ≤ 2

   = x² + 6, x > 2 ⇒ C

Step-by-step explanation:

The graph has two parts:

∴ The graph represents two functions:

→ Quadratic function y = ax² + bx + c with domain x > 2

→ Cubic function y = ax³ + bx² + cx + d with domain x ≤ 2

∵ The answers have two functions:

→ y = x³ - 3 ⇒ cubic function

→ y = x² + 6 ⇒ quadratic function

∵ The domain of the cubic function is x ≤ 2

∵ The domain of the quadratic function is x > 2

∴ The answer is

y = x³ - 3, x ≤ 2

     x² + 6, x > 2

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Answer:

y={x^3-3, x ≤ 2

   {x^2+6, x>2

Step-by-step explanation:

a pex :)

Answer:

y = -5/3 + 5/3x

Step-by-step explanation:

Solve for y. View image.

Explanation:

To achive that you have to piant a ring in red, which will have its big diameter equal to the sphere diameter and its small diameter equal to the cube diagonal.

The diagonal of the cube can be calculated using Pithagoras:

[tex]D^2=L^2+L^2[/tex]

Where D is the diagonal and L is the side of the cube

Answer: The slope of the line would be -5/2, and the whole fraction would be negative.  

Step-by-step explanation:

Technically just the 5 is negative because the new slope is going down 5, yet on paper its just safer to write the whole fraction as a negative.

Answer:

Step-by-step explanation:

Total number of students = 68

Let history = H

Maths = M

English = E

n(H) = 25

n(M) = 25

n(E) = 34

n(HnMnE) = 3

Total = n(H) + n(M) + n(E) - people in exactly two groups + 2(people in exactly 3 groups) + people in none of the groups

68 = 25 + 25 + 34 - people in exactly two groups - 6 +0

68 = 84 -6 - people in exactly two groups

68 = 78 - people in exactly two groups

People in exactly two groups = 78 - 68

= 10

OR

From the venn diagram, people in exactly two groups are represented by x, y and z

Total = 25 - x - y - 3 + 25 - x - z - 3 + 34 - y - z - 3 + x + y + z + 3

68 = 50 - x - 3 + 34 - y - z - 3

68 = 84 - 6 - x - y - z

68 = 78 - x - y - z

68 - 78 = - x - y - z

-10 = -(x + y + z)

x+y+z = -10/-1

x+y+z = 10

The number of students that registered for exactly two courses = 10

Answer:

[tex[ two groups=-68+25+25+34 -6=10[/tex]

Step-by-step explanation:

For this case we have a diagram of the situation on the figure attached.

And for this case we can us the following rule from probability:

[tex]P(AUBUC) = P(A)+P(B) +P(C) -P(A and B)- P(A andC)-P(B and C) +P(A and B and C)[/tex]

Or equivalently:

[tex] total= A+ B +C - two groups -2*[people in3 groups]+ nonegroups[/tex]

We know the total on this case total=68, the people for history is A=25, for math B=25 and for english C=34, and the people in all the groups 3, so we can replace:

[tex]68=25+25+34- two groups -2*3 +0[/tex]

And if we solve for the poeple in two groups we got:

[tex[ two groups=-68+25+25+34 -6=10[/tex]

Answer: check explanation

Step-by-step explanation:

The question is not complete but nonetheless, gross profit is easy to calculate. Let us start by the definition of gross profit, to how to calculate gross profit and, calculation of gross profit margin.

GROSS PROFIT: gross profit can be defined as the profit gained after subtracting the costs of making and selling the products. Gross profit is also known as gross margin.

HOW TO CALCULATE GROSS PROFIT: Gross profit can be calculated by subtracting the total revenue from the cost of goods sold. That is, gross profit= total revenue - cost of goods sold.

So, for example; Company A makes women handbags. Assuming the company made $10million in total revenue for the year and cost of goods sold is $5 million. We can use the formula above to find the company's gross profit margin.

Hence, company A's gross profit= total revenue($10,000,000) - cost of goods sold ($5,000,000).

= $5,000,000.

That is, the gross profit for company A= $5,000,000.

GROSS PROFIT MARGIN: This can be calculated using the formula below;

Gross profit margin= (total revenue - cost of goods)/ revenue.

Hence, from the example above;

Gross profit margin= $10,000,000 - $5,000,000) / $10,000,000.

= 50%

Answer:

Option A) (x, y) = (4, -3)

Step-by-step explanation:

we know that

A function is a relation from a set of inputs (independent variable) to a set of possible outputs (dependent variable) where each input is related to exactly one output

we know that

The set of the function is { (-4, 2), (3, 6), (4, 3), (x, y) }

The ordered pair (x, y) = (4, -3)

could not be included, because for the input value of x=4, the function would have two output values (y=-3,y=3) and remember that each input is related to exactly one output

Answer:

The probability is %13,5

Step-by-step explanation:

If it is a binomial distribution function than we can find a probability of earning less or more than 35000$ in this certain large city. Lets assume that p is probability of earning less than 35000$ and q is earning more than 35000$.:

p=0,45

q=0,55

So general formula of n families that earning less than 35000$ is:

[tex]P(X=n)=combination(30,n)*0,45^n*0,55^{30-n}[/tex]

Probability of 10 or less families out of 30 families that earning less than 35000$ is:

[tex]combination(30,10)*0.45^{10}*0.55^{20}+combination(30,9)*0.45^9*0.55^{21}+combination(30,8)*0.45^8*0.55^{22}+combination(30,7)*0.45^7*0.55^{23}+combination(30,6)*0.45^6*0.55^{24}+combination(30,5)*0.45^5*0.55^{25}+combination(30,4)*0.45^4*0.55^{26}+combination(30,3)*0.45^3*0.55^{27}+combination(30,2)*0.45^2*0.55^{28}+combination(30,1)*0.45^{1}*0.55^{29}+combination(30,0)*0.45^0*0.55^{30}=0,135[/tex]

The correct probability that a simple random sample of 30 families will have 10 or fewer families earning less than $35,000 per year, using the exact binomial calculation, is approximately 0.0674.

To solve this problem, we will use the binomial probability formula, which is given by:

 [tex]\[ P(X = k) = \binom{n}{k} p^k (1-p)^{n-k} \][/tex]

 Given that 45% of families earn less than $35,000 per year, we have p = 0.45.

The number of families in the sample is n = 30

We want to find the probability that 10 or fewer families earn less than $35,000 per year, so k will range from 0 to 10.

Then, we sum these probabilities to find the cumulative probability of 10 or fewer families earning less than $35,000 per year.

Using the binomial probability formula, we calculate:

[tex]\[ P(X \leq 10) = \sum_{k=0}^{10} \binom{30}{k} (0.45)^k (0.55)^{30-k} \][/tex]

This calculation can be done using statistical software or a calculator that supports binomial probability calculations.

 After performing the exact binomial calculation, we find that the probability is approximately 0.0674.

This is the probability that, in a random sample of 30 families from this city, 10 or fewer families will earn less than $35,000 per year.

The probability of getting two consecutive ones in a string of 1s and 0s of length n can be calculated as (n-1) / (2n).

The probability of getting two consecutive ones in a string of 1s and 0s of length n can be calculated by considering the number of possible outcomes and the number of favorable outcomes.

Let's assume that the probability of getting a one is p and the probability of getting a zero is q. The favorable outcomes are when two consecutive ones occur, which can be represented as (1,1).

To calculate the probability, we need to determine the number of ways we can arrange the numbers in the string. Since we are only interested in the position of the ones, we can ignore the zeros.

Therefore, the number of favorable outcomes is n-1, because we have n-1 places where two consecutive ones can occur in a string of length n.

The number of possible outcomes is 2n, because each digit in the string can be either a one or a zero. Therefore, the probability of getting two consecutive ones is:

p = (n-1) / (2n)