The points (0, 1) and (1, 4) are contained in the graph of an equation with only two variables, 2 and y.
Select all of the true statements.
There is exactly one equation in the form y = max + b that contains these points.
There are two equations in the form y = m + b that contain these points.
There are no equations in the form y = a - b* that contain these points.
There is exactly one equation in the form y - a - b° that contains these points.
There is more than one equation in the form y = a - b° that contains these points.

A negative return means that the investment has lost value within a certain period of time. It is a loss on paper unless the investment is redeemed. The return may become positive again the next day or the next quarter.

What is meant by investment?

Investment is the use of money or capital to acquire an asset or securities for the purpose of earning income or profits over time. It can be various forms of financial instruments such as stocks, bonds, mutual funds, real estate, and others.

What is a quarter?

A quarter is a unit of currency equal to one-fourth of a dollar in the United States and some other countries. It is also commonly used to denote a period of three months in a calendar year.

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The factory has 172 litres of dye available.

Liters (also spelled litres) is a unit of volume in the International System of Units (SI). It is commonly used to measure the volume of liquids, gases, and solids that can be poured or contained in a container. One liter is equivalent to 1000 cubic centimeters (cc) or milliliters (ml), and it is roughly equal to 1.057 quarts or 0.264 gallons.

In the given question,

First, we need to find out how much dye is needed for one roll of fabric. We know that 43 liters of dye are needed for 1 roll of fabric that is 1,067 feet long. Therefore, we can say that:

1 roll of fabric = 43 liters

1,067 feet

To find out how much dye is needed for 5 rolls of fabric, we can multiply both sides of this equation by 5:

5 rolls of fabric = 5 × 43 liters

1,067 feet = 215 liters

1,067 feet

So, 5 rolls of fabric would require 215 liters of dye.

Next, we need to check if the 4 buckets of dye are enough to dye 5 rolls of fabric. Each bucket contains 43 liters of dye, so 4 buckets would contain:

4 buckets of dye = 4 × 43 liters

= 172 liters

Therefore, the factory has 172 liters of dye available.

Since 215 liters of dye are required for 5 rolls of fabric, and the factory has only 172 liters of dye available, it cannot dye 5 rolls of fabric with the given amount of dye.

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The standard form (vertex form) of the function f(x) is: f(x) = 6(x - 5/12)x² - 169/24.

To rewrite the quadratic function f(x) = 6x2 - 5x - 1 in standard form (vertex form), we can complete the square:

f(x) = 6xx² - 5x - 1 = 6(x²- (5/6)x) - 1 = 6(xx² - (5/6)x + 25/144) - 1 - 6(25/144) = 6(x - 5/12)x² - 169/24

Therefore, the standard form (vertex form) of the function f(x) is: f(x) = 6(x - 5/12)x² - 169/24.

The vertex form of a quadratic function is a way of writing the function in a specific form that reveals important information about the vertex, or turning point, of the parabolic graph of the function.

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If One of the 200 business majors at a college is to be chosen for the student senate. The outcomes that correspond to a business major who is enrolled in both accounting and business law is: x = 33 - y.

Since we know that 92 students are enrolled in either course, we can write this number in the intersection of the two circles, which represents the number of students enrolled in both courses. Let x be the number of students enrolled only in accounting, and y be the number of students enrolled only in business law.

Our Venn diagram now looks like this:

       Accounting

         (77-x)       (x)

             ___________

            |           |

    Total |   (92)    |  y

   Business|___________|

       Law |           |

          |     x     |  

          |___________|

             (64-y)    |

                     Total

                    Business

                     Majors

We know that there are 200 business majors in total, so the sum of the four regions in the diagram must add up to 200. Therefore:

x + y + (77-x) + (64-y) + 92 = 200

Simplifying this equation, we get:

x + y = 33

We want to find the number of outcomes that correspond to a business major who is enrolled in both accounting and business law. From the Venn diagram, we can see that this is represented by the intersection of the two circles, which has a value of x.

Therefore, there are x = 33 - y outcomes that correspond to a business major who is enrolled in both accounting and business law. The value of y can range from 0 (if all 33 students enrolled only in accounting) to 33 (if all 33 students enrolled only in business law).

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Therefore , the solution of the given problem of angles comes out to be

Angle QMR = 30.

The place where the lines that make up a skew's ends meet determines the size of its largest and smallest walls. It is conceivable for two routes to cross at a junction. Angle is another outcome of two things interacting. They mirror dihedral shapes the most. A two-dimensional curve can be created by arranging two line beams in various configurations between their ends.

Here,

Angle QRM counts 90 degrees because it is a right angle (represented by the square in the diagram).

We can use the knowledge that the sum of all angles in a straight line is 180 degrees to determine angle QPR. A straight line is formed by angles QPB and BPR, so:

=> Angle QPB + Angle BPR =  180°.

Given that the triangular is equilateral, angle QPB is equal to 60 degrees.

=> BPR angle = 180 - 60 = 120 degrees.

We can now use the knowledge that a triangle's total angles equal 180 degrees to determine angle QMR. Triangle formed by angles QMR, QRM, and BMR results in:

Angles QMR, QRM, and BMR add up to 180 degrees.

=> Angle QMR+90+120=180

=> Angle QMR = 180 - 90- 120,

=> Angle QMR = 30

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Answer:

2+5/9 is the answer

If you add 2 to 5/9, that makes the statement true

Answer: Therefore, a possible expression for the length of the side of the square painting is:

side = 15x + 8

or

side = -15x - 8

Step-by-step explanation:

To find a possible expression for the length of the side of the square painting, we need to use the formula for the area of a square, which is:

Area = side^2

We can set the given expression for the area of the painting equal to this formula:

225x¹+240x+64 = side^2

Next, we can simplify the expression on the left-hand side by factoring it into a perfect square trinomial:

225x¹+240x+64 = (15x + 8)^2

Now we can substitute this expression back into the equation and solve for the side of the square painting:

(15x + 8)^2 = side^2

Taking the square root of both sides, we get:

15x + 8 = side

or

15x + 8 = -side (since the length of a side can be positive or negative)

Therefore, a possible expression for the length of the side of the square painting is:

side = 15x + 8

or

side = -15x - 8

Note that since we are dealing with a geometric object, we should choose the positive value for the length of the side, as the side length cannot be negative. Therefore, the final expression for the length of the side of the square painting is:

side = 15x + 8

Answer:

Step-by-step explanation:

To find sin(alpha-beta), we can use the trigonometric identity:

sin(alpha - beta) = sin(alpha)cos(beta) - cos(alpha)sin(beta)

We are given that sin(alpha) = 11/12 in the second quadrant and cos(beta) = 15/17 in the fourth quadrant. We can use the Pythagorean theorem to find sin(beta):

sin^2(beta) + cos^2(beta) = 1

sin(beta) = sqrt(1 - cos^2(beta))

sin(beta) = sqrt(1 - (15/17)^2)

sin(beta) = sqrt(1 - 225/289)

sin(beta) = sqrt(64/289)

sin(beta) = 8/17 (since sin(beta) is positive in the fourth quadrant)

Now we can plug in the values we know into the identity:

sin(alpha - beta) = sin(alpha)cos(beta) - cos(alpha)sin(beta)

sin(alpha - beta) = (11/12)(15/17) - cos(alpha)(8/17)

We still need to find cos(alpha), which we can do using the Pythagorean identity:

sin^2(alpha) + cos^2(alpha) = 1

cos(alpha) = sqrt(1 - sin^2(alpha))

cos(alpha) = sqrt(1 - (11/12)^2)

cos(alpha) = sqrt(23/144)

Now we can substitute this value into the expression for sin(alpha - beta):

sin(alpha - beta) = (11/12)(15/17) - cos(alpha)(8/17)

sin(alpha - beta) = (11/12)(15/17) - sqrt(23/144)(8/17)

sin(alpha - beta) ≈ 0.210

Therefore, sin(alpha - beta) is approximately equal to 0.210.

According to the information, the volume of the three-dimensional rhombus is 61.92 cm³.

The three-dimensional rhombus is a geometric solid in the shape of a prism whose lateral faces are rhombuses and the bases are parallelograms. To calculate its volume, the area of the base must be multiplied by the height of the prism.

In this case, the height of the prism is 3 cm and the dimensions of the base rhombus are 5.2 cm wide and 8 cm long. Since the rhombus has two diagonals of equal length, its area can be calculated using the formula (major diagonal x minor diagonal) / 2.

First, the length of the diagonals of the base rhombus must be calculated using the Pythagorean theorem, since its width and length are known:

Then, the area of the base rhombus can be calculated:

Finally, the volume of the prism can be calculated:

Therefore, the volume of the three-dimensional rhombus is 61.92 cm³.

Note: This question is incomplete. Here is the complete information:

Find the volume of the prism

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Answer:

30

Step-by-step explanation:

41.25-10=31.25

31.25/1.25=25

25+5=30

Hope this helps!

Production budget for the month of July, August, and September as below.

The selling price is the amount of money that a company charges for a product or service in order to generate revenue and make a profit.

1. Expected Sales:

July: 120,000 / 20 = 6,000 units

August: 100,000 / 20 = 5,000 units

September: 160,000 / 20 = 8,000 units

2. Required Production:

July: 6,000 units + (8,000 units / 4) - 1,500 units = 4,500 units

August: 5,000 units + (6,000 units / 4) - (8,000 units / 4) = 3,500 units

September: 8,000 units + (5,000 units / 4) - (6,000 units / 4) = 6,000 units

3. Desired Ending Inventory:

July: 8,000 units / 4 = 2,000 units

August: 6,000 units / 4 = 1,500 units

September: 10,000 units / 4 = 2,500 units

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1. The Expected Sales in July is 6,000 units, August is 5,000 units and september is 8,000 units.

2. Required Production in July is 4,500 units, August is 3,500 units and september is 6,000 units.

3. Desired Ending Inventory in July is 2,000 units, August is 1500 units and september is 2500 units.

The most basic method is: sales forecast = sales from the previous month + expected growth (or shrinkage) in revenue for the next term.

1. Expected Sales:

July = 120,000 / 20

      = 6,000 units

August = 100,000 / 20

            = 5,000 units

September = 160,000 / 20

                  = 8,000 units

2. Required Production:

The quantity of units that a company must produce in a given time frame in order to be profitable.

[tex]July=6000\ units+(\frac{8000\ units}{4} )-1500\ units[/tex]

       [tex]=4500\ units[/tex]

[tex]August=5000\ units+(\frac{6000\ units}{4} )-(\frac{8000\ units}{4} )[/tex]

           [tex]=3500\ units[/tex]

[tex]september=8000\ units+(\frac{5000\ units}{4} )-(\frac{6000\ units}{4} )[/tex]

                [tex]=6000\ units[/tex]

3. Desired Ending Inventory:

Ending inventory is the sellable inventory that remains at the conclusion of an accounting period.

July = 8,000 units / 4

      = 2,000 units

August = 6,000 units / 4

            = 1,500 units

September = 10,000 units / 4

                   = 2,500 units

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If the GCD of three numbers is 30 and their LCM is 900. Two of the numbers are 60 and 150. The other possible number is 450.

Let the third number be x. We know that:

GCD(60, 150, x) = 30

This means that 30 is a common factor of all three numbers. We can divide each number by 30 to get:

GCD(2, 5, x/30) = 1

Now we can use the fact that the product of the GCD and LCM of three numbers is equal to the product of the numbers themselves:

GCD(60, 150, x) * LCM(60, 150, x) = 60 * 150 * x

30 * 900 = 60 * 150 * x

x = 900 / 2 = 450

Therefore, the other possible number is 450.

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Answer:

There are 1760 yards in one mile and the rink is 250 yard in perimeter.

This means 3 miles is 5280 yards.

If Sam has already gone around the whole rink 6 times, that means he was traveled a total of 1500 yards.  

Sam has 3780 more yards to travel 3 miles.

This means he needs to do 15.12 more laps around the rink.  Or 16 if you are rounding.

Answer:

ASAP................Research the use in the military of magnetic anomaly detectors, MADs. Write a brief 300-word essay answer the following questions on MADs. What is the main idea behind MADs? What can be detected by using MADs? A brief history of the MAD development.

Step-by-step explanation:

Answer:

The answer is 13.6

Step-by-step explanation:

4 x 3.4 = 13.6

Answer:

This is a guess but I think it's 5 min per table.

Step-by-step explanation:

The reason being:

if we know that she has 9 tables to get to and each table can seat 4 people, we would have to multiply both numbers to find how many TOTAL people are in the restaurant during the first few hours.

9x4 = 36 people in total

then, we need to convert 3hrs into minutes to get a more accurate rep as to how much time she would spend at each table (she isn't going to spend the entire 3 hrs with only one table now, is she?)

so for this, we convert 3hrs into minutes

1 min = 60 secs

1 hr = 60 minutes

3hrs -> 60 x 3 = 180 minutes

now, to understand how many time she spends at each table, we need to figure out by dividing the # of people by the amount of minutes.

180 minutes/36 people = 5 mins per table.

Answer:

[tex]f(x) = {x}^{2} - 14x + 45[/tex]

Step-by-step explanation:

[tex]f(x) = (x - 5)(x - 9)[/tex]

[tex]f(x) = {x}^{2} - 14x + 45[/tex]

Therefore, Kallie will need to use a total of 6 teaspoons of water conditioner for all the water in 12 fish tanks.

An equation is a mathematical statement that shows that two expressions are equal. It consists of two sides separated by an equal sign, with the expression on the left being equal to the expression on the right. Equations are used to represent various relationships and situations in mathematics and other fields, and are solved to find the values of variables that make the equation true.

Here,

First, we need to determine the total amount of water in all 12 fish tanks. Since each fish tank is filled with 20 quarts of water, the total amount of water in all 12 fish tanks is:

12 fish tanks * 20 quarts per fish tank = 240 quarts of water

To convert quarts to gallons, we divide by 4 (since there are 4 quarts in a gallon):

240 quarts / 4 quarts per gallon = 60 gallons of water

Now, we can use the given conversion factor to determine how many teaspoons of water conditioner are needed for 60 gallons of water. Since for every 10 gallons of water, Kallie uses 1 teaspoon of water conditioner, for 60 gallons of water, she will use:

60 gallons / 10 gallons per teaspoon = 6 teaspoons of water conditioner

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Answer:

Step-by-step explanation:

[tex]24\div 6+2\times 9 =4+18=22[/tex]

÷  and × first followed by + and -.  But otherwise work left to right.

Answer:  22

Step-by-step explanation:

1.)  Solve using PEMDAS.

An approximate of 68% of American women have shoe sizes that are between 6.54 and 9.58.

To use the empirical rule, we need to assume that the distribution of women's shoe sizes is approximately normal. Given a mean of 8.06 and a standard deviation of 1.52, we can standardize the values of 6.54 and 9.58 by subtracting the mean and dividing by the standard deviation:

Ζ1 = (6.54 - 8.06) / 1.52

Ζ1 = -1.00

Ζ2 = (9.58 - 8.06) / 1.52

Ζ2 = 1.00

The standardized values tell us that the value of 6.54 is 1 standard deviation below the mean, while the value of 9.58 is 1 standard deviation above the mean. According to the empirical rule, about 68% of the data falls within one standard deviation of the mean. Therefore, we can say that: [tex]P(6.54 < x < 9.58) = P(-1.00 < z < 1.00) = 68%[/tex]

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Answer:

(6,-5)

Step-by-step explanation:

Parallel lines have the same slope.

Step-by-step explanation:

As your post is written   90 dL  *  L / dl  = 90 L

But I think what you really want is the conversion factor for L to dL :

one liter is 10 dL  :

        L / 10 dL

then you question becomes

   90 dL   * L / 10 dL  =  9 liters      

F(x) is one-to-one, and it is invertible.

The inverse of f(x) is f^-1(x) = (x + 8)^(1/4)/∛3.

We need to check if it is a one-to-one function.

A function is one-to-one if every element in the domain is paired with a unique element in the range.

To check if f(x) is one-to-one, we can use the horizontal line test. If no horizontal line intersects the graph of the function more than once, then the function is one-to-one.

Taking the derivative of f(x), we get:

f'(x) = 12x^3

Since f'(x) is always positive, f(x) is a strictly increasing function. This means that no two different inputs x1 and x2 can produce the same output f(x1) = f(x2).

Therefore, f(x) is one-to-one, and it is invertible.

To find the inverse of f(x), we can follow these steps:

Step 1: Replace f(x) with y:

y = 3x^4 - 8

Step 2: Solve for x in terms of y:

y + 8 = 3x^4

x^4 = (y + 8)/3

x = (y + 8)^(1/4)/∛3

Step 3: Replace x with f^-1(x):

f^-1(x) = (x + 8)^(1/4)/∛3

Therefore, the inverse of f(x) is f^-1(x) = (x + 8)^(1/4)/∛3.

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the number of students that offer Mathematics is 11

The sum of the fractions of the pie chart should be equal to 1 since it represents the whole class of 80 students.

Let's write the fractions for each subject in terms of x:

Math: 5x/80

French: (16x-24)/80

English: (6x+12)/80

Hausa: (4x+12)/80

Physics: 5x/80

The sum of these fractions must equal 1:

5x/80 + (16x-24)/80 +  (6x+12)/80 + (4x+12)/80 + 5x/80 = 1

Multiplying both sides by the least common multiple (LCM) of the denominators, which is 80, we get:

5x + 16x - 24 + 6x + 12 + 4x + 12 + 5x = 80

Combining like terms, we get:

36x = 80

So, we have

x = 80/36

For maths, we have

Maths = 5 * 80/36

Maths = 11

Therefore, 11 students offer Mathematics.

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Answer: 1/3

Step-by-step explanation:

Quotient is another word for the solution to a division problem.

So in this case the quotient is the answer to -5/-15.

When you divide a negative by another negative, you get a positive answer. The same can be said about dividing a positive number by another positive number.

So, in this case, we can change -5/-15 to 5/15.

Now we just need to simplify by finding a GCF (greatest common factor)

Both 5 and 15 shares 5 as a factor, so divide them both by 5.

Then you would get 1/3 or .33333333333333333...

[tex]x = (-b ± sqrt(b^2 - 4ac)) / 2a[/tex]The three consecutive integers are 5/2, 7/2, and 9/2. We can check that this solution works by squaring the third integer (9/2), adding it to the first integer (5/2), and verifying that the sum is indeed 130:

[tex](5/2) + (9/2)^2 = 130[/tex]

Let's call the first of the three consecutive integers "x". Then, the next two consecutive integers are x+1 and x+2.

The problem tells us that the square of the third integer (which is x+2) added to the first integer (which is x) is 130. In equation form, we can write:

[tex]x + (x+2)^2 = 130[/tex]

Simplifying the equation, we can expand the square:

[tex]x + x^2 + 4x + 4 = 130[/tex]

Combining like terms:

[tex]x^2 + 5x - 126 = 0[/tex]

Now we can use the quadratic formula to solve for x:

x = -b ±  [tex]sqrt(b^2 - 4ac)) / 2a[/tex]

where a = 1, b = 5, and c = -126. Plugging these values into the formula, we get:

x = (-5 ±[tex]sqrt(5^2 - 4(1)(-126))) / 2(1)[/tex]

x = (-5 ± [tex]sqrt(625)) / 2[/tex]

x = (-5 ±25) / 2

So, x could be either -15/2 or 5/2. However, we are looking for three consecutive integers, so we can eliminate the negative value and choose x = 5/2.

Therefore, the three consecutive integers are 5/2, 7/2, and 9/2. We can check that this solution works by squaring the third integer (9/2), adding it to the first integer (5/2), and verifying that the sum is indeed 130:

[tex](5/2) + (9/2)^2 = 130[/tex]

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The biker wοuld travel 20 miles in 20 minutes.

The speed οf an οbject, alsο knοwn as v in cοmmοn parlance and kinematics, is the size οf the change in pοsitiοn per unit οf time οr the size οf the change in pοsitiοn οver time; as such, it is a scalar quantity. The average speed οf an οbject in a given periοd οf time is equal tο the distance traveled by the οbject divided by the length οf the interval the instantaneοus speed is the upper limit οf the average speed as the length οf Velοcity and speed are different cοncepts.

We can nοw substitute this expressiοn fοr s in the previοus equatiοn:

t = 48 miles / (48 miles / t)

Simplifying this equatiοn, we get:

t = t

Therefοre, we can cοnclude that the biker travelled fοr exactly 1 minute fοr every mile travelled.

b. If the biker travelled fοr 20 minutes, we can use the fοrmula:

d = s x t

Substituting the values we knοw, we get:

d = s x 20 minutes

We alsο knοw frοm the previοus calculatiοn that the biker travels 1 mile fοr every minute traveled. Therefοre, the speed οf the biker is:

s = 1 mile / minute

Substituting this value, we get:

d = 1 mile/minute x 20 minutes = 20 miles

Therefοre, the biker wοuld travel 20 miles in 20 minutes.

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Answer:

The values in the table suggest that there is a mathematical relationship between the two variables X and Y. Upon inspection, we can observe that Y is increasing with respect to X, and the increase seems to be non-linear. Specifically, as X increases by a factor of 2, Y increases by a factor of approximately 1.5 to 2.

Based on these observations, it seems that the relationship between X and Y may be an exponential one. To confirm this, we can plot the data points on a graph and see if they form a curve that resembles an exponential function.

Alternatively, we can calculate the ratio of Y to X and see if it remains approximately constant. This can be done by dividing each value of Y by its corresponding value of X:

1/5 = 0.2

2/10 = 0.2

3/15 = 0.2

5/25 = 0.2

8/40 = 0.2

The ratio remains constant at approximately 0.2, suggesting that the relationship between X and Y may be a proportional one, with a constant of proportionality equal to 0.2.

Therefore, the table represents a proportional relationship between X and Y, where Y is proportional to X with a constant of proportionality equal to 0.2.

Step-by-step explanation:

Here's a step-by-step explanation of how to evaluate the table:

1. Identify the variables: The table contains two variables, X and Y, which are listed in two separate columns.

2. Examine the values: Look at the values in the table for both X and Y. Notice that as X increases, so does Y.

3. Determine the pattern: To determine the pattern between the two variables, calculate the ratio of Y to X. If the ratio is constant, then the relationship is proportional. If the ratio changes, then the relationship is nonlinear.

4. Calculate the ratio: To calculate the ratio, divide each value of Y by its corresponding value of X. For example, to find the ratio for the first row, divide 1 by 5: 1/5 = 0.2. Continue calculating the ratios for each row.

5. Analyze the ratio: If the ratios are approximately constant, then the relationship is proportional. In this case, we see that the ratios are all approximately 0.2, so we can conclude that the relationship is proportional.

6. Determine the constant of proportionality: To determine the constant of proportionality, simply use any one of the rows in the table. For example, let's use the first row, where X = 5 and Y = 1. The ratio of Y to X is 0.2, so we can write the relationship as Y = 0.2X. This means that for every increase of 1 unit in X, Y increases by 0.2 units.

7. Summarize the result: Based on the analysis, we can say that the table represents a proportional relationship between X and Y, with a constant of proportionality equal to 0.2.

Given

X 5 10 15 25 40

Y 1 2 3 5 8

5 / 40 = 0.2

y=0.2x