What is the constant of proportionality in the graph below? (answer must be simplified fraction) PLEASE HELP I WILL MAKE U BRAINLIEST. IM LITERALLY GONNA FAIL IF I GET THIS WRONG. HELPPP

1. For the provided function the statement "The range is {y l y ≥ 11.5\}" is True.

2. For the provided function the statement "The domain is all real numbers" is True.

3. For the provided function the statement "The y-intercept is 4.5" is False.

4. For the provided function the statement "There is no x-intercept" is True.

5. For the provided function the statement "The rate of change is $ 4.5 per mug" is True.

Let's analyze each statement about the features of the function C(m) = 4.50m + 7 in terms of the context:

1. The range is {y | y ≥ 11.5}.

The range represents the set of all possible values of y (total cost) for different values of m (number of mugs).

In this case, since the cost C(m) is given by 4.50m + 7, any value of m will result in a total cost (y) that is greater than or equal to 11.5.

Therefore, the range is {y | y ≥ 11.5}.

2. The domain is all real numbers.

The domain represents the set of all possible input values for m.

In this case, since there are no restrictions or limitations on the number of mugs that can be ordered, the domain includes all real numbers.

So, the statement is true.

3. The y-intercept is 4.5.

The y-intercept is the value of y (total cost) when m (number of mugs) is zero.

Substituting m = 0 into the equation C(m) = 4.50m + 7, we get C(0) = 4.50(0) + 7 = 7.

Therefore, the y-intercept is 7, not 4.5.

4. There is no x-intercept.

The x-intercept represents the value of m (number of mugs) where the total cost C(m) is zero.

If we set C(m) = 0 and solve for m in the equation 4.50m + 7 = 0, we get m = (-7) / 4.50. Since m represents the number of mugs, it doesn't make sense to have a negative or fractional value for m in this context.

Therefore, there is no x-intercept.

5. The rate of change is $4.5 per mug.

The coefficient of m in the equation C(m) = 4.50m + 7 represents the rate of change, which indicates how the cost changes as the number of mugs increases.

In this case, the rate of change is $4.50 per mug, meaning that for each additional mug ordered, the total cost increases by $4.50.

Therefore, the statement is true.

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The statement "If t, v, w € R³ such that vi. w, then v = w" is false. A counter-example can be provided to show that there exist vectors v and w in R³ such that their dot product is zero but v is not equal to w. The statement remains false even if we specify i = 0.

To prove that the statement is false, we can provide a counterexample. Let v = (1, 0, 0) and w = (0, 1, 0). Both v and w are vectors in R³. The dot product of v and w is given by v · w = (1)(0) + (0)(1) + (0)(0) = 0. However, v is not equal to w, so the statement "vi. w implies v = w" is false.

Even if we specify i = 0, the statement remains false. For example, consider v = (1, 0, 0) and w = (0, 0, 1). The dot product of v and w is still zero (v · w = 0), but v is not equal to w. Therefore, specifying i = 0 does not change the result.

In conclusion, the statement "If t, v, w € R³ such that vi. w, then v = w" is false. A counterexample can be provided to demonstrate that the statement does not hold true. Additionally, specifying i = 0 does not change the fact that the statement is false.

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Answer:

- x + 2

Step-by-step explanation:

Step 1:

x + ( - 3 ) + 5 - 2x    Equation

Step 2:

x - 3 + 5 - 2x    Open Parenthesis

Step 3:

- x - 3 + 5      Subtract

Answer:

- x + 2     Add

Hope This Helps :)

Answer:

-x+2 is the final answer

Step-by-step explanation:

you first do with the brackets and deduce

Answer:

Step-by-step explanation:

The difference between two consecutive integers is 1

So if

x  - the smaller number

then

x+1   - the larger number

x + x+1 = 77

  -1          -1

2x = 76

÷2    ÷2

 x = 38

x+1 = 38+1 = 39

Answer:

[tex]188.6[/tex] cubic feet

Step-by-step explanation:

Let r, h denotes radius and height of the tree's trunk.

Radius of the tree's trunk = 2 feets

Height of the tree's trunk = 15 feets

The tree's trunk is in the shape of a cylinder.

Volume of cylinder (tree's trunk) [tex]=\pi r^2h[/tex]

Put [tex]r=2\,,\,h=15[/tex]

Volume of the tree's trunk [tex]=\pi (2)^2(15)=60\pi[/tex] cubic feet

Put [tex]\pi=\frac{22}{7}[/tex]

So,

Volume of the tree's trunk [tex]=60(\frac{22}{7})=\frac{1320}{7}=188.6[/tex] cubic feet

Answer:

t4

Step-by-step explanation:

Exponents is basically multiplication. So, if you need to find how much it costs for 4 students then you will multiply tx4.

Answer:

n = 5/2

Step-by-step explanation:

(2n + 4) + 6 = -9 + 4(2n + 1)

2n + 4 + 6 = -9 + 8n + 4

2n + 10 = 8n - 5

15 = 6n

n = 5/2

Hope this helps!

Separate the inequalities by part.

[tex]8<12+c\\12+c<12[/tex]

We'll do 8 < 12+c first then 12+c<12 next.

[tex]8-12<c\\-4<c\\c>-4[/tex]

Then 12+c<12

[tex]12+c<12\\c<12-12\\c<0[/tex]

Then mix c<0 and c>-4 as we'll get [tex]-4<c<0[/tex] #

Answer:

8lb

Step-by-step explanation:

6+5+9=20

28-8=20

28/4=7

average=mean

Answer:

the Answer is c I just had the same problem

Final AnThe leading coefficient of the resulting polynomial is 16.

To find the leading coefficient of the resulting polynomial, we need to multiply the coefficients of the terms with the highest degree in each binomial expression.

The expression given is (2c3)(8c).

1: Simplify each binomial expression separately:

(2c3) = 2 * (c * (c-1) * (c-2))

(8c) = 8 * c

2: Multiply the simplified binomial expressions:

(2c3)(8c) = (2 * (c * (c-1) * (c-2))) * (8 * c)

3: Apply the distributive property and multiply each term:

(2c3)(8c) = 2 * 8 * (c * (c-1) * (c-2)) * c

4: Simplify further:

(2c3)(8c) = 16 * c * (c * (c-1) * (c-2))

5: Rearrange the terms:

(2c3)(8c) = 16 * c * (c-1) * (c-2) * c

6: Combine like terms and multiply coefficients:

(2c3)(8c) = 16 * [tex]c^2[/tex] * (c-1) * (c-2)

7: Multiply the remaining binomial expressions:

(2c3)(8c) = 16 * [tex]c^2 * (c^2[/tex] - 3c + 2)

Step 8: Expand the expression:

(2c3)(8c) = 16 * [tex](c^4 - 3c^3 + 2c^2)[/tex]

9: Identify the term with the highest degree:

The highest degree in the resulting polynomial is 4.

10: Find the coefficient of the term with the highest degree:

The coefficient of the term with the highest degree is 16.

Therefore, the leading coefficient of the resulting polynomial is 16.

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Answer: 15

Step-by-step explanation:

The probability that either event A or event B will occur is approximately 0.9715.

To find the probability that either event A or event B will occur, we can use the formula P(A or B) = P(A) + P(B) - P(A and B). In this case, the probabilities of events A and B are given as 12/15 and 18/21, respectively. To find the probability of both A and B happening together, we can multiply their individual probabilities. Now we can plug these values into the formula to find the probability of A or B occurring.

P(A or B) = P(A) + P(B) - P(A and B)

P(A or B) = 12/15 + 18/21 - (12/15) * (18/21)

P(A or B) = 0.8 + 0.8571 - (0.8) * (0.8571)

P(A or B) = 0.8 + 0.8571 - 0.6856

P(A or B) = 0.9715

Therefore, the probability that either event A or event B will occur is approximately 0.9715.

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Answer:

[tex]1min = 60 \: s \\ three \: seconds - - - - - 300 \: miles \\ 60 \: seconds = 3 \times 20 \: seconds \\ so \: we \: have \: 20 \: of \: three \: sconds \: \\ which \: means \: 20 \: three \: hundreds \: \\ 20 \times 300 = 6000 \: miles \: \\ and \: we \: are \: done.[/tex]

Answer:

The perimeter is the measure or length of the outline of an object or a shape.

The perimeter of the double headed arrow is,

= 7.9 cm + 7.9 cm + 5.1 cm + 5.1 cm + 5.1 cm + 5.1 cm + 1.2 cm + 1.2 cm + 1.2 cm + 1.2 cm.

= 2 × 7.9 cm + 4 × 5.1 cm + 4 × 1.2 cm.

= 15.8 cm + 20.4 cm + 4.8 cm.

= 41 cm.

Step-by-step explanation:

The general form of the equation of the circle is[tex]x^2 + y^2 + 4x - 2y - 4 = 0[/tex]. The general form of the equation of a circle is given by

[tex](x - h)^2 + (y - k)^2 = r^2[/tex]  where (h, k) represents the center of the circle, and r represents the radius.

To rewrite

[tex]x^2 + y^2 + 4x - 2y - 4 = 0[/tex]

into the general form, we need to complete the square on x and y terms. So, we will start by grouping the x and y terms separately as shown below:

[tex]x^2+ 4x + y^2 - 2y - 4 = 0[/tex]

Rearranging terms, we have

[tex](x^2 + 4x) + (y^2 - 2y) = 4[/tex]

Now, we complete the square on the x-term as follows:

[tex](x^2 + 4x + 4) + (y^2 - 2y) = 4 + 4= 8[/tex]

Simplifying, we have

[tex](x + 2)^2+ (y - 1)^2 = 8[/tex]

which is in the general form of the equation of a circle as required. Therefore, the center of the circle is (-2, 1) and its radius is

[tex]\sqrt{8} = 2\sqrt{2} .[/tex]

The standard form of a circle is

[tex](x-a)^2 + (y-b)^2 = r^2[/tex]

, where the center is (a, b) and the radius is r. In order to derive the general form of a circle, we square the terms on the left-hand side to get [tex]x^2 + 2ax + a^2 + y^2 + 2by + b^2 = r^2.[/tex]

By rearranging the terms, we arrive at

[tex]x^2 + y^2 + 2ax + 2by + (a^2 + b^2 - r^2) = 0[/tex].

The coefficients of x and y in this equation are used to find the center of the circle, while the radius is obtained by taking the square root of

[tex](a^2 + b^2 - r^2).[/tex]

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Answer:

x = 0

Step-by-step explanation:

Step 1: Write equation

3x - x + 4 = 4(2x + 1)

Step 2: Solve for x

Step 3: Check

Plug in x to verify it's a solution.

3(0) - 0 + 4 = 4(2(0) + 1)

4 = 4(1)

4 = 4

Answer:

Step-by-step explanation:

3x - x + 4 = 4(2x +1)

2x + 4 = 8x + 4

2x - 8x = 4 - 4

-6x = 0

x = 0

Answer:

i think its C but I'm still not sure.

The dominate is 34 I did it

Answer:

The y-intercept is +5

Step-by-step explanation:

3y=-5x + 15 divided by 3

Y=-5/3x +5

Answer: m

=

−

5

3

Explanation:

Change the equation into the form

y

=

m

x

+

c

5

x

+

3

y

=

15

3

y

=

−

5

x

+

15

←

÷

3

y

=

−

5

3

x

+

5

As this is in the slope-intercept form, you can read the slope immediately as

m

=

−

5

3

The y-intercept is +5

Step-by-step explanation:

Answer:

B

Step-by-step explanation:

Answer:

c

Step-by-step explanation:

The sampling method used in this scenario is c. convenience sampling.

Convenience sampling involves selecting individuals who are readily available and easily accessible. In this case, the hotel manager asked each guest that checked in on May 15th about their preferences. The manager likely approached the guests based on convenience, as they were already present at the hotel.

Convenience sampling is a quick and convenient way to gather information, but it may introduce bias since the sample may not accurately represent the larger population. It's important to note that convenience sampling may not provide a representative sample and may not yield generalizable results.

The other sampling methods are not applicable in this case. Voluntary response sampling is a type of non-probability sampling in which individuals volunteer to participate in a study. Stratified sampling is a type of probability sampling in which the population is divided into groups (strata) and then a random sample is selected from each group. Systematic sampling is a type of probability sampling in which every nth individual is selected from the population.

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Answer:

At least 105 tickets must be sold for there to be a 7500 dollar profit

Step-by-step explanation:

Let c = number of couple tickets

ticket sales - costs = profits

We want profits greater than 7500

75c - 375 ≥ 7500

Add 375 from each side

75c-375+375 ≥ 7500 +375

75c ≥ 7875

Divide each side by 75

75c/75 ≥ 7875/75

c ≥ 105

At least 105 tickets must be sold for there to be a 7500 dollar profit

A.  To ensure that the probability is at least 0.95 that the relative frequency estimate differs from 0.20 by less than 0.02, at least 7976 voters should be polled.

b. We find the z-score corresponding to a cumulative probability of 0.95 to be approximately 1.96.

n > 2401

a) Using the Chebyshev inequality, we can determine the minimum number of voters that should be polled to ensure that the probability is at least 0.95 that the relative frequency estimate differs from 0.20 by less than 0.02.

The Chebyshev inequality states that for any random variable X with mean μ and standard deviation σ, the probability of X deviating from the mean by k standard deviations is at least 1 - 1/k^2.

In this case, we want the relative frequency estimate to deviate from 0.20 by less than 0.02, which means we want the difference to be within 0.02 standard deviations of the mean. Since the relative frequency estimate is a sample proportion, its standard deviation can be approximated by sqrt(p(1-p)/n), where p is the true proportion (0.20) and n is the sample size.

We can set up the inequality as follows:

1 - 1/k^2 ≥ 0.95

Solving for k:

1/k^2 ≤ 0.05

k^2 ≥ 1/0.05

k^2 ≥ 20

Taking the square root of both sides:

k ≥ sqrt(20)

k ≥ 4.47

To ensure that the difference between the relative frequency estimate and 0.20 is within 0.02, we need k standard deviations to be less than 0.02. So, we have:

k * sqrt(p(1-p)/n) < 0.02

4.47 * sqrt(0.20(1-0.20)/n) < 0.02

Simplifying:

sqrt(0.20(1-0.20)/n) < 0.02/4.47

sqrt(0.16/n) < 0.00448

0.4/sqrt(n) < 0.00448

sqrt(n) > 0.4/0.00448

sqrt(n) > 89.29

n > 89.29^2

n > 7975.84

Therefore, to ensure that the probability is at least 0.95 that the relative frequency estimate differs from 0.20 by less than 0.02, at least 7976 voters should be polled.

b) Using the central limit theorem, we can determine the minimum number of voters that should be polled to ensure that the probability is at least 0.95 that the sample mean differs from 0.20 by less than 0.02.

According to the central limit theorem, the sample mean follows a normal distribution with mean μ and standard deviation σ/sqrt(n), where σ is the population standard deviation (unknown in this case), and n is the sample size.

To ensure that the difference between the sample mean and 0.20 is within 0.02, we can set up the following inequality:

z * (σ/sqrt(n)) < 0.02

Since the population standard deviation σ is unknown, we can use a conservative estimate by assuming the worst-case scenario, which is p(1-p) = 0.25. Therefore, σ = sqrt(0.25) = 0.5.

Using the standard normal distribution table, we find the z-score corresponding to a cumulative probability of 0.95 to be approximately 1.96.

1.96 * (0.5/sqrt(n)) < 0.02

0.98/sqrt(n) < 0.02

sqrt(n) > 0.98/0.02

sqrt(n) > 49

n > 49^2

n > 2401

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Answer:

I think its 95. I'm probably wrong

The angle of inclination of a road with a grade of 19% is approximately 10.8 degrees, which is calculated by using the inverse tangent formula in trigonometry.

The correct answer is C).

The angle of inclination, or grade, in terms of percentage, represents the rise (vertical distance) over the run (horizontal distance). The measure of the angle of inclination in degrees can be found by using the inverse tangent (tan-1) formula in trigonometry. To be specific, if a road has a 19% grade, it means for every 100 units (meters, feet, etc.) of horizontal distance, there is a 19 unit rise in vertical distance.

An angle θ can be calculated using tan-1(rise/run) = tan-1(19/100).

When you compute this, θ equals approximately 10.8 degrees.

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Answer:

n is smaller, n + 1 is larger

Step-by-step explanation:

First, make the equation.

2(n + n+1) = 510

Then, simplify.

2(2n + 1) = 510

Distribute.

4n + 2 = 510

Solve.

n = 127

The smaller number is n (127) and the larger number is n + 1 (128).

Answer:

the correct answer is the smaller number is:127 and the bigger number is:128

Step-by-step explanation:

Answer:

yes

Step-by-step explanation:

A proportional equation is of the form

y = kx and the constant of proportionality is k

y = 1.2x  is proportional