NEED HELP DUE TODAY!!!! GIVE GOOD ANSWERS PLEASE!!!!
2. How do the sizes of the circles compare?





3. Are triangles ABC and DEF similar? Explain your reasoning.

4. How can you use the coordinates of A to find the coordinates of D?

The graph of an exponential function with an initial value of 10 and a base of 1.3z. Therefore option D is correct.

The function f(x) is an exponential function with a base of 1.3 and an initial value of 10. The graph of an exponential function with a base greater than 1 increases rapidly as x increases. Therefore, option a can be eliminated.

Option b is not a graph of an exponential function, as the function is not continuous and does not approach any asymptote.

Option c shows an exponential function with an initial value of 10 and a base of 1.3/10, which is less than 1. This means that the function would decrease over time, which is not consistent with the problem statement.

Option d shows an exponential function with an initial value of 10 and a base of 1.3, which is consistent with the problem statement. Therefore, option d is the correct answer.

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Therefore, there are 336 different groups of software packages that can be selected from the 8 different software packages offered during the Computer Daze special promotion.

There are 8 different software packages to choose from during the Computer Daze special promotion. Since the customer purchasing a computer and printer is given a choice of 3 free software packages, this means that there are 336 different groups of software packages that can be selected.

To calculate this, the total number of possibilities can be found by using the formula nPr,

where n is the total number of choices, and r is the number of items chosen. This can be written as 8P3. 8P3 is equal to[tex]8x7x6 = 336.[/tex]

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Answer: The smallest integer value of x that satisfies the inequality -2x+1<-9 is x=5.

Step-by-step explanation:

Answer: The smallest integer value of x that satisfies the inequality -2x+1<-9 is x=5.

Explanation:

To solve the inequality, we need to isolate the variable x on one side of the inequality symbol. Here are the steps:

   Subtract 1 from both sides of the inequality:

   -2x < -10

   Divide both sides of the inequality by -2, remembering to reverse the direction of the inequality symbol:

   x > 5

Therefore, the smallest integer value of x that satisfies the inequality is x = 5, since any value less than 5 would make the inequality false.

Answer:

x = 6

Step-by-step explanation:

- 2x + 1 < - 9 ( subtract 1 from both sides )

- 2x < - 10

divide both sides by - 2, reversing the symbol as a result of dividing by a negative quantity.

x > 5

since x must be greater than 5, it cannot equal 5

then the smallest integer value of x is x = 6

The equation line of the of the road in slope-intercept form is; y = 2·x - 10

The standard form of the equation of a line is Ax + Bx + C, where A, B, and C are constants and A and B are nonzero numbers.

The parameters for the new road are;

The road will be parallel to village way with points (0, 5), and (-4, -3)

The road will pass through the intersection  of Gray Dr and Canon Rd., which is the point with coordinates (3, -4)

Required; The equation of the road

Since the new road is parallel to Village Way, which has slope;

m = (5 - (-3))/(0 - (-4)) = 8/4 = 2

The slope of the new road will also be 2.

Let the equation of the new road be y = m·x + c, where m = 2 is the slope we just found. To find c, we use the fact that the road passes through the point (3, -4);

y - (-4) = 2 × (x - 3)

y = 2·x - 6 - 4 = 2·x - 10

y = 2·x - 10

Therefore, c = -10

Therefore, the equation of the new road in slope-intercept form, therefore is; y = 2·x - 10

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The value of 1/3 in decimals is 0.33 and the value in percent is 33 1/3%.

We must divide a fraction to get it to a decimal form. To convert a fraction to decimal form, divide the fraction's numerator by its denominator. If the division is not accurate, we can round the decimal to the closest desired place value or divide again until the appropriate number of decimal places is obtained.

The given number is 1/3.

Using division the value of 1/3 = 0.33.

Now, to calculate the percentage we multiply the value by 100:

0.33 x 100 = 33.33% = 33 1/3%.

Hence, the value of 1/3 in decimals is 0.33 and the value in percent is 33 1/3%.

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By using the Cauchy-Riemann equations on a real-valued function, it can be proven that the function f(z) is constant in the domain D. This is important for understanding analytic functions in complex analysis.

To prove that if f(z) is real-valued for all z in D, then f(z) must be constant throughout D, let a function f be analytic everywhere in a domain D. We know that a real-valued function is said to be a function whose values lie on the real line. In the case of the complex plane, a function whose values lie on the real line is real-valued.

The Cauchy-Riemann equations, which define the necessary conditions for a function f(z) to be analytic in a domain, say that the imaginary component of f(z) is determined by its real component.

To be more precise, if f(z) is real-valued for all z in D, then we can say that:u(x, y) = f(z),v(x, y) = 0

By definition, the Cauchy-Riemann equations can be stated as:

∂u/∂x = ∂v/∂y∂u/∂y = -∂v/∂x

Taking the first equation, we get:

∂u/∂x = ∂v/∂y => ∂v/∂y = 0

Since v is equal to 0 for all values of x and y, the above equation reduces to ∂u/∂x = 0, which implies u is constant with respect to x.

Similarly, taking the second equation, we get:

∂u/∂y = -∂v/∂x => ∂u/∂y = 0

Since u is equal to a constant for all values of x and y, the above equation reduces to ∂v/∂y = 0, which implies v is constant with respect to y. Since u and v are both constant with respect to their respective variables, u + iv = f(z) is a constant with respect to z throughout the domain D. Thus, we have proved that if f(z) is real-valued for all z in D, then f(z) must be constant throughout D.

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Answer:

$63 more in tax

Step-by-step explanation:

Takis is 5.25 in tax  

PlayStation is 68.25

well, we know the tax is 10.5% so let's get them for both.

[tex]\begin{array}{|c|ll} \cline{1-1} \textit{\textit{\LARGE a}\% of \textit{\LARGE b}}\\ \cline{1-1} \\ \left( \cfrac{\textit{\LARGE a}}{100} \right)\cdot \textit{\LARGE b} \\\\ \cline{1-1} \end{array}~\hspace{5em}\stackrel{\textit{10.5\% of 49.99}}{\left( \cfrac{10.5}{100} \right)49.99} ~~ \approx ~~ 5.25[/tex]

[tex]\stackrel{\textit{10.5\% of 649.99}}{\left( \cfrac{10.5}{100} \right)649.99} ~~ \approx ~~ 68.25\hspace{9em}\underset{ \textit{taxes' difference} }{\stackrel{ 68.25~~ - ~~5.25 }{\approx\text{\LARGE 63}}}[/tex]

Answer:

Step-by-step explanation:

To find the perimeter of the triangle, we need to add the lengths of all three sides. So,

Perimeter = (5p^2 − q^2) + (6p^2 − 8 + 5q^2) + (−5p^2+ 8 + 9q^2)

Simplifying the above expression, we get:

Perimeter = 6p^2 + 14q^2 - 8

Therefore, the perimeter of the triangle is 6p^2 + 14q^2 - 8.

The 95% confidence interval for the true average number of alcoholic drinks all UF male students have in a one week period is (4.58, 7.10) that is option C.

Using the following formulas the lower and upper limits of the Interval are calculated,

n = 60

x = 5.84

s = 4.981 = 95% = 0.95

Because the population standard deviation is unknown, the Student T-distribution should be used. Yet, because the sample is huge, some books will utilise the normal distribution. I'll provide solutions for both techniques.

Error = z x s/√n

= 1.96 x 4.98/√60

Error margin ≈1.26

Lower limit = 5.84 - Error

= 5.54 - 1.2601

= 4.58

Upper limit = 5.84 + Error

= 5.84 + 1.2601

= 7.10

Therefore, the upper limit and lower limit is 4.58 and 7.10.

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Complete question:

A study on students drinking habits asks a random sample of 60 male UF students how many alcoholic beverages they have consumed in the past week. The sample reveals an average of 5.84 alcoholic drinks, with a standard deviation of 4.98. Construct a 95% confidence interval for the true average number of alcoholic drinks all UF male students have in a one week period.

A. (4.78, 6.90)

B. (0, 15.60)

C.(4.58, 7.10)

D. (-3.92, 15.60)

619 would Katherine need to invest, to the nearest dollar, for the value of the account.

What is interest in simple words?

When you borrow money, you must pay interest, and when you lend money, you must charge interest. The most common way to represent interest is as a percentage of a loan's total amount every year. The interest rate for the loan is denoted by this proportion.

x. (1 + 3.8%/365)¹⁷ˣ³⁶⁵  = 1180

= x * ( 1 + 38/365000)¹⁷ˣ³⁶⁵  = 1180

= x * ( 1 + 19/182500)¹⁷ˣ³⁶⁵  = 1180

= common denominator and write the numerators above common denominator  x * ( 182500 + 19/182500)⁶²⁰⁵  = 1180

        = x * (182519/182500)⁶²⁰⁵  = 1180

  Divide both sides of the equation by the coefficient of variable

                                  x = 1180/(182519/182500)⁶²⁰⁵

                         x = 1180 * 182500⁶²⁰⁵/182519⁶²⁰⁵

                        x =  619

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The probability that both tests yield the same result is 7.7%.

Simply put, probability is the likelihood that something will occur. When we don't know how an occurrence will turn out, we can discuss the likelihood or likelihood of various outcomes. Statistics is the study of occurrences that follow a probability distribution.
It is predicated on the likelihood that something will occur. The justification for probability serves as the primary foundation for theoretical probability. For instance, the theoretical chance of receiving a head when tossing a coin is 12.
Let's break it down:-
90% don't have of those 99%
5% will be positive
1% positive of those 1%
90% positive
10% negative.
Well we need it to be the same, so 99*(.05*.05+.95*.95)+.01*(.9*.9+.1*.1)= 90.4%.
If both tests are positive, we have:-

0.99*0.05*0.05 and 0.01*0.9*0.9 for being positive, so :-

[tex]\frac{carrier}{positive} = \frac{0.01*0.9*0.9}{(0.99*0.05*0.05+0.01*0.9*0.9)} = 7.7[/tex]

hence, the probability of the two tests yield the same result is 7.7%.

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Suppose sat writing scores are normally distributed with a mean of 497 and a standard deviation of 114. A university plans to admit students whose scores are in the top 30%, the minimum score required for admission is 434

Given information:

Let X be the random variable which represents the SAT writing scores. Then X ~ N(497, 114)Now we have to find the minimum score required for admission. We can solve the problem using the standard normal distribution table. Here we need to find the z-score.

The formula for z-score is given below:z = (X - μ) / σ z-score corresponding to the probability (p) can be calculated as:z = ZpWhere Zp is the standard normal variable, which gives the area to the left of the z-score. So, Zp = InvNorm(0.30) = - 0.524For the top 30% of the scores, we have Zp = -0.524. Now the z-score is known. So we can calculate the minimum score required for admission as :X = μ + z * σ = 497 + (-0.524) * 114 = 433.584 ≈ 434The minimum score required for admission is 434.

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Answer:

See below.

Step-by-step explanation:

Here's a number line showing the points that represent the values of x that satisfy the equation x² = 16

       |---------------------------|---------------------------|

      -4                          0                           4

On this number line, I have marked the points -4, 4, which are the two solutions to the equation x² = 16. These values of x make the left-hand side of the equation equal to 16.

After solving the linear inequality, the number can have any value less than or equal to 12 (x ≤ 12). So the maximum possible value of the number is 12.

Let's suppose the number be "x".

From the given statement, we can write the following inequality:

2x ≤ 24

To solve for x, we can divide both sides by 2:

x ≤ 12

Therefore, the number "x" is at most 12. The exact value of "x" could not be found out. As it could be any number less than or equal to 12 that satisfies the inequality.

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The complete question is :

If twice a number is at most 24, find the number.

If product of two numbers is 19,200 and HCF is 40, then the LCM is 480

Given that the product of two numbers is 19,200 and the highest common factor (HCF) is 40.

Let us assume the two numbers to be x and y.

Therefore, x × y = 19,200

Also, HCF of x and y is 40.

We can write x = 40a and y = 40b, where a and b are co-prime.

Then, x × y = 40a × 40b = 1600ab = 19,200

Therefore, ab = 12

Now, we need to find the LCM of x and y.

LCM(x, y) = (x × y)/HCF(x, y) --- (1)

Substituting the values of x, y and HCF in the above equation, we get,

LCM(x, y) = (40a × 40b)/40 = 40ab

= 40 × 12 (as ab = 12)

= 480

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The solution to the given equation 2sin2x = 1 − cos x on the interval [0, 2π) as required is; Choice D; x equals 0 comma 2 times pi over 3 comma 4 times pi over 3.

It follows from the task content that the solutions to the given equation be determined.

On this note, since the give equation is;

2sin²x = 1 − cos x on the interval [0, 2π).

Recall sin²x = 1 − cos²x; therefore we have that;

2 - 2cos²x = 1 - cos x

2cos²x - cos x - 1 = 0.

let y = cos x so that we have;

2y² - y - 1 = 0

x = 1 or x = -1/2.

Therefore; cos x = 1 or cos x = -1/2.

Ultimately, the values of x in the given interval are; 0, 2π/3, 4π/3.

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From the given information provided, the number of people having brown eyes in town is 180.

If the probability that a person in the town has brown eyes is 2/5, then we can expect that 2 out of every 5 people have brown eyes.

To find the number of people in the survey who would be expected to have brown eyes, we can use the following proportion:

(2/5) = (x/450)

where x is the number of people expected to have brown eyes.

Solving for x, we can cross-multiply:

5x = 2 × 450

5x = 900

x = 180

Therefore, the expected number of people in the survey who would have brown eyes is 180.

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Answer:

1,520

Step-by-step explanation:

The triangle ΔA'B'C' formed following the dilation of ΔABC is a similar

triangle to ΔABC.

. a. Please find attached the drawing of the dilated triangle ΔA'B'C', created with MS Excel

b. The properties of dilations indicate that ∠B = ∠B'

Reasons:

a. With the assumption that the vertices of the triangle are;

A(0, -3), C(0, 5), and B(6, 3)

Let point P = (0, 0)

A' = 2/3 *(0,-3) = (0, -9/2) (0, -4.5)

C' = 2/3 *(0,5) = (0, 15/2) (0, 7.5)

B' = 2/3 *(6,3) = (9, 9/2) (9, 4.5)

We have;

b. From the attached diagram, and from the properties of dilation, given

that the image of ΔABC is larger than the image of ΔA'B'C' by a scale

factor of 1.5, we have that the ratio of the corresponding sides of ΔABC

and ΔA'B'C' are equal and therefore the angle formed by segment BC and BA which is ∠B and the angle formed by segment B'C' and B'A' which is ∠B'. are equal.

AC/AB = A'C'/A'B'

AC/Sin(B) = AB/Sin (C)

AC/AB = Sin(B)/Sin(C)

Similarly, we have;

A'C'/A'B' = Sin(B')/Sin(C')

Therefore;

Sin(B)/Sin(C) = Sin(B')/Sin(C')

According to the properties of dilation, ∠B = ∠B'

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Answer:

Step-by-step explanation:

[tex]P=\frac{\theta}{360} \pi d[/tex]

    [tex]= \frac{120}{360} \pi \times 10[/tex]      (diameter = 2 x radius)

    [tex]=\frac{10\pi}{3}[/tex]    

    [tex]=10.5cm[/tex]    

(a) The eigenvalues of the coefficient matrix is  [-1,3]  and for λ=42, we get the eigenvector [1,5].

Itcan be found by solving the characteristic equation |A-λI|=0, where A is the coefficient matrix and λ is the eigenvalue. Solving for λ, we get λ=0 and λ=42.

o find the eigenvectors, we substitute each eigenvalue into the equation (A-λI)x=0 and solve for x. For λ=0, we get the eigenvector [-1,3]. For λ=42, we get the eigenvector [1,5].

(b) The solution is y(t) = c1e^(0t)[-1,3] + c2e^(42t)[1,5].

To find the real-valued solution to the initial value problem, we can use the eigenvectors and eigenvalues to diagonalize the coefficient matrix. We have A = PDP^-1, where P is the matrix whose columns are the eigenvectors and D is the diagonal matrix with the eigenvalues on the diagonal.

Using the initial condition y2(0) = 15, we can solve for the constants c1 and c2.

The solution is y(t) = c1e^(0t)[-1,3] + c2e^(42t)[1,5]. Solving for c1 and c2 using the initial condition, we get

y(t) = [-15e^(42t) + 3e^(0t), 15e^(42t) + 5e^(0t)].

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Answer: Kelinatra (x) worked 5 hours and Samantha (y) worked 6 hours

Step-by-step explanation:

     We will use the variables x and y the question provides. We know the time worked by each person added together will equal the combined total time. We can write an equation to show this using addition.

        x + y = 11 hours

     Next, we know that Keilantra ironed 30 per hour, Samantha ironed 15 per hour and that they ironed 240 shirts. We can write another equation to represent this using addition and multiplication.

     30x + 15y = 240

     Next, we will graph these two equations. See attached. The solution is the point of intersection written as (x, y). This is (5, 6) meaning that Kelinatra (x) worked 5 hours and Samantha (y) worked 6 hours.

Answer:

£ 6904.13

Step-by-step explanation:

the final value is given by

[tex]8500 (0.90)[/tex] at the final of the first year
then you need to add (0.95) twice (one from second and one from third year)

Notice if the depreciation is 5% the final value is 0.95 of the initial value at the beginning of the year

finally:

[tex]8500 (0.90) (0.95)^2 = 6904.13[/tex] (rounded to nearest cent!)

The correlation close to 0, because there is no reason to believe that height and number of siblings are related to each other.

For each of the following pairs of variables, indicate whether you would expect a positive correlation, a negative correlation, or a correlation close to 0. Explain your choice. (a) Weight of a car and gas mileage: There is a negative correlation, because heavier cars tend to get lower gas mileage. (b) Size and selling price of a house: There is a positive correlation, because larger houses tend to be more expensive. (c) Height and weight: There is a positive correlation, because taller people tend to be heavier. (d) Height and number of siblings: There is a correlation close to 0, because there is no reason to believe that height and number of siblings are related to each other.

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there are approximately 1506 bouncy balls in the box.

What is mass ?

Mass is a physical property of matter, which refers to the amount of substance present in an object. It is typically measured in units of grams or kilograms, and can be thought of as a measure of the object's inertia or resistance to acceleration. Mass is often used interchangeably with weight in everyday language, but they are technically different concepts. Weight is a measure of the force of gravity acting on an object, and varies depending on the object's location in the gravitational field.

According to the question:
First, we need to find the mass of the bouncy balls in the box by subtracting the mass of the box only from the mass of the box and bouncy balls.

Mass of bouncy balls in box = Mass of box and bouncy balls - Mass of box only

Mass of bouncy balls in box = 17,342 - 429

Mass of bouncy balls in box = 16,913 grams

Next, we need to find the mass of one bouncy ball by dividing the mass of 45 balls by 45.

Mass of one bouncy ball = Mass of 45 balls / 45

Mass of one bouncy ball = 505 / 45

Mass of one bouncy ball = 11.222 grams

Finally, we can estimate the number of bouncy balls in the box by dividing the mass of the bouncy balls in the box by the mass of one bouncy ball.

Number of bouncy balls in box = Mass of bouncy balls in box / Mass of one bouncy ball

Number of bouncy balls in box = 16,913 / 11.222

Number of bouncy balls in box ≈ 1506

Therefore, there are approximately 1506 bouncy balls in the box.


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Therefore, the derivative of the function h(w) is h'(w) = [tex]7*arcsin(w) + w*cos(w)*7.[/tex]

The derivative of the function h(w) is h'(w) = [tex]7*arcsin(w) + w*cos(w)*7[/tex]. To find this, first simplify the original function using the identity arcsin(w) = sin-1(w), then use the chain rule. We get:
h'(w) = 7*sin-1(w) + w*cos(sin-1(w))*7

Since sin-1(w) is the inverse of sin(w), we can substitute w for sin(w). This gives us:

h'(w) = 7*sin-1(w) + w*cos(w)*7[tex]7*sin-1(w) + w*cos(w)*7[/tex]

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Answer: n=40

Step-by-step explanation:

let me know if i got this right for you broski

now dance

Answer: The input force (effort) on the rope is 20 N.

Step-by-step explanation:

In a frictionless pulley system, the tension in the rope is constant throughout. Therefore, the force applied to the rope on one side of the pulley system is equal to the force exerted on the other side of the system.

In this problem, we know that the weight of the block is 20 N. This means that there is a force of 20 N acting downwards on one side of the pulley system.

Since the pulley system is frictionless, the tension in the rope is also 20 N. Therefore, the force applied to the rope on the other side of the pulley system (i.e., the input force or effort) must also be 20 N in order to balance the weight of the block.

So the input force (effort) on the rope is also 20 N.