A trapezoid has bases of lengths 14 and 21. Find the trapezoid's height if it's area is 245

The variable that fits this description is a discrete variable. Discrete variables are often used in statistics and data analysis to describe populations or samples. They are important for identifying patterns and relationships in data and can be used to make predictions or draw conclusions.

A discrete variable is a type of variable that takes on distinct and separate values or categories. These values are typically counted in whole numbers, such as the number of children in a family, the number of cars in a parking lot, or the number of pets in a household.

In contrast, continuous variables can take on any value within a range, such as height, weight, or temperature. These variables are measured on a continuous scale and can take on fractional or decimal values.

Examples of discrete variables include the number of students in a class, the number of coins in a piggy bank, and the number of days in a month. While these variables can take on different values, they are always counted in whole numbers and are not measured on a continuous scale.

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The greatest possible number of different values of all 30 student heights is 30.

Let the heights of students R, S, and M be r, s, and m, respectively. Then we have:

r = (s + m + r) / 3

2r = s + m

Similarly, we have:

s = (r + m + s) / 3

m = (r + s + m) / 3

Simplifying these two equations gives:

2s = r + m

2m = r + s

Adding all three equations, we get:

3r + 3s + 3m = 2r + 2s + 2m

r + s + m = 0

This means that the sum of all 30 student heights is 0.

Then the smallest possible sum of 30 distinct integers is 1 + 2 + ... + 30 = 465, and the largest possible sum is 465 + 29 + 28 + ... + 1 = 930.

We can then assign each of these 30 heights to a different student, with the additional condition that for each student R, there exist students S and M (all three are different students) such that the height of student R equals the average height of all three students.

Therefore, the greatest possible number of different values of all 30 student heights is 30.

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The owner of the bookstore sells the used books for $6 each. J.

The price of a used book in the bookstore we need to calculate how much the owner is selling the books for.

The owner of the bookstore buys the used books from customers for $1.50 each.

The owner resells the used books for we need to multiply the cost price by 400%:

$1.50 x 400% = $1.50 x 4

= $6

The markup percentage for the used books is very high.

The owner is reselling the used books for four times the amount he paid for them.

This is a common practice in the used book industry as it allows the owner to make a profit on the books they sell.

It is important for customers to be aware of the markup and shop around for the best prices.

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The series ∑=0infinity diverges, meaning it does not have a finite sum. The sequence of series of partial sums increases without bound, meaning it diverges.

The series ∑=0infinity is an infinite sum of the constant value 23. To determine whether this series converges or diverges, we can use the definition of convergence: if the sequence of partial sums converges to a finite value, then the series converges. Otherwise, if the sequence of partial sums diverges or oscillates, then the series diverges.

The sequence of partial sums for this series is:

S1 = 23

S2 = 23 + 23 = 46

S3 = 23 + 23 + 23 = 69

...

As we can see, the sequence of partial sums increases without bound, meaning it diverges. Therefore, the series ∑=0infinity does not have a finite sum and is said to be divergent.

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The inverse Laplace transform of the function i(s) = (β^2)/(s^2 + β^2) is given by f(t) = β sin(βt).

The Laplace transform is a mathematical technique used to solve differential equations by transforming them from the time domain to the frequency domain. The inverse Laplace transform is then used to transform the solution back from the frequency domain to the time domain.

In this case, the Laplace transform of the function i(t) is given by I(s) = β^2/(s^2 + β^2). To find the inverse Laplace transform, we use the partial fraction decomposition technique to break down the function into simpler terms.

We can rewrite I(s) as I(s) = β^2/[(s + iβ)(s - iβ)]. Using partial fraction decomposition, we can express I(s) as I(s) = A/(s + iβ) + B/(s - iβ), where A and B are constants to be determined.

Solving for A and B, we get A = B = β/2i. We can now use the inverse Laplace transform table to find the inverse Laplace transform of each term.

The inverse Laplace transform of A/(s + iβ) is β/2 e^(-iβt), and the inverse Laplace transform of B/(s - iβ) is β/2 e^(iβt). Adding these two terms together gives us the final solution of f(t) = β sin(βt).

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The statement "If B = [tex]PDP^{-1}[/tex] with P an orthogonal matrix and D a diagonal matrix, then B is a symmetric matrix" is true because If B = [tex]PDP^{-1}[/tex] with P an orthogonal matrix and D a diagonal matrix, then B is a symmetric matrix.

For a matrix to be symmetric, it should be equal to its transpose. Using the given equation, we have:

B^T = ([tex]PDP^{-1}[/tex])^T = (P^-1)^T D^T P^T

Since P is an orthogonal matrix, P^T = P^-1, and we can simplify the above equation as:

B^T = PDP^-1 = B

Therefore, B is equal to its transpose and is a symmetric matrix. Hence the statement is true.

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The range of this function can be represented using the interval [-1,1]. However, if we have a function h(x) = x^3, we know that the output values can take on any real number, so the range of this function can be represented using the interval (-∞, ∞).

Interval notation is a shorthand way of representing a range of numbers using brackets and parentheses. For example, the interval [0,1] represents all real numbers between 0 and 1, including 0 and 1 themselves. The interval (0,1) represents all real numbers between 0 and 1, excluding 0 and 1 themselves.

To represent the domain of a function using interval notation, we consider the set of all input values for which the function is defined. For example, if we have a function f(x) = x^2, we know that this function is defined for all real numbers. Therefore, the domain of this function can be represented using the interval (-∞, ∞).

To represent the range of a function using interval notation, we consider the set of all output values that the function can take. This can be a bit trickier, as some functions may take on a continuous range of values, while others may only take on a finite set of values. For example, if we have a function g(x) = sin(x), we know that the output values will always be between -1 and 1. Therefore, the range of this function can be represented using the interval [-1,1]. However, if we have a function h(x) = x^3, we know that the output values can take on any real number, so the range of this function can be represented using the interval (-∞,∞).

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Complete Question:

Fill in the blanks. (Enter the range in interval notation.) Function Alternative Notation Domain Range y = y = cos-1 x -1 < x< 1

ANSWER:

18

STEP-BY-STEP:

To find the maximum value of P, we need to evaluate P at each vertex.

P(0,0)=3(0)+2(0)=0+0=0

P(0,22/3)=3(0)+2(22/3)=0+44/3=44/ 3

Now

P(16/5,0)=3(16/5)+2(0)=48/5+0=48/ 5

P(2,6)=3(2)+2(6)=6+12=18

Therefore, the maximum value of P is *18* when x = *2* and y = *6*.

Answer:

18

Step-by-step explanation:

To find the maximum value of p, substitute the value of x and the value of y of each vertices in the equation and then compare the results

p = 3x + 2y

For (0,0)

p = 3(0) + 2 (0)

For (0,7.3)

p = 3(0) + 2 (7.3) = 0

For (2,6)

p = 3(2) + 2(6) = 18

For (3.2,0)

p = 3(3.2) + 2(0) = 9.6

therefore the maximum value of p = 18

The volume of the trapezoidal prism would be = 22.05 ft³

To calculate the volume of the prism, the formula that should be used is given below. That is

Volume of trapezoid prism = area of base × height.

The area of base = 6.3ft²

The height = 3.5ft

Therefore the volume = 6.3×3.5

= 22.05 ft³

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The image is reflected completely opposite to the given figure in the graph is having the following points (2,2), (4,4) and (9,0).

The points which are having the given triangle are,

To reflect the given figure completely to the opposite side of the given line, we have to invert the above given points. Simple it is meaning to flip the triangle without disturbing on point.

The points which are having the flipped triangle figure are,

From the above analysis, the flipped triangle which is the triangle reflected across the line is constructed.

The reflected triangle's diagram is attached below,

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The given question is missing graphs, I am attaching them below:

A 95% confidence interval's margin of error is 2.8. The margin of error will be less than 2.8 if the confidence level is reduced to 90%. Here option A is the correct answer.

The margin of error is the range within which the true population parameter is expected to lie, given a certain level of confidence. In this case, we are given that the margin of error for a 95% confidence interval is 2.8. This means that if we were to conduct the same study many times and construct 95% confidence intervals using each sample, about 95% of those intervals would contain the true population parameter.

Now, if we decrease the confidence level to 90%, the margin of error will become smaller. This is because a lower level of confidence means we are willing to tolerate a greater risk of being wrong, so we can afford to have a narrower interval.

To see why this is the case, consider the formula for the margin of error:

The margin of Error = Z * (Standard Deviation / Square Root of Sample Size)

Where Z is the z-score for the desired level of confidence, and the standard deviation represents the variability in the sample data. The sample size also plays a role in determining the margin of error, with larger samples leading to smaller margins of error.

If we decrease the level of confidence from 95% to 90%, the z-score will become smaller (since we need to cover less area in the tails of the distribution). This means that the product of Z and the standard deviation will be smaller, which in turn will lead to a smaller margin of error.

The margin of error will be smaller than 2.8 if we decrease the confidence level to 90%. It is important to note, however, that a smaller margin of error comes at the cost of a lower level of confidence, meaning there is a greater chance of being wrong. Additionally, changing the level of confidence after data has been collected can lead to biased results, so it is generally recommended to specify the desired level of confidence before conducting a study.

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Complete question:

The margin of error for a 95% confidence interval is 2.8. If we decrease the confidence level to 90%, the margin of error will be

A - smaller than 2.8.

B - biased.

C - larger than 2.8.

D - 99%.

In college basketball, a "1 and 1" refers to a situation where a player is awarded one free throw and if they make that shot, they are awarded a second free throw.

We can find the PMF (probability mass function) of the number of points scored in a "1 and 1" situation given that any free throw goes in with probability p, independent of any other free throw.

Let Y denote the number of points scored in a "1 and 1" situation. There are three possible outcomes for Y: the player makes both free throws and scores 2 points, the player makes the first free throw but misses the second and scores 1 point, or the player misses the first free throw and scores 0 points.

The probability of making both free throws is p * p = p^2, since the two free throws are independent. The probability of making the first free throw but missing the second is p * (1 - p), and the probability of missing the first free throw is (1 - p). Thus, the PMF of Y is:

P(Y = 2) = p^2
P(Y = 1) = 2p(1-p)
P(Y = 0) = (1-p)^2

We can see that the PMF of Y follows a binomial distribution with n = 2 and p = the probability of making a free throw.

This distribution tells us the probability of obtaining a certain number of successes in a fixed number of independent trials, which is the same as the probability of scoring a certain number of points in a "1 and 1" situation.

This PMF can be useful for coaches and players to understand the probabilities of scoring in different scenarios and to make strategic decisions during games.

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We can use the alternating series error bound to estimate the error between the infinite series S and its partial sum P. The alternating series error bound states that the error between S and P is less than or equal to the absolute value of the first neglected term. That is:

|S - P| <= |a_{n+1}|

where a_{n+1} is the (n+1)-th term in the series.

In this case, we have:

S = -1 + 1/2 - 1/3 + 1/4 - ...

P = -1 + 1/2

and

a_{n+1} = (-1)^{n+1} / (n+1)

We want to find the least value of k for n=1 such that |a_{n+1}| is less than the error bound that guarantees that |S - P| < k. That is:

|a_{n+1}| < k

Substituting n=1 and P= -1 + 1/2, we get:

|a_2| = 1/3 < k

Therefore, the least value of k for n=1 that satisfies the error bound is k = 1/3.

To check which option is correct, we need to calculate the value of S - P and see if it is less than 64, 66, 68, or 70. We have:

S - P = -1/3 + 1/4 - 1/5 + 1/6 - ...

The sum of the first two terms is approximately -0.25, which is less than 0.33 (the error bound). Therefore, we have:

|S - P| < 0.33

So the correct answer is (A) 64, since 0.33 is less than 64.

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Answer: 15x + 150 = 950

Step-by-step explanation:

Let x equal the number of weeks.

He saves $15 per week, so 15 times the number of weeks, 15x.

He has already saved $150, so the money saved up over the weeks gets added to 150, 15x + 150.

all of the money he saves up has to equal 950, so 15x + 150 = 950.

I hope this helps!

Answer:

15x + 150 = 950

Step-by-step explanation:

I did dont paper I dont knwo how to upload it

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The given joint probability mass function defines the probabilities of the discrete random variables x and y taking on values 1, 2, or 3.

The probability p(x = x, y = y) is equal to xy/54 for all (x, y) in the set {(1, 1), (1, 2), (1, 3), (2, 1), (2, 2), (2, 3), (3, 1), (3, 2), (3, 3)}.  To find the marginal probability mass functions for x and y, we sum the joint probabilities over all possible values of the other variable. That is,

p(x = x) = ∑ p(x = x, y = y) = ∑ xy/54, y=1 to 3

         = (x/54)∑y=1 to 3 y

         = (x/54)(1+2+3)

         = (x/54)(6)

         = x/9

Similarly, we have

p(y = y) = ∑ p(x = x, y = y) = ∑ xy/54, x=1 to 3

         = (y/54)∑x=1 to 3 x

         = (y/54)(1+2+3)

         = (y/54)(6)

         = y/9

Hence, the marginal probability mass functions for x and y are given by p(x) = x/9 and p(y) = y/9, respectively.

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The solution is the coordinate point (-1, 4)

Here we need to solve the system of equations in the diagram. Notice that the system is already graphed, the solutions are all the points where the graphs intercept.

Here we can see that there is one interception point so there is only one soluition, which is at the coordinate point (-1, 4), so that is the solution of the system.

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Answer: I think the answer is 104m

Step-by-step explanation: 8x10=80+6x4=104

Answer:

Step-by-step explanation:

8 + 2x - x^2 >= 0

x^2 - 2x - 8 <= 0

(x - 1)^2 - 9 <= 0
(x - 1)^2 <= 9
x - 1 <= +- 3
-3 <= x - 1 <= 3
-2 <= x <= 4

The given statement is "In determining the size of hail stones, weather spotters should report the longest dimension of the largest hail stone"

This statement is False because meteorologists ought to report the hail stones' diameter in millimeters rather than their longest dimension.

The longest dimension is the longest line member between the two points of the hailstone, while the periphery is the longest distance between the two points. The standard measurement utilized by meteorologists is the periphery, which is a more accurate measurement of the size of the hail gravestone.

This is because the hailstone size could be used as an indicator of the wind speed and the height of the storm where it formed. The National Weather Service uses size criteria to issue various hail size warnings.

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The domain of G is -6 ≤ x ≤ 6. Therefore the correct answer is option C.

Look at the graph to identify the largest interval of x-values for which a graph exists above, below, or on the x-axis. This will find the domain of the function. In other words, the collection of all x-coordinates for each point on the graph represents the domain. Either write the domain as an inequality involving x (or whatever the independent variable is) or express it using interval notation.

In the graph, we can see that when x = 6, the graph's value, f(x) = 3. This is the highest value of x, and we can also see that the lowest value of x in the graph, where f(x) = -6. Thus, its range will be from -6 to 6.

Since, the domain of the function is : -6 ≤ x ≤ 6, therefore option C is correct.

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Answer: c = 10, d = 7

Step-by-step explanation:

To solve this system using the linear combination method, we want to eliminate one of the variables, either c or d, by adding or subtracting the two equations. One way to do this is to add the two equations together, which will cancel out the d terms:

(c + d) + (c - d) = 17 + 3

2c = 20

c = 10

Now we can substitute this value of c into either equation to solve for d:

c - d = 3

10 - d = 3

d = 7

Therefore, the solution to the system is:

c = 10, d = 7.

Answer:

c=10 and d=7

Step-by-step explanation:

Use linear combination to solve the following system of equations.

Linear combination is synonymous with the method of elimination. The goal of elimination is to "eliminate" one of the variables so that we may solve for the other.

[tex]\left\{\begin{array}{ccc}c+d=17\\c-d=3\end{array}\right[/tex]

Notice how the "d" term has opposite signs in the system. We can add these two equations together to "eliminate" d.

[tex](c+d=17)+(c-d=3)=\boxed{2c=20}\\\\\therefore \boxed{\boxed{c=10}}[/tex]

We now know what "c" equals, plug this value into either of the equations and solve for "d."

[tex]c=10\\\\\Longrightarrow 10+d=17\\\\\therefore \boxed{\boxed{d=7}}[/tex]

Thus, the system is solved. c=10 and d=7.

The given function is 5x^4-24x^3+24x^2+17. In order to determine where the function is concave down, we need to find its second derivative. The second derivative of the function is 60x^2-144x+48. To determine where the function is concave down, we need to find the values of x for which the second derivative is negative. Using the quadratic formula, we find that the roots of the second derivative are x=1 and x=4/5. Thus, the function is concave down for x values between 1 and 4/5.

To find whether a function is concave up or down, we need to look at its second derivative. If the second derivative is positive, the function is concave up. If the second derivative is negative, the function is concave down. In this case, we have found that the second derivative is 60x^2-144x+48. To find where the function is concave down, we need to find the values of x for which this second derivative is negative. We can do this by finding the roots of the quadratic equation 60x^2-144x+48=0. Using the quadratic formula, we find that the roots are x=1 and x=4/5. Thus, the function is concave down for x values between 1 and 4/5.

The function 5x^4-24x^3+24x^2+17 is concave down for x values between 1 and 4/5. This means that the function is curving downwards in this interval. It is important to note that this is just one piece of information about the behavior of the function, and we would need to analyze other aspects of the function, such as its critical points and end behavior, to get a complete understanding of its behavior.

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The equation is given, N(a) = 2.925 sin ( 3.65 ) + 12.18, which models the number of hours of daylight in New York City d days after March 21, 2010.

To solve the equation 11.5 = 2.925 sin (27 d) + 12.18 over the interval [0°, 720°), we need to isolate the sine function on one side of the equation.

Subtracting 12.18 from both sides, we get:
-0.68 = 2.925 sin (27 d)
Dividing both sides by 2.925, we get:
sin (27 d) = -0.2333
To find d, we need to use the inverse sine function ([tex]sin^{-1}[/tex]) on both sides:
27 d = [tex]sin^{-1}[/tex] (-0.2333)
Using a calculator, we find that [tex]sin^{-1}[/tex] (-0.2333) = -13.5° or -0.235 radians (rounded to three decimal places).
Dividing both sides by 27, we get:
d = -0.0087 radians / 27
d = -0.00032 radians (rounded to five decimal places)
To make sense of this answer in the context of the problem, we need to convert radians to days.
One complete cycle of the sine function occurs over 360 degrees or 2π radians. Therefore, over the interval [0°, 720°), there are two complete cycles or 4π radians.
To find the number of days, we can set up a proportion:
4π radians = 365 days - 80 days (March 21 to June 9)
Solving for one radian, we get:
1 radian = (365 - 80) days / 4π
1 radian ≈ 71.3 days
Substituting this value, we get:
d = -0.00032 radians x 71.3 days/radian
d ≈ -0.023 days

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Answer: 7s - 2 + 3 + (s + 3) = 52

Step-by-step explanation:

Answer:

31.40 inches

Step-by-step explanation:

The circle has a radius of 5 inches (as the radius is drawn from the center to the point labeled 5 inches).

Pi (π) = 3.14

Circumference = 2 * pi * Radius

Substitute the radius of 5 inches: Circumference = 2 * 3.14 * 5

= 31.40 inches

So the circumference of the full circle is 31.40 inches.

The other options do not match the given radius of 5 inches and the formula for circumference.

Hence, the correct option is:

31.40 inches

An equation for the parabola that has its x-intercepts at (-2, 0) and (-5, 0) and its y-intercept at (0, -4) is y = -2/5(x² + 7x + 10).

In Mathematics, the vertex form of a quadratic function is represented by the following mathematical equation:

f(x) = a(x - h)² + k

Where:

Based on the information provided about the y-intercept and x-intercepts, we can write the quadratic function and determine the value of "a" as follows:

f(x) = (x + 2)(x + 5)

f(x) = x² + 2x + 5x + 10

f(x) = x² + 7x + 10

f(x) = a(x² + 7x + 10)

-4 = a(x² + 7x + 10)

-4 = a(0² + 7(0) + 10)

-4 = 10a

a = -4/10

a = -2/5

Therefore, the required quadratic function is given by:

y = a(x - h)² + k

y = -2/5(x² + 7x + 10)

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Amelia paid a total fine of £1.44 for returning the DVD 16 days overdue.

To calculate the total fine paid by Amelia, we need to determine the number of days the DVD was overdue and then multiply that by the fine rate.

The rental period for the DVD is from 26 November to 12 December. To find the number of days overdue, we subtract the due date from the actual return date:

12 December - 26 November = 16 days

Since the fine rate is 9p per day, we multiply the number of days overdue by the fine rate:

16 days × £0.09/day = £1.44

Therefore, Amelia paid a total fine of £1.44 for returning the DVD 16 days overdue.

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We can use the formula for compound interest to solve this problem:

A = P(1 + r/n)^(nt)

where:

A = final amount

P = principal amount (initial investment)

r = annual interest rate (as a decimal)

n = number of times the interest is compounded per year

t = number of years

In this case, we have:

P = $84,410

r = 15% = 0.15

n = 1 (compounded annually)

t = 4

Substituting these values into the formula, we get:

A = $84,410(1 + 0.15/1)^(1*4)

= $84,410(1.15)^4

= $148,982.74

Therefore, Jim will have $148,982.74 in 4 years.