5. (10 points) let p3 denote the vector space of all polynomials of degree at most 3, which of the following subsets are subspaces of either r3 or p3?

The Length of CD is 27.875 cm.

We have,

AB=24 cm, BD= 17 cm, AD = 13 cm

and, ACD=90Degrees

Using Pythagoras theorem

AD² = AC² + CD²

13² = AC² + (x-17)²

169 = AC² + x² + 289 - 34x

- x² + 34x - 120 = AC²

AC² = (x-4)(x-30)

Again,

AB² = AC² + CB²

24² = (x-4)(x-30) + x²

576 =  - x² + 34x - 120 + x²

34x = 696

x= 10.875

Thus, the length of CD is

= 10.875 + 17

= 37.875 cm

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The fraction of Cos L is 23/25

First, let's understand what a fraction is. A fraction represents a part of a whole. It has two parts: the numerator and the denominator. The numerator represents the part we are interested in, and the denominator represents the whole.

Now, let's look at our problem. We have a right triangle with sides KL and JL, and we need to find cos L. Cosine is defined as the ratio of the adjacent side to the hypotenuse in a right triangle. So, to find cos L, we need to identify the adjacent and hypotenuse sides.

From the given information, we know that KL is adjacent to angle L, and JL is the hypotenuse. So, we can write:

cos L = KL/JL

Now, we need to simplify this fraction. To simplify a fraction, we need to divide both the numerator and the denominator by their greatest common factor (GCF). The GCF of 23 and 25 is 1, so we cannot simplify the fraction any further.

Therefore, the final answer is:

cos L = KL/JL = 23/25

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According to current fiscal policy theory, the best decision to help end a recession in the United States would be to increase government spending. This is based on the Keynesian theory that during a recession, there is a lack of aggregate demand in the economy, and government spending can help stimulate demand and encourage economic growth.

By increasing government spending on infrastructure, education, and other public services, it can create jobs, increase consumer spending, and boost economic activity. Additionally, the government can also implement tax cuts, which can give consumers more disposable income to spend and also stimulate demand.

However, it's important to note that the effectiveness of fiscal policy in ending a recession can be influenced by various factors such as the magnitude of the recession, the timing of the policy implementation, and the government's ability to finance the policy measures. Therefore, policymakers need to carefully consider all of these factors and adjust their decisions accordingly.
According to current fiscal policy theory, the best decision to help end a recession in the United States would involve implementing expansionary fiscal measures. This typically includes increasing government spending, cutting taxes, or a combination of both, which in turn stimulates economic activity and growth.

Expansionary fiscal policy works by injecting more money into the economy, which increases aggregate demand. This leads to higher levels of output and employment, eventually helping to alleviate the negative effects of a recession. Increased government spending can come in various forms, such as investments in infrastructure, public services, or direct financial assistance to individuals and businesses. Tax cuts provide more disposable income for consumers and lower costs for businesses, promoting spending and investment.

To implement these decisions, policymakers need to consider various factors, such as the severity of the recession, the level of public debt, and the effectiveness of specific fiscal measures in achieving the desired outcomes. It is essential to strike the right balance to avoid causing inflation or exacerbating long-term fiscal imbalances.

In conclusion, current fiscal policy theory suggests that the best decision to help end a recession in the United States involves implementing expansionary fiscal measures, such as increasing government spending and cutting taxes. These actions stimulate economic growth and alleviate the negative impacts of a recession, ultimately contributing to economic recovery.

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The speed of the airplane in still air is 310 miles per hour.

Let's denote the speed of the airplane in still air as "x" (in miles per hour).

When the airplane is flying with a tailwind, its speed relative to the ground increases. We can use the formula:

speed with tailwind = speed in still air + speed of tailwind

To set up an equation:

350 mi/h = x mi/h + 40 mi/h

To simplify, we have:

x mi/h = 350 mi/h - 40 mi/h

x mi/h = 310 mi/h

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The expected number of rolls needed to generate a number below 1/2 is 1.5, which is rounded to 2.

If we pick a random number between 0 and 1 and generate the next number to be at most the previous number, then the expected number of rolls until the generated number is below 1/2 is 2.

To see why, consider the following strategy:

Roll the die once to generate the first number, X1.

If X1 < 1/2, stop.

Otherwise, continue rolling the die until the generated number is below X1.

Once the generated number is below X1, stop.

Let Y be the number of rolls needed to complete this strategy. If X1 < 1/2, then Y = 1, since we stop immediately. Otherwise, we know that X2 < X1, X3 < X2, and so on until we reach a number Xn < Xn-1 < ... < X2 < X1 that is below 1/2. Thus, we need at least n - 1 additional rolls to complete the strategy.

To find the expected value of Y, we can use the law of total probability:

E(Y) = P(X1 < 1/2) × E(Y | X1 < 1/2) + P(X1 ≥ 1/2) × E(Y | X1 ≥ 1/2)

Since the first roll is uniformly distributed between 0 and 1, we have P(X1 < 1/2) = 1/2 and P(X1 ≥ 1/2) = 1/2.

If X1 < 1/2, then Y = 1, so E(Y | X1 < 1/2) = 1.

If X1 ≥ 1/2, then we need to roll the die until we get a number below X1. Since X1 is uniformly distributed between 1/2 and 1, the expected value of X1 is 3/4. Thus, by the memoryless property of the geometric distribution, the expected number of rolls needed to generate a number below X1 is 2. Therefore, E(Y | X1 ≥ 1/2) = 2.

Substituting these values into the formula for E(Y), we get:

E(Y) = (1/2) × 1 + (1/2) × 2 = 1.5

Therefore, the expected number of rolls needed to generate a number below 1/2 is 1.5, which is rounded to 2.

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The simple interest after 30 months is $924. 375

To determine the simple interest value, we need to know the formula for calculating it

The formula for simple interest is represented as;

S.I =PRT/100

The parameters of the equation are;

From the information given, we have;

Substitute the values

Simple interest = 8500 × 2.5 × 4.35/100

Multiply the values

Simple interest = 92437.5/100

Divide the values

Simple interest = $924. 375

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Answer:

Step-by-step explanation:

5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%5.3%uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

uestion

A square with sides measuring 5 millimeters each is drawn within the figure shown. A point within the figure is randomly selected.

What is the approximate probability that the randomly selected point will lie inside the square?

5.3%

8.4%

13.3%

18.1%

Answer:

mean = 52

Step-by-step explanation:

In mathematics, the mean is a measure of central tendency that represents the average of a set of numbers. It is also commonly known as the arithmetic mean.

To calculate the mean, you add up all the numbers in a set and then divide by the total number of values in the set.

So in tho case we would add all the values then divide by the amount of values there are.

1) rewrite values:

42  45  58  63

2) add:

42 + 45 + 58 + 63
= 208

3) divide:

Since there arev4 values we will divide by 4.

208 / 4 = 52

Therefore, the mean is 52

Answer:

[tex]\huge\boxed{\sf Mean = 52}[/tex]

Step-by-step explanation:

42, 45, 58, 63

[tex]\displaystyle Mean = \frac{Sum \ of \ data}{No. \ of \ data} \\\\Mean = \frac{42+45+58+63}{4} \\\\Mean = \frac{208}{4} \\\\Mean = 52\\\\\rule[225]{225}{2}[/tex]

Mary needs to score 96 on the fifth test to raise her average test score from 92.25 to 93.

Let's use the formula for the mean

mean = (sum of all scores) / (number of scores)

We can rearrange this formula to solve for the sum of all scores

sum of all scores = mean x number of scores

We know that Mary's mean test score is currently 92.25 and she has taken four tests, so

sum of all scores = 92.25 x 4 = 369

To raise her mean test score to 93, Mary needs the sum of all five test scores to be

sum of all scores = 93 x 5 = 465

To find out what score Mary needs to earn on the fifth test, we can subtract the sum of her first four test scores from the required sum of all five test scores

score on fifth test = sum of all five tests - sum of first four tests

score on fifth test = 465 - 369

score on fifth test = 96

Therefore, Mary needs to earn a score of 96 on the fifth test in order to raise her mean test score to 93.

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Answer:

D.) 7

Step-by-step explanation:

5 trees have a height of from 80 ft to 85 ft.

2 trees have a height of from 85 ft to 90 ft.

Answer: D.) 7

Answer:

D) 7 black cherry trees

Step-by-step explanation:

In the bar graph, we can see that starting at 80 feet, there are 5 trees that range from 80-85 feet.

We can also see that there are only 2 trees that range from 85-90 feet.  The question asks for how many trees that have a height of at least 80 feet, so we add 5+2 to get 7 trees.

Hope this helps! :)

The derivative of the vertical position of the pumpkin trajectory with respect to its horizontal position is 2ax, as given by option b.

To find the position of maximum height of the pumpkin, the students need to find the point where the derivative of the vertical position with respect to the horizontal position is equal to zero. Setting 2ax equal to zero and solving for x, we get x=0. This means that the pumpkin reaches its maximum height at x=0, or in other words, at the point where it is launched from the trebuchet.

To find the value of the maximum height, we can substitute x=0 into the original equation for the pumpkin's trajectory. This gives us y(0) = b, which means that the maximum height of the pumpkin is b units.

The derivative of the vertical position of the pumpkin trajectory with respect to its horizontal position is 2ax because the derivative of ax^2 with respect to x is 2ax. This means that the rate of change of the pumpkin's height with respect to its horizontal position is proportional to 2ax. When x is zero, the derivative is also zero, which indicates that the pumpkin has reached its maximum height at that point.

This is because at the maximum height, the rate of change of height with respect to horizontal distance is zero. Finally, we find the value of the maximum height by substituting x=0 into the equation for the pumpkin's trajectory.

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Answer:

4!/(2!2!) = 6

There are 6 possible ways that 2 of the 4 dice will land on six.

6(1/6)(1/6)(5/6)(5/6) = 25/216 = .116

B is correct.

To ensure that the error is less than 0.0000001, we need to compute at least the first 6 terms of the series. This will give us a partial sum that is within 0.0000001 of the actual sum.

(a) The ratio of successive terms of the series is:

[tex]|a[n+1]/a[n]| = |(-1)^(n+1)*(n+2)/(n+1)(1/2)|[/tex]

Simplifying this expression, we get:

[tex]|a[n+1]/a[n]| = (n+2)/(2(n+1))[/tex]

(b) To evaluate the limit of this expression as n approaches infinity, we can divide the numerator and denominator by n:

[tex]|a[n+1]/a[n]| = [(n/n)(1+2/n)] / [(2/n)(1+1/n)][/tex]

Taking the limit as n approaches infinity, we get:

[tex]lim n- > ∞ |a[n+1]/a[n]| = lim n- > ∞ [(n/n)(1+2/n)] / [(2/n)(1+1/n)[/tex]]

= 1/2

Therefore, the limit of the ratio of successive terms is 1/2.

(c) Since the limit of the ratio of successive terms is less than 1, by the ratio test, the series ? + 2 converges.

To approximate the alternating series Σα, = 0. 45 - (0. 45) (0. 45) (0. 45) 31 +. 5! 7! within 0.0000001 of the convergent value, we need to determine how many terms of the series we need to compute. We can use the alternating series error bound theorem to estimate the error:

|Rn| <= |an+1|

where Rn is the error term (the difference between the nth partial sum and the actual sum), and an+1 is the first neglected term in the series.

To find the first neglected term, we can look at the pattern of the series:

a0 = 0.45

a1 = -0.2025

a2 = 0.025641

a3 = -0.0007716

a4 = 0.00003857

a5 = -0.00000298

The absolute value of the terms is decreasing, so the error is bounded by the absolute value of the first neglected term. In this case, the first neglected term is a6 = 0.00000025.

Therefore, to ensure that the error is less than 0.0000001, we need to compute at least the first 6 terms of the series. This will give us a partial sum that is within 0.0000001 of the actual sum.

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The value of exact solutions of the given system equations graphically is,

⇒ x = (1 ± √ 47i) / 8

We have to given that;

Equations are,

y = x - 3

y = 4x²

Now, Substitute the value of y in (ii);

x - 3 = 4x²

4x² - x + 3 = 0

x = - (- 1) ± √(- 1)² - 4×4×3/8

x = (1 ± √1 - 48) / 8

x = (1 ± √- 47) / 8

Thus, The value of exact solutions of the given system equations graphically is,

⇒ x = (1 ± √ 47i) / 8

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Answer:

1/6561

Step-by-Step Explanation:

you get 1/6561 when you simplify 9^-4

To apply the y-function to the provided cme data, we need to first calculate the specific volume (v) for each data point using the ideal gas law: v = (RT)/P

where R is the gas constant, T is the temperature in Kelvin, and P is the pressure. We will assume that the gas is ideal and use R = 8.314 J/mol K.

Next, we need to calculate the y-values for each data point using the equation:

[tex]Y = (v - v_l) /(v_g - v_l)[/tex]

where [tex]v_l[/tex] and [tex]v_g[/tex] are the specific volumes of the liquid and gas phases, respectively, at the given pressure and temperature. We will use the following values for [tex]v_l[/tex] and [tex]v_g[/tex]:

[tex]v_l = 0.001 (m^3/kg)\\\\v\\_g = 5.0 (m^3/kg)[/tex]

Using the specific volume values and the equation for y, we can calculate the y-values for each data point:

| Pressure (MPa) | Temperature (K) | Specific Volume

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i) The equation in vertex form is f(x) = (x - 2)² - 1.

ii) The vertex of the parabola is (2, -1).

iii)The x-intercepts are (1, 0) and (3, 0) and the y-intercept is (0, 3).

b. The quadratic function is: f(x) = (1/8)(x + 3)² + 2.

A quadratic function is a function of form f(x) = ax² + bx + c, where a, b, and c are constants and a ≠ 0. The graph of a quadratic function is a U-shaped curve called a parabola.

The vertex of a parabola is the point where the parabola changes direction. It lies on the axis of symmetry, which is a vertical line that divides the parabola into two equal halves.

Here we have

The parabola f(x) = x² - 4x +3

a. Consider the parabola f(x) = x^2 - 4x + 3

i) To write the equation in vertex form, we complete the square:

f(x) = x² - 4x + 3

= (x² - 4x + 4) - 1

= (x - 2)² - 1

Therefore, the equation in vertex form is f(x) = (x - 2)² - 1.

ii) The vertex of the parabola is (2, -1). The axis of symmetry is the vertical line passing through the vertex, which is x = 2.

iii) To find the x-intercepts, we set f(x) = 0:

(x - 2)² - 1 = 0

(x - 2)² = 1

x - 2 = ±1

x = 1, 3

Therefore, the x-intercepts are (1, 0) and (3, 0).

To find the y-intercept, we set x = 0:

f(0) = 0² - 4(0) + 3 = 3

Therefore, the y-intercept is (0, 3).

b. To write the quadratic function for the parabola that has vertex (-3, 2) and passes through (1, 4), we use the vertex form of the quadratic equation:

f(x) = a(x - h)² + k,

where (h, k) is the vertex.

Substituting the given values, we get:

f(x) = a(x + 3)² + 2

To find the value of a, we substitute the point (1, 4) into the equation:

4 = a(1 + 3)² + 2

2 = 16a

a = 1/8

Therefore,

i) The equation in vertex form is f(x) = (x - 2)² - 1.

ii) The vertex of the parabola is (2, -1).

iii)The x-intercepts are (1, 0) and (3, 0) and the y-intercept is (0, 3).

b. The quadratic function is: f(x) = (1/8)(x + 3)² + 2.

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A.i. The equation in vertex form is f(x) = (x - 2)² - 1.

ii. The axis of symmetry is the vertical line passing through the vertex, which is x = 2.

iii. The x-intercepts are x = 1 and x = 3. The y-intercept is y = 3.

B. The quadratic function for the parabola is:

f(x) = (1/8)(x + 3)^2 + 2.

a.

i) To write the equation in vertex form, we need to complete the square. The general vertex form of a parabola is given by f(x) = a(x - h)² + k, where (h, k) represents the vertex.

Let's complete the square for the given parabola f(x) = x² - 4x + 3:

f(x) = x² - 4x + 3

= (x² - 4x + 4) - 4 + 3 [Adding and subtracting (4/2)² = 4 to complete the square]

= (x - 2)² - 1

So, the equation in vertex form is f(x) = (x - 2)² - 1.

ii) Comparing the equation f(x) = (x - 2)² - 1 with the vertex form f(x) = a(x - h)² + k, we can see that the vertex is (h, k) = (2, -1). The axis of symmetry is the vertical line passing through the vertex, which is x = 2.

iii) To find the x-intercepts, set f(x) = 0 and solve for x:

(x - 2)² - 1 = 0

(x - 2)² = 1

x - 2 = ±√1

x - 2 = ±1

x = 2 ± 1

So, the x-intercepts are x = 1 and x = 3.

To find the y-intercept, set x = 0 in the equation:

f(0) = (0 - 2)² - 1

= (-2)² - 1

= 4 - 1

= 3

So, the y-intercept is y = 3.

b.

To write the quadratic function for the parabola with a vertex at (-3, 2) and passing through (1, 4), use the vertex form of a parabola.

The vertex form of a parabola is f(x) = a(x - h)² + k, where (h, k) represents the vertex.

Using the given vertex (-3, 2):

h = -3 and k = 2.

Substituting the values of h and k:

f(x) = a(x - (-3))² + 2

= a(x + 3)² + 2

Now, use the point (1, 4) to find the value of 'a'.

Substituting x = 1 and f(x) = 4 in the equation:

4 = a(1 + 3)² + 2

4 = a(4²) + 2

4 = 16a + 2

16a = 4 - 2

16a = 2

a = 2/16

a = 1/8

Therefore, the quadratic function for the parabola is: f(x) = (1/8)(x + 3)² + 2.

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The E-M algorithm is used to estimate the parameters mu and Sigma. The implementation in R involves defining the likelihood function, initializing the estimates, and using the E-M steps to update the estimates.

The E-M algorithm for estimating the mean and covariance matrix of a multivariate normal distribution from a set of observations can be performed in the following steps

Initialization: Choose initial values for the mean vector and covariance matrix.

Expectation step: Calculate the posterior probabilities of each observation belonging to each component of the mixture model using Bayes' theorem and the current parameter estimates.

Maximization step: Use the posterior probabilities to update the estimates of the mean vector and covariance matrix for each component of the mixture model.

Repeat steps 2 and 3 until convergence (i.e., until the change in the parameter estimates falls below a specified tolerance level).

In this case, we have a single multivariate normal distribution with unknown mean vector and covariance matrix. Therefore, we can perform the E-M algorithm to estimate these parameters directly.

Here is the R code for implementing the E-M algorithm

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Based on the information, the side length of square 4 = a + b and the side length of square 5 = a + b

The 4 sides of a square are usually the same ;

Hence, each side is called the side length ; from the diagram attached :

Side length of square 4 = a + b

Side length of square 5 = a + b

If the side lengths are equal ; that is (a + b) ; the the area which is the square of the side length will also be the same.

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P(T < 50) = 0.3202 * 0.5 + 0.102 * 0.5 = 0.2111

Finally, substituting all these values into Bayes' theorem, we get:

P(T < 50 | T = 50 or 75) = 0

a) To solve this problem, we need to use the properties of the lognormal distribution. Specifically, we know that if T is a lognormal distribution with mean μ and coefficient of variation σ, then ln(T) has a normal distribution with mean ln(μ) and standard deviation σ.

Using this, we can standardize the distribution of ln(T) as follows:

z = (ln(50) - ln(75)) / (0.4 * ln(10))

where ln(10) is the natural logarithm of 10.

We can then use a standard normal distribution table (or a calculator) to find the probability that z is less than or equal to this value.

P(T < 50) = P(ln(T) < ln(50)) = P(z < -0.468) = 0.3202

Therefore, the probability of an earthquake occurring in the next 50 years is approximately 0.3202.

b) Similarly, to find the probability of an earthquake occurring in the next 50 years given that the last earthquake occurred 75 years ago, we standardize the distribution of ln(T) using:

z = (ln(50) - ln(75)) / (0.4 * ln(10))

But this time, we need to adjust the mean by subtracting ln(75) and adding ln(75+75) = ln(150) to account for the time since the last earthquake.

z = (ln(50) - ln(75+75)) / (0.4 * ln(10)) = -1.272

Again, using a standard normal distribution table (or calculator), we find that:

P(T < 50 | T = 75) = P(ln(T) < ln(50) | ln(T) = ln(75)) = P(z < -1.272) = 0.102

Therefore, the probability of an earthquake occurring in the next 50 years given that the last earthquake occurred 75 years ago is approximately 0.102.

c) To find the probability of an earthquake occurring in the next 50 years, given that the last earthquake occurred either 50 or 75 years ago with equal probability, we need to use Bayes' theorem:

P(T < 50 | T = 50 or 75) = P(T = 50 or 75 | T < 50) * P(T < 50) / P(T = 50 or 75)

where P(T = 50 or 75) = 0.5 (since the two cases are equally likely).

To find P(T = 50 or 75 | T < 50), we can use the law of total probability:

P(T < 50) = P(T < 50 | T = 50) * P(T = 50) + P(T < 50 | T = 75) * P(T = 75)

where P(T = 50) = P(T = 75) = 0.5 (since the two cases are equally likely).

From parts a) and b), we know that:

P(T < 50 | T = 50) = 0.3202

P(T < 50 | T = 75) = 0.102

Substituting these values, we get

P(T < 50) = 0.3202 * 0.5 + 0.102 * 0.5 = 0.2111

Finally, substituting all these values into Bayes' theorem, we get:

P(T < 50 | T = 50 or 75) = 0

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Answer: Another simple way to help get the tears flowing is by yawning. “Try yawning a few times in a row to wake up the tear ducts. This may be helpful ...

Step-by-step explanation:

Answer:

To create a matrix for this linear system, we can arrange the coefficients of the variables and the constants into a matrix as follows:

| 1 3 2 | | x | | 26 |

| 1 -3 4 | x | y | = | 2 |

| 2 1 1 | | z | | 8 |

To solve the system using row reduction, we can perform elementary row operations to transform the matrix into row echelon form or reduced row echelon form. I will use the latter approach for simplicity:

| 1 0 0 | | x | | 6 |

| 0 1 0 | x | y | = | 5 |

| 0 0 1 | | z | | -1 |

Therefore, the solution to the system is x = 6, y = 5, and z = -1.

The image of point A after it is dilated with a scale factor 3 is (6, 12)

Dilation is a transformation, which is used to resize the object.

A scale factor is when you enlarge a shape and each side is multiplied by the same number. This number is called the scale factor.

Let the coordinates of A are (2, 4)

We have to find the coordinates of point A after dilation with scale factor 3

A'=(3×2, 3×4)

=(6, 12)

Hence,  the image of point A after it is dilated with a scale factor 3 is (6, 12)

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Rounding to 4 decimal places, we expect 9.9600 of the 12 vehicles to use E-ZPass.

Rounding to 4 decimal places, the mode is 10 and the probability associated with the mode is 0.2822.

Rounding to 4 decimal places, the probability of eight or more of the sampled vehicles using E-ZPass is 0.9975.

a. We can use the binomial distribution to model the number of vehicles out of 12 that use E-ZPass. The probability of a vehicle using E-ZPass is 0.83, so the expected number of vehicles out of 12 that use E-ZPass is:

E(X) = np = 12 x 0.83 = 9.96

Rounding to 4 decimal places, we expect 9.9600 of the 12 vehicles to use E-ZPass.

b. The mode of the binomial distribution is the value of X that maximizes the probability mass function (PMF). In this case, the PMF is given by:

P(X = x) = (12 choose x) * 0.83^x * 0.17^(12-x)

We can find the mode by calculating the PMF for each possible value of X and identifying the value(s) with the highest probability. Alternatively, we can use the formula for the mode of the binomial distribution, which is:

mode = floor((n+1)p)

where n is the number of trials and p is the probability of success.

In this case, the mode is:

mode = floor((12+1) x 0.83) = floor(10.08) = 10

The probability associated with the mode is:

P(X = 10) = (12 choose 10) * 0.83^10 * 0.17^2 = 0.2822

Rounding to 4 decimal places, the mode is 10 and the probability associated with the mode is 0.2822.

c. The probability of eight or more of the sampled vehicles using E-ZPass can be found using the binomial distribution:

P(X >= 8) = 1 - P(X < 8) = 1 - P(X <= 7)

Using a binomial calculator or a cumulative binomial table, we can find:

P(X <= 7) = 0.0025

Therefore:

P(X >= 8) = 1 - 0.0025 = 0.9975

Rounding to 4 decimal places, the probability of eight or more of the sampled vehicles using E-ZPass is 0.9975.

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Answer: 82

Step-by-step explanation:

               82

            35   47

       15     20     27

   7      8        12    15

2     5      3        9        6

puzzle two numbers add up to one above

2 numbers under a number add up to make that number

2+5=7

5+3=8 etc

The equation that can be used to calculate Willy the whale's position relative to sea level.

Question Blank 1 of 4; -245, Question Blank 2 of 4; -83, Question Blank 3 of 4; +103, Question Blank 4 of 4; -225

The sea level is the level of the sea, which is taken as the zero mark on the number line.

The level of Willy the whale below sea level = 245 feet

The level Willy the whale descends = 83 feet

The level wheely the whale ascends = 103 feet

Therefore, the level to which Willy the whale starts = -245 feet

The level Willy the whale descends to = (-245 - 83) feet = -328 feet

The level to which Willy the whale then ascends to = -328 feet + 103 feet = -225 feet

The equation to calculate the position of Willy the whale is therefore;

-245 - 83 + 103 = -225

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If the function x(t) = cos(2π100t + π/3) is sampled at the minimum sampling rate to avoid aliasing for 10 seconds, 2000 points are generated.

The function x(t) = cos(2π100t + π/3) is sampled at the minimum sampling rate to avoid aliasing for 10 seconds.

To avoid aliasing, we need to use the Nyquist-Shannon Sampling Theorem, which states that the minimum sampling rate should be twice the highest frequency in the signal. In this case, the highest frequency is 100 Hz.

Step 1: Calculate the minimum sampling rate.
Minimum sampling rate = 2 * highest frequency = 2 * 100 Hz = 200 Hz.

Step 2: Calculate the total number of points generated in 10 seconds.
A number of points = sampling rate * time duration = 200 Hz * 10 s = 2000 points.

So, 2000 points are generated when the function x(t) = cos(2π100t + π/3) is sampled at the minimum sampling rate to avoid aliasing for 10 seconds.

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Yes it should be surface area

Both sets (a) and (b) are compact because they are closed and bounded.

To prove that each of the following sets is compact, we will show that they are both closed and bounded.

For set (a), which is a finite set {(a1, ..., an)} ⊂ R:

1. Closed: A finite set is closed because it contains all its limit points. In a finite set, every point is isolated, meaning that no point is a limit point. Therefore, the set is closed.
2. Bounded: Since the set is finite, we can find a minimum and a maximum value among its elements. By defining an interval [min, max], we can show that the set is bounded.

For set (b), which is the set {arctan(n): n ∈ N} ∪ {π/2}:

1. Closed: The set of arctan(n) has a limit point at π/2 as n approaches infinity. However, π/2 is included in the set, so it contains all its limit points and is closed.
2. Bounded: The arctan function has a horizontal asymptote at π/2 as n approaches infinity, and the minimum value of the set is arctan(1). Therefore, the set is bounded by the interval [arctan(1), π/2].

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