I have no clue how to answer this question Will give brainliest to the correct answer +30 points

By gathering 13 people, you ensure that two of them have birthdays in the same month using pigeonhole principle has correct reasoning.

In order to guarantee that at least two people have birthdays in the same month, we need to calculate the minimum number of people required for this to happen.

There are 12 months in a year, so the maximum number of unique birthdays possible is 12. Therefore, if we have 13 people gathered, there is a guarantee that at least two people have the same birthday month.

To see why, we can use the pigeonhole principle. There are 12 "pigeonholes" (one for each month) and 13 "pigeons" (the people). Since there are more pigeons than pigeonholes, there must be at least one pigeonhole with two or more pigeons (i.e., at least two people have the same birthday month).

Therefore, we need at least 13 people gathered to guarantee that at least two have birthdays in the same month.
To guarantee that at least two people have birthdays in the same month, you would need 13 people. Here's the reasoning behind this:

There are 12 months in a year. In the worst-case scenario, the first 12 people each have their birthdays in different months. When you add the 13th person, there are no remaining months for their birthday to be unique, so they must share the same month with at least one of the previous 12 people.

By gathering 13 people, you ensure that at least two of them have birthdays in the same month based on our reasoning.

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Yes, Fubini's theorem for proper regions can be applied to the function f since region D is a disk of radius 4 centered on the origin, which is a proper region.

It appears that the function f(x, y) is not provided in the question. In order to determine if Fubini's theorem can be applied to the function f over disk D with radius 4 centered at the origin, please provide the complete function f(x, y).

In mathematical analysis, Fubini's theorem is a result put forward by Guido Fubini in 1907, which gives the conditions under which the double integral can be calculated as an integral real value.

Fubini's theorem means that two compounds are equal to the sum of the two compounds in their reciprocal terms. Tonelli's theorem, proposed by Leonida Tonelli in 1909, is similar, but it applies to negative indices, not to the unity of the originals.

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The value of the logarithmic function log 2 log 2 log 2 16 is equal to 4. To see why, we can simplify the expression by evaluating each logarithm one at a time:

log 2 16 = 4, since 2 to the fourth power is 16. log 2 (log 2 16) = log 2 4 = 2, since 2 to the second power is 4.log 2 (log 2 (log 2 16)) = log 2 2 = 1, since 2 to the first power is 2.Therefore, the overall value of the expression is 1+2+1=4.
The value of the logarithmic function log₂(log₂(log₂(16))) can be found by evaluating each log step by step.

1. First, find the value of log₂(16): log₂(16) = 4 (since 2^4 = 16)
2. Next, find the value of log₂(log₂(16)) which is log₂(4): log₂(4) = 2 (since 2^2 = 4)
3. Finally, find the value of log₂(log₂(log₂(16))): log₂(2) = 1 (since 2^1 = 2)
So, the value of the given logarithmic function is 1 (option b).

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To find the parametric equations for the line segment joining the first point to the second point (0,0,0) and (10,8,4), we can use the formula:

x = x1 + t(x2 - x1)
y = y1 + t(y2 - y1)
z = z1 + t(z2 - z1)
where (x1,y1,z1) is the first point and (x2,y2,z2) is the second point, and t is a parameter that varies between 0 and 1.
Substituting the values, we get:
x = 0 + t(10 - 0)
y = 0 + t(8 - 0)
z = 0 + t(4 - 0)
Simplifying, we get:
x = 10t
y = 8t
z = 4t
Therefore, the parametric equations for the line segment joining the first point to the second point are x = 10t, y = 8t, and z = 4t.

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The series Diverges; the limit of the terms, an, is not 0 as n goes to infinity.(C)

The given series is not a geometric series, but let's first simplify it to better understand its behavior. The simplified series is: 2n + 14 = 1. This is an arithmetic series, not a geometric one. Therefore, the correct answer is:


To determine whether the series is convergent or divergent, we can try to find the limit of the terms as n goes to infinity.

In this case, the simplified series is 2n + 14 = 1, which can be rewritten as 2n = -13. As n goes to infinity, the term 2n will also go to infinity. Therefore, the limit of the terms, an, is not 0 as n goes to infinity, and the series diverges.(C)

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The volume of the composite figure is 129.85 cm³.

The volume of the composite figure is made up of volume of cylinder plus volume of cone.

height of the cylinder = 8 cm

height of the cone = 15 cm - 8 cm = 7 cm

Volume of the cylinder is calculated as follows;

V = πr²h

V = π (2 cm)² (8 cm )

V = 100.53 cm³

The volume of the cone is calculated as follows;

V = ¹/₃πr²h

V = ¹/₃π(2 cm)²(7 cm)

V = 29.32 cm³

Total volume = 100.53 cm³ + 29.32 cm³ = 129.85 cm³

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Both lines are not parallel and perpendicular.

In geometry, parallel lines are two or more lines that are always the same distance apart and never intersect. Parallel lines are always in the same plane and have the same slope. They can be in any orientation relative to each other, such as horizontal, vertical, or at any angle. Parallel lines are important in geometry and mathematics because they have many properties and relationships with other geometric figures, such as angles, triangles, and polygons.

Given lines;

First line: 2x-7y=-14

-7y=-14-2x

y=2+x/7

Slope of line =1/7

Second line: y=-2x/7-1

Slope of line =-2/7

Given lines are not parallel. ( slopes are different)

Given lines are not Perpendicular.( Multiplication of slopes is not equals -1)

Hence, Both lines are not parallel and perpendicular.

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The t-distribution with n-2 degrees of freedom to find the t-value for the 95% confidence level.

Let's denote the per capita income by X and dem ind by Y.

If we assume a linear relationship between X and Y, we can use simple linear regression to estimate the slope and intercept of the line that best fits the data.

The slope of the line represents the change in Y for a one-unit increase in X, and the intercept represents the value of Y when X is zero.

Once we have estimated the slope and intercept of the line, we can use them to predict the increase in dem ind for a 20% increase in per capita income.

If we denote the predicted increase in dem ind by ΔY, we can use the following formula:

ΔY = b * 0.2,

Where b is the slope of the regression line.

To calculate the 95% confidence interval for the prediction, we need to estimate the standard error of the estimate (SE) and the t-value for the 95% confidence level.

Assuming the errors are normally distributed, we can use the following formula to calculate SE:

The t-distribution with n-2 degrees of freedom to find the t-value for the 95% confidence level.

We can then calculate the margin of error as t-value * SE, and construct the confidence interval as:

[ΔY - ME, ΔY + ME]

Where ME is the margin of error.

The predicted increase in dem ind is considered large or small depending on the context of the problem and the magnitude of the increase relative to the scale of the dem ind.

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The directional derivative of f at the point (0,π/3) in the direction of v is (27√3 - 15)/26.

To find the directional derivative of the function f(x,y) = 3ex sin y at the point (0,π/3) in the direction of the vector v = (-5,12), we need to compute the gradient of f at the point (0,π/3) and then take the dot product of that with the unit vector in the direction of v.

First, we need to find the gradient of f:

∇f(x,y) = <3ex cos y, 3ex sin y>

At the point (0,π/3), this becomes:

∇f(0,π/3) = <3cos(π/3), 3sin(π/3)> = <3/2, 3√3/2>

To get the unit vector in the direction of v, we need to divide v by its magnitude:

|v| = √((-5)^2 + 12^2) = 13

So, the unit vector in the direction of v is:

u = v/|v| = (-5/13, 12/13)

Finally, we can compute the directional derivative:

Duf(0,π/3) = ∇f(0,π/3) · u = <3/2, 3√3/2> · (-5/13, 12/13)

= (-15/26)(3/2) + (36/26)(3√3/2)

= (27√3 - 15)/26

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The measure used by the charity is: The IQR of 13 is the most accurate to use, since the data is skewed.

In a graphic representation of data called a histogram, a set of continuous numerical data is distributed in a given way. Each rectangle's area is related to the frequency of data values occurring within a given interval or bin. It consists of a sequence of rectangles or bars. The y-axis displays the frequency or count of values that fall inside each interval, while the x-axis displays the range of values that are divided up into intervals or bins. Large data sets can be visually summarised using histograms, which can also be used to spot patterns and trends as well as outliers or unexpected numbers.

A measure of variability that is less susceptible to outliers than the range is the IQR (interquartile range). The data in this instance is skewed to the right, which means that a few large donations are pushing the range upward.

From the given data we see that the values are skewed. Thus, for the values IQR will be an appropriate way to represent the data and understand about the range in the upper and the lower bound.

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The equations that have no solution are the third and fourth equations.

The equations that have one solution are the first, second and fifth equations.

There are three main methods of solving simultaneous equations as:

Elimination method

Graphical Method

Substitution method

The first two simultaneous equations clearly have one solution each because it is clear that when we subtract both, we can eliminate y and solve for x.

However, the third and fourth equations have no solution as the variables attached to both x and y in both cases are the same.

The fifth simultaneous equation has one solution because at least one of them with variable is different.

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Step-by-step explanation:

x = cost of 1 kg mushrooms

y = cost of 1 kg turnips

2x + 2.5y = 8.55

3x + 4y = 13.10

so, we have a system of 2 equations with 2 variables.

this can be solved either by

or by

this here looks (for me) better for elimination.

we bring the first equation to something with 6x, and the second one to something with -6x, abd then we add them.

so, we multiply the first equation by 3, and the second equation by -2 :

6x + 7.5y = 25.65

-6x - 8y = -26.20

-------------------------------

0 -0.5y = -0.55

y = -0.55/-0.5 = £1.10

for x I suggest now to use the second original equation :

3x + 4y = 13.10

3x + 4×1.10 = 13.10

3x + 4.40 = 13.10

3x = 8.70

x = 8.70/3 = £2.90

a) 1 kg of turnips cost £2.90

b) 1 kg if mushrooms cost £1.10

A. The initial concentration of the drug in the organ is 0.06 mg/cm³.
B. the concentration of the drug in the organ after 19 seconds is approximately 0.1043 mg/cm³.

(a) The initial concentration of the drug in the organ can be found by evaluating x(t) at time t=0.

x(0) = 0.06 + 0.14(1 − e^(-0.02*0))
x(0) = 0.06 + 0.14(1 − 1)
x(0) = 0.06 + 0.14(0)
x(0) = 0.06

The initial concentration of the drug in the organ is 0.06 mg/cm³.

(b) To find the concentration of the drug in the organ after 19 seconds, plug t=19 into the given equation:

x(19) = 0.06 + 0.14(1 − e^(-0.02*19))
x(19) = 0.06 + 0.14(1 − e^(-0.38))
x(19) ≈ 0.06 + 0.14(1 − 0.6835)
x(19) ≈ 0.06 + 0.14(0.3165)
x(19) ≈ 0.10431

After rounding to four decimal places, the concentration of the drug in the organ after 19 seconds is approximately 0.1043 mg/cm³.

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(a) The 90% confidence interval for p. ≤ p ≤ is 0.6256 ≤ p ≤ 0.7230. (b) The margin of error for this 90% confidence interval for p is 0.0487. (c) The margin of error is smaller for an 80% confidence interval. So, the correct option is option   B. smaller.

(a) Calculate the sample proportion (p-hat) and the standard error (SE).

p-hat = 354 / 525 ≈ 0.6743 (rounded to four decimal places)
SE = √(p-hat * (1 - p-hat) / n) ≈ √(0.6743 * (1 - 0.6743) / 525) ≈ 0.0296 (rounded to four decimal places)

The z-score for a 90% confidence interval is 1.645.

Now, we can calculate the confidence interval using the formula:
CI = p-hat ± (z-score * SE)

CI = 0.6743 ± (1.645 * 0.0296)
CI = 0.6743 ± 0.0487

Thus, the 90% confidence interval for p is: 0.6256 ≤ p ≤ 0.7230

(b) To find the margin of error for this 90% confidence interval for p, we simply take the difference between the upper limit and the sample proportion:

Margin of error = 0.7230 - 0.6743 = 0.0487

(c) Without doing any calculations, the margin of error for an 80% confidence interval would be smaller because the level of confidence is lower, which means that we are willing to accept a wider range of possible values for the population proportion. As a result, the margin of error will be smaller for an 80% confidence interval compared to a 90% confidence interval.

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(a) The 90% confidence interval for p. ≤ p ≤ is 0.6256 ≤ p ≤ 0.7230. (b) The margin of error for this 90% confidence interval for p is 0.0487. (c) The margin of error is smaller for an 80% confidence interval. So, the correct option is option   B. smaller.

(a) Calculate the sample proportion (p-hat) and the standard error (SE).

p-hat = 354 / 525 ≈ 0.6743 (rounded to four decimal places)
SE = √(p-hat * (1 - p-hat) / n) ≈ √(0.6743 * (1 - 0.6743) / 525) ≈ 0.0296 (rounded to four decimal places)

The z-score for a 90% confidence interval is 1.645.

Now, we can calculate the confidence interval using the formula:
CI = p-hat ± (z-score * SE)

CI = 0.6743 ± (1.645 * 0.0296)
CI = 0.6743 ± 0.0487

Thus, the 90% confidence interval for p is: 0.6256 ≤ p ≤ 0.7230

(b) To find the margin of error for this 90% confidence interval for p, we simply take the difference between the upper limit and the sample proportion:

Margin of error = 0.7230 - 0.6743 = 0.0487

(c) Without doing any calculations, the margin of error for an 80% confidence interval would be smaller because the level of confidence is lower, which means that we are willing to accept a wider range of possible values for the population proportion. As a result, the margin of error will be smaller for an 80% confidence interval compared to a 90% confidence interval.

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The value of the sum n∑ i=1 6(1 −2i)² is -24n.

To find this value, first simplify the expression inside the parentheses to get (1-2i)² = 1 - 4i + 4i². Then plug this into the original sum to get n∑ i=1 6(1 −2i)² = n∑ i=1 6(1 - 4i + 4i²) = n∑ i=1 6 - 24i + 24i².

This simplifies further to 6n∑ i=1 1 - 4i + 4i². The sum of 1 from i=1 to n is just n, the sum of -4i from i=1 to n is -2n(n+1), and the sum of 4i² from i=1 to n is 4n(n+1)(2n+1)/3. Plugging these values back in gives us the final result of -24n.

The given sum involves finding the sum of the expression 6(1-2i)² for i=1 to n. To simplify this expression, we expand (1-2i)² to get 1 - 4i + 4i². Plugging this back into the original sum gives us the expression 6(1 - 4i + 4i²).

From there, we can simplify further by factoring out 6 and expanding the summation. We then use summation formulas to evaluate the sum of 1, -4i, and 4i² from i=1 to n. After plugging these values back in, we arrive at the final answer of -24n.

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The smallest natural number that satisfies the inequality is n = 2.

We want to find the smallest natural number n such that [tex]2n > n^2[/tex] for all n greater than n.

We can start by simplifying the inequality [tex]2n > n^2[/tex] to n(2 - n) > 0.

Notice that when n = 1, the inequality is false, since [tex]2(1) \leq (1)^2[/tex]. So we can assume that n ≥ 2.

If n > 2, then both n and 2 - n are positive, so the inequality n(2 - n) > 0 holds.

If n = 2, then the inequality becomes 2(2) > [tex]2^2[/tex], which is true.

Therefore, the smallest natural number that satisfies the inequality is n = 2.

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Answer:

Step-by-step explanation:

5x +2.57=25.92

5x=23.35

23.35/5

x=4.67

The matrix A = [9 -6] satisfies the conditions given in the problem.

The size of the matrix A,  T([(2),(4)]) = [(−3),(−15)] ′ and T([(−1),(−1)]) = [(−5),(−24)] ′.

Since T is a transformation from [tex]R^2[/tex] to [tex]R^1[/tex], A must have dimensions 1x2.

Let A = [a b] be the matrix of the transformation T. Then, we have the following system of equations:

2a + 4b = -3

(-1)a + (-1)b = -24

Solving this system, we get:

a = 9

b = -6

Solving these two equations simultaneously, we obtain:

2a + 4b = -3 (equation 1)

-a - b = -24 (equation 2)

We can solve for one variable in terms of the other using either equation.

For example, solving for a in terms of b from equation 2, we get:

a = -24 + b

Substituting this into equation 1, we get:

2(-24 + b) + 4b = -3

Simplifying, we obtain:

b = -6

Substituting b = -6 back into equation 2, we get:

a = 9

Therefore, the matrix A is:

[9 -6]

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The Least Squares Regression Line (LSRL) for predicting temperature (response variable) based on wind speed is B. y = 1.23x - 90.13.

To determine the Least Squares Regression Line (LSRL) for predicting temperature (response variable) based on wind speed (explanatory variable), we need to identify the equation with the correct format and values. The general format for an LSRL is:
ŷ = a + bx
where ŷ is the predicted temperature, a is the y-intercept, b is the slope, and x is the wind speed.
Comparing the given options, we can see that option B is in the correct format and has the right values:
B. y = 1.23x - 90.13
So, the LSRL for determining temperature based on wind speed is B. y = 1.23x - 90.13.

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(b) The signal [tex]x_2(t)[/tex]  is not periodic because its exponential term does not repeat after a certain interval.  (c) The signal [tex]x_3[n][/tex] is periodic because it is a discrete-time complex exponential signal with frequency 7π.

What is periodic ?

In signal processing, a periodic signal is a signal that repeats itself after a specific interval of time known as the period.

The signal [tex]x_2(t)[/tex] is not periodic because its exponential term does not repeat after a certain interval. Therefore, it does not have a fundamental period. On the other hand, [tex]x_3[n][/tex] is a discrete-time complex exponential signal with frequency 7π. A signal is periodic if and only if it satisfies the condition x[n] = x[n+N] for all n, where N is the fundamental period. Using the definition of [tex]x_3[n][/tex] , we can write:

[tex]x_3[n] = e^{j7\pi n} = e^{j7\pi (n+N)}[/tex]

If we equate the two sides of the equation, we get:

[tex]e^{j7\pi n} = e^{j7\pi n} * e^{j7\pi N}[/tex]

Simplifying the above expression, we get:

[tex]e^{j7\pi N} = 1[/tex]

The solution of this equation is N = 2/7 because

[tex]e^{j7\pi N} = cos(2\pi N) + j sin(2\pi N) = 1[/tex]                      

Therefore, the fundamental period of [tex]x_3[n][/tex] is N = 2/7. In summary, [tex]x_2(t)[/tex] is not periodic and [tex]x_3[n][/tex] is periodic with a fundamental period of 2/7.

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The complete question is :

Determine whether or not each of the following signals is periodic. If a signal is periodic, specify its fundamental period.

(b) [tex]x_2(t)=e^{(-1+j)t[/tex]

(c) [tex]x_3[n]=e^{j7\pi n[/tex]

Lambda cannot be equal to 1 or -1. In general, we can conclude that if a is invertible, then its eigenvalues cannot be equal to 1 or -1.

Suppose that a is an invertible nxn matrix and lambda is an eigenvalue of a. By definition, there exists a non-zero vector v such that av = lambda v.

Multiplying both sides by a^-1, we get: a^-1(av) = a^-1(lambda v) (a^-1a)v = lambda(a^-1v) v = lambda(a^-1v) .

Since a is invertible, a^-1 exists, so we can rewrite the equation as: av = lambda v a(av) = a(lambda v) (aa^-1)av = lambda(av) v = lambda(av) Substituting the first equation into the last equation, we get: v = lambda^2 v

Since v is non-zero, lambda^2 cannot be equal to 1, or else we would have v = 1v = -1v = 0, which is a contradiction.

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Since the limit is less than 1, the series converges absolutely for all x. Thus, the given series converges for all x in the interval (3, 5).

To find all the values of x such that the given series converges, we can apply the Ratio Test for convergence. The series is given by:
∑(n=1 to ∞) (x-4)^n / n^n
For the Ratio Test, we consider the limit as n approaches infinity of the ratio of consecutive terms:
lim (n→∞) |[(x-4)^(n+1) / (n+1)^(n+1)] / [(x-4)^n / n^n]|Simplifying the expression, we get:
lim (n→∞) |(x-4) * n^n / (n+1)^(n+1)|
For the series to converge, the limit must be less than 1:
|(x-4) * n^n / (n+1)^(n+1)| < 1
Now, we apply the limit:
lim (n→∞) |(x-4) * n^n / (n+1)^(n+1)| = |x-4| * lim (n→∞) |n^n / (n+1)^(n+1)|
The limit can be solved using L'Hôpital's Rule or by recognizing that it converges to 1/e. So we get:
|x-4| * (1/e) < 1
Solving for x:
-1 < x-4 < 1
3 < x < 5

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Answer:

Step-by-step explanation:

The derivative of y with respect to x, or dy/dx, is [tex]-2xy - 7/2 y^2.[/tex]

To use implicit differentiation to find dy/dx, we'll take the derivative of both sides of the equation with respect to x, using the chain rule for the left-hand side:

[tex](7xy+4)^2 = 28y[/tex]

2(7xy+4)(7y dx/dx + 7x dy/dx) = 28 dy/dx

Simplifying and solving for dy/dx, we get:

(7xy+4)(14y + 14x dy/dx) = 28 dy/dx

[tex]98xy^2 + 56xy + 56x dy/dx = 28 dy/dx[/tex]

[tex]98xy^2 + 28 dy/dx = -56xy[/tex]

[tex]dy/dx = (-56xy - 98xy^2) / 28[/tex]

Simplifying further, we get:

[tex]dy/dx = -2xy - 7/2 y^2[/tex]

Therefore, the derivative of y with respect to x, or dy/dx, is [tex]-2xy - 7/2 y^2.[/tex]

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The derivative of y with respect to x, or dy/dx, is [tex]-2xy - 7/2 y^2.[/tex]

To use implicit differentiation to find dy/dx, we'll take the derivative of both sides of the equation with respect to x, using the chain rule for the left-hand side:

[tex](7xy+4)^2 = 28y[/tex]

2(7xy+4)(7y dx/dx + 7x dy/dx) = 28 dy/dx

Simplifying and solving for dy/dx, we get:

(7xy+4)(14y + 14x dy/dx) = 28 dy/dx

[tex]98xy^2 + 56xy + 56x dy/dx = 28 dy/dx[/tex]

[tex]98xy^2 + 28 dy/dx = -56xy[/tex]

[tex]dy/dx = (-56xy - 98xy^2) / 28[/tex]

Simplifying further, we get:

[tex]dy/dx = -2xy - 7/2 y^2[/tex]

Therefore, the derivative of y with respect to x, or dy/dx, is [tex]-2xy - 7/2 y^2.[/tex]

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Answer: 12x^3+21x^

Step-by-step explanation:

you need to multiply the expression outside to every term inside the parentheses . Multiply the numbers and add the powers. Good luck with algebra

The measure of angle ABD is given as follows:

m < ABD = 172º.

The angle addition postulate states that if two angles share a common vertex and a common angle, forming a combination, the measure of the larger angle will be given by the sum of the smaller angles.

In the context of this problem, we have that angle ABD is formed as a combination of angles ABC and CBD, hence:

m < ABD = m < ABC + m < DBC

m < ABD = 147 + 25

m < ABD = 172º.

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The scalar triple product is not zero, the three vectors (a → b), (a → c), and (a → d) are not coplanar, and hence, the four points a, b, c, and d do not lie on the same plane.

If the four points lie in the same plane, then the vector from a to b, the vector from a to c, and the vector from a to d will lie in the same plane. We can use the scalar triple product to determine if this is true.

The scalar triple product of three vectors a, b, and c is defined as:

a ⋅ (b × c)

where × represents the cross product.

So, let's compute the scalar triple product of the vectors from a to b, a to c, and a to d:

(a → b) = (5 - 2, -3 - 1, 5 - 1) = (3, -4, 4)

(a → c) = (8 - 2, -1 - 1, 0 - 1) = (6, -2, -1)

(a → d) = (5 - 2, 3 - 1, -4 - 1) = (3, 2, -5)

Now, we take the cross product of the vectors (a → b) and (a → c):

(a → b) × (a → c) =

|  i    j  k |

| 3 -4  4 |

| 6 -2 -1 |

= i (4(-2) - (-4)(-1)) - j (3(-2) - 4(-1)) + k (3(-2) - (-4)(6))

= i (-4) - j (-5) + k (-27)

= (-4, 5, -27)

Finally, we take the dot product of the resulting vector with the vector (a → d):

(-4, 5, -27) ⋅ (3, 2, -5) = -12 + 10 + 135 = 133

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The correct answer is Part A: The dimensions of the new deck are 9 feet for the base and 5.4 feet for the height.Part B: The area of the original deck is 67.5 square feet, and the area of the new deck is 24.3 square feet.Part C: The ratio of the areas (new deck to original deck) is 0.36, which is different from the scale factor of 3:5.

Part A: To find the dimensions of the new deck, we need to scale the base and height of the original deck by a factor of 3:5.

The scale factor from the original deck to the new deck is 3:5.

The scaled base of the new deck can be found by multiplying the original base by the scale factor:

Scaled base = Original base * Scale factor = 15 feet * (3/5) = 9 feet

The scaled height of the new deck can be found by multiplying the original height by the scale factor:

Scaled height = Original height * Scale factor = 9 feet * (3/5) = 5.4 feet

Therefore, the dimensions of the new deck are 9 feet for the base and 5.4 feet for the height.

Part B: To find the area of the original deck and the new deck, we'll use the formula for the area of a triangle:

Area = (base * height) / 2

For the original deck:

Area of original deck = (15 feet * 9 feet) / 2 = 67.5 square feet

For the new deck:

Area of new deck = (9 feet * 5.4 feet) / 2 = 24.3 square feet

Part C: To compare the ratio of the areas to the scale factor, we'll divide the area of the new deck by the area of the original deck:

Ratio of areas = Area of new deck / Area of original deckRatio of areas = 24.3 square feet / 67.5 square feet = 0.36

The ratio of the areas is 0.36.

Comparing this ratio to the scale factor (3:5), we can see that they are not equal. The scale factor represents the ratio of the corresponding sides, not the ratio of the areas.

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Answer:

To graph a cube root function, you can follow these steps:

Determine the domain and range of the function. The domain of the cube root function is all real numbers, and the range is also all real numbers.

Find the intercepts of the function. To find the x-intercept, set the function equal to zero and solve for x. To find the y-intercept, plug in x = 0 and solve for y.

Find the points where the function is undefined, which are the values that make the radicand (the expression under the cube root symbol) negative.

Plot several additional points on the graph by choosing values for x and finding the corresponding values of y by evaluating the function.

Draw the graph by connecting the points with a smooth curve that approaches the x-axis but never touches or crosses it.

Note that the cube root function has a vertical asymptote at x = 0, meaning that the graph approaches the x-axis but never touches or crosses it as x approaches zero from the left or right.