Use the Chain Rule to find dw/dt. w = xey/z, x = t9, y = 8 − t, z = 9 + 4t

If one or both samples have a sample size less than 30, you can still conduct a two sample test if the population standard deviation is known. In such cases, you can use a Z-test to compare the means of two samples.

If the population standard deviation is unknown, you would need to use a T-test instead. The T-test is preferred over the Z-test when the sample size is small because it is more appropriate for small sample sizes and it accounts for the uncertainty of the sample standard deviation. When conducting a two sample test, it is important to ensure that the samples are independent and representative of the population. The sample size should also be large enough to ensure that the results are statistically significant and accurate. If the sample size is too small, the results may not be reliable or representative of the population. In summary, if one or both samples have a sample size less than 30, you can still conduct a two sample test if the population standard deviation is known. However, it is important to ensure that the samples are independent, representative of the population, and large enough to yield accurate results. Additionally, the appropriate statistical test should be used based on whether the population standard deviation is known or unknown.

Learn more about population here

https://brainly.com/question/29885712

#SPJ11

Since f'(0)=0 and f''(0)=0, neither the first nor second derivative tests are conclusive. Therefore, we cannot determine whether f has a local maximum, local minimum, or neither at x=0.

The function f(x) is defined by the power series f(x) = Σ((-1)ⁿx²ⁿ)/(2n+1)!, from n=0 to infinity. To find f'(0) and f''(0), determine whether f has a local maximum, a local minimum, or neither at x=0.

Step 1: Find the first derivative, f'(x).
f'(x) = d/dx [Σ((-1)ⁿx²ⁿ)/(2n+1)!]
      = Σ((-1)ⁿ(2nx²^(n-1))/(2n+1)!) (using the power rule)

Step 2: Evaluate f'(0).
f'(0) = Σ((-1)ⁿ(2n(0)²⁽ⁿ⁻¹⁾)/(2n+1)!)
      = 0 (since x=0)

Step 3: Find the second derivative, f''(x).
f''(x) = d/dx [Σ((-1)ⁿ(2nx²⁽ⁿ⁻¹⁾)/(2n+1)!)]
       = Σ((-1)ⁿ(2n(2n-1)x²⁽ⁿ⁻²⁾)/(2n+1)!) (using the power rule again)

Step 4: Evaluate f''(0).
f''(0) = Σ((-1)ⁿ(2n(2n-1)(0)²⁽ⁿ⁻²⁾/(2n+1)!)
       = 0 (since x=0)

To know more about second derivative tests click on below link:

https://brainly.com/question/30404403#

#SPJ11

Answer:

The function y=-(x+5)^2+4 is a transformation of the parent function y=x^2. There are three transformations that have been applied to the parent function to obtain the new function:

1. Reflection about the x-axis: The negative sign in front of the function means that the graph of the function has been reflected about the x-axis. This means that every point on the original graph has been reflected across the x-axis to create a new point on the transformed graph.

2. Horizontal shift: The function has been shifted left by 5 units. This means that every point on the original graph has been moved 5 units to the left to create a new point on the transformed graph.

3. Vertical shift: The function has been shifted up by 4 units. This means that every point on the original graph has been moved 4 units up to create a new point on the transformed graph.

Together, these transformations result in a new graph that is a reflection of the parent function about the x-axis, shifted 5 units to the left, and shifted 4 units up. The vertex of the parabola has moved from the origin (0,0) to the point (-5,4). The shape of the parabola remains the same, but its position and orientation have been altered by the transformations.

The value of the phone can be modeled with the exponential decay:

y = 850*(0.825)^x

We know that the new phone costs $850 and its value decays at a rate of 37.5% per year

Then the value can be modeled by an exponential decay of the form:

y = A*(1 - r)^x

Where x is the number of years, A is the initial value, and r is the percentage in decimal form, then we will get:

A = 850

r = 0.375

Replacing that we will get the exponential decay:

y = 850*(1 - 0.375)^x

y = 850*(0.825)^x

That equation gives the value after x years.

Learn more about exponential decays at:

https://brainly.com/question/27822382

#SPJ1

The null hypothesis (H0) is that the proportion of taxpayers who do not pay income taxes in the region is equal to 47%. The alternative hypothesis (Ha) is that the proportion of taxpayers who do not pay income taxes in the region is not equal to 47%.

In other words, the null hypothesis assumes that the politician's claim is true, while the alternative hypothesis assumes that the claim is not true. To test these hypotheses, Makayla can use a one-sample proportion test to determine whether the proportion of taxpayers who do not pay income taxes in her sample is significantly different from 47%.
It's important to note that the results of the test will not definitively prove or disprove the politician's claim, but rather provide evidence for or against it. Additionally, the test may have limitations and assumptions that need to be taken into account when interpreting the results.

Learn more about null hypothesis here

https://brainly.com/question/4436370

#SPJ11

Answer:

34%

Step-by-step explanation:

34 percent change from 58 to 76

The results can be organized in a two-way table as follows: (image attached).

The rows represent whether the students like or dislike hot dogs, and the columns represent whether they like or dislike hamburgers. The cell in the intersection of each row and column represents the number of students who fall into that category.

The marginal frequencies represent the total number of students who fall into each category. The marginal frequency for the row is the total number of students who either like or dislike hot dogs, and the marginal frequency for the column is the total number of students who either like or dislike hamburgers. These values are included in the table.

In this case, there are more students who dislike hamburgers than like them, and there are more students who like hot dogs than dislike them. The two-way table provides a clear and organized way to summarize and analyze the results of the survey.

To learn more about marginal frequencies, here

https://brainly.com/question/31189964

#SPJ1

The function f(theta) is:

f(theta) = sin(theta) + cos(theta) + 3

To find the function f, we will integrate the given second derivative with respect to theta twice, and use the initial conditions to determine the constants of integration.

First, integrating f ''(theta) = sin(theta) + cos(theta) with respect to theta gives:

f '(theta) = -cos(theta) + sin(theta) + C1

where C1 is a constant of integration.

Next, integrating f '(theta) = -cos(theta) + sin(theta) + C1 with respect to theta gives:

f(theta) = sin(theta) + cos(theta) + C1*theta + C2

where C2 is another constant of integration.

To determine the values of C1 and C2, we use the initial conditions:

f(0) = 4 gives us:

4 = sin(0) + cos(0) + C1*0 + C2

4 = 1 + C2

so C2 = 3.

f '(0) = 1 gives us:

1 = -cos(0) + sin(0) + C1

1 = 1 + C1

so C1 = 0.

Therefore, the function f(theta) is:

f(theta) = sin(theta) + cos(theta) + 3

Note that there are other ways to express this function, such as using trigonometric identities to simplify the expression, but this is the most general form.

To learn more about integration, refer below:

https://brainly.com/question/30900582

#SPJ11

The sequence is of the form a_n / b_n, where b_n goes to negative infinity and a_n is bounded. By the ratio test, we can conclude that the sequence converges to 0. Hence, the limit of the sequence is 0.


However, I can still explain the terms "sequence", "limit", and "converges" for you:

1. Sequence: A sequence is an ordered list of elements, usually numbers, which are connected by a specific rule or pattern. For example, an arithmetic sequence is defined by the common difference between consecutive terms.

2. Limit: The limit of a sequence is a value that the terms of the sequence get arbitrarily close to as the sequence progresses. If a sequence has a limit, it means that as the number of terms (n) increases, the value of the sequence approaches a specific value.

3. Converges: A sequence is said to converge if it has a limit. In other words, as the number of terms (n) goes to infinity, the terms of the sequence approach a specific value. If a sequence does not have a limit or does not approach a specific value, it is said to diverge.
Let's first look at the denominator, (n - 2n^2). As n approaches infinity, the second term dominates and the denominator goes to negative infinity.

Now let's look at the numerator, cos((n+1)/n). As n approaches infinity, the argument of cos approaches 1, and cos(1) is a fixed value.

Therefore, the sequence is of the form a_n / b_n, where b_n goes to negative infinity and a_n is bounded. By the ratio test, we can conclude that the sequence converges to 0

Learn more about the sequence:

brainly.com/question/30262438

#SPJ11

Answer:

We first multiply 19 and 5, which equals 95. Then we multiply the result by 27, giving us 2565. Finally, we subtract 27, giving us a final answer of 2538.

Answer:

Step-by-step explanation: use your calculator its 499.5

An interval within which we expect 95% of all x 's to fall can be defined for any population by applying the Central Limit Theorem.

The Central Limit Theorem states that for a large sample size, the sample mean will be approximately normally distributed, regardless of the underlying distribution of the population.

This means that we can use the properties of the normal distribution to make probabilistic statements about the sample mean.

Specifically, we can construct a confidence interval for the population mean by calculating the sample mean and the standard error of the mean.

If we assume that the population mean is normally distributed, we can use the properties of the normal distribution to calculate the probability that the population mean falls within a certain interval.

For example, a 95% confidence interval for the population mean represents the range of values that we are 95% confident contains the true population mean.

To learn more about central limit theorem, click here:

https://brainly.com/question/23563427

#SPJ11

Based on this sample of 17 adults, it appears that the mean annual salary in the town is significantly lower than the claimed value of $30,000. However, we should keep in mind that our conclusion is only based on a sample and may not necessarily hold true for the entire population.

We will test the claim that the mean annual salary for the adult population of a town is µ=$30,000 using the sample data provided.

Given:

- Population mean (µ) = $30,000

- Sample size (n) = 17

- Sample mean (X) = $22,298

- Sample standard deviation (s) = $14,200

- Significance level (α) = 0.05

Since we have a simple random sample from a normally distributed population, we can use a t-test to test the claim. Here are the steps:

1. State the null hypothesis (H₀) and alternative hypothesis (H₁):

  H₀: µ = $30,000 (claim)

  H₁: µ ≠ $30,000 (to test the claim)

2. Calculate the t-score using the sample data:

  t = (X - µ) / (s / √n)

  t = ($22,298 - $30,000) / ($14,200 / √17)

  t ≈ -2.056

Given that n=17, x(bar)=$22,298 and s=$14,200, we can calculate the t-statistic as follows:

t = (x(bar) - µ) / (s / sqrt(n))

t = ($22,298 - $30,000) / ($14,200 / sqrt(17))

t = -2.31

3. Determine the critical t-value (t_ critical) using the degrees of freedom (n - 1) and α:

  Degrees of freedom = 17 - 1 = 16

  Using a t-distribution table, with α/2 (0.025) and 16 degrees of freedom, we find that the t_ critical values are approximately ±2.12.

4. Compare the calculated t-score with the critical t-values:

  -2.056 lies within the range of -2.12 and 2.12.

5. Make a decision based on the comparison:

Since the calculated t-score is within the critical t-value range, we fail to reject the null hypothesis (H₀).

In conclusion, based on the sample data, we do not have sufficient evidence to reject the claim that the mean annual salary for the adult population of the town is $30,000 at the 0.05 significance level.

Learn more Sample:

brainly.com/question/27860316

#SPJ11

Answer:

45.5

Step-by-step explanation:

i passed

A circle is the locus of points in a plane that are equidistant from one point, known as the center.

In geometry, a circle is a two-dimensional figure that consists of all points in a plane that are at an equal distance, called the radius, from a fixed point called the center. The distance from the center to any point on the circumference of the circle is always the same.

This property makes circles useful in various fields, such as mathematics, physics, and engineering. Circles have several important characteristics, including a diameter (the longest chord that passes through the center), a circumference (the boundary of the circle), and an area (the measure of the space enclosed by the circle).

The equation of a circle in the Cartesian coordinate system is (x - a)^2 + (y - b)^2 = r^2, where (a, b) represents the center coordinates and r represents the radius of the circle.

Learn more about Circle:

brainly.com/question/22874193

#SPJ11

According to the attached graph

The roots of the parabola (-3, 0)and (7, 0)

the vertex is at (2, 25)

two other points are (0, 21) and (-2.5, 5)

The vertex of a parabola signifies the highest or lowest point depending on the direction it opens.

To find the vertex, we use the formula with regards to a parabola in the format of y = ax^2 + bx + c:

Vertex x-coordinate = -b / (2a)

Vertex y-coordinate is equal to f(x) = ax²+bx+c, keeping x as the found vertex x-coordinate

Vertex x-coordinate = -b / (2a) for y = -x^2 + 4x + 21

b = 4

a = -1

Vertex x-coordinate = -4 / (2 * -1) = 2

substituting x = 2 into  y = -x^2 + 4x + 21  gives y as 25

hence the vertex is (2, 25

)

Learn more about parabola at

https://brainly.com/question/29635857

#SPJ1

Terry should take the shortest path across the river and then travel downstream to Sophie's house. To find the optimal path, we can use the Pythagorean theorem and the speed of Terry's travel on land and water.

Let x be the distance Terry travels downstream along the riverbank before crossing the river. Then, the remaining distance to travel downstream on the water is (10-x) km. The distance across the river (the hypotenuse) is 2 km.

By the Pythagorean theorem, the distance Terry travels on land is sqrt(x^2 + 4), and the distance on water is sqrt((10-x)^2 + 4). Now, we can find the time Terry spends traveling on land and water:

Time on land = (sqrt(x^2 + 4))/4 km/h
Time on water = (sqrt((10-x)^2 + 4))/2 km/h

Terry's goal is to minimize the total time spent, so we need to find the value of x that minimizes the sum of these times:

Total time = (sqrt(x^2 + 4))/4 + (sqrt((10-x)^2 + 4))/2

By applying calculus and finding the derivative of this function with respect to x, we can determine the optimal value for x. In this case, the optimal path would be to travel approximately 2.07 km downstream along the riverbank and then cross the river, taking approximately 1.35 hours in total. This way, Terry can reach Sophie's house in the shortest possible time.

Learn more about shortest time: https://brainly.com/question/4931057

#SPJ11

The 95%-confidence interval (45.76%, 50.23%) is a confidence interval for the percentage of listeners in the sample who would accept the invitation to enter the competition.

This means that if we were to repeat the same process of randomly selecting 500 listeners and offering them the chance to enter the competition, we would expect the true percentage of listeners who would accept the offer to fall within this interval 95% of the time. It is important to note that this interval only applies to the sample of 500 listeners who were selected for the promotion, and we cannot generalize these results to all listeners of the radio station. However, this information can still be useful for the radio station in terms of understanding the response rate to promotions among a specific group of its listeners.

Learn more about competition here

https://brainly.com/question/29610001

#SPJ11

The derivative of f(x) is f'(x) = 3x^2 + 6x - 4. To find the inflection points, we need to find where the concavity changes.

To find the inflection points, we need to find where the concavity changes. This occurs where the second derivative, f''(x), equals zero or is undefined. Taking the derivative of f'(x), we get f''(x) = 6x + 6.
Setting f''(x) = 0, we get 6x + 6 = 0, which gives x = -1. This is the only inflection point since f''(x) is defined for all values of x.

To check whether this point is a point of inflection, we need to examine the concavity of the function around x = -1. Plugging in x = -2, we get f''(-2) = -6, which is negative, indicating that the function is concave down. Plugging in x = 0, we get f''(0) = 6, which is positive, indicating that the function is concave up. Therefore, the point x = -1 is a point of inflection.

Thus, the location of the inflection point is x = -1.

To find the location of all points of inflection of the function f(x)=(x^2-4)(x+3), we first need to find its second derivative.

1. Find the first derivative, f'(x):
f'(x) = (2x)(x+3) + (x^2-4)(1) = 2x^2 + 6x + x^2 - 4 = 3x^2 + 6x - 4

2. Find the second derivative, f''(x):
f''(x) = 6x + 6

Now, to find the points of inflection, we need to determine where f''(x) changes its sign. This occurs when f''(x) = 0.

3. Solve f''(x) = 0 for x:
6x + 6 = 0
6x = -6
x = -1

The location of the point of inflection is x = -1.

Learn more about derivative at: brainly.com/question/30365299

#SPJ11

To solve the differential equation using the exact method, we need to verify that it is exact. A first-order differential equation of the form M(x,y)dx + N(x,y)dy = 0 is exact if and only if ∂M/∂y = ∂N/∂x.

In this case, we have:

M(x,y) = e^{y+x} + ye^y

N(x,y) = xe^y - 1

∂M/∂y = e^{y+x} + e^y + ye^y

∂N/∂x = e^y

Since ∂M/∂y is not equal to ∂N/∂x, the equation is not exact. However, we can make it exact by multiplying both sides of the equation by a suitable integrating factor. An integrating factor is a function that when multiplied by both sides of a differential equation, makes it exact.

To find the integrating factor, we need to find a function μ(x,y) such that:

μ(x,y)∂M/∂y - ∂μ/∂y M(x,y) = μ(x,y)∂N/∂x - ∂μ/∂x N(x,y)

By comparing the coefficients of dx and dy, we get:

∂μ/∂y = xe^y - 1

∂μ/∂x = e^{y+x} + ye^y

Integrating the first equation with respect to y and the second equation with respect to x, we get:

μ(x,y) = e^{xy} - y

μ(x,y) = e^{y+x} + ye^y + f(x)

Equating the two expressions for μ(x,y), we get:

e^{xy} - y = e^{y+x} + ye^y + f(x)

Taking the derivative of both sides with respect to x, we get:

ye^{xy} = e^{y+x} + ye^y f'(x)

Solving for f'(x), we get:

f'(x) = \frac{ye^{xy}-e^{y+x}}{ye^y}

Integrating both sides with respect to x, we get:

The solution of the first order differential equation using Exact method is -e⁻¹

We must determine whether the differential equation meets the criteria for being exact in order to solve it using the exact method, which is given by:

∂M/∂y = ∂N/∂x

where M and N, respectively, are the dx and dy coefficients.

Here, [tex]M = e^{y+x} + ye^y[/tex]  and[tex]N = xe^y - 1.[/tex]

∂M/∂y = [tex]e^{y+x} + e^y + ye^y[/tex]

∂N/∂x = [tex]e^y[/tex]

We must discover the integrating factor to make the equation precise because  ∂M/∂y does not equal ∂N/∂x. The formula for the integrating factor is

μ =[tex]e^{\int\limits(\partial N/\partial x - \partial M/\partial y)/N dx = e^{\int\limits(1 - e^{-y})/x dx} = e^y ln|x|[/tex]

We obtain the following by multiplying the given equation by the integrating factor:

[tex](e^{2y+x}ln|x| + ye^yln|x|)dx + (xe^yln|x| - ln|x|)dy = 0[/tex]

We can now check if the equation is exact:

∂M/∂y = [tex]e^{2y+x}ln|x| + e^y + ye^yln|x|[/tex]

∂N/∂x = [tex]e^yln|x|[/tex]

As both are equal, the equation is exact.

By integrating the coefficients of dx with respect to x and dy with respect to y, we can now get the potential function u(x,y):

u(x,y) = ∫[tex](e^{2y+x}ln|x| + ye^yln|x|)dx = x e^{2y+x} ln|x| - x ye^yln|x| + f(y)[/tex]

∂u/∂y = [tex]xe^{2y+x} + e^yln|x| + ye^y[/tex]

Comparing this with N, we get:

∂u/∂y = ∫Ndy = ∫[tex](xe^y-1)dy = xe^y - y + g(x)[/tex]

Using u's partial derivative with regard to y, we can calculate:

[tex]xe^{2y+x} + e^yln|x| + ye^y = xe^y + g'(x)[/tex]

Comparing the coefficients of [tex]e^y[/tex] and ln|x|, we get:

g'(x) = [tex]xe^{2y+x} - ye^y[/tex]

When we combine both sides in relation to x, we get:

g(x) = [tex](1/3)xe^{2y+3x} - xye^y + C[/tex]

where C is the integration constant.

When we change the values of u and g in the formula u(x,y) = g(x) + C, we obtain:

[tex]x e^{2y+x} ln|x| - x ye^yln|x| + (1/3)xe^{2y+3x} - xye^y = C[/tex]

Substituting the initial condition y(0) = -1, we get:

C = -e⁻¹

As a result, the following is the differential equation's solution:

[tex]x e^{2y+x} ln|x| - x ye^yln|x| + (1/3)xe^{2y+3x} - xye^y = -e^{(-1)[/tex]

To know more about differential equation, refer here:

brainly.com/question/14598404#

#SPJ11

The interval for the FEUT to apply is: t ∈ (-∞, 0) U (0, ∞)

a) To transform the given DE into a system of two first order DE in matrix form, we first define:

y1 = y
y2 = y'

Then, we can rewrite the given DE as:

[t^2 - 5t + 4] y2' + [t] y2 + [2] y1 = cot(t)

Now, we can express this system in matrix form as:

[0   1] [y1']   [0]
[-2/t 5/t-4] [y2'] = [cot(t)/(t^2-5t+4)]

Therefore, the system of two first order DE in matrix form is:

y' = A(t) y + b(t)

where A(t) = [0   1; -2/t 5/t-4] and b(t) = [0; cot(t)/(t^2-5t+4)]

b) To determine the interval of t for the FEUT (Finite Element Unfitted Taylor) method to apply, we need to consider the singularities of the system matrix A(t). In this case, the singularity occurs at t = 0, which is also the initial point. Therefore, the interval of t for the FEUT method to apply is [2, ∞), which includes the initial point t = 2.

For more about interval:

https://brainly.com/question/29197921

#SPJ11

The probability mass function for this problem is f(x) = C(20, x) * (0.65)^x * (0.35)^(20-x). The parameters for this binomial distribution are n=20 (number of trials) and p=0.65 (probability of success).

Based on the given information, x follows a binomial distribution since each passenger either belongs to the frequent rider club or not, with a fixed probability of 0.65 for success (being a member of the club) and 0.35 for failure (not being a member). The probability mass function (f(x)) for this distribution can be written as f(x) = (20 choose x) * 0.65^x * 0.35^(20-x), where (20 choose x) represents the number of ways x passengers can be chosen from a total of 20 passengers. The parameters for this distribution are n = 20 (the total number of passengers) and p = 0.65 (the probability of success).
Hi! Based on your question, the variable X follows a binomial distribution since it represents the number of successes (frequent rider club members) out of a fixed number of independent Bernoulli trials (20 passengers). The probability mass function (f(x)) for a binomial distribution is given by:
f(x) = C(n, x) * p^x * (1-p)^(n-x)
where:
- C(n, x) represents the number of combinations of n items taken x at a time (n choose x)
- n is the number of trials (20 passengers in this case)
- x is the number of successes (number of frequent rider club members)
- p is the probability of success (0.65 for a passenger being part of the frequent rider club)
- (1-p) is the probability of failure (0.35 for a passenger not being part of the frequent rider club)

Learn more about probability here

https://brainly.com/question/25839839

#SPJ11

The solution of this exponential expression is 201. Therefore, the correct option is (c).

The expression that writes the powers or exponents in the easy and short form are exponential expressions. To evaluate the given exponential expression, [tex]3(5 + 4 )^2 - 42[/tex] it is necessary to follow these steps:

Perform the addition inside the parentheses:

[tex]3(5 + 4 )^2 - 42[/tex]

After the addition of 5 + 4, we get 9.

[tex]3(9)^2 - 42[/tex]

The 2 exponent indicates that you need to multiply 9 by itself twice, then:

[tex]3( 9 * 9) - 42[/tex]

Now, we will multiply 3 by 81.

= [tex](3 * 81) - 42[/tex]

After multiplying 3 and 81, we get 243

= 243 - 42

Now, subtracting these terms, we get our final answer

= 201

Therefore, after evaluating the given exponential expression, [tex]3(5 + 4 )^2 - 42[/tex] , the answer we get is 201.

The correct option is (c).

To learn more about exponential expression;

https://brainly.com/question/30672621

#SPJ4

The complete question is " Evaluate this exponential expression.

3 • (5 + 4)^2 – 42  A. 345   B. 15   C. 201   D. 46 "

The equilibrium quantity and calculated the producer's surplus using the area of the triangle formed by the supply curve and the price level up to the equilibrium quantity.

To calculate the producer's surplus, we need to first find the equilibrium quantity (q) at the given unit price (p) and then calculate the area between the supply curve and the price level up to that equilibrium quantity.

1) For the supply equation p = 10 - 2q and the unit price p = 1:

Solve for q: 1 = 10 - 2q => q = 4.5

The producer's surplus is the area of the triangle with base 4.5 and height 1 (since p = 1):

Producer's Surplus = 0.5 * base * height = 0.5 * 4.5 * 1 = $2.25

2) For the supply equation p = 10 - 2q^(1/3) and the unit price p = 8:

Solve for q: 8 = 10 - 2q^(1/3) => q^(1/3) = 1 => q = 1

Producer's Surplus = 0.5 * base * height = 0.5 * 1 * 8 = $4

3) For the supply equation q = 50 - 3p and the unit price p = 11:

Solve for q: q = 50 - 3(11) => q = 17

Producer's Surplus = 0.5 * base * height = 0.5 * 17 * 11 = $93.50

For more about equilibrium quantity:

https://brainly.com/question/13458865

#SPJ11

For y-hat for x = 10 and d = 1 is 2.51(rounded to 2 decimal places) and for  y-hat for x = 10 and d = 0 is 0.16(rounded to 2 decimal places).

A. To compute y-hat for x = 10 and d = 1: - First, calculate the numerator: exp(-1.9885 + 0.2099(10) + 0.4498(1)) = 4.0412 - Then, calculate the denominator: 1 + exp(-1.9885 + 0.2099(10)) = 1.6117 -

Finally, divide the numerator by the denominator: y-hat = 4.0412/1.6117 = 2.5087 Therefore, y-hat for x = 10 and d = 1 is 2.51 (rounded to 2 decimal places).

B. To compute y-hat for x = 10 and d = 0: - First, calculate the numerator: exp(-1.9885 + 0.2099(10)) = 0.1835 - Then, calculate the denominator: 1 + exp(-1.9885 + 0.2099(10)) = 1.1835 -

Finally, divide the numerator by the denominator: y-hat = 0.1835/1.1835 = 0.155 Therefore, y-hat for x = 10 and d = 0 is 0.16 (rounded to 2 decimal places).

Visit here to learn more about Decimal Place:

brainly.com/question/29423712

#SPJ11

77 is the mode of the data set represented by the stem and leaf plot.

Looking at the stem and leaf plot given, we can see that the most frequently occurring value, or mode, is 77. This can be determined by examining the plot and identifying the largest group of leaves, which in this case is the group of sevens under the stem of 5.

To further explain this mathematically, we can define mode as the value that occurs most frequently in a data set. In the stem and leaf plot, the leaves represent the individual values of the data set.

By counting the number of times each value appears in the plot, we can determine the frequency of each value.

The mode is then the value with the highest frequency. In this case, the value with the highest frequency is 77, which occurs five times.

To know more about mode here

https://brainly.com/question/30891252

#SPJ1

The executive used 1075 minutes on their cellular phone in the given month.

To determine the number of minutes used by the business executive, we need to first understand the billing structure for their cellular phone service. The service costs $35 per month, which is a fixed cost, and an additional $0.40 per minute for usage over 900 minutes. Let's call the total number of minutes used in a month "m".

If the executive used less than or equal to 900 minutes, then the total cost of their bill would be $35. However, if the executive used more than 900 minutes, then the total cost of their bill would be $35 plus $0.40 multiplied by the number of minutes over 900. This can be represented mathematically as follows:

Total cost = $35 + $0.40 x (m - 900)

We know from the problem that the total cost of the executive's bill was $105. We can use this information to set up an equation and solve for "m", the number of minutes used.

$105 = $35 + $0.40 x (m - 900)

Simplifying the equation, we get:

$70 = $0.40 x (m - 900)

Dividing both sides by $0.40, we get:

175 = m - 900

Adding 900 to both sides, we get:

m = 1075

To learn more about executive

https://brainly.com/question/11422252

#SPJ4

Answer:

for me I think a numerical expression

The mathematical phrase 5 + 2 x 18 is an example of an arithmetic expression.

In arithmetic expressions, mathematical operations consisting of addition, subtraction, multiplication, and department are used to combine numbers or variables. In this example, the expression consists of operations, addition and multiplication.

The multiplication operation takes priority over addition, so we ought to carry out it first, following the order of operations, which is a set of rules that dictate the order wherein operations have to be carried out.

Using the order of operations, we first perform the multiplication of 2 and 18, which offers 36. Then we add 5 to the result, giving a final answer of 41.

So the value of the arithmetic expression 5 + 2 x 18 is 41.

Learn more about arithmetic expression:-

https://brainly.com/question/30303405
#SPJ4

So, Nayan plays games for a total of 90 minutes or 1 hour and 30 minutes.

The time interval is the span of time between two specified times. To put it another way, it is the amount of time that has elapsed between the event's start and finish. A different name for it is elapsed time.  A larger span of time can be broken up into several shorter, equal-length segments. These are referred to as time periods.

Since there is no "true zero" value for time, it is regarded as an interval variable. However, differences between all time points are equal.

To calculate how long Nayan plays games, we need to add up the time intervals:

Morning: 7:00 - 6:15 = 45 minutes

Evening: 8:15 - 7:30 = 45 minutes

So, Nayan plays games for a total of 90 minutes or 1 hour and 30 minutes.

Learn more about games Visit: brainly.com/question/30728731

#SPJ4

Answer:

c

Step-by-step explanation:

The Wason task is a classic problem in cognitive psychology that involves conditional reasoning. In the version of the task that you mentioned, participants are given the following information:

"If a person is drinking alcohol, then they must be at least 21 years old." They are then presented with four cards that show a person's age on one side and whether or not they are drinking alcohol on the other side. The task is to determine which cards need to be flipped over to test the conditional rule.

Research has shown that people perform better on the Wason task when it is presented in a meaningful context, such as the one you described involving age and drinking alcohol, rather than using abstract symbols or letters and numbers. This is because the meaningful context helps people to better understand and remember the conditional rule being tested. When the task is presented in terms of letters and numbers, it can be more difficult for people to make sense of the information and apply the conditional rule correctly.

Additionally, using a meaningful context can make the task more relevant and engaging to participants, which can improve their motivation and performance. Overall, presenting the Wason task with examples rather than letters and numbers can help to make the task more accessible and easier to understand for participants.

Learn more about Wason Task here:- brainly.com/question/29658452

#SPJ11