1. Match each expression with the correct combined form.
f(x)=x²-2
g(x)=x+5
h(x) = 2x


x²+x+3
2x + x + 5
x²-x-7
2x-x-5


f+g
f-g
g+h
h-g

the probability that 5 or fewer games finish in less than 15 minutes is 0.167.

Using the binomial distribution, we have:

n = 20 (number of games)

p = 0.45 (probability of finishing under 15 min)

q = 1 - p = 0.55 (probability of finishing over 15 min)

We want to find P(X ≤ 5), where X is the number of games that finish in under 15 min. Using the cumulative binomial distribution table, we find:

P(X ≤ 5) = 0.167

Therefore, the probability that 5 or fewer games finish in less than 15 minutes is 0.167.

Using the binomial distribution, we have:

n = 5 (number of days)

p = 0.7 (probability of arriving on time)

q = 1 - p = 0.3 (probability of arriving late)

We want to find P(X < 4), where X is the number of days the train arrives on time. Using the cumulative binomial distribution table, we find:

P(X < 4) = 0.744

Therefore, the probability that the train arrives on time fewer than 4 times in the next 5 days is 0.744.

Using the binomial distribution, we have:

n = 10 (number of coin tosses)

p = 0.5 (probability of getting heads)

q = 1 - p = 0.5 (probability of getting tails)

We want to find P(X > 7), where X is the number of times we get heads. Using the cumulative binomial distribution table, we find:

P(X > 7) = 0.171

Therefore, the probability of getting more than 7 heads from 10 tosses is 0.171

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Through several stages of factor analysis, common factors across all scales were identified and eliminated, resulting in more refined and precise items on each scale.

Factor analysis is a statistical technique used to identify underlying factors that explain the variance in observed variables. In this case, multiple stages of factor analysis were conducted to identify and remove factors that were common to all scales. This process helped to isolate and extract the unique factors specific to each scale, making the items on each scale more distinct and focused.

The first step involved conducting an exploratory factor analysis (EFA) on the combined dataset from all scales. This helped in identifying the initial set of factors that were common to all scales. These common factors represented shared variance among the items from different scales. These common factors were then removed from the analysis to eliminate redundancy and reduce multicollinearity.

Next, a confirmatory factor analysis (CFA) was performed on the remaining factors for each individual scale. This allowed for a more focused analysis of the unique factors underlying each scale. The items on each scale were refined and modified based on the results of the CFA, with a focus on enhancing the clarity and distinctiveness of each item.

This process was repeated iteratively, with multiple stages of EFA and CFA, and item refinement, until the items on each scale were more precise, with reduced overlap and enhanced discriminant validity. The final set of items on each scale were more refined, distinct, and better suited to measure the specific construct of interest without interference from common factors.

Therefore, through multiple stages of factor analysis, common factors were identified and removed, resulting in more refined and precise items on each scale, which were better able to capture the unique aspects of the constructs being measured.

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In order for there to be 10 visits, she needs to make 10.

What is system of linear equations?

The intersections or meetings of the lines or planes that represent the linear equations are known as the solutions of linear equations. The set of values for the variables in every feasible solution is known as a solution set for a system of linear equations.

points that piper earned 13.5x + 60

she cannot get free tickets until she has at least 195 points.

so   13.5x + 60 ≥ 195

13.5x ≥ 195 - 60

13.5x ≥ 135 x ≥ 10

So, In order for there to be 10 visits, she needs to make 10.

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A half life is the amount of time it takes for half of a radioactive substance to decay.

Yes, that is correct. The half-life of a radioactive element is the amount of time it takes for half of the initial amount of the element to decay. Therefore, the larger the initial amount of the element, the longer the half-life will be. This is because there are more atoms that need to decay in order for the half-life to occur. Conversely, if the initial amount of the element is small, the half-life will be shorter because there are fewer atoms that need to decay.

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By applying the Mean Value Theorem to the function f(x) = eˣ - (1+x) on the interval [0, x], where x>=0, it is shown that there exists a c in (0, x) such that f'(c) = [tex]e^c[/tex] - 1 >= 0, which implies that eˣ >= 1+x.

To use the Mean Value Theorem, we need to show that a function f(x) satisfies the conditions of the theorem

The function f(x) is continuous on the closed interval [0, x].

The function f(x) is differentiable on the open interval (0, x).

We take f(x) = eˣ  - (1 + x). Note that f(0) = 0, and we need to show that there exists a value c in (0, x) such that f'(c) = f(x) - f(0) / (x - 0) = f(x) / x >= 1.

Now, we take the derivative of f(x)

f'(x) = eˣ- 1

Note that f'(x) > 0 for all x > 0, which means that f(x) is an increasing function on the interval (0, infinity). Therefore, the minimum value of f(x) on the interval [0, x] is f(0) = 0, and the maximum value of f(x) on the interval [0, x] is f(x).

By the Mean Value Theorem, there exists a value c in (0, x) such that

f'(c) = f(x) - f(0) / (x - 0)

[tex]e^c[/tex]- 1 =eˣ - (1 + x) / x

Simplifying, we get

[tex]e^c[/tex] = 1 + x + x² / 2! + x³ / 3! + ... + xⁿ / n! + ....

> 1 + x

Since [tex]e^c[/tex] > 1 + x for all c in (0, x), we can conclude that eˣ >= 1 + x for all x >= 0.

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a. The average slope of f(x) on the interval [3, 9] is -2/27.

b. The value of c that satisfies the Mean Value Theorem is [tex]c = \sqrt{(54)} .[/tex]

a. To find the average or mean slope of the function f(x) = 1/x on the interval [3, 9], we need to calculate the slope of the secant line that passes through the points (3, f(3)) and (9, f(9)), and then divide by the length of the interval:

Average slope = (f(9) - f(3)) / (9 - 3)

To find f(3) and f(9), we simply plug in the values:

f(3) = 1/3

f(9) = 1/9

Substituting these values into the formula, we get:

Average slope = (1/9 - 1/3) / (9 - 3) = (-2/27)

b. According to the Mean Value Theorem, there exists a c in the open interval (3, 9) such that f'(c) is equal to this mean slope. To find c, we need to first find the derivative of f(x):

[tex]f'(x) = -1/x^2[/tex]

Then, we need to solve the equation f'(c) = -2/27 for c:

[tex]-1/c^2 = -2/27[/tex]

Multiplying both sides by [tex]-c^2[/tex], we get:

[tex]c^2 = 54[/tex]

Taking the square root of both sides, we get:

[tex]c = \sqrt{(54)}[/tex]

Since [tex]3 < \sqrt{(54)} < 9[/tex], we know that c is in the open interval (3, 9).

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Answer: pretty sure its c

Step-by-step explanation: i might be wrong

Therefore, the exponential form of [tex]3^2* 3^3[/tex]is [tex]3^5[/tex].

Exponential form, also known as exponential notation or scientific notation, is a way of expressing a number as a product of a coefficient and a power of 10. The coefficient is typically a number between 1 and 10, and the power of 10 indicates how many places the decimal point should be shifted to the left or right to convert the number to standard decimal form.

For example, the number 3,000 can be written in exponential form as 3 x [tex]10^3[/tex], where the coefficient is 3 and the exponent is 3. This means that the decimal point should be shifted three places to the right to obtain the standard decimal form of 3,000.

Similarly, the number 0.0005 can be written in exponential form as 5 x. [tex]10^{-4}[/tex], where the coefficient is 5 and the exponent is -4. This means that the decimal point should be shifted four places to the left to obtain the standard decimal form of 0.0005.

Exponential form is often used in scientific and engineering applications where very large or very small numbers are involved, as it provides a convenient way to express these numbers in a compact and easy-to-read format.

The exponential form of [tex]3^2* 3^3[/tex] can be found by applying the rules of exponents which states that when multiplying two exponential expressions with the same base, you can add their exponents.

So,[tex]3^2 * 3^3[/tex] can be simplified as follows:

[tex]3^2 * 3^3 = 3^{(2+3)}[/tex]

[tex]= 3^5[/tex]

Therefore, the exponential form of [tex]3^2*3^3*3^5[/tex].

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The mean brightness of a random sample of 16 light bulbs from a population of 100-watt light bulbs will have a normal distribution. This is because, according to the Central Limit Theorem, the distribution of sample means from a large sample size (n ≥ 30) drawn from a population with any distribution shape will approximate a normal distribution, regardless of the shape of the original population distribution.

1. The Central Limit Theorem states that the sampling distribution of the mean of a random sample drawn from any population with a finite mean (μ) and a finite standard deviation (σ) will be approximately normally distributed, as long as the sample size is sufficiently large (n ≥ 30). In this case, we have a sample size of 16 light bulbs, which may not be large enough to satisfy the Central Limit Theorem, but since the population is assumed to be normally distributed with known mean (μ = 1650 lumens) and standard deviation (σ = 65 lumens), we can still approximate the sampling distribution of the mean as normal.

2. The mean (μx) of the sampling distribution of the mean brightness of these 16 light bulbs will be the same as the mean of the population (μ = 1650 lumens), since the sample mean is an unbiased estimator of the population mean. The standard deviation (σx) of the sampling distribution of the mean can be calculated using the formula σx = σ / √n, where σ is the population standard deviation and n is the sample size. Plugging in the given values, we get σx = 65 lumens / √16 = 65 lumens / 4 = 16.25 lumens.

3. To find the probability that the mean brightness of the 16 light bulbs is between 1620 lumens and 1640 lumens, we need to calculate the z-scores for these values using the formula z = (x - μx) / σx, where x is the value we are interested in, μx is the mean of the sampling distribution of the mean, and σx is the standard deviation of the sampling distribution of the mean. Plugging in the given values, we get z1 = (1620 - 1650) / 16.25 ≈ -1.85 and z2 = (1640 - 1650) / 16.25 ≈ -0.61. Using a standard normal distribution table or a calculator, we can find the probabilities associated with these z-scores. Let's denote the probability that the mean brightness is between 1620 lumens and 1640 lumens as P(-1.85 < z < -0.61).

The 70th percentile of a normal distribution corresponds to the z-score that separates the lowest 70% of the distribution from the highest 30%. Using a standard normal distribution table or a calculator, we can find the z-score that corresponds to the 70th percentile, denoted as zp70. Then we can use the formula x = μx + zp70 × σx to find the 70th percentile for the mean brightness of 16 light bulbs.

Therefore, The mean brightness of a random sample of 16 light bulbs from a population of 100-watt light bulbs will have a normal distribution due to the Central Limit Theorem, as long as the population is assumed to be normally distributed. The mean of the sampling distribution of the mean will be the same as the mean of the population, which is 1650 lumens.

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If the man invested at 5% interest rate and get an amount of GH¢840, then the amount invested at the beginning in the bank was GH¢16,800.

The "Simple-Interest" is defined as a method of calculating the interest on a principal amount based on a fixed percentage rate and a specific period of time.

⇒ Simple Interest (SI) = Principal Amount (P) × Rate of Interest (R) × Time (T)

Where : P = initial amount invested, R = Rate-of-Interest (in decimal form)

T = Time (in years);

⇒ The interest-rate is = 5% per annum, = 0.05 , and

⇒ total amount in bank at end of year is = GH¢840,

Substituting the values,

We get,

⇒ 840 = P × 0.05 × 1,

⇒ 840 = 0.05×P,

⇒ P = GH¢16,800,

Therefore, the man invested GH¢16,800 in bank.

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Answer:

k = -1.

Step-by-step explanation:

√4k-11+15=2

√4k = 11-15+2

√4k = -2

Squaring both sides

4k^2 = 4

k^2 = 1

k = +/- 1

Only k = -1 fits the original eqation

To find g'(2), we will use the Chain Rule, which states that if g(x) = h(f(x)), then g'(x) = h'(f(x)) * f'(x). In this case, we have:

g(x) = sin(πf(x)) h(x) = sin(πx)

Now, let's find the derivatives of h(x) and f(x): h'(x) = d(sin(πx))/dx = π*cos(πx) f'(x) is given as f'(2) = -8

Now, we can find g'(2) using the Chain Rule:

g'(2) = h'(f(2)) * f'(2) We are given that f(2) = 6, so:

g'(2) = h'(6) * (-8) g'(2) = π*cos(π*6) * (-8)

Since cos(2πn) = 1 for any integer n (6 in this case):

g'(2) = π*cos(12π) * (-8) g'(2) = π * 1 * (-8)

So, g'(2) = -8π.

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(a) To rank each lottery pair by statewise dominance, we compare the prizes of each lottery for each possible outcome of the die roll. Here are the six rankings:
Lottery 1 >SW Lottery 2
Lottery 1 >SW Lottery 3
Lottery 1 >SW Lottery 4
Lottery 2 ∼SW Lottery 3
Lottery 2 ∼SW Lottery 4
Lottery 3 ∼SW Lottery 4

(b) To rank each lottery pair by first-order stochastic dominance, we compare the cumulative distribution functions (CDFs) of each lottery. The CDF of a lottery gives the probability that the prize is less than or equal to a certain value. Here are the rankings:
Lottery 1 >F OSD Lottery 2 >F OSD Lottery 3 >F OSD Lottery 4
To show why Lottery 1 is first-order stochastically dominant over Lottery 2, consider the following CDFs:
Lottery 1:
Prize ≤ $1: 1/6
Prize ≤ $2: 2/6
Prize ≤ $3: 3/6
Prize ≤ $4: 4/6
Prize ≤ $5: 5/6
Prize ≤ $6: 6/6
Lottery 2:
Prize ≤ $1: 0/6
Prize ≤ $2: 1/6
Prize ≤ $3: 2/6
Prize ≤ $4: 3/6
Prize ≤ $5: 4/6
Prize ≤ $6: 6/6
We can see that for any prize value, the CDF of Lottery 1 is always greater than or equal to the CDF of Lottery 2. This means that the probability of winning a certain prize or less is always greater for Lottery 1 than for Lottery 2, which is the definition of first-order stochastic dominance.
We can similarly compare the CDFs of the other lotteries to arrive at the ranking above.

(c) To rank each lottery pair by second-order stochastic dominance, we compare the CDFs of the lotteries' expected values. The expected value of a lottery is the sum of the prizes multiplied by their probabilities, and the CDF of the expected value gives the probability that the expected value is less than or equal to a certain value. Here are the rankings:
Lottery 1 >SOSD Lottery 2 >SOSD Lottery 4 >SOSD Lottery 3
To show why Lottery 1 is second-order stochastically dominant over Lottery 2, consider the following CDFs of the expected values:
Lottery 1:
Expected value ≤ $1: 1/6
Expected value ≤ $2: 3/6
Expected value ≤ $3: 4/6
Expected value ≤ $4: 5/6
Expected value ≤ $5: 6/6
Expected value ≤ $6: 6/6
Lottery 2:
Expected value ≤ $1: 0/6
Expected value ≤ $2: 1/6
Expected value ≤ $3: 2/6
Expected value ≤ $4: 3/6
Expected value ≤ $5: 4/6
Expected value ≤ $6: 5/6
We can see that for any expected value, the CDF of Lottery 1 is always greater than or equal to the CDF of Lottery 2. This means that the probability of getting an expected value or less is always greater for Lottery 1 than for Lottery 2, which is the definition of second-order stochastic dominance.
We can similarly compare the CDFs of the other lotteries to arrive at the ranking above.

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The monopolist's profit-maximizing output is 20 units, the price is $710 per unit, and the corresponding profit is $11,800.

To find the profit-maximizing output and price for the monopolist, we need to use the following formula:

Profit = Total Revenue - Total Cost

Total Revenue (TR) is equal to price (p) times quantity (q), so we can substitute the demand equation for p:

TR = (750 - 2q)q

Total Cost (TC) is equal to average cost (c) times quantity (q), so we can substitute the cost equation for c:

TC = q + 110 + 1000/q

Now we can rewrite the profit formula:

Profit = (750 - 2q)q - (q + 110 + 1000/q)q

Simplifying this expression, we get:

Profit = 640q - 2q^2 - 110q - 1000

To find the profit-maximizing output, we need to take the derivative of this equation with respect to q and set it equal to zero:

dProfit/dq = 640 - 4q - 110 - 1000/q^2 = 0

Solving for q, we get:

q = 20

To find the corresponding price, we can substitute this value of q into the demand equation:

p = 750 - 2q = 710

Therefore, the profit-maximizing output is 20 units, the price is $710 per unit, and the corresponding profit is:

Profit = (750 - 2q)q - (q + 110 + 1000/q)q
Profit = (750 - 2(20))(20) - (20 + 110 + 1000/(20))(20)
Profit = $11,800

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The population proportions are different from the hypothesized values.

To test the hypotheses, we can use the chi-square goodness-of-fit test.

The null hypothesis (H0) is that the population proportions are pA = 0.40, pB = 0.40, and pC = 0.20. The alternative hypothesis (Ha) is that the population proportions are not pA = 0.40, pB = 0.40, and pC = 0.20.

We can calculate the expected frequencies for each category under the null hypothesis as follows:

Expected frequency for category A = 0.40 x 200 = 80

Expected frequency for category B = 0.40 x 200 = 80

Expected frequency for category C = 0.20 x 200 = 40

We can then calculate the chi-square statistic as:

χ2 = ∑(O-E)2 / E

where O is the observed frequency and E is the expected frequency.

Using the values from the sample, we get:

χ2 = [(160-80)2/80] + [(20-80)2/80] + [(20-40)2/40]

= 120 + 900 + 100

= 1120

The degrees of freedom for this test is df = k - 1 = 3 - 1 = 2, where k is the number of categories.

Using a chi-square distribution table with df = 2 and a significance level of α = 0.01, we find the critical value to be 9.210.

Since the calculated chi-square statistic (1120) is greater than the critical value (9.210), we reject the null hypothesis and conclude that the population proportions are not pA = 0.40, pB = 0.40, and pC = 0.20.

Therefore, there is sufficient evidence to suggest that the population proportions are different from the hypothesized values.

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The x-value a such that 98% of x-values are less than or equal to a is approximately 9.9.

To find the x-value a such that 98% of x-values are less than or equal to a, we need to use the z-score formula for normal distributions:

z = (x - μ) / σ

where μ is the mean and σ is the standard deviation.

First, we need to find the z-score that corresponds to the 98th percentile. We can look this up in a standard normal distribution table or use a calculator.

Using a calculator, we can use the inverse normal function, norminv(), which gives us the z-score that corresponds to a given percentile.

norminv(0.98) = 2.0537

So, the z-score that corresponds to the 98th percentile is 2.0537.

Now, we can use the z-score formula to solve for the x-value a:

2.0537 = (a - (-4.8)) / 6.7

2.0537 * 6.7 = a + 4.8

a = (2.0537 * 6.7) - 4.8

a ≈ 9.9

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When checking conditions for calculating a confidence interval for a proportion, you should use the observed number of successes and failures. (option c).

In general, if the sample size is large enough (typically, at least 30), then the observed number of successes and failures can be used to calculate a confidence interval for the proportion. This is because, in large samples, the observed sample proportion is likely to be close to the true population proportion.

However, if the sample size is small (less than 30), or if the observed number of successes or failures is very small, then the expected number of successes and failures may be used instead.

This is because, in small samples, the observed sample proportion may not be a reliable estimate of the true population proportion, and the standard error of the sample proportion may not be accurately estimated using the observed number of successes and failures.

Hence the correct option is (c).

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The additional time it took Luke to get to school than Sarah is 13 minutes

From the question, we are to calculate how much longer it took Luke to get to school than Sarah

From the given information,

'Luke left his house at 7:12 am and arrived at school today at 8:00am'

The time it took Luke to get to school is 8:00 am - 7:12 am = 48 minutes

Also,

"Sarah left her house 7:05 a and arrived at school at 7:40 am"

The time it took Sarah to get to school is 7:40 am - 7:05 am = 35 minutes

To determine how much longer it took Luke to get to school than Sarah, we will subtract the time it took Sarah to get to school from the time it took Luke to get to school

That is,

48 minutes - 35 minutes

= 13 minutes

Hence,

It took Luke 13 minutes longer

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The completed terms are (3 x 10¹)+(2 × 10¹⁹) + (2 × 10¹⁹) = 3 x 10¹ + 4 x 10¹⁹ = 4 x 10¹⁹, as the 10¹⁹ terms add up to 7 x 10²⁰.

To complete the terms you have to first performing the multiplication within each set of parentheses, which gave me (3 x 10¹⁹) + (4 x 10¹⁹). Then, I added these two terms together to get a final answer of 7 x 10²⁰.

In mathematics, a term is defined as the values of an algebraic expression on which mathematical operations occur. Let's look at an example of a word. This algebraic statement has terms 8x and 9.

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the coordinates of B' are:B'(1, 1+7) = B'(1, 8)

What is are of triangle?

The territory included by a triangle's sides is referred to as its area. Depending on the length of the sides and the internal angles, a triangle's area changes from one triangle to another. Square units like m2, cm2, and in2 are used to express the area of a triangle.The sum of all angle of triangle = 180

the triangle ABC is being translated 7 units up, which means that all of its points will be moved vertically 7 units while maintaining the same horizontal position.

To translate the triangle 7 units up, we add 7 to the y-coordinates of each point.

Therefore, the coordinates of B' are:B'(1, 1+7) = B'(1, 8)

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The tangent line approximation near x = 0 gives [tex]e^{2.1}[/tex] ≈ -1.1.

However, this result is not correct since[tex]e^{-2.1}[/tex] is a positive number and the tangent line approximation gives a negative number.

Therefore, there must be an error in the calculations.

To find the tangent line approximation for 5 + x near x = 2, we need to find the derivative of the function 5 + x and evaluate it at x = 2:

f(x) = 5 + x

f'(x) = 1

So the slope of the tangent line at x = 2 is f'(2) = 1.

We also need a point on the tangent line to determine the equation of the line.

Since the point of tangency is (2, 7), we can use this point.

Using point-slope form of a line, we have:

y - 7 = 1(x - 2)

Simplifying this expression, we get:

y = x + 5

Therefore, the tangent line approximation for 5 + x near x = 2 is y = x + 5.

To find the value of [tex]e^{-2.1}[/tex], we use the tangent line approximation near x = 0.

Since the tangent line approximation near x = 0 is y = x + 5, we have:

[tex]f(x) = e^x[/tex]

[tex]f'(x) = e^x[/tex]

So the slope of the tangent line at x = 0 is f'(0) = 1.

Using point-slope form of a line, we have:

[tex]y - (e^0) = 1(x - 0)[/tex]

Simplifying this expression, we get:

y = x + 1

Therefore, the tangent line approximation for [tex]e^x[/tex] near x = 0 is y = x + 1.

To find the value of [tex]e^{-2.1}[/tex] using this tangent line approximation, we plug in x = -2.1:

y = (-2.1) + 1 = -1.1.

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a)  The equation of the tangent line to the curve y=x² −2x+7 which is.(a) parallel to the line 2x−y+9=0 is y=2x+3.

b) The equation of the tangent line to the curve y=x² −2x+7 which is perpendicular to the line 5y−15x=13 is y=-1/3x+31/3.

(a) To find the equation of the tangent line to the curve y=x² −2x+7 which is parallel to the line 2x−y+9=0, we need to find the slope of the given line. We can rearrange the given line to y=2x+9. Since we want the tangent line to be parallel, it must have the same slope as the given line, which is 2.

Now, we need to find the point on the curve where the tangent line passes through. We can do this by finding the derivative of the curve and setting it equal to 2. Differentiating y=x² −2x+7, we get y'=2x-2. Setting this equal to 2, we get 2x-2=2, which gives us x=2. Substituting x=2 into the original equation, we get y=7.

Therefore, the point on the curve where the tangent line passes through is (2, 7). Using the point-slope form of the equation of a line, we can write the equation of the tangent line as y-7=2(x-2), which simplifies to y=2x+3.

(b) To find the equation of the tangent line to the curve y=x² −2x+7 which is perpendicular to the line 5y−15x=13, we need to find the slope of the given line and then find the negative reciprocal of that slope to get the slope of the tangent line.

Rearranging the given line to y=3x+13/5, we can see that the slope of the given line is 3. Therefore, the slope of the tangent line is -1/3. Now, we need to find the point on the curve where the tangent line passes through. We can do this by finding the derivative of the curve and setting it equal to -1/3.

Differentiating y=x² −2x+7, we get y'=2x-2. Setting this equal to -1/3, we get 2x-2=-1/3, which gives us x=5/3. Substituting x=5/3 into the original equation, we get y=26/3.

Therefore, the point on the curve where the tangent line passes through is (5/3, 26/3). Using the point-slope form of the equation of a line, we can write the equation of the tangent line as y-26/3=-1/3(x-5/3), which simplifies to y=-1/3x+31/3.

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[tex]\textit{midsegment of a trapezoid}\\\\ m=\cfrac{a+b}{2} ~~ \begin{cases} a,b=\stackrel{parallel~sides}{bases~\hfill }\\[-0.5em] \hrulefill\\ a=19.5\\ b=27 \end{cases}\implies m=\cfrac{19.5+27}{2}\implies m=23.25[/tex]

The probability of both marbles being white is about 0.067, and the probability of exactly one marble being white is about 0.467.

The probability that both marbles are white can be found by multiplying the probability of drawing a white marble on the first pick (3/10) by the probability of drawing a white marble on the second pick given that the first marble drawn was white (2/9).

So, P(both marbles are white) = (3/10) * (2/9) = 1/15 or 0.067.

The probability that exactly one marble is white can be found by adding the probability of drawing a white marble on the first pick (3/10) and drawing a black marble on the second pick given that the first marble drawn was white (7/9 * 3/10) to the probability of drawing a black marble on the first pick (7/10) and drawing a white marble on the second pick given that the first marble drawn was black (3/9 * 7/10).

So, P(exactly one marble is white) = (3/10 * 7/9) + (7/10 * 3/9) = 21/90 + 21/90 = 42/90 or 0.467.

The probability that both marbles are white can be calculated as follows:
(3/10) * (2/9) = 1/15 or approximately 0.067 (since there are 3 white marbles out of 10 and then 2 out of the remaining 9).

The probability that exactly one marble is white can be calculated using two scenarios:
1) First marble is white, second is black: (3/10) * (7/9)
2) First marble is black, second is white: (7/10) * (3/9)

Adding these probabilities gives:
(3/10)*(7/9) + (7/10)*(3/9) = 21/45 or approximately 0.467 (rounded to three decimal places).

So, the probability of both marbles being white is about 0.067, and the probability of exactly one marble being white is about 0.467.

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The distribution is normal, with an expected value of 90 and a standard error of 4.

The distribution of sample means for samples of n = 64 selected from a population with a mean of μ = 90 and a standard deviation of σ = 32 is as follows:
1. Shape: The distribution will be approximately normal due to the Central Limit Theorem, which states that the distribution of sample means approaches a normal distribution as the sample size increases.
2. Expected Value: The expected value of the sample means is equal to the population mean, which is μ = 90.
3. Standard Error: The standard error (SE) is calculated by dividing the population standard deviation (σ) by the square root of the sample size (n). In this case, SE = σ / √n = 32 / √64 = 32 / 8 = 4.
So, the distribution is approximately normal, with an expected value of 90 and a standard error of 4.

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The minimum value of y is -1. This can be answered by the concept from equation of a circle.

To find the minimum value of y, we need to rewrite the given equation in terms of y. Completing the square, we have:

x² - 14x + y² - 48y = 0
(x² - 14x + 49) + (y² - 48y + 576) = 49 + 576
(x - 7)² + (y - 24)² = 625

This is the equation of a circle with center (7,24) and radius 25. The minimum value of y occurs at the bottom of the circle, which is the point (7,24-25).

Therefore, the minimum value of y is -1.

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Consequently, the rectangle's area is10x⁴y⁴z⁴. 

The size of a surface is referred to as its area. Square units like square meters  (m²), square centimeters(cm²), square inches

Define the area.

The size of a surface is referred to as its area. Square units like square meters  (m²), square centimeters(cm²), square inches (in2), etc. are used to measure it.

The following formula determines the area of a rectangle:

Area is equal to length times breadth.

In this instance, the rectangle is  2x³yz in length and 5xy³z³. in width. Therefore, we may add these values to the formula as follows:

Area equals (2x³yz) x (5xy³z³)

If we condense this expression, we get:

Size (10x⁴y⁴z⁴).

Consequently, the rectangle's area is 10x⁴y⁴z⁴.

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The value of given functions f₁ (t), f₂ (t), f₃ (t) and f₄ (t) are linearly independent.

Given that;

All the functions are,

f₁ (t) = 2t - 3

f₂ (t) = t² + 1

f₃ (t) = 2t² - t

f₄ (t) = t² + t + 1

Now, We can setting up a matrix with the coefficients of each function as the rows:

2 0 0 0

-3 1 0 1

0 2 -1 1

0 1 1 1

And, Now let's do some row operations to put the matrix in row echelon form:

2 0 0 0

0 1 0 1

0 0 -1 0

0 0 0 1

Hence, We have a pivot in every column, so the functions are linearly independent.

And, There is no non-trivial linear combination of them that equals the zero function.

Therefore, we can conclude that f1(t), f2(t), f3(t) and f4(t) are linearly independent.

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There are several potential problems that could arise from the situation described. Firstly, the response rate of only 30% may not be representative of the entire population, and thus the results may not accurately reflect the views of all constituents.

Additionally, the question itself may be leading or biased, potentially influencing respondents to answer in a certain way. Furthermore, the survey may not have been distributed randomly, which could further skew the results. Lastly, it's important to note that agreement with the statement "soft on crime" can be interpreted in many different ways, making it difficult to draw clear conclusions from the survey results.

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The equation of the quadratic function is: f(x) = (x + 5)² - 2.

What is quadratic function?

To find the equation of the quadratic function represented by the given table of values, we can start by identifying the pattern in the data. We can see that the values of f(x) increase and then decrease, which suggests that the graph of the function is a parabola that opens downward.

To find the vertex of the parabola, we can use the formula x = -b/2a, where a is the coefficient of x², b is the coefficient of x, and x is the x-coordinate of the vertex.

Using the data in the table, we can calculate the values of a, b, and c in the standard form of a quadratic equation: f(x) = ax² + bx + c.

First, we can use the data for x = 0 to find the value of c:

f(0) = 13

a(0)² + b(0) + c = 13

c = 13

Next, we can use the data for x = -8 and x = -5 to set up a system of two equations and two unknowns to solve for a and b:

f(-8) = 13 = a(-8)² + b(-8) + 13

f(-5) = -2 = a(-5)² + b(-5) + 13

Simplifying each equation:

64a - 8b = -4

25a - 5b = -8

Multiplying the second equation by 8/5 to eliminate b:

64a - 8b = -4

32a - 8b = -12

Subtracting the second equation from the first:

32a = 8

a = 1/4

Substituting a = 1/4 into one of the equations and solving for b:

64(1/4) - 8b = -4

16 - 8b = -4

b = 5/2

So the equation of the quadratic function is:

f(x) = (1/4)x² + (5/2)x + 13

Simplifying:

f(x) = (x + 5)² - 2

Therefore, the answer is f(x) = (x + 5)² - 2.

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