mike is flying a kite the horizontal distance to the kite a is about 19 feet the kite is 31 feet from the ground how long is the string

Answer:

Area = 20 ft²

Step-by-step explanation:

Area of a thrombus

½ × d1 × d2

½ × 5 × 8

20

Answer:

20 ft squared

Step-by-step explanation:

The area of a rhombus can be calculated by multiplying its diagonals by each other and then halving that product: A = [tex]\frac{1}{2} d_1d_2[/tex]

Here, we know that [tex]d_1[/tex] = 5 and [tex]d_2[/tex] = 8. So, we have the equation: A = [tex]\frac{1}{2} *5*8=(1/2)*40=20[/tex]

Thus, the area is 20 ft squared.

Hope this helps!

Answer:

She has completed 2/3 of the poster

Explanation:

1/3 of the poster the first day

+

1/3 of the poster the next day

1/3 + 1/3 = 2/3

The solution of the inequality -14.5 < x represents graph which is correct option C

What is inequality?

Inequality is the defined as mathematical statements that have a minimum of two terms containing variables or numbers is not equal.

-14.5 < x

x > -14.5

A number line going from negative 15 to negative 11. An open circle is at negative 14.5. Everything to the right of the circle is shaded.

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Answer:

fernando is 45 inches tall, and jasmine is 40 inches tall

Step-by-step explanatin

60 divided by 3/4 is 45, 45 divided by 8/9 is 40

Fernando is 45 inches tall, and Jasmine is 40 inches tall.

Emily is 60 inches tall. Fernando is 3/4 of Emily's height:

(60 inches x 3/4 = 45 inches).

Jasmine is 8/9 of Fernando's height:

(45 inches x 8/9 = 40 inches).

Answer:

the mean is 3

answer choice D

Step-by-step explanation:

60/20

Hence, the correct answer is 1/5

A random variable is a numerical valued variable on a defined sample space of an experiment with expressions such as X

probability distribution of random variable X is given by,

X        1        2        3        4        5

P(X)   1/5     1/5     1/5     1/5      1/5

mean of probability distribution = [tex]\frac{\sum{P(X)}}{5}[/tex]

                                                     = 1/5

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Answer:

Therefore profit function is increasing on the interval (0,3200)

Step-by-step explanation:

The cost function of the manufacturer C(x) is given as:

[TeX]C(x)= 0.17x^{2}-0.00016x^{3}[/TeX]

The Revenue function is also given as:

[TeX]R(x)= 0.362x^{2}-0.0002x^{3}[/TeX]

Profit=Revenue-Cost

Therefore:

P(x)=R(x)-C(x)

[TeX]= 0.362x^{2}-0.0002x^{3}-[0.17x^{2}-0.00016x^{3}][/TeX]

[TeX]= 0.362x^{2}-0.0002x^{3}-0.17x^{2}+0.00016x^{3}[/TeX]

The Profit Function, [TeX]P(x)= 0.192x^{2}-0.00004x^{3}[/TeX]

To determine the point where the function is increasing, we take the derivative and examine it's critical points.

The derivative of the profit function is:

[TeX]P^{'}(x)= 0.384x-0.00012x^{2}[/TeX]

Set the derivative equal to zero.

[TeX]0.384x-0.00012x^{2}=0[/TeX]

[TeX]x(0.384x-0.00012x)=0[/TeX]

x=0 or [TeX]0.384-0.00012x=0[/TeX]

x=0 or [TeX]0.384=0.00012x[/TeX]

x=0 or x=3200

Now let's choose 2000 and 4000 as test points.

[TeX]P^{'}(2000)= 0.384(2000)-0.00012(2000)^{2}=288[/TeX]

[TeX]P^{'}(4000)= 0.384(4000)-0.00012(4000)^{2}=-384[/TeX]

Therefore profit function is increasing on the interval (0,3200)

Answer:

The is profit function is increasing on (0, 3200).

Step-by-step explanation:

Given

C(x) = 0.17x² - 0.00016x³

R(x) = 0.362x² - 0.0002x³

The profit function is given by

P(x) = R(x) - C(x)

P(x) = (0.362x² - 0.0002x³) - (0.17x² - 0.00016x³)

P(x) = 0.362x² - 0.0002x³ - 0.17x² + 0.00016x³

P(x) = 0.192x² - 0.00004x³

The derivative of the profit function is given by

P'(x) = 0.384x - 0.00012x²

Determine the critical number of P(x) to get interval where the profit function is increasing,

Set P'(x) = 0

0.384x - 0.00012x² = 0

x(0.384 - 0.00012x) = 0

x = 0 or 0.384 - 0.00012x = 0

0.384 - 0.00012x = 0

x = 0.384/0.00012 = 3200

Therefore the is profit function is increasing on (0, 3200)

Answer:

a) 0.760

b) 0.048

c) 0.192

Step-by-step explanation:

The step by step solution is attached as an image.

A) The probability of passing the test on the first or second try is 0.760.

That is he pass in the first trial or second trial.

(B) The probability of failing on the first 2 trials and passing on the third is 0.048.

That is the employee fail the first the trial and pass the third trial.

(C) The probability of failing on all 3 attempts is 0.192.

That is the employee fail all the three trial.

The probability of passing on the first or second try is 76%, the probability of failing the first 2 trials and passing on the third is 4.8%, and the probability of failing all 3 attempts is 19.2%.

This problem relates to the field of probability. Let's break it down.

For part A, the probability of passing on the first or second try is the sum of the probability of passing on the first try and the product of the probability of failing on the first try and passing on the second. This is calculated as 0.4 + (0.6*0.6) = 0.76 or 76%.

For part B, the probability of failing the first 2 trials and passing on the third is calculated by multiplying the probability of failing the first trial, failing the second, and passing the third: (0.6*0.4*0.2) = 0.048 or 4.8%.

For part C, the probability of failing all 3 attempts is equal to the product of the probability of failing each attempt: (0.6*0.4*0.8) = 0.192 or 19.2%.

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Answer: C

Step-by-step explanation:

Answer:The answer Is The Third One On The Right.

Step-by-step explanation:

Answer:

54

Step-by-step explanation:

6(6)+3(9)-9

=54

Answer:

54

Step-by-step explanation:

First, since it's given the x and y values, you need to plug them in.

6(6) + 3(9) - 9

36 + 27 - 9

63 - 9

54

Answer:

  m = 57

Step-by-step explanation:

If we assume your equation is supposed to be ...

  512 = (m +7)^(3/2)

we can raise both sides to the 2/3 power to get ...

  512^(2/3) = m +7

  64 = m +7

  57 = m . . . . . . subtract 7

Answer:

[tex]a) \ H_o:\hat p_f=\hat p_m\\\ \ \ H_a:\hat p_f\neq \hat p_m\\\\b) z\ test=2.925, \ p\ value(two-tail)=0.003444\\\\\\[/tex]

c)  Reject  H_o  since there is sufficient evidence to suggest that there is difference between males and females with respect to how they feel about this issue.

d. No. Interval does not include zero

e. [tex]CI=[0.01044<(\hat p_f-\hat p_m)<0.05576[/tex]

We are 95% confident that the proportional difference lies between the [0.010444,0.05576] interval.

Step-by-step explanation:

a. The null hypothesis is that there is no difference between males and females with respect to how they feel about this issue:

[tex]H_o:p_m=p_f[/tex]

-The alternative hypothesis is that there is some difference between males and females with respect to how they feel about this issue:

[tex]H_a:p_m\neq p_f[/tex]

where [tex]p_m, \ p_f[/tex] is the proportion of males and females respectively.

b. The proportion of males and females in the study can be calculated as follows:

[tex]\hat p=\frac{x}{n}\\\\\hat p_f=\frac{1729}{1913}=0.9038\\\\\hat p_m=\frac{1111}{1276}=0.8707[/tex]

[tex]\hat p=\frac{x_f+x_m}{n_m+n_f}=\frac{1111+1729}{1276+1913}=0.8906[/tex]

#We then calculate the test statistic using the formula:

[tex]z=\frac{(\hat p_f-\hat p_m)}{\sqrt{\hat p(1-\hat p)(\frac{1}{n_f}+\frac{1}{n_m})}}\\\\\\=\frac{(0.9038-0.8707)}{\sqrt{(0.8906\times0.1094)(\frac{1}{1913}+\frac{1}{1276})}}\\\\\\=2.9250\\\\\therefore p-value=0.001722\\[/tex]

[tex]\# The \ two \ tail \ p-value \ is\\\\=0.01722\times 2\\\\=0.003444[/tex]

c. Since p<0.05:

[tex]p<0.05\\\\0.00344<0.05\\\\\therefore Reject \ H_o[/tex]

Hence, we Reject the Null Hypothesis since there is sufficient evidence to suggest that there is difference between males and females with respect to how they feel about this issue

d. The 95% confidence interval can be calculated as below:

[tex]CI=(p_f-p_m)\pm z_{\alpha/2}\sqrt{\frac{\hat p_m(1-\hat p_m)}{n_m}+\frac{\hat p_f(1-\hat p_f)}{n_f}}\\\\=(0.9038-0.8707)\pm 1.96\sqrt{0.00008823+0.000045449}\\\\=0.03310\pm 0.02266\\\\=[0.01044,0.05576][/tex]

Hence, the confidence interval does not include  0

e. The 95% confidence interval calculated from above is :

[tex]0.01044<(p_f-p_m)<0.05576[/tex]

Hence, we are 95% confident that the proportional difference will fall between the interval [tex]0.01044<(\hat p_f-\hat p_m)<0.05576[/tex]

Answer:

y = -4x + 26

Step-by-step explanation:

y = mx + b    m: slope  -4   b: y intercept

pass (5 , 6)

b = y - mx = 6 - (-4) x5 = 6 + 20 = 26

equation: y = -4x + 26

Answer:

a on edge2021

Step-by-step explanation:

The volume is One-fourth of the original.

"It is a three dimensional structure having two parallel bases joined by a curved surface, at a fixed distance."

V = π × r² × h, where 'r' is the radius of the circular base and 'h' is the height of the cylinder.

In the given question,

the radius of the cylinder is 10 cm, and the height is 14 cm.

⇒ r = 10 cm, h = 14 cm

The volume of the cylinder would be,

[tex]V_1=\pi\times 10^2\times 14\\\\V_1=\frac{22}{7}\times 100 \times 14\\\\V_1=4400~~cu.~cm.[/tex]

If the radius is halved, the radius becomes 5 cm.

The new volume of a cylinder would be,

[tex]V_2=\pi \times 5^2\times 14\\\\V_2=\frac{22}{7}\times 25 \times 14\\\\V_2=1100~~cu.~cm.[/tex]

The ratio between the original and the new volume of the cylinder is:

[tex]\Rightarrow \frac{1100}{4400}=\frac{1}{4}\\\\\Rightarrow V_2=\frac{1}{4}V_2[/tex]

This means, the volume is One-fourth of the original.

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Answer:

(a) H1: μ < 530. Reject H1 if tcalc > –1.753

(b) t calc = –1.6. There is not enough evidence to reject the manufacturer’s claim.

Step-by-step explanation:

We are given that the manufacturer of an airport baggage scanning machine claims it can handle an average of 530 bags per hour.

A sample of 16 randomly chosen hours with a mean of 510 and a standard deviation of 50 is given.

Let [tex]\mu[/tex] = average bags an airport baggage scanning machine can handle

So, Null Hypothesis, [tex]H_0[/tex] : [tex]\mu \geq[/tex] 530 bags     {means that an airport baggage scanning machine can handle an average of more than or equal to 530 bags per hour}

Alternate Hypothesis, [tex]H_A[/tex] : [tex]\mu[/tex] < 530 bags     {means that an airport baggage scanning machine can handle an average of less than 530 bags per hour}

The test statistics that would be used here One-sample t test statistics as we don't know about the population standard deviation;

                         T.S. =  [tex]\frac{\bar X-\mu}{\frac{s}{\sqrt{n} } }[/tex]  ~ [tex]t_n_-_1[/tex]

where, [tex]\bar X[/tex] = sample mean = 510

             s = sample standard deviation = 50

            n = sample of hours = 16

So, test statistics  =  [tex]\frac{510-530}{\frac{50}{\sqrt{16} } }[/tex]  ~ [tex]t_1_5[/tex]

                              =  -1.60

The value of t test statistics is -1.60.

Now, at 0.05 significance level the t table gives critical value of -1.753 at 15 degree of freedom for left-tailed test. Since our test statistics is more than the critical values of t as -1.60 > -1.753, so we have insufficient evidence to reject our null hypothesis as it will not in the rejection region due to which we fail to reject our null hypothesis.

Therefore, we conclude that an airport baggage scanning machine can handle an average of more than or equal to 530 bags per hour.

Answer:

54.98 degrees.

Step-by-step explanation:

In the diagram, the sides of the A-Frame are lengths AB and BC. The width of the cabin is length BC. We are to determine the measure of the angle at B, i.e. the angle between the two sides of the roof.

Using Cosine Rule:

[tex]b^2=a^2+c^2-2acCos B\\Cos B=\dfrac{b^2-a^2-c^2}{-2ac} \\B=arcCos(\dfrac{b^2-a^2-c^2}{-2ac} )\\a=26, b=24, c=26\\B=arcCos(\dfrac{24^2-26^2-26^2}{-2*26*26} )\\=arcCos 0.5739\\B=54.98^0[/tex]

The angle in between the two sides of the roof is 54.98 degrees.

To find the angle between the two sides of the roof of an A-frame cabin, we can use trigonometry and the Pythagorean theorem. The angle is approximately 22.33°.

To determine the angle between the two sides of the roof of an A-frame cabin, we can use trigonometry. Since the sides of the roof are both 26 feet long and the base of the cabin is 24 feet wide, we can consider the A-frame cabin as a right triangle. The roof line forms the hypotenuse of the triangle, and the sides of the triangle represent the rafters of the A-frame roof.

Using the Pythagorean theorem, we can find the height of the triangle (which is the distance from the base of the cabin to the point where the roof meets): h^2 = 26^2 - 12^2 = 676 - 144 = 532.

Taking the square root of both sides gives us h ≈ 23.07 feet.

Now, we can determine the angle by using trigonometric functions.

The sine function relates the opposite side (the height) to the hypotenuse (the roof line). So, sin(θ) = h / 26, where θ is the angle we want to find. Solving for θ gives us θ ≈ 22.33°.

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Answer:

(-7, 9]

Step-by-step explanation:

Assuming you want an answer in interval notation:

W is less than or equal to 9 >> [tex]w \leq 9[/tex]

W is greater than- 7 >> [tex]-7 < w[/tex]

Combine the two >> [tex]-7 < w \leq 9[/tex]

So in interval notation, (-7, 9]

Answer:

a) There is no significant evidence to conclude that there there is significant difference in the mean amount of paint per 1-gallon cans and 1 gallon.

b) The p-value obtained = 0.076727 > significance level (0.01), hence, we fail to reject the null hypothesis and conclude that there is no significant evidence to conclude that there there is significant difference in the mean amount of paint per 1-gallon cans and 1 gallon.

That is, the mean amount of paint per 1-gallon cans is not significantly different from 1 gallon.

c) The 99% confidence for the population mean amount of paint per 1-gallon cans is

(0.988, 0.999) in gallons.

d) The result of the 99% confidence interval does not agree with the result of the hypothesis testing performed in (a) because the right amount of paint in 1-gallon cans, 1 gallon, does not lie within this confidence interval obtained.

Step-by-step explanation:

a) This would be answered after solving part (b)

b) For hypothesis testing, the first thing to define is the null and alternative hypothesis.

The null hypothesis plays the devil's advocate and is always about the absence of significant difference between two proportions being compared. It usually contains the signs =, ≤ and ≥ depending on the directions of the test.

While, the alternative hypothesis takes the other side of the hypothesis; that there is indeed a significant difference between two proportions being compared. It usually contains the signs ≠, < and > depending on the directions of the test.

For this question, the null hypothesis is that there is no significant difference in the mean amount of paint per 1-gallon cans and 1 gallon. That is, the mean amount of paint per 1-gallon cans should be 1 gallon.

And the alternative hypothesis is that there is significant difference in the mean amount of paint per 1-gallon cans and 1 gallon. That is, the mean amount of paint per 1-gallon cans is not 1 gallon.

Mathematically,

The null hypothesis is

H₀: μ₀ = 1 gallon

The alternative hypothesis is

Hₐ: μ₀ ≠ 1 gallon

To do this test, we will use the z-distribution because we have information on the population standard deviation.

So, we compute the z-test statistic

z = (x - μ)/σₓ

x = the sample mean = 0.995 gallons

μ₀ = what the amount of paint should be; that is 1 gallon

σₓ = standard error = (σ/√n)

σ = standard deviation = 0.02 gallon

n = sample size = 50

σₓ = (0.02/√50) = 0.0028284271 = 0.00283 gallons.

z = (0.995 - 1) ÷ 0.00283

z = -1.77

checking the tables for the p-value of this z-statistic

p-value (for z = -1.77, at 0.01 significance level, with a two tailed condition) = 0.076727

The interpretation of p-values is that

When the (p-value > significance level), we fail to reject the null hypothesis and when the (p-value < significance level), we reject the null hypothesis and accept the alternative hypothesis.

So, for this question, significance level = 0.01

p-value = 0.076727

0.076727 > 0.01

Hence,

p-value > significance level

So, we fail to reject the null hypothesis and conclude that there is no significant evidence to conclude that there there is significant difference in the mean amount of paint per 1-gallon cans and 1 gallon.

That is, the mean amount of paint per 1-gallon cans is not significantly different from 1 gallon.

c) To compute the 99% confidence interval for population mean amount of paint per 1-gallon paint cans.

Confidence Interval for the population mean is basically an interval of range of values where the true population mean can be found with a certain level of confidence.

Mathematically,

Confidence Interval = (Sample Mean) ± (Margin of error)

Sample Mean = 0.995 gallons

Margin of Error is the width of the confidence interval about the mean.

It is given mathematically as,

Margin of Error = (Critical value) × (standard Error)

Critical value at 99% confidence interval is obtained from the z-tables because we have information on the population standard deviation.

Critical value = 2.58 (as obtained from the z-tables)

Standard error = σₓ = 0.00283 (already calculated in b)

99% Confidence Interval = (Sample Mean) ± [(Critical value) × (standard Error)]

CI = 0.995 ± (2.58 × 0.00283)

CI = 0.995 ± 0.0073014

99% CI = (0.9876986, 0.9993014)

99% Confidence interval = (0.988, 0.999) in gallons.

d) The result of the 99% confidence interval does not agree with the result of the hypothesis testing performed in (a) because the right amount of paint in 1-gallon cans, 1 gallon, does not lie within this confidence interval obtained.

Hope this Helps!!!

By calculating a z-value and comparing it to the critical value at alpha = 0.01, evidence can be determined. The p-value, as extreme as the calculated one assuming the null hypothesis is true, can be used to interpret the findings. Additionally, a 99% confidence interval estimate can be constructed to provide a range of values that is 99% confident in containing the true population mean amount of paint.

a. To determine whether the mean amount of paint contained in 1-gallon cans is different from 1.0 gallon, we can perform a hypothesis test. The null hypothesis (H0) is that the mean amount is 1.0 gallon, and the alternative hypothesis (Ha) is that the mean amount is different from 1.0 gallon. We can perform a z-test using the formula Z = (sample mean - population mean) / (standard deviation / sqrt(sample size)). In this case, the sample mean is 0.995 gallon, the population mean is 1.0 gallon, the standard deviation is 0.02 gallon, and the sample size is 50. By calculating the z-value, we can compare it to the critical value at alpha = 0.01 to determine whether there is evidence to reject the null hypothesis.

b. The p-value is the probability of observing a test statistic as extreme as the one calculated, assuming the null hypothesis is true. In this case, we can calculate the p-value using the standard normal distribution table or a calculator. If the p-value is less than the significance level (alpha = 0.01), we reject the null hypothesis. The interpretation of the p-value is that there is strong evidence to suggest that the mean amount of paint is different from 1.0 gallon.

c. To construct a 99% confidence interval estimate of the population mean amount of paint, we can use the formula CI = sample mean ± (z-score * (standard deviation / sqrt(sample size))). In this case, the z-score for a 99% confidence level is approximately 2.61. Plugging in the values, we can calculate the confidence interval, which gives us a range of values that we are 99% confident contains the true population mean amount of paint.

d. By comparing the results of (a) and (c), we can draw conclusions about whether the mean amount of paint is different from 1.0 gallon. If the null hypothesis is rejected in (a) and the 99% confidence interval in (c) does not include 1.0 gallon, then we can conclude that there is evidence to suggest that the mean amount is different from 1.0 gallon.

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To solve the equation x - 6 = 14, the first step is to isolate the variable 'x'. You do this by adding 6 to both sides of the equation, which results in x = 14 + 6. Therefore, 'x' equals 20.

The subject of this question is Mathematics, and it is focusing on solving a basic algebraic equation: x - 6 = 14. When you are asked to solve an equation, you're figuring out what numbers you can replace the variable with to make the equation true. In this case, the variable is 'x', and your goal is to find what number 'x' stands for. The first step to solve the equation is to isolate 'x'. This means you want 'x' to stand alone on one side of the equation. To accomplish this, you need to perform the same operation on both sides of the equation to maintain equality. Here, you would add 6 to both sides of the equation (opposite of subtracting 6), which simplifies to: x = 14 + 6. So, 'x' equals 20.

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Answer:

[tex]\frac{5}{3}x^3+\frac{9}{2}x^2-7x+8\\[/tex]

Step-by-step explanation:

Integrate your function with respect to x to get the non-differentiated form.

[tex]\int(5x^2+9x-7)dx=\frac{5}{3}x^3+\frac{9}{2}x^2-7x+c\\[/tex]

Plug in your known value of x to get your value for your constant

[tex]f(0) = 8\\ \frac{5}{3}(0^3)+\frac{9}{2}(0^2)-7(0)+c = 8 \\c=8[/tex]

This gives you your function to be

[tex]\frac{5}{3}x^3+\frac{9}{2}x^2-7x+8\\[/tex]

To find f such that f'(x) = 5x² + 9x - 7 and f(0) = 8, integrate the given function and solve for the constant of integration using the given condition. The resulting equation is f(x) = (5/3)x³ + (9/2)x² - 7x + 8.

To find f such that f'(x) = 5x² + 9x - 7 and f(0) = 8, we need to integrate f'(x) to find the equation for f(x). Let's find the antiderivative of 5x² + 9x - 7, which is  (5/3)x³ + (9/2)x² - 7x + C. To determine the value of C, we can use the given condition f(0) = 8. Substituting x = 0 into the equation, we get 8 = (5/3)(0)³ + (9/2)(0)² - 7(0) + C. Solving for C, we find that C = 8. Therefore, the equation for f(x) is f(x) = (5/3)x³ + (9/2)x² - 7x + 8.

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Answer:

The 95% CI is (6.93% , 7.47%)

The 99% CI is (6.85% , 7.55%)

Step-by-step explanation:

We have to estimate two confidence intervals (95% and 99%) for the population mean 30-year fixed mortgage rate.

We know that the population standard deviation is 0.7%.

The sample mean is 7.2%. The sample size is n=26.

The z-score for a 95% CI is z=1.96 and for a 99% CI is z=2.58.

The margin of error for a 95% CI is

[tex]E=z\cdot \sigma/\sqrt{n}=1.96*0.7/\sqrt{26}=1.372/5.099=0.27[/tex]

Then, the upper and lower bounds are:

[tex]LL=\bar x-z\cdot\sigma/\sqrt{n}=7.2-0.27=6.93\\\\ UL=\bar x+z\cdot\sigma/\sqrt{n} =7.2+0.27=7.47[/tex]

Then, the 95% CI is

[tex]6.93\leq x\leq 7.47[/tex]

The margin of error for a 99% CI is

[tex]E=z\cdot \sigma/\sqrt{n}=2.58*0.7/\sqrt{26}=1.806/5.099=0.35[/tex]

Then, the upper and lower bounds are:

[tex]LL=\bar x-z\cdot\sigma/\sqrt{n}=7.2-0.35=6.85\\\\ UL=\bar x+z\cdot\sigma/\sqrt{n} =7.2+0.35=7.55[/tex]

Then, the 99% CI is

[tex]6.85\leq x\leq 7.55[/tex]

Answer:

7 jars per box

Step-by-step explanation:

He now has 41 jars. How many did he have before his teacher gave him 6?

Well, 41-6=35. He had 35 jars before his teacher gave him more.

It says there was an equal amount of jars in each box. There are 5 boxes. Divide the total amount of jars (35) by the amount of boxes to find out how many jars are in each box.

35 jars / 5 boxes = 7 jars / box

Answer:

d. She should reject the null hypothesis because p < 0.10.

Step-by-step explanation:

We have a t statistic, so let's solve for the P-value on our calculators. (tcdf on a TI-84 calculator is 2nd->VARS->6.)

tcdf(left bound, right bound, degrees of freedom)

tcdf(1.457,999,14) = .084

.084 < P-value of .10, so we reject the null hypothesis.

Lola's conclusion should be "She should reject the null hypothesis because p< 0.10". Option D is correct.

Given information:

Lola is using a one-sample t-test for a population mean, µ, to test the null hypothesis.

[tex]\mu=40[/tex]

Sample random size is, [tex]n=15[/tex].

The value of the one-sample t-statistic is [tex]t=1.457[/tex].

The left bound will be [tex]t=1.457[/tex] and the value of [tex]n-1[/tex] will be 15-1=14.

Now, use the calculator to find the value of p. The found value of p will be,

[tex]p=0.084[/tex]

So, the value of p is less than 0.1.

Therefore, Lola's conclusion should be "She should reject the null hypothesis because p< 0.10". Option D is correct.

For more details, refer to the link:

https://brainly.com/question/17117341

Answer:

136

Step-by-step explanation:

Take 68 x 2 since the side lengths are equal.

Given the properties of isosceles triangle, where congruent sides have equal opposite angles, and that the given angle ∠SUT = 68°, it implies that ∠TUV also equals 68°.

The question involves the principles of geometry, specifically the properties of angles and congruent lines. Given that ST≅SV and m∠SUT = 68°, it means that these two line segments are equal in length and that the angle of SUT is 68 degrees.

Since ST and SV are congruent in an isosceles triangle, the angles opposite these sides are equal. Hence, the measure of ∠SUT and ∠TUV are equal. We know m∠SUT = 68°, so therefore, m∠TUV = 68°.

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There are 12 valid arrangements for Sunhee to line up the four plastic shapes so that the circle is not next to the square.

In how many ways can Sunhee line up four plastic shapes (a square, a circle, and a pentagon) if the circle cannot be next to the square?

To solve this problem, we can count the total number of ways to arrange the shapes and then subtract the cases where the circle is next to the square.

1. Total ways to arrange the shapes:

Answer:

(-8-3)/(-8+10)= -11/2

y - 3 = -11/2(x+10)

y-3=-11/2x-55

y=-11/2x-52

Step-by-step explanation:

Answer:

128.86 square cm

Step-by-step explanation:

Area of shaded region = Area of rectangle - Area of circle

[tex] = 11 \times 12 - \pi {r}^{2} \\ = 132 - 3.14 \times {1}^{2} \\ = 132 - 3.14 \\ = 128.86 \: {cm}^{2} \\ [/tex]

Answer:

128.86

Step-by-step explanation:

Answer:

1/15

Step-by-step explanation:

Step-by-step explanation:

I hope this is what you need

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Answer:

162 inches

Step-by-step explanation:

To get the answer you would have to know how many inches are a yard. The answer is 36. So you would have to multiply 4.5 by 36.

Answer:

Conversions :

1 ft = 12 in.

3 ft = 1 yard

Step-by-step explanation:

[tex]4.5 yards (\frac{3 ft}{1 yard} ) ( \frac{12 in.}{1 ft} ) = 162[/tex]