1 point) Use Newton's method to approximate a root of the equation 4x 3
+4x 2
+3=0 as follows: Let x 1
​
=−1 be the initial approximation. The second approximation x 2
​
is and the third approximation x 3
​
is

Roland purchased five computers for $3,300 and received a 20% trade discount. The amount Roland paid for the computers after the discount was $2,640.

To calculate the amount Roland paid for the computers, we need to determine the discounted price after applying the 20% trade discount. The trade discount reduces the original price by 20%.

Let's denote the original price of the computers as 'X'. To find the discounted price, we can calculate 20% of X by multiplying X by 0.20, which gives us 0.20X. The discounted price will be the original price minus the trade discount, so the equation becomes X - 0.20X.

Given that Roland purchased five computers for a total of $3,300, we can set up an equation: 5X - 0.20(5X) = $3,300. Simplifying the equation, we have 5X - X = $3,300, which gives us 4X = $3,300.

Dividing both sides of the equation by 4, we find X = $825, which represents the original price of one computer. To calculate the amount Roland paid, we multiply the original price by the number of computers purchased: $825 * 5 = $4,125.

Therefore, Roland paid a total of $4,125 for the computers.

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The distance from the point (4, 9, 4) to the plane 6y + 8z = 0 is 9 units.

Given information: Point = (4, 9, 4) and plane equation = 6y + 8z = 0

The distance between a point and a plane can be calculated by using the formula mentioned below:

d(P, plane) = |ax + by + cz + d|/√(a² + b² + c²)

where a, b, and c are the coefficients of x, y, and z in the plane equation, and d is the constant term.

Let's identify the values of a, b, c, and d for the given plane equation:

6y + 8z = 0a

= 0b

= 6c

= 8d

= 0

Now, let's substitute the values in the above formula and calculate the distance:

d(P, plane) = |0(4) + 6(9) + 8(4) + 0|/√(0² + 6² + 8²)

= 90/10

= 9 units

Therefore, the distance from the point (4, 9, 4) to the plane 6y + 8z = 0 is 9 units.

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An investment compounded continuously at 6.1% for 13 years grew to $8,600. The initial investment is approximately $3891.4

To find the initial investment, we can use the formula for continuous compound interest:

A = P * e^(rt),

where A is the final amount, P is the principal (initial investment), e is the base of the natural logarithm (approximately 2.71828), r is the interest rate, and t is the time in years.

In this case, we know that A = $8,600, r = 6.1% (or 0.061 as a decimal), and t = 13 years. We need to solve for P.

Substituting the given values into the formula, we have:

$8,600 = P * e^(0.061 * 13).

To solve for P, we divide both sides of the equation by e^(0.061 * 13):

P = $8,600 / e^(0.061 * 13).

The value of e^(0.061 * 13) ≈ 2.71828^(0.793) ≈ 2.210.

Therefore, the initial investment P is:

P ≈ $8,600 / 2.210 ≈ $3891.4

Hence, the initial investment was approximately $3891.4

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A) The x-intercept of the line 3x+4y−24 is (8,0).

B) The y-intercept of the line 3x+4y−24 is (0,6).

To find the x-intercept, we set y = 0 and solve the equation 3x+4(0)−24 = 0. Simplifying this equation gives us 3x = 24, and solving for x yields x = 8. Therefore, the x-intercept is (8,0).

To find the y-intercept, we set x = 0 and solve the equation 3(0)+4y−24 = 0. Simplifying this equation gives us 4y = 24, and solving for y yields y = 6. Therefore, the y-intercept is (0,6).

The x-intercept represents the point at which the line intersects the x-axis, which means the value of y is zero. Similarly, the y-intercept represents the point at which the line intersects the y-axis, which means the value of x is zero. By substituting these values into the equation of the line, we can find the corresponding intercepts.

In this case, the x-intercept is (8,0), indicating that the line crosses the x-axis at the point where x = 8. The y-intercept is (0,6), indicating that the line crosses the y-axis at the point where y = 6.

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In the case where both salespeople have identical earnings for a week (15 sales), their total weekly earnings would be $750 each.

To represent each salesperson's weekly earnings for sales of x items, we can build linear equations. The first salesperson's earnings can be represented by the equation E1(x) = 225 + 35x, where x is the number of sales made.

The second salesperson's earnings can be represented by the equation E2(x) = 150 + 40x. To find the number of sales that would result in both salespeople having identical earnings for a week, we need to solve the equation E1(x) = E2(x).

The total weekly earnings for each salesperson in that case can also be calculated.

The first salesperson has a weekly base salary of $225 and earns an additional $35 for each sale made. Therefore, their earnings can be represented by the equation E1(x) = 225 + 35x, where x is the number of sales made.

The second salesperson has a weekly base salary of $150 and earns an additional $40 for each sale made. Their earnings can be represented by the equation E2(x) = 150 + 40x.

To find the number of sales that would result in both salespeople having identical earnings for a week, we set the two equations equal to each other: E1(x) = E2(x). This gives us the equation 225 + 35x = 150 + 40x. By solving this equation, we can determine the number of sales that would result in equal earnings.

Once we find the number of sales, we can substitute it back into either E1(x) or E2(x) to calculate the total weekly earnings for each salesperson in that case.

To solve the equation 225 + 35x = 150 + 40x, we can start by subtracting 35x and 150 from both sides of the equation:

225 + 35x - 35x - 150 = 150 + 40x - 35x - 150

This simplifies to:

75 = 5x

Next, we divide both sides of the equation by 5 to isolate x:

75/5 = 5x/5

This gives us:

15 = x

Therefore, the number of sales that would result in both salespeople having identical earnings for a week is 15.

To calculate the total weekly earnings for each salesperson in that case, we can substitute the value of x back into either E1(x) or E2(x).

For the first salesperson (E1(x) = 225 + 35x):

E1(15) = 225 + 35(15)

E1(15) = 225 + 525

E1(15) = 750

For the second salesperson (E2(x) = 150 + 40x):

E2(15) = 150 + 40(15)

E2(15) = 150 + 600

E2(15) = 750

Therefore, in the case where both salespeople have identical earnings for a week (15 sales), their total weekly earnings would be $750 each.

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During the record-breaking run, the cheetah was traveling at an approximate speed of 37.282 miles per hour.

To calculate the cheetah's speed in miles per hour, we need to convert the distance and time from meters and seconds to miles and hours, respectively.

1 mile is equal to approximately 1609.34 meters, and 1 hour is equal to 3600 seconds.

Distance in miles:

100 meters = 100 / 1609.34 miles

Time in hours:

5.95 seconds = 5.95 / 3600 hours

Now, we can calculate the speed in miles per hour by dividing the distance (in miles) by the time (in hours):

Speed = (100 / 1609.34) / (5.95 / 3600) miles per hour

Simplifying the expression:

Speed ≈ (100 * 3600) / (1609.34 * 5.95) miles per hour

Calculating the approximate value:

Speed ≈ 37.282 miles per hour

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The function r(t) = ⟨2sin(5t), 0, 3+2cos(5t)⟩ traces a circle. The radius of the circle is 2 units, and the center is located at the point (0, 0, 3). The circle lies in the xy-plane.

To determine the radius of the circle, we can analyze the expression for r(t) = ⟨2sin(5t), 0, 3+2cos(5t)⟩. In this case, the x-coordinate is given by 2sin(5t), the y-coordinate is always 0, and the z-coordinate is 3+2cos(5t). Since the y-coordinate is always 0, the circle lies in the xz-plane.

For a circle with center (a, b, c) and radius r, the general equation of a circle can be expressed as (x-a)² + (y-b)² + (z-c)² = r². Comparing this equation with the given function r(t), we can determine the values of the center and radius.

In our case, the x-coordinate is 2sin(5t), which means the center lies at x = 0. The y-coordinate is always 0, so the center's y-coordinate is 0. The z-coordinate is 3+2cos(5t), so the center's z-coordinate is 3. Therefore, the center of the circle is (0, 0, 3).

To find the radius, we need to consider the distance from the center to any point on the circle. Since the x-coordinate ranges from -2 to 2, we can see that the maximum distance from the center to any point on the circle is 2 units. Hence, the radius of the circle is 2 units.

In conclusion, the circle traced by the function r(t) = ⟨2sin(5t), 0, 3+2cos(5t)⟩ has a radius of 2 units and is centered at (0, 0, 3). It lies in the xy-plane, as the y-coordinate is always 0.

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The test would be done at 0.10/2 = 0.05 significance level.

To determine if the mean weights differ between baby boys and girls, we need to state the appropriate null and alternative hypotheses.

Null hypothesis (H0): The mean weight of baby boys (μ1) is equal to the mean weight of baby girls (μ2)).

Alternative hypothesis (H1): The mean weight of baby boys (μ1) is not equal to the mean weight of baby girls (μ2)

Since we are comparing the means of two independent samples, this is a two-sample t-test. The null hypothesis assumes that there is no difference in the mean weights between baby boys and girls. The alternative hypothesis suggests that there is a difference.

In this case, we will use the P-value method with a significance level of α = 0.10 to determine if there is enough evidence to reject the null hypothesis. The P-value is the probability of obtaining a test statistic as extreme as the observed one, assuming that the null hypothesis is true.

To perform the two-sample t-test and calculate the P-value, we can use statistical software like Excel or a statistical calculator. We will need the sample weights for boys and girls.

The given data are as follows:

Boys: 7.6, 6.4, 8.1, 7.9, 8.3, 7.3, 6.4, 8.4, 8.5, 6.9, 6.3, 7.4, 7.8, 7.5, 6.9, 7.8, 8.6, 7.7, 7.4

Girls: 7.0, 8.2, 7.4, 6.0, 6.7, 8.2, 7.5, 5.7, 6.6, 6.8, 7.5, 7.2, 6.9, 8.2, 6.5, 6.7, 7.2, 6.3, 5.9

By performing the two-sample t-test and calculating the P-value, we can determine if there is enough evidence to conclude that the mean weights differ between baby boys and girls.

Here are the null and alternate hypotheses that would be suitable for this case:

Null Hypothesis, H0: µ1 = µ2

Alternate Hypothesis, H1: µ1 ≠ µ2

Since it's a two-tailed test, the test would be done at 0.10/2 = 0.05 significance level.

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The test would be done at 0.10/2 = 0.05 significance level. it's a two-tailed test, the test would be done at  0.05 significance level. we need to state the appropriate null and alternative hypotheses.

If the mean weights differ between baby boys and girls, we need to state the appropriate null and alternative hypotheses.

Null hypothesis (H0): The mean weight of baby boys (μ1) is equal to the mean weight of baby girls (μ2)).

Alternative hypothesis (H1): The mean weight of baby boys (μ1) is not equal to the mean weight of baby girls (μ2)

Since we are comparing the means of two independent samples, this is a two-sample t-test. The null hypothesis assumes that there is no difference in the mean weights between baby boys and girls. The alternative hypothesis suggests that there is a difference.

In this case, we will use the P-value method with a significance level of α = 0.10 to determine if there is enough evidence to reject the null hypothesis. The P-value is the probability of obtaining a test statistic as extreme as the observed one, assuming that the null hypothesis is true.

To perform the two-sample t-test and calculate the P-value, we can use statistical software like Excel or a statistical calculator. We will need the sample weights for boys and girls.

The given data are as follows:

Boys: 7.6, 6.4, 8.1, 7.9, 8.3, 7.3, 6.4, 8.4, 8.5, 6.9, 6.3, 7.4, 7.8, 7.5, 6.9, 7.8, 8.6, 7.7, 7.4

Girls: 7.0, 8.2, 7.4, 6.0, 6.7, 8.2, 7.5, 5.7, 6.6, 6.8, 7.5, 7.2, 6.9, 8.2, 6.5, 6.7, 7.2, 6.3, 5.9

By performing the two-sample t-test and calculating the P-value, we can determine if there is enough evidence to conclude that the mean weights differ between baby boys and girls.

Here are the null and alternate hypotheses that would be suitable for this case:

Null Hypothesis, H0: µ1 = µ2

Alternate Hypothesis, H1: µ1 ≠ µ2

Since  0.10/2 = 0.05 significance level.

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(a) In an inverse variation, the equation relating the variables can be written as:

y = k/x

where k is the constant of variation. To find the value of k, we can use the given information. We know that when x = 4, y = 3. Substituting these values into the equation, we get:

3 = k/4

To solve for k, we can multiply both sides of the equation by 4:

12 = k

So the inverse variation equation relating x and y is:

y = 12/x

(b) To find y when x = 15, we can substitute x = 15 into the equation we found in part (a):

y = 12/15

Simplifying the expression, we get:

y = 4/5

Therefore, when x = 15, y = 4/5.

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Therefore, a westbound driver will travel 16 miles more by taking the detour than if they could stay on the highway. Among the given options, the closest value to 16 is 14 that is option G.

To determine the additional distance traveled by taking the detour compared to staying on the highway, we can calculate the distances traveled in each direction.

On the map, the detour involves:

Traveling 1 mile straight west

Traveling 2 miles straight north

Traveling 6 miles straight west

Traveling 3 miles straight south

Traveling 1 mile straight east

Traveling 3 miles straight south

Adding up these distances, we get:

1 + 2 + 6 + 3 + 1 + 3 = 16 miles.

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The driver taking the detour will travel an additional 9 miles compared to the direct distance on the highway.

The question is about calculating the extra distance that a driver would need to travel while taking a detour compared to the direct distance on a straight, flat highway. The detour includes going 1 mile west, 2 miles north, 6 miles west, 3 miles south, 1 mile east, and 3 miles south. These individual distances add up to a total of 16 miles. The original highway is a straight line, which can be viewed as 7 miles west on a flat map (1 mile west before the detour and 6 miles west as part of the detour). Therefore, the driver taking the detour will have to travel an additional 9 miles.

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(a) The elements in the intersect of the two subsets is A∩B = {1, 3}.

(b) The elements in the intersect of the two subsets is A∩B = {3, 5}

(c) The elements in the intersect of the two subsets is A∩B = {6}

The Venn diagram representation of the elements is determined as follows;

(a) The elements in the Venn diagram for the subsets are;

A = {1, 3, 5} and B = {1, 3, 7}

A∪B = {1, 3, 5, 7}

A∩B = {1, 3}

(b) The elements in the Venn diagram for the subsets are;

A = {2, 3, 4, 5} and B = {1, 3, 5, 7, 9}

A∪B = {1, 2, 3, 4, 5, 7, 9}

A∩B = {3, 5}

(c) The elements in the Venn diagram for the subsets are;

A = {2, 6, 10} and B = {1, 3, 6, 9}

A∪B = {1, 2, 3, 6, 9, 10}

A∩B = {6}

The Venn diagram is in the image attached.

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The probabilities are

5. The probability that the tenth person is the fifth one to own a dog is  0.000175.

6. (a) The probability of passing on the third try is 0.063 or 6.3%.

(b) The probability of passing before the fourth try is 0.973 or 97.3%.

To determine the probabilities,

5. To find the probability, that the tenth person randomly interviewed in the city is the fifth one to own a dog, we can use the concept of independent events.

Since the probability that a person owns a dog is 0.3, the probability that a person does not own a dog is 1 - 0.3 = 0.7.

To calculate the probability that the tenth person is the fifth one to own a dog, we need to consider the following:

The first four people interviewed must not own a dog (probability of not owning a dog: 0.7).

The fifth person interviewed must own a dog (probability of owning a dog: 0.3).

The remaining five people interviewed can own a dog or not (probability of owning/not owning a dog: 0.3/0.7).

Therefore, the probability is calculated as follows:

(0.7)^4 * (0.3) * (0.3)^5 = 0.7^4 * 0.3^6 = 0.2401 * 0.000729 ≈ 0.000175.

Hence, the probability that the tenth person randomly interviewed in the city is the fifth one to own a dog is approximately 0.000175.

6. For the probability that a given student pilot will pass the written test for a private pilot's license, we are given that the probability of passing is 0.7.

(a) To find the probability that the student will pass the test on the third try, we need to consider the following:

The first two attempts must result in a failure (probability of failing: 1 - 0.7 = 0.3).

The third attempt must result in a pass (probability of passing: 0.7).

Therefore, the probability is calculated as follows:

(0.3)^2 * (0.7) = 0.09 * 0.7 = 0.063.

The probability that the student will pass the test on the third try is 0.063 or 6.3%.

(b) To find the probability that the student will pass the test before the fourth try, we need to consider the following:

The student can pass on the first, second, or third try.

The probability of passing on any given try is 0.7.

Therefore, the probability is calculated as follows:

1 - (0.3)^3 = 1 - 0.027 = 0.973.

The probability that the student will pass the test before the fourth try is 0.973 or 97.3%.

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The linear equality that will not have a shared solution set with the graphed linear inequality is y > 2/5x + 2. So, option A is the correct answer.

To determine which linear equality will not have a shared solution set with the graphed linear inequality, we need to compare the slopes and intercepts of the inequalities.

The given graphed linear inequality is y > -5/2x - 3.

Let's analyze each option:

A. y > 2/5x + 2:

The slope of this inequality is 2/5, which is different from -5/2, the slope of the graphed inequality. Therefore, option A will not have a shared solution set.

B. y < -5/2x - 7:

The slope of this inequality is -5/2, which is the same as the slope of the graphed inequality. However, the intercept of -7 is different from -3, the intercept of the graphed inequality. Therefore, option B will have a shared solution set.

C. y > -2/5x - 5:

The slope of this inequality is -2/5, which is different from -5/2, the slope of the graphed inequality. Therefore, option C will not have a shared solution set.

D. y < 5/2x + 2:

The slope of this inequality is 5/2, which is different from -5/2, the slope of the graphed inequality. Therefore, option D will not have a shared solution set.

Based on the analysis, the linear inequality that will not have a shared solution set with the graphed linear inequality is option A: y > 2/5x + 2.

The question should be:

Which linear equality will not have a shared solution set with the graphed linear inequality?

graphed linear equation: y>-5/2x-3 (greater then or equal to)

A. y >2/5 x + 2

B. y <-5/2 x – 7

C. y >-2/5 x – 5

D. y <5/2 x + 2

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Answer:

b

Step-by-step explanation:

y<-5/2x - 7

The area of the rectangle of length 13cm and width 9cm is 117 square cm.

Let's assume the width of the rectangle is x cm. Since the length is 4 cm longer than the width, the length would be (x + 4) cm.

The formula for the perimeter of a rectangle is given by: P = 2(length + width).

Substituting the given values, we have:

44 cm = 2((x + 4) + x).

Simplifying the equation:

44 cm = 2(2x + 4).

22 cm = 2x + 4.

2x = 22 cm - 4.

2x = 18 cm.

x = 9 cm.

Therefore, the width of the rectangle is 9 cm, and the length is 9 cm + 4 cm = 13 cm.

The area of a rectangle is given by: A = length × width.

Substituting the values, we have:

A = 13 cm × 9 cm.

A = 117 cm^2.

Hence, the area of the rectangle is 117 square cm.

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The scale factor of the model car is 1:61.23.

To determine the scale factor, we need to compare the length of the actual car to the length of the model car. The length of the actual car is given as 16 3/4 feet, which can be converted to inches as (16 x 12) + 3 = 195 inches. The length of the model car is given as 3 1/4 inches.

To find the scale factor, we divide the length of the actual car by the length of the model car: 195 inches ÷ 3.25 inches = 60. In the scale factor notation, the first number represents the actual car, and the second number represents the model car. Therefore, the scale factor of the model car is 1:61.23.

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Thus, the area of the parallelogram is given by:Area of the parallelogram = |u x v| = |ac| = ac.

1. The determinant of the matrix A is -1. To compute the determinant of matrix B, let det(B) = D.

We have:|B| = |3pq + ax - 2py|   |3pq + ax - 2py|   |3pq + ax - 2py||3qr + by - 2pz| + |-3pr - cy + 2qx| + |-2px + 3ry + cz||3qr + by - 2pz|   |3qr + by - 2pz|   |3qr + by - 2pz||-2px + 3ry + cz|D

= (3pq + ax - 2py)(3qr + by - 2pz)(-2px + 3ry + cz) - (3pq + ax - 2py)(-3pr - cy + 2qx)(-2px + 3ry + cz)|B|

 D = (3pq + ax - 2py)[(3r + b)y - 2pz] - (3pq + ax - 2py)[-3pc + 2qx + (2p - a)z]

= (3pq + ax - 2py)[3ry - 2pz + 3pc - 2qx - 2pz + 2az]

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)] = (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]  D

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]

Thus, det(B) = D

= (3pq + ax - 2py)[3r(y - p) - 2q(z - p) + 2a(z - p)]2.

To compute the determinant of the matrix A, use the following formula:|A| = -5[(0)(-8) - (2)(-3)] - 1[(2)(2) - (0)(-3)] + (-3)[(2)(0) - (5)(-3)]

= -8 - (-6) - 45

= -47 Thus, the determinant of the matrix A is -47.3.

The area of a parallelogram is given by the cross product of the two vectors that form the parallelogram.

Here, the two vectors are u and v.

Thus, the area of the parallelogram is given by:Area of the parallelogram = |u x v| = |ac| = ac.

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The area of the parallelogram determined by `0`, `u`, `v`, and `u + v` is `ac`.

1. To compute `det [-x 3p+a 2p; -y 3q+b 2q; -z 3r+c 2r]`,

we should use the formula of the determinant of a matrix that has the form of `[a b c; d e f; g h i]`.

The formula is `a(ei − fh) − b(di − fg) + c(dh − eg)`.Let `M = [-x 3p+a 2p; -y 3q+b 2q; -z 3r+c 2r]`.

Applying the formula, we obtain:

det(M) = `-x(2q)(3r + c) - (3q + b)(2r)(-x) + (-y)(2p)(3r + c) + (3p + a)(2r)(-y) - (-z)(2p)(3q + b) - (3p + a)(2q)(-z)

= -2(3r + c)(px - qy) - 2(3q + b)(-px + rz) - 2(3p + a)(qz - ry)

= -2(3r + c)(px - qy + rz - qz) - 2(3q + b)(-px + rz + qz - py) - 2(3p + a)(qz - ry - py + qx)

= -2(3r + c)(p(x + z - q) - q(y + z - r)) - 2(3q + b)(-p(x - y + r - z) + q(z - y + p)) - 2(3p + a)(q(z - r + y - p) - r(x + y - q + p))

= -2[3r + c + 2(3q + b) + 3p + a](p(x + z - q) - q(y + z - r)) - 2[3q + b + 2(3p + a) + 3r + c](-p(x - y + r - z) + q(z - y + p))`.

But `det(A) = -1`,

so we have:`

-1 = det(A) = det(M) = -2[3r + c + 2(3q + b) + 3p + a](p(x + z - q) - q(y + z - r)) - 2[3q + b + 2(3p + a) + 3r + c](-p(x - y + r - z) + q(z - y + p))`.

Therefore:

`1 = 2[3r + c + 2(3q + b) + 3p + a](p(x + z - q) - q(y + z - r)) + 2[3q + b + 2(3p + a) + 3r + c](-p(x - y + r - z) + q(z - y + p))`.

2. Using the cofactor expansion down the second column,

we obtain:`det(A) = -2⋅(1)⋅(2)⋅(-3) + (−2)⋅(−3)⋅(2) + (5)⋅(2)⋅(2) = 12`.

Therefore, `det(A) = 12`.3.

We need to use the formula for the area of a parallelogram that is determined by two vectors.

The formula is: `area = |u x v|`, where `u x v` is the cross product of vectors `u` and `v`.

In our case, `u = [a; b]` and `v = [0; c]`. We have: `u x v = [0; 0; ac]`.

Therefore, `area = |u x v| = ac`.

Thus, the area of the parallelogram determined by `0`, `u`, `v`, and `u + v` is `ac`.

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By finding 59% of 50.7 million we know that approximately 29.9 million travelers are originating from the Southeast.

To find the number of travelers originating from the southeast, we need to calculate 59% of the total number of travelers.
The total number of travelers estimated is 50.7 million.
To find 59% of 50.7 million, we can multiply 50.7 million by 0.59:
[tex]50.7 million * 0.59 = 29.913 million[/tex]

Therefore, approximately 29.9 million travelers are originating from the Southeast.

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To the nearest tenth of a million, approximately 20.3 million travelers are originating from the southeast region.

The ratio of the numbers of travelers from the southeast, midwest, and northeast regions is given as 6:5:4, respectively. To find the number of travelers originating from the southeast region, we need to determine the value of one part of the ratio.

Let's assume the common ratio value is "x". According to the given ratio, the number of travelers from the southeast region can be represented as 6x.

We know that the total number of travelers is estimated to be 50.7 million. Therefore, we can set up the following equation:

6x + 5x + 4x = 50.7

Combining like terms, we get:

15x = 50.7

To solve for x, we divide both sides of the equation by 15:

x = 50.7 / 15

Evaluating this expression, we find:

x ≈ 3.38

Now, to find the number of travelers originating from the southeast region, we multiply the value of x by the corresponding ratio:

6x ≈ 6 * 3.38 ≈ 20.28 million

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The equation of the tangent line to the curve [tex]\(y = 2\tan x\)[/tex] at the point [tex]\(\left(\frac{\pi}{4}, 2\right)\) is \(y = 4x - (\pi - 2)\)[/tex], where [tex]\(\theta = \frac{\pi}{4}\) and \(b = \pi - 2\)[/tex].

To find the equation of the tangent line to the curve [tex]\(y = 2\tan x\)[/tex]at the point [tex]\(\left(\frac{\pi}{4}, 2\right)\)[/tex], we need to determine the slope of the tangent line and the point where it intersects the y-axis.

The slope of the tangent line can be found by taking the derivative of the function [tex]\(y = 2\tan x\)[/tex] with respect to x:

[tex]\(\frac{dy}{dx} = \frac{d}{dx}(2\tan x)\)[/tex]

Using the derivative of the tangent function, which is[tex]\(\sec^2 x\)[/tex], we have:

[tex]\(\frac{dy}{dx} = 2\sec^2 x\)[/tex]

To find the slope at \(x = \frac{\pi}{4}\), substitute the value into the derivative:

\(\frac{dy}{dx} \bigg|_{x = \frac{\pi}{4}} = 2\sec^2 \left(\frac{\pi}{4}\right)\)

Since \(\sec^2 \left(\frac{\pi}{4}\right) = 2\), the slope is:

\(\frac{dy}{dx} \bigg|_{x = \frac{\pi}{4}} = 2(2) = 4\)

Now that we have the slope, we can use the point-slope form of a line to find the equation of the tangent line:

\(y - y_1 = m(x - x_1)\)

Substituting the values \((x_1, y_1) = \left(\frac{\pi}{4}, 2\right)\) and \(m = 4\), we have:

\(y - 2 = 4(x - \frac{\pi}{4})\)

Simplifying, we get:

\(y - 2 = 4x - \pi\)

Finally, rearranging the equation in the desired form \(y = mx + b\), we have:

\(y = 4x - \pi + 2\)

Therefore, the equation of the tangent line to the curve \(y = 2\tan x\) at the point \(\left(\frac{\pi}{4}, 2\right)\) is \(y = 4x - (\pi - 2)\), where \(\theta = \frac{\pi}{4}\) and \(b = \pi - 2\).

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The variable \(x\) represents the independent variable, typically corresponding to the horizontal axis, while \(f(x)\) represents the function that defines the curve or shape within the region of interest.

The integral calculates the signed area between the curve and the x-axis, within the interval from \(a\) to \(b\).

In the context of the problem, the value of \(a\) corresponds to the left endpoint of the region of interest, while \(b\) corresponds to the right endpoint.

By evaluating the definite integral \(\int_{a}^{b} f(x) dx\), we calculate the area between the curve \(f(x)\) and the x-axis, limited by the values of \(a\) and \(b\). The integral essentially sums up an infinite number of infinitesimally small areas, resulting in the total area within the given range.

This mathematical concept is fundamental in various fields, including calculus, physics, and engineering, allowing us to determine areas, volumes, and other quantities by means of integration.

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The value of the double integral as (π²/96)(e^(4) - 1) and to evaluate the double integral ∬ R e^(16x^2 + 9y^2) dA over the region R in the first quadrant bounded by the ellipse 16x^2 + 9y^2 = 1, we can make use of an appropriate change of variables.

By employing elliptical coordinates, we can convert the integral into a standard form, allowing for easier computation. The given integral can be evaluated using elliptical coordinates to simplify the integral bounds. We introduce the transformation:

x = (1/4)ρcosθ

y = (1/3)ρsinθ

Applying the change of variables, we have dA = (1/12)ρ dρ dθ. The bounds for the transformed variables are as follows: 0 ≤ ρ ≤ 1 and 0 ≤ θ ≤ π/2.

Now, substituting the change of variables into the integral, we get:

∬ R e^(16x^2 + 9y^2) dA = ∫₀^(π/2) ∫₀¹ e^(16(1/4)ρ²cos²θ + 9(1/3)ρ²sin²θ) (1/12)ρ dρ dθ

Simplifying the exponent and rearranging, we have:

∬ R e^(16x^2 + 9y^2) dA = (1/12) ∫₀^(π/2) ∫₀¹ e^(4ρ²(cos²θ + 3sin²θ)) ρ dρ dθ

Using the fact that cos²θ + 3sin²θ = 1, the integral becomes:

∬ R e^(16x^2 + 9y^2) dA = (1/12) ∫₀^(π/2) ∫₀¹ e^(4ρ²) ρ dρ dθ

The inner integral can be solved easily, resulting in (1/12) ∫₀^(π/2) (1/8)(e^(4) - 1) dθ = (π/96)(e^(4) - 1).

Finally, integrating with respect to θ from 0 to π/2, we obtain the value of the double integral as (π²/96)(e^(4) - 1).

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Given, f(2) = 15, f-1(4) = 1

To find:

The value of w in the expression

f(w) = 4

Using the given information, we can solve the problem as follows:

Since f-1(4) = 1, we can say that f(1) = 4 (since f and f-1 are inverse functions, they undo each other)

Now, let's use the point (2, 15) to find the equation of the line in slope-intercept form:

y - y1 = m(x - x1),

where (x1, y1) = (2, 15)

Let's first find the slope m:

m = (y2 - y1) / (x2 - x1),

where (x2, y2) is any other point on the line

Let's take the point (1, 4) since we know that this point lies on the line:

m = (4 - 15) / (1 - 2)

= 11

The equation of the line in slope-intercept form:

y - 15 = 11(x - 2)

y = 11x - 7

Now we can use this equation to find the value of w for which f(w) = 4.

We have:

y = 11x - 7

f(w) = 4

Substituting f(w) with 4, we have:

11w - 7 = 4

Solving for w, we get:

w = 11/7

Therefore, the value of w in the expression

f(w) = 4 is 11/7.

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Answer:

[tex]\boxed{\tt \int (5x - 2)log(x) dx = log(x) *( \frac{5}{2}x^2 - 2x)- \frac{5}{4}x^2 + 2x + C}[/tex]

Step-by-step explanation:

The integral of  [tex]\tt \int (5x-2)log(x) dx[/tex]   can be evaluated using integration by parts. The formula for integration by parts is:

[tex]\tt \int u \:dv = uv - \int v \:du[/tex]

where u and v are functions of x and du and dv are their respective differentials.

Let's choose

By using ILATE rule

where

I= Inverse

L=logarithm

A=Algebraic

T=Trigonometry

E= Exponential

Over here:

[tex]\tt u = log(x)[/tex]  (This will be the first function to differentiate.)

[tex]\tt dv = (5x - 2) dx[/tex]  (This will be the second function to integrate.)

Now, we need to find du and v:

For du.

[tex]\tt d\:u = d\: log(x)\:dx\\Differentiate \:\:u \:with\: respect\: to\: x\\= \frac{1}{x}\:dx[/tex]

For v.

[tex]\tt v = \int (5x - 2) \: dx\\ Differentiate \:u \:with \:respect \:to\: x\\\int 5x \:dx \:-\:\int 2\:dx\\=5*\frac{x^{1+1}}{1+1} - 2*\frac{x^{0+1}}{0+1} +c\\=\frac{5}{2}x^2-2x+c[/tex]  

Using the integration by parts formula, we have:

Simplifying further:

[tex]\tt \int (5x - 2)log(x) dx = log(x) * (\frac{5}{2}x^2 - 2x)- \int \frac{5}{2}x - 2\: dx\\ = log(x) *( \frac{5}{2}x^2 - 2x)- \frac{5}{4}x^2 + 2x + C,[/tex]

where C is the constant of integration.

Therefore:

[tex]\boxed{\tt \int (5x - 2)log(x) dx = log(x) *( \frac{5}{2}x^2 - 2x)- \frac{5}{4}x^2 + 2x + C}[/tex]

Answer:

[tex]\left(\dfrac{5}{2}x^2-2x\right)\log x-\dfrac{5}{4}x^2+2x+C[/tex]

Step-by-step explanation:

If differentiating takes you from one function to another, then integrating the second function will take you back to the first with a constant of integration.

[tex]\boxed{\displaystyle \int \text{f}(x)\:\text{d}x=\text{F}(x)+\text{C} \iff \text{f}(x)=\dfrac{\text{d}}{\text{d}x}(\text{F}(x)}[/tex]

To evaluate the given indefinite integral, use integration by parts.

[tex]\boxed{\begin{minipage}{4.6 cm}\underline{Integration by parts} \\\\$\displaystyle \int u \dfrac{\text{d}v}{\text{d}x}\:\text{d}x=uv-\int v\: \dfrac{\text{d}u}{\text{d}x}\:\text{d}x$ \\ \end{minipage}}[/tex]

Given indefinite integral:

[tex]\displaystyle \int (5x-2)\log x\; \text{d}x[/tex]

Begin by working out which part should be u and which part should be dv/dx. As it is easier to differentiate log(x), and integrate (5x - 2), then:

[tex]\text{Let\;$u=\log x$}[/tex]

[tex]\text{Let\;$\dfrac{\text{d}v}{\text{d}x}=5x-2$}[/tex]

Differentiate u with respect to x:

[tex]u=\log x\implies \dfrac{\text{d}u}{\text{d}x}=\dfrac{1}{x}[/tex]

Integrate dv/dx to find v:

[tex]\begin{aligned}v= \displaystyle \int (5x-2)\; \text{d}x&=5\int x\; \text{d}x-\int 2\;\text{d}x\\\\&=5 \cdot \dfrac{x^2}{2}-2x\;(+\;C)\\\\&=\dfrac{5}{2}x^2-2x\;(+\;C)\end{aligned}[/tex]

Substitute the values into the integration by parts formula to evaluate the indefinite integral:

[tex]\begin{aligned}\displaystyle\int u\dfrac{\text{d}v}{\text{d}x}\:\text{d}x&=uv-\int v\: \dfrac{\text{d}u}{\text{d}x}\:\text{d}x\\\\\implies\int(5x-2)\log x\;\text{d}x&=\log x\cdot\left(\dfrac{5}{2}x^2-2x\right)-\int\left[\left(\dfrac{5}{2}x^2-2x\right)\: \dfrac{1}x}\right]\:\text{d}x\\\\&=\left(\dfrac{5}{2}x^2-2x\right)\log x-\int\left(\dfrac{5}{2}x-2\right)\:\text{d}x\\\\&=\left(\dfrac{5}{2}x^2-2x\right)\log x-\left(\frac{5}{4}x^2-2x\right)+C\end{aligned}[/tex]

                                     [tex]=\left(\dfrac{5}{2}x^2-2x\right)\log x-\dfrac{5}{4}x^2+2x+C[/tex]

Therefore, the evaluation of the given indefinite integral is:

[tex]\boxed{\displaystyle \int (5x-2)\log x\; \text{d}x=\left(\dfrac{5}{2}x^2-2x\right)\log x-\dfrac{5}{4}x^2+2x+C}[/tex]

[tex]\hrulefill[/tex]

Differentiation and Integration rules:

[tex]\boxed{\begin{minipage}{5.1 cm}\underline{Differentiating $\log x$}\\\\If $y=\log x$, then $\dfrac{\text{d}y}{\text{d}x}=\dfrac{1}{x}$\\\end{minipage}}[/tex]

[tex]\boxed{\begin{minipage}{5.1 cm}\underline{Integrating $x^n$}\\\\$\displaystyle \int x^n\:\text{d}x=\dfrac{x^{n+1}}{n+1}\;(+\;\text{C})$\end{minipage}}[/tex]

[tex]\boxed{\begin{minipage}{5.1 cm}\underline{Integrating a constant}\\\\$\displaystyle \int n\:\text{d}x=nx\;(+\;\text{C})$\\\\(where $n$ is any constant value) \end{minipage}}[/tex]

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The probability that the diameter of a selected ball bearing is between 151 and 155 millimeters is approximately 0.1571.

To find the probability that the diameter of a selected ball bearing is between 151 and 155 millimeters, we need to calculate the area under the normal distribution curve within this range.

First, we need to standardize the values using the z-score formula:

z = (x - μ) / σ

where x is the value we want to find the probability for, μ is the mean, and σ is the standard deviation.

For 151 millimeters:

z1 = (151 - 147) / 5 = 0.8

For 155 millimeters:

z2 = (155 - 147) / 5 = 1.6

Next, we look up the corresponding probabilities for these z-scores in the standard normal distribution table or use a calculator.

The probability of a z-score less than or equal to 0.8 is 0.7881, and the probability of a z-score less than or equal to 1.6 is 0.9452.

To find the probability between 151 and 155 millimeters, we subtract the smaller probability from the larger probability:

P(151 ≤ X ≤ 155) = P(X ≤ 155) - P(X ≤ 151) = 0.9452 - 0.7881 = 0.1571

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The function \(f(x) = x^4 - 24x^2\) is increasing on the intervals \((-∞, -2)\) and \((2, ∞)\), and decreasing on the interval \((-2, 2)\).


To determine where the function \(f(x) = x^4 - 24x^2\) is increasing or decreasing, we need to find its critical points and analyze the intervals between them.

First, let's find the derivative of \(f(x)\) using the power rule: \(f'(x) = 4x^3 - 48x\).

To find the critical points, we set \(f'(x) = 0\) and solve for \(x\):
\(4x^3 - 48x = 0\).

Factoring out 4x, we get: \(4x(x^2 - 12) = 0\).

This equation has three solutions: \(x = 0, x = -2\), and \(x = 2\).

Next, we create a sign chart to analyze the intervals between these critical points.

On the interval \((-∞, -2)\), we can test a value less than -2, such as -3. Plugging it into \(f'(x)\), we get a positive result, indicating that \(f(x)\) is increasing in this interval.

On the interval \((-2, 2)\), we can test a value between -2 and 2, such as 0. Plugging it into \(f'(x)\), we get a negative result, indicating that \(f(x)\) is decreasing in this interval.

On the interval \((2, ∞)\), we can test a value greater than 2, such as 3. Plugging it into \(f'(x)\), we get a positive result, indicating that \(f(x)\) is increasing in this interval.

Therefore, the function \(f(x) = x^4 - 24x^2\) is increasing on the intervals \((-∞, -2)\) and \((2, ∞)\), and decreasing on the interval \((-2, 2)\).

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The common ratio of the given geometric series is -4/5. The geometric series is convergent.

A geometric series is defined by the formula:

\[S = a + ar + ar^2 + ar^3 + \ldots\]

where 'a' is the first term and 'r' is the common ratio.

In the given series, the first term 'a' is given as (-4)^(1-1) * 5^1 = -20, and the ratio 'r' is (-4)^(n-1) * 5^n / (-4)^(n-2) * 5^(n-1).

To find the common ratio 'r', we can simplify the expression:

\[r = \frac{(-4)^{n-1} \cdot 5^n}{(-4)^{n-2} \cdot 5^{n-1}}\]

\[r = \frac{(-4)^1 \cdot 5}{(-4)^0 \cdot 5^0}\]

\[r = \frac{-4 \cdot 5}{1 \cdot 1}\]

\[r = \frac{-20}{1}\]

\[r = -20\]

So, the common ratio of the given geometric series is -20.

Next, to determine if the series is convergent or divergent, we need to check the absolute value of the common ratio. Since the absolute value of -20 is 20, which is greater than 1, the series is divergent.

Therefore, the given geometric series is divergent, and we cannot find its sum.

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The given function is f(x) = 8x - 7ln(x⁴). We need to find the absolute extrema for the given function on the interval [0.13, 6]. Absolute minimum is a value that a function takes at a specific point that is lower than the function values at every other point in the given interval.

The absolute maximum is the value that a function takes at a specific point that is greater than the function values at every other point in the given interval.Now, let's first find the critical points of the function on the given interval.To find the critical points, we need to differentiate the function f(x) w.r.t x:f(x) = 8x - 7ln(x⁴)Using the chain rule, we get,f'(x) = 8 - (7 * 4 * x⁻¹) Simplifying this, we get f'(x) = 8 - 28/x f'(x) = 0 gives us, 8 - 28/x = 0 => x = 3.5 Now, let's find the values of the function at the critical points and the endpoints of the given interval, and compare them to get the absolute extrema. f(0.13) = 8(0.13) - 7ln(0.13⁴) = -8.986 f(6) = 8(6) - 7ln(6⁴) = 119.389 f(3.5) = 8(3.5) - 7ln(3.5⁴) = 13.612 Hence, the absolute minimum is at (0.13, -8.986), and the absolute maximum is at (6, 119.389).

Given function is f(x) = 8x - 7ln(x⁴). We are asked to find the absolute extrema of the function on the interval [0.13, 6]. To find the absolute extrema, we need to find the critical points of the function and the endpoints of the interval. The critical points of a function are the points where the derivative of the function is equal to zero or undefined. So, we need to differentiate the given function to find its derivative:f(x) = 8x - 7ln(x⁴).

Using the chain rule, we get,f'(x) = 8 - (7 * 4 * x⁻¹) Simplifying this, we get f'(x) = 8 - 28/xNow, we need to solve f'(x) = 0 to find the critical point(s).8 - 28/x = 0 => x = 3.5 So, x = 3.5 is the critical point of the function on the given interval.

Now, we need to find the values of the function at the critical point and the endpoints of the interval. f(0.13) = 8(0.13) - 7ln(0.13⁴) = -8.986 f(6) = 8(6) - 7ln(6⁴) = 119.389 f(3.5) = 8(3.5) - 7ln(3.5⁴) = 13.612Comparing the values of the function at the critical point and the endpoints, we can see that the absolute minimum of the function on the interval [0.13, 6] is at (0.13, -8.986), and the absolute maximum is at (6, 119.389).

Absolute minimum is a value that a function takes at a specific point that is lower than the function values at every other point in the given interval.The absolute maximum is the value that a function takes at a specific point that is greater than the function values at every other point in the given interval.The absolute minimum of the given function f(x) = 8x - 7ln(x⁴) on the interval [0.13, 6] is at (0.13, -8.986), and the absolute maximum is at (6, 119.389).

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The linear function V(x) = 0.3623x + 14.5805, where x is the number of years since 1990 , V(23) = 0.3623(23) + 14.5805.  for 2021, the number of years since 1990 is 2021 - 1990 = 31

The linear function V(x) = 0.3623x + 14.5805 represents the relationship between the number of years since 1990 (x) and the amount it takes to equal the value of 1 currency unit in 1913 (V(x)). To predict the amount in specific years, we substitute the corresponding values of x into the function.

For 2013, the number of years since 1990 is 2013 - 1990 = 23. Therefore, to predict the amount it will take in 2013, we evaluate V(23). Plugging x = 23 into the function, we get V(23) = 0.3623(23) + 14.5805.

Similarly, for 2021, the number of years since 1990 is 2021 - 1990 = 31. We evaluate V(31) to predict the amount it will take in 2021.

By substituting the values of x into the function, we can calculate the predicted amounts for 2013 and 2021.

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The haircolor recording of shoppers at the mall describes an observational study.

This study falls under the category of an observational study. In an observational study, researchers do not manipulate or intervene in the natural setting or behavior of the subjects. Instead, they observe and record existing characteristics, behaviors, or conditions. In this case, the researchers simply recorded the hair color of shoppers at the mall without any manipulation or intervention.

Observational studies are often conducted to gather information about a particular phenomenon or to explore potential relationships between variables. They are useful when it is not possible or ethical to conduct an experiment, or when the researchers are interested in observing naturally occurring behaviors or characteristics. In this study, the researchers were likely interested in examining the distribution or prevalence of different hair colors among shoppers at the mall.

However, it's important to note that observational studies have limitations. They can only establish correlations or associations between variables, but cannot determine causality. In this case, the study can provide information about the hair color distribution among mall shoppers, but it cannot establish whether there is a causal relationship between visiting the mall and hair color.

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A stock split is a corporate action in which a company increases the number of shares it has outstanding by giving each shareholder more shares. This action does not affect the proportionate equity that each shareholder holds in the corporation. Instead, it adjusts the number of shares and the share's par value. In the case of Giacomo Company, a manufacturer of outdoor tables and chairs for European-style cafes, specific information is provided.

On January 1st, Year 1, Giacomo issues 500,000 shares of $2 par value common stock for $10 per share. This marks the first time Giacomo has issued common stock during Year 1, and no other stock issuances occur throughout the year.

Assuming Giacomo executes a 9:4 stock split, each old share would be transformed into 2.25 new shares (9/4). Consequently, the number of shares outstanding would increase by 125 percent. To calculate the new par value of Giacomo's stock, we can utilize the formula:

New par value per share = Old par value per share / (Split ratio)

In this case, the old par value is $2 per share, and the split ratio is 9/4. Substituting these values into the formula, we find:

New par value per share = $2 per share / (9/4)

New par value per share ≈ $0.888888888888889 or $0.89 per share

Therefore, the new par value of Giacomo's stock after a 9:4 stock split would be $0.89.

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The measures of the angles of the triangle are:

x = 65° , y = 71°, and z = 44°

Given data:

From the triangle ΔABC,

The ∠x is vertically opposite to the angle 65°

So, the measure of angle x is ∠x = 65°.

Now, when a transversal line intersects two parallel lines then each pair of alternate interior angles is equal.

So, the measure of ∠y = 71°

And, the sum of all angles of a triangle is 180°.

So, ∠z = 180° - ( ∠x + ∠y )

On simplifying the expression:

∠z = 180° - 136°

∠z = 44°

Hence, the angles of the triangle are solved.

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The complete question is attached below:

Write down value of x give reason for answer

write down the value of angle y give reason for answer

work out size of angle z