A hiker whose eye level is 2m above the ground wants to find the heigh of a tree. He places a mirror horizontally on the ground 20m from the base of the tree, and find that if he stands at a point c, which is 4m from the mirror b, he can see the reflection of the top of the tree. How tall is the tree

The center of the circle is given as (3, -2) and the radius is given as 7 in. To find the equation of the circle, we can use the standard form equation for a circle, which is (x - h)² + (y - k)² = r², where (h, k) is the center of the circle and r is the radius.

Substituting the given values, we get the equation as:(x - 3)² + (y + 2)² = 7²This is the equation of the given circle. Now, we need to find the measures of angles EAF and EBF. To do this, we can use the fact that the angle subtended by an arc at the center of the circle is twice the angle subtended by it at any point on the circumference.

Hence, we can say that:∠EAF = 1/2(arc EF)∠EBF = 1/2(arc EF)Since arc EF is the arc subtended by the angle EAFEBF, which is equal to the difference of the angles subtended by the same arc at the center of the circle, we can say that:arc EF = 360° - ∠EAFEBF = 360° - ∠EAF - 135°Now, we can substitute the value of arc EF and the measures of ∠EAF and ∠EBF in the above equations to get the values of both angles.

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The waiting times for patients who are admitted for additional treatment have a higher variability compared to the waiting times for patients who are discharged after receiving treatment.

To calculate the coefficient of variation (CV), we divide the standard deviation by the mean and multiply by 100 to express it as a percentage.

For patients admitted for additional treatment:

CV = (12.7 / 121) * 100 ≈ 10.5%

For patients discharged after receiving treatment:

CV = (10.5 / 118) * 100 ≈ 8.9%

Therefore, the coefficient of variation is higher for patients admitted for additional treatment, indicating a higher degree of variability in their waiting times compared to patients discharged after receiving treatment.

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The perimeter of triangle DEF is not over half of the perimeter of triangle ABC.This is proven below.

Given: Triangle ABC is acute with heights AD, BE, and CF.

To prove: Perimeter of triangle DEF is not over half of the perimeter of triangle ABC.

1. Let the side lengths of triangle ABC be a, b, and c.

2. Then the lengths of the heights are h1 = a/2, h2 = b/2, and h3 = c/2.

3. The perimeter of triangle ABC is a + b + c.

4. The perimeter of triangle DEF is h1 + h2 + h3 = a/2 + b/2 + c/2.

5. 1/2 < 1, so a/2 + b/2 + c/2 < a + b + c.

6. Therefore, the perimeter of triangle DEF is not over half of the perimeter of triangle ABC.

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The equation of the hyperbola centered at the origin, with the given foci (0, -9) and (0, 9), and vertices (0, -7) and (0, 7), is x^2/32 - y^2/49 = 1.

The equation of the hyperbola centered at the origin with the given foci and vertices can be found as follows:

The foci of the hyperbola are located at (0, -9) and (0, 9). The distance between the center of the hyperbola (0, 0) and each focus is 9 units, which gives us the value of c.

The vertices of the hyperbola are given as (0, -7) and (0, 7). The distance between the center and each vertex is 7 units, denoted by a.

In a hyperbola, the distance between the center and each focus is related to the distance between the center and each vertex by the equation c^2 = a^2 + b^2.

Since the center is at the origin, the equation simplifies to c^2 = a^2 + b^2.

Substituting the known values, we have 9^2 = 7^2 + b^2.

Simplifying the equation, we get 81 = 49 + b^2.

By subtracting 49 from both sides, we find b^2 = 32.

Thus, the equation of the hyperbola centered at the origin is x^2/32 - y^2/49 = 1.

In this equation, the squared term with the positive coefficient is associated with the x-axis, while the squared term with the negative coefficient is associated with the y-axis. The center of the hyperbola is at the origin, and its foci and vertices are as given.

Therefore, the equation of the hyperbola centered at the origin, with the given foci (0, -9) and (0, 9), and vertices (0, -7) and (0, 7), is x^2/32 - y^2/49 = 1.

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There would be 318 grams of sugar in a 3-liter bottle of soda. To determine the number of grams of sugar in a 3-liter bottle of soda, we can set up a proportion using the given information about the 2-liter bottle.

Let's assume that x represents the number of grams of sugar in a 3-liter bottle. We can set up the proportion: 2 liters is to 212 grams as 3 liters is to x grams.

Using cross-multiplication, we have 2 * x = 3 * 212. Solving for x, we get: x = (3 * 212) / 2 = 636 / 2 = 318 grams.Therefore, there would be 318 grams of sugar in a 3-liter bottle of soda.

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To solve the equation 3 and one-fifth n = 9, we can use the method of subtracting or adding the same value to both sides of the equation to isolate the variable.

In this case, we can subtract 3 and one-fifth from both sides or add 3 and one-fifth to both sides of the equation.

To solve the equation 3 and one-fifth n = 9, we can subtract 3 and one-fifth from both sides of the equation, which gives us:

3 and one-fifth n - 3 and one-fifth = 9 - 3 and one-fifth.

Simplifying the left side of the equation, we get:

n = 9 - 3 and one-fifth.

Alternatively, we can add 3 and one-fifth to both sides of the equation, which gives us:

3 and one-fifth n + 3 and one-fifth = 9 + 3 and one-fifth.

Simplifying the left side of the equation, we get:

n = 9 + 3 and one-fifth.

In either case, we have isolated the variable n and obtained the solution by either subtracting or adding the same value to both sides of the equation.

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To find the value of x, we equate the two expressions for the lengths:

4x + 2 = 10x - 1

Simplifying the equation:

4x - 10x = -1 - 2

-6x = -3

Dividing both sides by -6:

x = -3 / -6

x = 1/2

Therefore, the value of x is 1/2.

The given problem presents two expressions representing the lengths: 4x + 2 and 10x - 1. To find the value of x, we set these two expressions equal to each other and solve for x. By simplifying the equation, combining like terms, and isolating the variable, we find that x = 1/2. This means that if we substitute x with 1/2 in the given expressions for the lengths, we will obtain their respective values.

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Dan spent $25.70 in the past month on video game and DVD rentals.

In the past month, Dan rented 1 video game and 5 DVDs. The rental price for the video game was $2.70, and the rental price for each DVD was $4.60.
Let's calculate the total amount that Dan spent on video game and DVD rentals in the past month.
The cost of renting a video game was $2.70, and Dan rented only one video game.
Total cost of renting one video game is = $2.70
The cost of renting one DVD is $4.60, and Dan rented five DVDs.
Total cost of renting five DVDs is = $4.60 × 5= $23
Therefore, Dan spent $2.70 + $23 = $25.70 in the past month on video game and DVD rentals.

In summary, Dan spent $25.70 in the past month on video game and DVD rentals.

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The games in a game arena are numbered from 1 to 30 and accordingly the order conditions are given. The possible numbers of the game that Sam must be playing now are 17, 19, and 20.

Since Sam earned 4 bands, he must have won 4 sets of 4 games in a row. Each set of 4 games consists of consecutive game numbers.

To determine the possible game numbers, we need to find the starting game numbers of the sets that make up the 4 bands.

The first band is earned after winning the first set of 4 games, so the starting game number of this set is 1.

The second band is earned after winning the second set of 4 games, so the starting game number of this set is 5.

The third band is earned after winning the third set of 4 games, so the starting game number of this set is 9.

The fourth band is earned after winning the fourth set of 4 games, so the starting game number of this set is 13.

Since Sam continued playing after earning the 4 bands, he could be playing any game after the last game of the fourth set. Therefore, the possible game numbers he could be playing now are 17, 19, and 20.

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The equation that represents the problem of dividing twelve dollars equally among four people is as follows:12 / 4 = 3The given problem of dividing twelve dollars equally among four people can be represented by the equation 12/4 = 3.

Here, 12 represents the total amount of money that is being divided and 4 represents the number of people among whom the money is being divided .In this problem, we divide the total amount of money by the number of people to find out how much money each person will get. As there are four people to divide the money among, we divide the total amount of $12 by 4 to get $3 as the share of each person. Therefore, the equation that represents this problem is 12/4 = 3.

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When it comes to geometry, it's vital to understand that a statement that cannot be justified using a given premise doesn't necessarily mean that the statement is false.

It simply means that more information is needed to verify or disprove it. Therefore, given only that triangle PBJ = triangle TIM, it is impossible to justify that their perimeters are equal. This statement cannot be justified using the given information alone.

The perimeter of a triangle is the total length of the three sides of a triangle. Even though PBJ and TIM are congruent triangles, the lengths of their sides are unknown. It is possible that their sides are different in length and thus, their perimeters will be different.

Without more information about their side lengths, we cannot prove that their perimeters are equal, thus the statement cannot be justified.

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In geometry, similarity statements are used to indicate that two or more figures are similar. Similarity means that the figures have the same shape but may differ in size. A similarity statement consists of two parts: the corresponding sides and the corresponding angles.

The corresponding sides of similar figures are proportional, which means that the ratio of the lengths of corresponding sides is the same. For example, if we have two similar triangles, we can write their similarity statement as "Triangle ABC ~ Triangle DEF," indicating that the corresponding sides AB/DE, BC/EF, and AC/DF are all in the same ratio.

Similarly, the corresponding angles of similar figures are congruent, meaning that they have the same measure. In the case of our example triangles, the corresponding angles ∠A ≅ ∠D, ∠B ≅ ∠E, and ∠C ≅ ∠F.

By using similarity statements, we can solve various geometric problems. We can use the known ratios of corresponding sides to find missing side lengths, determine scale factors between similar figures, or establish relationships between different parts of the figures.

In conclusion, similarity statements are essential in geometry to express the similarity between figures. They provide a concise way to indicate that corresponding sides are proportional and corresponding angles are congruent. By applying the properties of similarity, we can solve problems involving similar figures and analyze their geometric properties. If you have specific questions or examples you'd like assistance with, please provide them, and I'll be glad to assist you further.

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Answer:

To calculate the time it takes for Thor to travel 2 miles at a speed of 24 miles per hour, we can use the formula:

Time = Distance / Speed

Given:

Distance = 2 miles

Speed = 24 miles per hour

Plugging these values into the formula, we have:

Time = 2 miles / 24 miles per hour

Calculating this, we get:

Time = 0.08333 hours

Rounding to the nearest tenth, the time it takes for Thor to travel 2 miles is approximately 0.1 hours.

Therefore, it takes Thor approximately 0.1 hours (or 6 minutes) to travel 2 miles at a speed of 24 miles per hour.

The probability of Jerome selecting jeans or joggers from his collection of pants is 5/7, indicating a high likelihood of choosing either jeans or joggers.

Jerome has a total of 3 pairs of jeans and 2 pairs of joggers. Since the question asks for the probability of selecting jeans or joggers, we need to consider the favorable outcomes, which are the jeans and joggers, and the total number of possible outcomes, which is the total number of pants.

The total number of pants Jerome has is 3 (jeans) + 2 (joggers) + 1 (black pants) + 1 (khaki pants) = 7. Out of these 7 pants, the favorable outcomes are the jeans and joggers, which total 3 (jeans) + 2 (joggers) = 5.

Therefore, the probability of Jerome selecting jeans or joggers can be calculated as the favorable outcomes divided by the total number of outcomes: P(jeans or joggers) = 5/7.

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The length of side MN from triangle MNP is 30.78 units.

From the given figure,

∠M = 90°

∠P = 72°

∠N = 18°

PM = 10 units

To solve this problem we need to find the length of side NP first using cos formula to angle P.

Cos ∠P = PM/NP

Cos 72° = 10/NP

0.309 = 10/NP

NP = 32.36 units

Next, we will use the same approach to angle N:

Cos ∠N = MN/NP

Cos 18° = MN/32.36

MN = 0.951 × 32.36

MN = 30.78 units

The length of side MN from triangle MNP is 30.78 units.

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The given system of equations is: y = -x + 27x + 4y = -1. To find the value of y, substitute the value of x from the first equation in the second equation. So, 7x + 4y = -1 can be written as 7(-y + 2) + 4y = -1 ⇒ -7y + 14 + 4y = -1 ⇒ -3y = -15 ⇒ y = 5. Therefore, the value of y for the solution to this system of equations is 5.

In order to solve the given system of equations, we need to first find the values of x and y that satisfy both equations. The system of equations is: y = -x + 27x + 4y = -1. We can use any method, either substitution or elimination, to find the values of x and y. However, in this case, the substitution method would be more convenient because one of the variables has a coefficient of 1. So, we can solve one of the equations for x or y and then substitute that value into the other equation. Let's solve the first equation for x:y = -x + 2 x = -y + 2. Now, substitute this value of x in the second equation and solve for y: 7x + 4y = -1 7(-y + 2) + 4y = -1 -7y + 14 + 4y = -1 -3y = -15 y = 5. Therefore, the value of y for the solution to this system of equations is 5.

The solution to the given system of equations is y = 5.

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In calculus, there are different ways to differentiate the tangent to a curve. The first principle is one of the ways to differentiate the tangent to a curve.

Differentiation is the foundation of calculus, and it's used to find rates of change, maxima and minima, and the behavior of functions in general.The first principle of differentiation.

The first principle is the fundamental approach to finding derivatives, which involves finding the limit of the difference quotient, or f(x + h) – f(x) / h as h approaches zero. This difference quotient represents the slope of the line tangent to the curve at the point (x, f(x)).

The first principle formula for differentiation is given by:lim h → 0 [f(x + h) – f(x) / h]To differentiate the tangent to the curve y = 2x² – 5x + 3 at the point where x = 2 using the first principle, we need to find the slope of the line tangent to the curve at x = 2. We start by finding the equation of the tangent line and then calculate its slope using the first principle.To find the equation of the tangent line, we differentiate the given function, y = 2x² – 5x + 3:dy/dx = 4x – 5At x = 2, dy/dx = 4(2) – 5 = 3.

Thus, the slope of the tangent line at x = 2 is 3.

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

y – f(2) = m(x – 2)y – (2(2)² – 5(2) + 3) = 3(x – 2)y – 4 = 3x – 6y = 3x – 2

This is the equation of the tangent line to the curve

y = 2x² – 5x + 3

at the point where x = 2. The slope of the tangent line is 3.

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When compared to the number of persons who were there in 2008, the number of people who were present in 2010 was roughly 1.26 times higher.

In 2008, the professional football team's home games averaged an attendance of around 4.32 times 10-5 people. The number of people who attended from their homes reached around 5.44 times 10-5 in the year 2010. We can determine how many times larger the attendance was in 2010 in comparison to 2008 by dividing the number of people who attended in 2010 by the number of people who attended in 2008.

The approximate value that is arrived at after taking 5.44 x 10-5 and dividing it by 4.32 x 10-5 is 1.26. As a direct consequence of this, the total number of individuals who participated in the event in 2010 was roughly 1.26 times more than the total number of people who participated in the event in 2008.

Between the years 2008 and 2010, there was an increase in attendance that was approximately equivalent to a 26 percent increase. Attendance at the professional football team's games has increased, which is a direct reflection of the growing interest in, and support for, the team over the course of the past two years.

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There was a decrease of approximately 13.6% in the number of people living with the disease from 2005 to 2015.

There was a decrease of 50% in the number of deaths from the disease from 2005 to 2015.

To calculate the percent change, we'll use the following formula:

Percent Change = ((New Value - Old Value) / Old Value) * 100

Let's calculate the percent change for each statistic:

1. Number of people living with the disease:

  Percent Change = ((27.3 million - 31.6 million) / 31.6 million) * 100

                ≈ (-4.3 million / 31.6 million) * 100

                ≈ -0.136 * 100

                ≈ -13.6%

Conclusion: There was a decrease of approximately 13.6% in the number of people living with the disease from 2005 to 2015.

2. Number of deaths from the disease:

  Percent Change = ((1.2 million - 2.4 million) / 2.4 million) * 100

                ≈ (-1.2 million / 2.4 million) * 100

                ≈ -0.5 * 100

                ≈ -50%

Conclusion: There was a decrease of 50% in the number of deaths from the disease from 2005 to 2015.

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The equation x^2 = p has 0 real number solution when p is less than or equal to 0. This is because the square of any real number is always non-negative. Therefore, if p is less than or equal to 0, then there is no real number x such that x^2 = p.

For example, if p = -1, then the equation x^2 = -1 has no real number solutions. This is because the square of any real number is always non-negative. Therefore, there is no real number x such that x^2 = -1.

However, if p is greater than 0, then there are two real number solutions to the equation x^2 = p. These solutions are x = sqrt(p) and x = -sqrt(p).

For example, if p = 4, then the equation x^2 = 4 has two real number solutions. These solutions are x = 2 and x = -2.

In conclusion, the equation x^2 = p has 0 real number solution when p is less than or equal to 0. This is because the square of any real number is always non-negative.

There are 21/10 fractions of cups of baking soda left in the box. The correct answer is 21/10.

Initially, Jack had 5 6/10 cups of baking soda in the box. He poured 3 1/2 cups into the volcano. To find out how much baking soda is left in the box, we need to subtract the amount poured from the initial amount.

First, let's convert the mixed numbers to improper fractions. The initial amount of baking soda is 5 6/10 cups, which is equivalent to 56/10 cups. The amount poured into the volcano is 3 1/2 cups, equivalent to 7/2 cups.

To subtract fractions, we need a common denominator. In this case, the common denominator is 10. Now, we subtract the fractions: (56/10) - (7/2) = (56/10) - (35/10) = 21/10.

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The first nonzero value of T, obtained by following the given algorithm with input values of a = 24 and b = 35, is 96 (option c).

The flowchart represents a mathematical algorithm that takes two positive integers, a and b, as input. It initializes a variable T to 0 and proceeds with a series of processes. The first process adds the value of a to the current value of T, resulting in T = T + a. The second process multiplies the current value of T by 2, resulting in T = 2 * T. The third process adds the value of b to the current value of T, resulting in T = T + b.

Given the input values a = 24 and b = 35, let's trace the algorithm:

T = 0 + 24 = 24

T = 2 * 24 = 48

T = 48 + 35 = 83

The value of T is 83, which is still nonzero. The algorithm continues:

4. T = 2 * 83 = 166

T = 166 + 24 = 190

T = 2 * 190 = 380

T = 380 + 35 = 415

T = 2 * 415 = 830

T = 830 + 24 = 854

T = 2 * 854 = 1708

T = 1708 + 35 = 1743

T = 2 * 1743 = 3486

T = 3486 + 24 = 3510

T = 2 * 3510 = 7020

T = 7020 + 35 = 7055

T = 2 * 7055 = 14110

T = 14110 + 24 = 14134

T = 2 * 14134 = 28268

T = 28268 + 35 = 28303

T = 2 * 28303 = 56606

T = 56606 + 24 = 56630

T = 2 * 56630 = 113260

T = 113260 + 35 = 113295

T = 2 * 113295 = 226590

T = 226590 + 24 = 226614

T = 2 * 226614 = 453228

T = 453228 + 35 = 453263

T = 2 * 453263 = 906526

T = 906526 + 24 = 906550

T = 2 * 906550 = 1813100

T = 1813100 + 35 = 1813135

T = 2 * 1813135 = 3626270

T = 3626270 + 24 = 3626294

T = 2 * 3626294 = 7252588

T = 7252588 + 35 = 7252623

T = 2 * 7252623 = 14505246

T = 14505246 + 24 = 14505270

T = 2 * 14505270 = 29010540

T = 29010540 + 35 = 29010575

T = 2 * 29010575 = 58021150

T = 58021150 + 24 = 58021174

T = 2 * 58021174 = 116042348

T = 116042348 + 35 = 116042383

T = 2 * 116042383 = 232084766

T = 232084766 + 24 = 232084790

T = 2 * 232084790 = 464169580

T = 464169580 + 35 = 464169615

T = 2 * 464169615 = 928339230

T = 928339230 + 24 = 928339254

T = 2 * 928339254 = 1856678508

T = 1856678508 + 35 = 1856678543

T = 2 * 1856678543 = 3713357086

T = 3713357086 + 24 = 3713357110

T = 2 * 3713357110 = 7426714220

T = 7426714220 + 35 = 7426714255

T = 2 * 7426714255 = 14853428510

T = 14853428510 + 24 = 14853428534

T = 2 * 14853428534 = 29706857068

T = 29706857068 + 35 = 29706857103

T = 2 * 29706857103 = 59413714206

T = 59413714206 + 24 = 59413714230

T = 2 * 59413714230 = 118827428460

T = 118827428460 + 35 = 118827428495

T = 2 * 118827428495 = 237654856990

At this point, the value of T is 237654856990, which is still nonzero. The algorithm will continue to produce nonzero values of T. Therefore, the first nonzero value of T is 96 (option c) not listed above.

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Penicillin is an antibiotic drug that is used to treat bacterial infections. The process of eliminating penicillin from the body is an important factor to consider when determining the correct dose of this drug.

This means that the amount of penicillin in the body decreases at a constant rate over time. Suppose a person receives a 300-mg dose of penicillin to combat strep throat. After one day, approximately 180-mg of the drug will remain active in their bloodstream. This is due to the fact that the elimination half-life of penicillin is approximately 1 hour. Therefore, after 1 hour, 150-mg of the drug will remain in the bloodstream. After 2 hours, this amount will decrease to 75-mg, and so on.

The expenential elimination of penicillin from the body is important to consider when determining the frequency and dose of this drug.

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The coefficients of the variables and the constants. [tex]\[\begin{bmatrix}\phantom{-}700 & -1 & \phantom{-}200 \\\phantom{-}75 & -1 & -5000\end{bmatrix}\][/tex].

To complete the matrix, we need to fill in the coefficients and constants from the given system of equations:

The given system of equations:

[tex]\[y &= 700x + 200 \\y &= 5000 - 75x\][/tex]

To complete the matrix, we'll organize the coefficients of the variables and the constants.

[tex]\[\begin{bmatrix}\phantom{-}700 & -1 & \phantom{-}200 \\\phantom{-}75 & -1 & -5000\end{bmatrix}\][/tex]

In the matrix, the coefficients of the variables [tex]\(x\)[/tex] and [tex]\(y\)[/tex] are arranged in the first two columns, and the constants are in the third column.

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On a two-dimensional Cartesian coordinate plane, points are represented by their coordinates (x,y).

The horizontal axis is called the x-axis and the vertical axis is called the y-axis. The x-axis represents all possible values of x, while the y-axis represents all possible values of y.

When a point lies on the x-axis, its y-coordinate is always 0, because the x-axis is defined as the set of all points where y=0. Therefore, any point with a y-coordinate of 0 will lie on the x-axis.

This fact has important implications in geometry and other fields that utilize coordinate planes. For example, the x-axis is often used to represent time in graphs and charts, where the y-axis represents some other quantity. Points on the x-axis can also be used to determine the roots or zeros of a function, which are the points where the function intersects the x-axis.

Overall, understanding the relationship between points and the axes on a coordinate plane is fundamental in many areas of mathematics and science.

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Paula made a scale drawing of the auditorium, which is a replica of the actual auditorium, but smaller in size. The scale drawing shows measurements of the actual auditorium at a reduced size.

Paula needs to determine the scale used to draw the auditorium. The scale is the ratio of the lengths of the corresponding sides of the actual auditorium and the scale drawing. We can use the following formula to find out the scale of the drawing:

Scale = (Length of the corresponding side of the actual object) / (Length of the corresponding side of the scale drawing)First, we have to convert 56 feet to inches:1 foot = 12 inches56 feet = 56 x 12 = 672 inchesNow, we can find the scale of the drawing as follows:

Now, we can use the scale to determine the length of other parts of the auditorium. For example, if a door in the auditorium is 32 inches long on the drawing, its actual length would be 32 x 8 = 256 inches or 21.3 feet. Therefore, the missing value in the ratio 3 inches : ____ feet is 2.333 feet. (This is obtained by dividing 84 inches by 36 inches, which is equivalent to 3 feet. Then multiplying the result by 3 inches, which gives 7/12 or 0.5833 feet or 7 inches. This can be written as 2.333 feet.)

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We can use the formula for compound interest: after 7 years, Ed will have approximately $617.

To determine how much money Ed will have after 7 years of investing $500 at an annual interest rate of 3% compounded quarterly, we can use the formula for compound interest:

A = P(1 + r/n)^(nt)

Where:

A = the final amount

P = the principal amount (initial investment)

r = the annual interest rate (expressed as a decimal)

n = the number of times interest is compounded per year

t = the number of years

In this case, P = $500, r = 3% (or 0.03), n = 4 (quarterly compounding), and t = 7. Plugging these values into the formula, we can calculate the final amount:

A = 500(1 + 0.03/4)^(4*7)

Simplifying the equation, we get:

A = 500(1.0075)^(28)

Calculating the expression within the parentheses, we find:

A = 500(1.234)

Finally, we can compute the final amount:

A = $617

Therefore, after 7 years, Ed will have approximately $617.


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When Charlie gets 20 apples and divides them by the answer to the first problem, he will get 35/143 of an apple. Firstly, let's solve the expression 15×5-3 +4÷7×3. Using the order of operations, we do the multiplication and division first. 15×5 = 75 and 4÷7×3 = 12/7.

Firstly, let's solve the expression 15×5-3 +4÷7×3. Using the order of operations, we do the multiplication and division first. 15×5 = 75 and 4÷7×3 = 12/7

So, 15×5-3 +4÷7×3 = 75 - 3 + 12/7

Next, we simplify the fraction by finding a common denominator. The common denominator for 7 and 1 is 7, so we multiply the numerator and denominator of 12/7 by 1 to get: 12/7 × 1/1 = 12/7

Now, 75 - 3 + 12/7 = 572/7. Therefore, the answer to the first problem is 572/7. Now, Charlie has 20 apples. If he divides these apples by the answer to the first problem, he will get: 20 ÷ 572/7

We can solve this by multiplying the dividend by the reciprocal of the divisor. In other words, we multiply 20 by 7/572.20 ÷ 572/7 = 20 × 7/572 = 140/572

We can simplify this fraction by finding a common factor of the numerator and denominator. Both 140 and 572 are divisible by 4.140/572 = 35/143

So, when Charlie gets 20 apples and divides them by the answer to the first problem, he will get 35/143 of an apple.

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The probability that a randomly selected light bulb has a lifetime that is greater than 532 hours is 0.10027

From the question, we have the following parameters that can be used in our computation:

Normal distribution, where, we have

Mean = 500

Standard deviation = 25

So, the z-score is

z = (x - mean)/SD

This gives

z = (532 - 500)/25

z = 1.28

So, the probability is

P = P(z > 1.28)

Using the table of z scores, we have

P = 0.10027

Hence, the probability is 0.10027

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Total number of items = 21a + 9b. By substituting the appropriate values for 'a' and 'b', Braedyn can calculate the total number of items on the shelves using this expression.

The expression 21a + 9b can help Braedyn find the total number of items on the shelves by representing the number of items on each type of shelf and then summing them together. Let's assume that 'a' represents the number of items on each short shelf and 'b' represents the number of items on each tall shelf.

The expression 21a represents the total number of items on all the short shelves, and the expression 9b represents the total number of items on all the tall shelves. To find the total number of items on all the shelves, we add the number of items on the short shelves to the number of items on the tall shelves: Total number of items = 21a + 9b. By substituting the appropriate values for 'a' and 'b', Braedyn can calculate the total number of items on the shelves using this expression.

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