a) The probability that, for at least 15 packs, the average weight of the erasers in the pack is at least 31.95 g is approximately 0.0384.
b) The probability that, on average, the unit finds at least 37.2 "good" erasers per day is approximately 0.3133.
a) To solve this problem, we need to use the central limit theorem. According to this theorem, the distribution of sample means becomes approximately normal, regardless of the shape of the population distribution, when the sample size is sufficiently large (usually, n >= 30). In this case, since the sample size is 45, we can assume that the distribution of sample means will be approximately normal.
Now, we need to find the probability that the average weight of at least 15 packs is at least 31.95 g. We can use the normal distribution to calculate this probability. We first calculate the z-score for this value as follows:
z = (31.95 - 31.9) / (0.163 / √(45)) = 1.77
Using a standard normal table or calculator, we can find the probability that a z-score is greater than or equal to 1.77. This probability is approximately 0.0384.
b) To solve this problem, we need to use the normal approximation to the binomial distribution. Since each eraser is either "good" or "bad", the number of "good" erasers that the unit finds each day follows a binomial distribution with parameters n = 50 and p = probability of finding a "good" eraser = (32.3 - 31.7)/(32.3 - 31.5) = 0.5.
Now, we need to find the probability that, on average, the unit finds at least 37.2 "good" erasers per day. We can use the normal distribution to calculate this probability. We first calculate the z-score for this value as follows:
z = (37.2 - 25) / 25 = 0.488
Using a standard normal table or calculator, we can find the probability that a z-score is greater than or equal to 0.488. This probability is approximately 0.3133.
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Use this scenario on this and the next problem.
Tobias received an inheritance from his grandfather of $20,000. When he gets out of
college in 4 years he wants to use it as a down payment on a piece of lakeside property.
If he puts all the money in a savings account paying 6. 5% interest compounded daily,
how much money will be in the account at the end of the four years to use as the down
payment on the property?
The amount of money that will be in the account at the end of the four years to use as the down payment on the property is $26,102.47.
What is the compound interest?In the above question, we need to use the formula for compound interest and it is:
A = P(1 + r/n)^(nt)
Note that:
A = the amount of money at the end of the investment
P = the principal amount
r = the annual interest rate
n = the number of times the interest is compounded per year
t = the number of years of the investment
Since:
P = $20,000
r = 6.5% = 0.065
n = 365 (note the interest is compounded everyday)
t = 4
We shall put the values into the formula:
A = $20,000(1 + 0.065/365)^(365*4)
A = $20,000(1.0178)¹⁴⁶⁰
A = $20,000 x 1.305124
A = $26,102.47
Therefore, at the end of the four years, there will be $26,102.47.
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Use the compound interest table on p. 28 to complete each row below.
Annual
Interest Compounded
Rate
$900.00 5.50%
$640.00 6.00%
$1,340.00 5.00%
$6,231.40 5.75%
$3,871.67 12.00%
$9,000.00 18.00%
Quarterly a.
a.
Semiannually a.
Quarterly
Semiannually a.
Monthly a.
Monthly
a.
Rate per
Period
Total
Time
Total
Number of
Periods
2 years b.
4 years b.
3
years b.
years b.
4 years b.
2 years b.
C.
C.
C.
C.
C.
C.
Amount
Compound
Interest
d.
d.
d.
d.
d.
d.
Answer:To complete the table using the compound interest table on page 28, we can use the following steps:
Determine the rate per period based on the given annual interest rate and compounding frequency.
Calculate the total number of periods based on the total time and compounding frequency.
Use the compound interest table to find the factor for the rate per period and the total number of periods.
Multiply the factor by the initial amount to find the amount after compound interest.
Subtract the initial amount from the amount after compound interest to find the compound interest.
Using these steps, we can complete the table as follows:
Annual
Interest Compounded
Rate
$900.00 5.50% Quarterly 1.375% 2 years 8
$640.00 6.00% Semiannually 3.00% 4 years 8
$1,340.00 5.00% Quarterly 1.25% 3 years 12
$6,231.40 5.75% Semiannually 2.875% 4 years 8
$3,871.67 12.00% Monthly 1.000% 4 years 48
$9,000.00 18.00% Monthly 1.500% 2 years 24
Quarterly 0.016%
Semiannually 0.033%
Monthly 0.058%
Monthly 0.058%
Monthly 1.500%
Quarterly 0.450%
Total
Time
2 years
4 years
3 years
4 years
4 years
2 years
Total
Number of
Periods
8
8
12
8
48
24
C.
$1,042.36
$812.65
$1,519.39
$7,305.10
$8,980.54
$20,790.56
Amount
Compound
Interest
d.
$42.36
$172.65
$119.39
$3,074.70
$4,109.87
$11,790.56
Note: The values in row C represent the amount after compound interest, and the values in row d represent the compound interest. The quarterly, semiannually, and monthly rates are rounded to three decimal places for convenience.
Step-by-step explanation:
Two forces of 39n (newtons) and 46n act on an object at right angles. find the magnitude of the resultant and the angle that it makes with the smaller force.
The magnitude of the resultant force is approximately 60.28 newtons. The angle between the resultant force and the smaller force is approximately 50.5 degrees.
To find the magnitude of the resultant force, we can use the Pythagorean theorem, which states that in a right triangle, the square of the hypotenuse (the longest side) is equal to the sum of the squares of the other two sides.
In this case, the two forces are acting at right angles, so we can treat them as the sides of a right triangle:
resultant force^2 = (39n)^2 + (46n)^2
resultant force^2 = 1521n^2 + 2116n^2
resultant force^2 = 3637n^2
resultant force = sqrt(3637n^2) = 60.28n
So the magnitude of the resultant force is approximately 60.28 newtons.
To find the angle that the resultant force makes with the smaller force, we can use trigonometry.
We know that the two forces are at right angles, so the angle between the resultant force and the smaller force is the same as the angle between the resultant force and the larger force. Let's call this angle θ. Then we have:
tan θ = (larger force) / (smaller force)
tan θ = 46n / 39n
θ = tan^-1(46/39) = 50.5°
Therefore, the angle between the resultant force and the smaller force is approximately 50.5 degrees.
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Question 1 (multiple choice worth 2 points) (10.03, 10.04 lc) which digital text feature plays music or speaking on its own? animation
interactive
elements
sound text
Based on the given options, the digital text feature that plays music or speaking on its own is "sound." The correct option is sound.
Digital texts can incorporate various features to engage readers and enhance their experience. These features include:
1. Animation: Visual effects and motion graphics that add dynamic elements to a digital text. Animation can be used to illustrate complex concepts, tell stories, or create visual appeal.
2. Interactive elements: Components of digital texts that allow users to interact with the content, such as hyperlinks, buttons, quizzes, or navigation tools. Interactive elements can make digital texts more engaging and help users find information more efficiently.
3. Sound: Audio elements that play music, speaking, or other sounds. Sound can be used to provide additional information, create atmosphere, or guide users through a digital text.
4. Text: The written content of a digital text. Text can be formatted in various ways, such as using different fonts, colors, or layouts, to make digital texts more accessible and visually appealing.
In this case, the feature that plays music or speaking on its own is "sound." Sound elements in digital texts can enhance the user experience by providing audio feedback, creating a more immersive environment, or adding an additional layer of information.
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find the coordinates of p so that p partitions the segment of AB in the ratio 7 to 2 if A( -5,4) and B( -8,-2)
The coordinates of p so that p partitions the segment of AB in the ratio 7 to 2 if A( -5,4) and B( -8,-2) is P(x, y) = [-22/3, -2/3].
How to determine the coordinates of point P?In this scenario, line ratio would be used to determine the coordinates of the point P on the directed line segment that partitions the segment into a ratio of 1 to 4.
In Mathematics and Geometry, line ratio can be used to determine the coordinates of P and this is modeled by this mathematical equation:
P(x, y) = [(mx₂ + nx₁)/(m + n)], [(my₂ + ny₁)/(m + n)]
By substituting the given parameters into the formula for line ratio, we have;
P(x, y) = [(mx₂ + nx₁)/(m + n)], [(my₂ + ny₁)/(m + n)]
P(x, y) = [(7(-8) + 2(-5))/(7 + 2)], [(7(-2) + 2(4))/(7 + 2)]
P(x, y) = [(-56 - 10)/(9)], [(-14 + 8)/9]
P(x, y) = [-66/9], [(-6)/(9)]
P(x, y) = [-22/3, -2/3]
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If you chose an angle, how are the construction steps you completed similar to the steps you would have taken to construct and bisect a line segment? How are they different?
The construction steps for bisecting an angle are similar to those for bisecting a line segment as both involve using a compass and straightedge, but the former creates an angle with a specific degree measure while the latter divides a line segment into two equal parts.
The construction steps for constructing and bisecting an angle are similar to the steps for constructing and bisecting a line segment in that they both involve using a compass and straightedge to create geometric constructions.
However, the steps are different in that constructing and bisecting an angle involves creating an angle with a specific degree measure, whereas constructing and bisecting a line segment involves dividing a line segment into two equal parts.
To construct and bisect an angle, the compass is used to create congruent arcs on either side of the angle, and the straightedge is used to connect the intersections of those arcs to create the angle. To bisect a line segment, the compass is used to create arcs of equal length from the endpoints of the segment, and the straightedge is used to connect the intersection of those arcs to the midpoint of the segment.
So while both constructions involve the use of similar tools and techniques, the specific steps required for each are unique.
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You are choosing between two different cheese wedges at the grocery store. Assume both
wedges are triangular prisms with bases that are isosceles triangles. The first wedge has a base
that is 2. 5 in. Wide and a height of 4. 5 in. , with the entire wedge being 3 in thick. The second
wedge has a base that is 3 in, wide and a height of 4 in. , with the entire wedge being 3. 5 in.
thick. Which wedge has a greater volume of cheese, and by how much?
The first wedge by 6. 375 cubic inches
The first wedge by 12. 75 cubic inches
The second wedge by 8. 25 cubic inches
The second wedge by 4. 125 cubic inches
The second wedge has a greater volume by 4.125 cubic inches. Therefore, the correct option is 4.
To determine which cheese wedge has a greater volume, you need to calculate the volume of each triangular prism using the given dimensions.
For the first wedge:
1. Calculate the area of the base (isosceles triangle):
(base x height) / 2 = (2.5 in x 4.5 in) / 2 = 5.625 square inches
2. Calculate the volume of the prism:
base area x thickness = 5.625 sq in x 3 in = 16.875 cubic inches
For the second wedge:
1. Calculate the area of the base (isosceles triangle):
(base x height) / 2 = (3 in x 4 in) / 2 = 6 square inches
2. Calculate the volume of the prism:
base area x thickness = 6 sq in x 3.5 in = 21 cubic inches
To find which wedge has a greater volume and by how much, subtract the smaller volume from the larger volume:
21 cu in - 16.875 cu in = 4.125 cu in.
Therefore, the correct answer is option 4: The second wedge has a greater volume by 4.125 cubic inches.
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Help pls I need help with sand and a word with my
Answer: X= 4/5x + 8
Step-by-step explanation: Distribution factor
So far you have completed 816 miles
which is 48% of the trail.
Assuming that the trail is a total of "x" miles, we can set up the following equation to solve for "x":
816 = 0.48x
To solve for "x", we can divide both sides by 0.48:
x = 1700
Therefore, the total length of the trail is 1700 miles.
Consider the function f(x) = 1x - 3 a. Find the inverse function off. f-'(x) = Use STACK interval notation for the following. For example, enter [12,00) as co(12, inf). b. What is the domain off-l? c. What is the range off-l?
a. To find the inverse function of f(x), we need to interchange the roles of x and y and solve for y. So, we have:
y = 1x - 3
x = 1y - 3
x + 3 = y
Therefore, the inverse function of f(x) is f^-1(x) = x + 3.
The domain of f^-1(x) is the range of f(x). Since f(x) = 1x - 3 is a linear function, its domain is all real numbers. Therefore, the range of f(x) is also all real numbers. In interval notation, we can write this as (-inf, inf).
The range of f^-1(x) is the domain of f(x). As we determined in part b, the domain of f(x) is all real numbers. Therefore, the range of f^-1(x) is also all real numbers. In interval notation, we can write this as (-inf, inf).
Hi! I'd be happy to help you with your question.
a. To find the inverse function of f(x) = 1x - 3, you can follow these steps:
1. Replace f(x) with y: y = 1x - 3
2. Swap x and y: x = 1y - 3
3. Solve for y: y = x + 3
So, the inverse function f^(-1)(x) = x + 3.
The domain of f^(-1) refers to the set of all possible x-values. Since the inverse function is a linear function with no restrictions, the domain of f^(-1) is all real numbers. In interval notation, this is written as (-∞, ∞).
c. The range of f^(-1) refers to the set of all possible y-values (output). Again, since it's a linear function with no restrictions, the range of f^(-1) is also all real numbers. In interval notation, this is written as (-∞, ∞).
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Find the moment of inertia about the x-axis of the
first-quadrant area bounded by the curve find lx (round to 1
Decimal place)
y^2=4x−2, the x-axis, and x=7
Im abit confused about this one
To find the moment of inertia about the x-axis of the given area, we can use the formula:
Ix = ∫y^2 dA
Where Ix is the moment of inertia about the x-axis and dA is an infinitesimal area element.
First, we need to find the limits of integration. The curve y^2 = 4x - 2 intersects the x-axis at (1/2, 0). Also, the area is bounded by the x-axis and the line x = 7. Therefore, the limits of integration for x are from 1/2 to 7.
Now, we can express the infinitesimal area element as dA = y dx. Also, we can solve the given equation for x in terms of y as x = (y^2 + 2)/4. Therefore, we can write:
Ix = ∫y^2 (y dx)
Ix = ∫[(y^3)/4 + (y/2)] dx, with limits from 1/2 to 7
Ix = [(y^3)/16 + (y^2)/4] evaluated at x = 7 and x = 1/2
Ix = [(49y^3)/16 + (49y^2)/4] - [(y^3)/16 + (y^2)/4]
Ix = (48y^3)/16 + (48y^2)/4
Ix = 3y^3 + 12y^2
To find the moment of inertia about the x-axis, we need to substitute y with x and take the integral from 1/2 to 0 (since the area is in the first quadrant):
Ix = ∫3x^3 + 12x^2 dx, with limits from 1/2 to 0
Ix = [x^4/4 + 4x^3] evaluated at x = 1/2 and x = 0
Ix = (1/64) + 0 - (0 + 0)
Ix = 1/64
Therefore, the moment of inertia about the x-axis of the first-quadrant area bounded by the curve y^2=4x−2, the x-axis, and x=7 is 0.0156 (rounded to 1 decimal place).
To find the moment of inertia (I_x) about the x-axis of the first-quadrant area bounded by the curve y^2 = 4x - 2, the x-axis, and x = 7, we need to use the following formula:
I_x = ∫(y^2 * dA)
Here, dA represents the differential area element. Since the curve is defined in terms of y^2, let's express y in terms of x:
y = ±√(4x - 2)
As we are considering the first quadrant, we will take the positive root:
y = √(4x - 2)
Now, let's find the differential area element, dA:
dA = y*dx
Substitute the expression for y into dA:
dA = √(4x - 2)*dx
Now, substitute dA into the formula for I_x and integrate with respect to x:
I_x = ∫(y^2 * dA) = ∫((4x - 2) * √(4x - 2)*dx)
Integrate this expression with limits of integration from x = 0 (where the curve intersects the x-axis) to x = 7:
I_x ≈ 203.33
Therefore, the moment of inertia about the x-axis for the given region is approximately 203.3 (rounded to 1 decimal place).
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In triangle ABC, A is (0,0), B is (0,,3) and C is (3,0). What type of triangle is ABC? SELECT ALL THAT APPLY
The triangle has two sides with equal lengths (AB and AC) and one side with a different length (BC). This makes it an isosceles triangle.
How to find the type of triangle
Triangle ABC has vertices A(0,0), B(0,3), and C(3,0).
To determine the type of triangle, we can find the lengths of the sides using the distance formula:
AB = sqrt((0-0)^2 + (3-0)^2) = sqrt(0 + 9) = 3
BC = sqrt((3-0)^2 + (0-3)^2) = sqrt(9 + 9) = sqrt(18) = 3√2
AC = sqrt((3-0)^2 + (0-0)^2) = sqrt(9 + 0) = 3
The triangle has two sides with equal lengths (AB and AC) and one side with a different length (BC). This makes it an isosceles triangle.
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Movie Galore Video Store is open every day of the year. To rent movies from the store, a person has to pay an annual membership fee of $20, plus $2. 50 for each movie rented. To reduce the chance that movies are returned late, members are not allowed to rent more than 10 movies per day. Billy decides to become a member of the video store. Let x represent the number of movies that Billy could rent next year, and let f (x) represent the amount (in dollars) that he would pay the store as a result. Then f (x) is a function of x. What is the domain D and range R of f (x)?
The domain of the function f(x) is {x | 0 ≤ x ≤ 3650} and the range is {f(x) | 20 ≤ f(x) ≤ 9145}, where f(x) represents the amount Billy would spend to rent x films.
The domain D of the function f(x) is the collection of all possible values for x. In this scenario, because Billy is not permitted to rent more than ten films every day, the maximum number of films he may rent in a year is ten times the number of days in a year, or 10 x 365 = 3650 films.
Furthermore, because he must pay a membership fee of $20 regardless of how many movies he rents, the minimum number of movies he could rent in a year is zero. As a result, the domain of the function f(x) is as follows:
D = {x | 0 ≤ x ≤ 3650}
The range R of the function f(x) is the collection of all possible values for f(x). In this scenario, the function: returns the amount Billy would spend to rent x films.
f(x) = 2.5x + 20
where 2.5x is the rental charge for x films and 20 is the membership fee. Because x can be any value between 0 and 3650, the smallest value that f(x) can be is:
f(0) = 2.5(0) + 20 = 20
and f(x) has the following maximum value:
f(3650) = 2.5(3650) + 20 = 9145
As a result, the function f(x) has the following range:
R = {f(x) | 20 ≤ f(x) ≤ 9145}
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What is the sine ratio for angle A?
A. 10/8
B. 8/10
C. 6/10
D. 6/8
Answer:
C. 6/10
Step-by-step explanation:
Sin A = 6/10
 the measures of the angles of a triangle are shown in the figure below solve for X
Answer:
x = 13
Step-by-step explanation:
We Know
The sum of angles of a triangle must add up to 180°
We know 2 angles, one is 60° and the other is 90°
Solve for x.
Let's solve
3x - 9 + 60 + 90 = 180
3x + 141 = 180
3x = 39
x = 13
The dotted line is the perpendicular bisector of side AB. The distance between points E and A is 7 units. What is the distance between points E and B? Explain or show your reasoning
The distance between points E and B is (2/3)*AB, or (2/3)*(7+x) units.
Since the dotted line is the perpendicular bisector of side AB, it means that it cuts the line AB into two equal halves. Thus, the distance between points E and the dotted line is equal to the distance between point A and the dotted line.
We know that the distance between points E and A is 7 units, and since the dotted line bisects AB, the distance between point A and the dotted line is equal to the distance between point B and the dotted line. Let's call this distance 'x'.
Therefore, we have two equal distances (7 units and 'x') that add up to the length of AB. This means that:
AB = 7 units + x
However, we also know that the dotted line is the perpendicular bisector of AB, meaning that it forms right angles with both A and B. This creates two right-angled triangles, AED and BED, where DE is the perpendicular line from point E to AB.
Using Pythagoras' theorem, we can find the length of DE in terms of 'x':
(DE)² + (AE)² = (AD)²
(DE)² + (7)² = (AB/2)²
(DE)² + 49 = (AB²)/4
(DE)² = (AB²)/4 - 49
(DE)² = (AB² - 196)/4
(DE)² = (x²)/4
DE = x/2
Therefore, the distance between points E and B is equal to the length of DE plus the distance between point B and the dotted line, which is also equal to 'x'. Therefore, the distance between points E and B is:
EB = (x/2) + x = 1.5x
We can substitute this into the equation we found earlier:
AB = 7 units + x
AB = 7 units + (2/3)*EB
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Consider the following 8 numbers, where one labelled
x
is unknown. 32
,
46
,
46
,
x
,
35
,
9
,
4
,
38
Given that the range of the numbers is 55, work out 2 values of
x
Two possible values of x are 10 and 40.
To find two possible values of x, we need to first determine the highest and lowest numbers in the set.
Highest number: 46
Lowest number: 4
To get a range of 55, we need the highest number minus the lowest number to equal 55.
46 - 4 = 42
But we know that there are 8 numbers in the set, so the range must be spread out over those 8 numbers. To get an idea of how much each number should increase, we can divide 42 by 7 (the number of gaps between the numbers) to get an average increase of 6.
Now we can use this average increase to find two possible values of x.
1) If x is 6 more than the lowest number (4 + 6 = 10), then the set becomes:
4, 9, 10, 32, 35, 38, 46, 46
And the range is:
46 - 4 = 42
2) If x is 6 less than the highest number (46 - 6 = 40), then the set becomes:
4, 9, 35, 38, 40, 46, 46, 32
And the range is:
46 - 4 = 42
Therefore, two possible values of x are 10 and 40.
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True or false kites are never rhombuses
Answer:
Step-by-step explanation:
false i think
Answer:
True
Step-by-step explanation:
Robert is currently working for a landscaping company earning $1520 per month. he has a dream of starting his own landscaping company and figures he would need to save $5000 to buy his own equipment. select the budget that would help robert most quickly achieve his financial goal of starting his own business, while still meeting his basic needs. monthly budget budget a budget b budget c budget d income $1520 $1520 $1520 $1600 expenses rent utilities food cell phone savings entertainment clothing $400 $80 $250 $0 $400 $220 $130 $400 $80 $25 $75 $600 $320 $0 $400 $80 $150 $70 $500 $125 $120 $400 $80 $400 $110 $260 $200 $150 net income $40 $20 $75 $0 a. budget a b. budget b c. budget c d. budget d
The budget with the highest savings amount that still meets Robert's basic needs is Budget C. The answer is C. Budget C
To determine which budget would help Robert most quickly achieve his financial goal of starting his own landscaping business, we need to compare the savings amounts in each budget.
Budget A:
Income: $1520
Expenses: Rent ($400), Utilities ($80), Food ($250), Cell Phone ($0), Savings ($400), Entertainment ($220), Clothing ($130)
Net Income: $40
Budget B:
Income: $1520
Expenses: Rent ($400), Utilities ($80), Food ($250), Cell Phone ($75), Savings ($600), Entertainment ($320), Clothing ($0)
Net Income: $20
Budget C:
Income: $1520
Expenses: Rent ($400), Utilities ($80), Food ($150), Cell Phone ($70), Savings ($500), Entertainment ($125), Clothing ($120)
Net Income: $75
Budget D:
Income: $1600
Expenses: Rent ($400), Utilities ($80), Food ($400), Cell Phone ($110), Savings ($260), Entertainment ($200), Clothing ($150)
Net Income: $0
In Budget C, Robert can save $500 per month while still covering his expenses for rent, utilities, food, cell phone, entertainment, and clothing. Additionally, this budget has a positive net income of $75, indicating that it is sustainable.
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Reema and Quinton both babysit for extra money. Reema charges $10 per hour and
Quinton charges based on the equation m= 5h + 25. Where h is the number of hours
worked and m is the total amount of money charged. Who would make more money if
they both worked 4 hours?
o Quinton would make $10 more than Reema
O Quinton would make $5 more than Reema
o Reema would make $10 more than Quinton
O Reema would make $5 more than Quinton
On babysitting for four hours, the differently earned money will be Quinton would make $5 more than Reema.
Reema's charge for babysitting for four hours = 10 × 4
Reema's charge = $40
For Quinton, keep the value of hours in expression -
Quinton's charge = 5 (4) + 25
Quinton's charge = 20 + 25
Quinton's charge = $45
As Quinton's charge is greater than Reema, she makes more money.
Amount of more money made by Quinton = 45 - 40
Subtract to find the difference
Amount of more money made by Quinton = $5
Hence, correct answer is Quinton would make $5 more than Reema.
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Two cafés on opposite sides of an atrium in a shopping centre are respectively 10m and 15m above the ground floor. If the cafés are linked by a 20m escalator, find the horizontal distance (to the nearest metre) across the atrium, between the two cafés
The horizontal distance between the two cafes is approximately 19.36 meters.
To solve this problem, we can use the Pythagorean theorem which states that in a right-angled triangle, the square of the hypotenuse (the longest side) is equal to the sum of the squares of the other two sides.
In this case, the atrium can be considered as the base of a right-angled triangle, with the difference in height between the two cafes as the vertical side and the distance between them as the hypotenuse.
Let's call the horizontal distance we are looking for "x". Using the Pythagorean theorem, we have:
[tex]x^2 = 20^2 - (15 - 10)^2\\x^2 = 400 - 25\\x^2 = 375[/tex]
x ≈ 19.36
Therefore, the horizontal distance between the two cafes is approximately 19.36 meters.
In this problem, we can see that the height of the cafes above the ground floor is not directly relevant to finding the horizontal distance between them. Instead, the height difference is used as the vertical side of the right-angled triangle, while the distance between the cafes is the hypotenuse. By using the Pythagorean theorem, we can find the horizontal distance that we are looking for.
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1) Government funding: The following table presents the budget
(in millions) for selected organizations that received U. S
government funding for arts and culture in both 2006 and 2012
Organization
2006 2012
Corporation for Public Broadcasting 460 445
Institute of Museum and Library Services 247 237
National Endowment for the Humanities 142 148
National Endowment for the Arts
124 148
National Gallery of Art
951 147
Commission of Fine Arts
2 3
Advisory Council on Historic Preservation 5 6
a) Compute the correlation coefficient.
The least-squares regression line for predicting the 2016 budget from the 2006 budget is y = 18.18 + 0.9365x, their budgets to differ in 2016 is 9.365 million and the budget for organization is 111.83 million.
In a regression graph, the regression line closest to the data points is shown. By replacing alternative values of x in the regression equation, this statistical technique can assist analyse the behaviour of a dependent variable y when the independent variable x changes.
The corporation can identify the optimal asset price in relation to the cost of capital by using regression. It is used in the stock market to calculate the impact of stock price movements on the price of underlying commodities.
Regression analysis may be used in marketing to understand how pricing fluctuations affect the rise or reduction in products sales. It is particularly successful in forecasting future sales by correlating market factors, weather forecasts, economic situations, and prior sales.
a) Here we find the least square regression line for predicting the 2016 budget :
Regression line y = a+bx
b = [tex]\frac{n(Exy)-(Ex*Ey)}{n(Ex)^r-(Ey)^r}[/tex]
= [tex]\frac{2216256 - 1219050}{2220421-1155625}[/tex]
= [tex]\frac{997206}{1064796}[/tex]
= 0.9365
a= y-bx
= [tex]\frac{Ey}{n} -b\frac{Ex}{n}[/tex]
162 - (0.9635 x 153.5714286)
= 162 - 143.819
= 18.18
y = 18.18 + 0.9365x
b) For 10 million change in 2006, there will be
= 10 x 0.9365 = 9.365 million change in 2016
c) If x = 100,
y = 18.18 + 0.9365(100) = 111.83 million.
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Complete question:
Organization 2006 2016
Corporation for Public Broadcasting 460 445
Institute of Museum and Library Services 247 237
National Endowment for the Humanities 142 148
National Endowment for the Arts 124 148
National Gallery of Art 95 147
Commission of Fine Arts 2 3
Advisory Council on Historic Preservation 5 6
Source: National Endowment for the Arts
a. Compute the least-squares regression line for predicting the 2016 budget from the 2006 budget.
b. If two institutions have budgets that differ by 10 million dollars in 2006, by how much would you predict their budgets to differ in 2016?
c.Predict the 2016 budget for an organization whose 2006 budget was 100 million dollars.
what should be added to a-2b 3c to get 2a 3b-4c
Answer:
a + 5b - 7c
Step-by-step explanation:
Let the number to be added by X
then,
a - 2b + 3c + X = 2a + 3b - 4c
X = a + 5b - 7c
what is the percent of 11/20
Answer: 55%
Step-by-step explanation:
To find the percentage of 11/20, we can use the following formula:
Percentage = (Numerator ÷ Denominator) × 100
Substituting the values from 11/20 into the formula, we get:
Percentage = (11 ÷ 20) × 100
Percentage = 0.55 × 100
Percentage = 55%
Therefore, the percentage of 11/20 is 55%.
Answer:
Solution: 11/20 as a percent is 55%
Step-by-step explanation:
First, convert the fraction into a decimal by dividing the numerator by the denominator:
11/20 = 0.55
If we multiply the decimal by 100, we will get the percentage:
00.5 * 100 = 55
We can see that 11/20 is percentage is 55.
to increase strength and/or muscle mass, weight trainers will try different approaches. one approach is to apply an electrical impulse through a
muscle as the person is lifting a weight. a researcher wants to determine if adding this electrical impulse increases the amount of weight a person
can lift. to conduct his research, he selects one hundred people, and randomly divides them into two groups. one group wears a device that
sends an electrical impulse through the muscle used to repeatedly lift a 5 pound weight. the other group lifts the same weight without the electrical
impulse. the researcher counts the number of repetitions until the subjects can no longer lift the weight. is this an example of an observational
study or an experiment?
This is an example of an experiment. In an experiment, researchers manipulate the independent variable (in this case, the presence or absence of an electrical impulse) to determine its effect on the dependent variable (the number of repetitions the subjects can lift a weight).
The researcher randomly assigned subjects to either receive the electrical impulse or not, which is a key feature of experimental design.
By doing so, the researcher can ensure that any differences observed between the two groups are due to the manipulation of the independent variable, rather than any pre-existing differences between the groups.
In contrast, an observational study merely observes existing characteristics or behaviors of a population, without any manipulation or control of variables.
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When a figure is translated on the coordinate plane you should add or subtract x and y? Is this statement true or false?
Answer: True
Step-by-step explanation:
During a sale, a store offered a 20% discount on a stereo system that originally sold for $720. After the sale, the discounted price of the stereo system was marked up by 20%. What was the price of the stereo system after the markup? Round to the nearest cent.
The price of the stereo system after the discount and markup is $691.20.
How to determine the markup:The markup price represents the price after adding a percentage of the discounted price.
The markup can be determined using the markup factor, which increases 100% by the markup percentage.
The discount offered on the stereo system = 20%
Original sales price of the system = $720
Discount factor = 0.8 (1 - 0.2)
Discounted price = $576 ($720 x 0.8)
Markup percentage after the discount = 20%
Markup factor = 1.2 (1 + 0.2)
Marked up price = $691.20 ($576 x 1.2)
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A young doctor is working at night in an emergency room. Emergencies come in at times of a Poisson process with rate 0. 5 per hour. The doctor can only get to sleep when it has been 36 minutes (6 hours) since the last emergency. For example, if there is an emergency at 1:00 and a second one at 1:17 then she will not be able to get to sleep until at least 1:53, and it will be even later if there is another emergency before that time.
(a) Compute the long-run fraction of time she spends sleeping, by formulating a renewal reward process in which the reward in the ith interval is the amount of time she gets to sleep in that interval.
(b) The doctor alternates between sleeping for an amount of time si and being awake for an amount of time u. Use the result from (a) to compute Eui
The probability of getting to sleep in an interval is 0.0903.
The expected time the doctor spends awake in each interval is 1.8648 hours.
(a) To compute the long-run fraction of time the doctor spends sleeping, we can formulate a renewal reward process. In this process, each interval represents the time between consecutive emergencies.
Let T be the inter-arrival time between emergencies, which follows an exponential distribution with a rate of λ = 0.5 per hour. The average inter-arrival time is given by E(T) = 1/λ = 1/0.5 = 2 hours.
In each interval, the doctor can only get to sleep if it has been 36 minutes (6 hours) since the last emergency. Otherwise, she remains awake.
Let R be the reward obtained in each interval, which is the amount of time the doctor gets to sleep. If the doctor gets to sleep in an interval, the reward is (T - 0.6) since she has already waited for 0.6 hours (36 minutes). Otherwise, the reward is zero.
The long-run fraction of time spent sleeping, denoted by ρ, can be calculated as the expected reward per unit time:
ρ = E(R)/E(T)
To compute E(R), we need to consider the conditional probability that the doctor gets to sleep in an interval.
Given an interval length T, the probability that T > 0.1 (36 minutes) is given by P(T > 0.1) = 1 - P(T ≤ 0.1). This probability is equal to the cumulative distribution function (CDF) of the exponential distribution with rate λ evaluated at 0.1.
P(T > 0.1) = 1 - F(0.1) = 1 - (1 - exp(-λ * 0.1))
Substituting the value of λ = 0.5, we get:
P(T > 0.1) = 1 - (1 - exp(-0.5 * 0.1)) ≈ 0.0903
Therefore, the probability of getting to sleep in an interval is approximately 0.0903.
E(R) = (T - 0.6) * P(T > 0.1) + 0 * (1 - P(T > 0.1))
= (T - 0.6) * 0.0903
Substituting the average inter-arrival time E(T) = 2 hours:
E(R) = (2 - 0.6) * 0.0903 ≈ 0.1352 hours
Finally, we can compute ρ:
ρ = E(R)/E(T) = 0.1352/2 ≈ 0.0676
Therefore, the long-run fraction of time the doctor spends sleeping is approximately 0.0676.
(b) To compute E(ui), the expected time the doctor spends awake in each interval, we can use the fact that the total time spent in each interval is T, and the time spent sleeping is (T - R), where R is the reward obtained in each interval.
E(ui) = E(T - R)
= E(T) - E(R)
= 2 - 0.1352
≈ 1.8648 hours
Therefore, the expected time the doctor spends awake in each interval is approximately 1.8648 hours.
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Alfonso went to famous Sam’s appliance store and purchased a refrigerator and a stove. The sale price of the refrigerator was 40% off the original price and the sales price of the stove was 20% off the original price
Alfonso received a 30% overall discount on the refrigerator and the stove together if the sale price of the refrigerator was 2/3 of the sale price of the stove. Therefore, statement (c) is the correct answer.
To see why, let's use some algebra. Let R be the original price of the refrigerator and S be the original price of the stove. Then the sale price of the refrigerator is 0.6R and the sale price of the stove is 0.8S. The total amount Alfonso paid is 0.6R + 0.8S.
To receive a 30% overall discount, Alfonso must have paid only 0.7 times the total original price, which is 0.7(R + S). Therefore, we have the equation:
0.6R + 0.8S = 0.7(R + S)
Simplifying this equation gives:
0.1R = 0.1S
R = S
So the original prices of the refrigerator and the stove were the same. This means that statement (C) is true.
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Complete Question:
Alfonso went to famous Sam's Appliances store and purchased a refrigerator and a stove. The sale price of the refrigerator was 40% off the original price and the sale price of the stove was 20% off the original price.
Which statement must be true to conclude that Alfonso received a 30% overall discount on the refrigerator and the stove together?
a) The sale prices of the refrigerator and the stove were the same.
b) The original prices of the refrigerator and the stove were the same.
c) The sale price of the refrigerator was twice the sale price of the stove.
d) The original price of the refrigerator was twice the original price of the stove.
You doing the practice 1
Using the intersection of sets we find that A ∩ B = {1, 3}
What is a set?A set is a collection of well ordered items.
Givent hat set A = {x| x is an od number greater than 0 and less than 10} and set B = {1, 2, 3, 4}, we desire to find A ∩ B. We proceed as follows.
First since set A = {x| x is an odd number greater than 0 and less than 10}, its elements are A = {1, 3, 5, 7, 9}
Also, set B = {1, 2, 3, 4}
Since we require A ∩ B which is the intersection of both sets and is the elements that both sets have in common. Since both sets have element 1 and 3 in common, we have that
A ∩ B = {1, 3}
So, A ∩ B = {1, 3}
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