After formula for the volume of a cylinder, the increase in water level results in approximately 260 more cubic feet of water in the tank.
The current water level is 10 feet, which is 120 inches. When the water level increases by 2 inches, the new water level will be 122 inches.
The radius of the tank is half of the diameter, which is 30 feet or 360 inches.
The current volume of water in the tank can be calculated using the formula for the volume of a cylinder: V = πr²h, where r is the radius and h is the height of the water level.
V = π(360²)(120) ≈ 15,465,920 cubic inches
When the water level increases by 2 inches, the new height of the water level is 122 inches.
The new volume of water in the tank can be calculated using the same formula:
V = π(360²)(122) ≈ 15,914,693 cubic inches
The difference in volume between the two levels is:
15,914,693 - 15,465,920 = 448,773 cubic inches
To convert cubic inches to cubic feet, we divide by 1728:
448,773 ÷ 1728 ≈ 259.6 cubic feet
Rounding to the nearest cubic foot, we get:
260 cubic feet
Therefore, the increase in water level results in approximately 260 more cubic feet of water in the tank.
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Each theme park charges an entrance fee plus an additional fee per ride. Write a function for each park. (3 points)
a) write a function rule for Big Wave Waterpark
b) write a function rule for Coaster City
c) write a function rule for Virtual Reality Lan
Answer:
a)
[tex]m = \frac{15 - 10}{4 - 2} = \frac{5}{2} [/tex]
[tex]10 = \frac{5}{2} (2) + b[/tex]
[tex]10 = 5 + b[/tex]
[tex]b = 5[/tex]
[tex]y = \frac{5}{2}x + 5[/tex]
b) The function is already given.
c)
[tex]m = \frac{100 - 40}{30 - 10} = \frac{60}{20} = 3 [/tex]
[tex]100 = 3 (30) + b[/tex]
[tex]100 = 90 + b[/tex]
[tex]b = 10[/tex]
[tex] y = 3x + 10[/tex]
Krissa exercises daily by walking. she aims to walk at a steady rate of 3.4 miles per hour.
a. if t represents time in hours and d represents distance in miles, write an equation that models the relationship between these variables.
b. use your equation to calculate the distance krissa will jog in 5/8 of an hour (round to the hundredths).
c. use your equation to calculate how long it will take for krissa to walk 5.44 miles.
When Krissa exercises daily by walking and she aims to walk at a steady rate of 3.4 miles per hour:
a) The equation is d = 3.4t;
b) Krissa will walk 2.13 miles;
c) It will take Krissa 1.6 hours to walk 5.44 miles.
What is a) the equation for Krissa's walking speed (d = 3.4t), and b) how far will she walk in 5/8 of an hour (2.13 mi), and c) how long to walk 5.44 miles (1.6 hours)?When Krissa exercises daily by walking and she aims to walk at a steady rate of 3.4 miles per hour:
a. The equation that models the relationship between time and distance is:
d = 3.4t
where d is the distance Krissa walks in miles and t is the time she spends walking in hours.
b. To calculate the distance Krissa will walk in 5/8 of an hour, we can substitute t = 5/8 into the equation from part a:
d = 3.4(5/8) = 2.125 miles
Therefore, Krissa will walk 2.125 miles in 5/8 of an hour, rounded to the hundredths.
c. To calculate how long it will take Krissa to walk 5.44 miles, we can rearrange the equation from part a to solve for t:
t = d/3.4
Substituting d = 5.44 into this equation, we get:
t = 5.44/3.4 = 1.6 hours
Therefore, it will take Krissa 1.6 hours to walk 5.44 miles.
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A home improvement store advertises 60 square feet of flooring for $253.00, plus $80.00 installation fee. What is the cost per square foot for the flooring?
A. $4.95
B. $5.25
C. $5.55
D. $6.06
If the store advertises 60 square foot flooring for $253, then the cost for "per-square foot" is (c) $5.55.
To find the cost per square foot for the flooring, we need to divide the total cost of the flooring including the "installation-fee' by the total square footage of the flooring.
⇒ Total cost of flooring + installation fee = $253 + $80 = $333,
⇒ Total square footage of the flooring = 60 sq. ft.
So, Cost per square foot = (Total cost of flooring and installation fee)/(Total square footage of the flooring),
⇒ Cost per square-foot = 333/60,
⇒ Cost per square foot = $5.55/sq. ft.
Therefore, the correct option is (c).
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Out of a group of 120 students that were surveyed about winter sports, 28 said they ski and 52 said they snowboard.
Sixteen of the students who said they ski said they also snowboard. If a student is chosen at random, find each
probability
The probability of P(Ski) is 7 / 30, P(Snowboard) is 13 / 30,P(Ski & Snowboard) is 2/15 and P(ski or snowboard) is 8/15.
1. Probability of a student skiing (P(Ski)):
P(Ski) = number of students who ski / total number of students = 28 / 120 = 7 / 30
2. Probability of a student snowboarding (P(Snowboard)):
P(Snowboard) = number of students who snowboard / total number of students = 52 / 120 = 13 / 30
3. Probability of a student skiing and snowboarding (P(Ski & Snowboard)):
P(Ski & Snowboard) = number of students who ski and snowboard / total number of students = 16 / 120 = 4 / 30
=2/15
4.Probability(ski or snowboard) = (7/30) + (13/30) - (2/15)
P(ski or snowboard) = 8/15
Therefore, the probabilities are:
P(ski) = 7/30
P(snowboard) = 13/30
P(ski and snowboard) = 2/15
P(ski or snowboard) = 8/15
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Austin use a mold to make cone-shaped cupcakes. The diameter of the mold is 3 inches, and the height of the mold is 2 inches. If one cubic inch is about 0. 55 ounces, how many ounces will 10 cupcakes weigh? Use 3. 14 for pi. Round to the nearest tenth of an ounce
The 10 cupcakes will weigh approximately 25.9 ounces when one cubic inch is about 0. 55 ounces, the diameter of the mold is 3 inches and the height of the mold is 2 inches.
Given data:
Diameter of the mold = 3 inches
Radius = 3/2 = 1.5 inches
Height of the mold = 2 inches.
One cubic inch = 0.55 ounces
π = 3. 14
We need to find how many ounces will 10 cupcakes weigh. to find that we need to find the volume of a cone and the weight of one cupcake. we can find the volume of a cone given by the formula,
[tex]V = (1/3)πr^2h[/tex]
Where:
r = radius
h = height
By Substituting the r and h values into the formula we get:
[tex]V = (1/3)πr^2h[/tex]
[tex]= (1/3) π ((1.5)^2) × (2)[/tex]
[tex]= (1/3) π×(2.25)×(2)[/tex]
= 1.5π
When one cubic inch of the cone is about 0.55 ounces, the weight of one cupcake is approximately
= 1.5π × 0.55
= 0.825π ounces.
The weight of 10 cupcakes is determined by multiplying by the weight of one cupcake, it is given as:
= 10 × 0.825π
= 8.25π ounces
= 8.25 × 3.14
= 25.9 ounces.
Therefore, the 10 cupcakes will weigh approximately 25.9 ounces.
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Find the global minimum and maximum of the continuous F(x) = ×2 - 8 In(x) on [1, 4].
Global minimum value = ______
Global maximum value =______
F(4) = 16 - 8 In(4) = 8 - 4 In(2)
So the global minimum value is F(2) ≈ -2.6137 and the global maximum value is F(1) = 1 (since F(4) is not greater than 1).
To find the global minimum and maximum of the continuous function F(x) = x^2 - 8 In(x) on the interval [1, 4], we need to find the critical points of the function and evaluate the function at those points and at the endpoints of the interval.
First, we take the derivative of the function:
F'(x) = 2x - 8/x
Setting F'(x) = 0, we get:
2x - 8/x = 0
Multiplying both sides by x, we get:
2x^2 - 8 = 0
Dividing both sides by 2, we get:
x^2 - 4 = 0
Factoring, we get:
(x + 2)(x - 2) = 0
So the critical points are x = -2 and x = 2. However, x = -2 is not in the interval [1, 4], so we only need to consider x = 2.
Now we evaluate the function at the critical point and the endpoints of the interval:
F(1) = 1 - 8 In(1) = 1
F(2) = 4 - 8 In(2) ≈ -2.6137
F(4) = 16 - 8 In(4) = 8 - 4 In(2)
So the global minimum value is F(2) ≈ -2.6137 and the global maximum value is F(1) = 1 (since F(4) is not greater than 1).
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Which interval represents the most number of cars?
4:00-4:59
4:00-4:59
2:00-2:59
2:00-2:59
1:00-1:59
1:00-1:59
3:00-3:59
3:00-3:59
The interval 4:00-4:59 represents the most number of cars.
How to determine the interval with the most number of cars based on the given time ranges?
To determine the interval that represents the most number of cars, we need to analyze the given options and find the one with the highest number of cars.
Unfortunately, we don't have any data about the actual number of cars during those intervals. Therefore, we cannot provide a definitive answer to this question. We could only make an educated guess based on certain assumptions.
For instance, if we assume that the traffic is usually higher during rush hour, we could say that the intervals between 4:00-4:59 and 3:00-3:59 are more likely to have the highest number of cars. However, without additional information or data, we cannot provide a more accurate answer.
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What is the diameter of a sphere with a volume of
7483
m
3
,
7483 m
3
, to the nearest tenth of a meter?
The diameter of the sphere is approximately 20 meters to the nearest tenth of a meter.
The volume of a sphere is given by the formula V = (4/3)πr^3, where r is the radius of the sphere. Since we are given the volume of the sphere, we can solve for the radius as follows:
V = (4/3)π[tex]r^{3}[/tex]
[tex]r^{3}[/tex] = (3V) / (4π)
r = [tex](3V/4\pi )^{1/3}[/tex]
Substituting the given value of the volume, we get:
r = [tex](3*7483/4\pi )^{1/3}[/tex] ≈ 10.0
Therefore, the radius of the sphere is approximately 10 meters. The diameter of the sphere is twice the radius, so the diameter is approximately:
2 x 10 ≈ 20 meters
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Solve for X
X^2 + x - 6 = 0
Answer: There are two solutions to X.. x = -3 and x = 2
Step-by-step explanation:
In this case, a = 1, b = 1, and c = -6, so we have:
x = (-1 ± sqrt(1^2 - 4(1)(-6))) / 2(1)
x = (-1 ± sqrt(1 + 24)) / 2
x = (-1 ± sqrt(25)) / 2
The two solutions are x = (-1 + 5) / 2 = 2 and x = (-1 - 5) / 2 = -3. Therefore, the solutions to the equation X^2 + x - 6 = 0 are x = 2 and x = -3.
+ = a) Find a parametrization for the curve of intersection of 9y2 + z2 = 1 and xyz = 1 such that it is defined for all t + b) Same for surfaces x=y_and x2 - y2 =z. c) Same for surfaces x2 + y2 + z =
a) Parametrization for the curve of intersection of 9y2 + z2 = 1 and xyz = 1 is:
x = 1/(z(sqrt((1 - z^2)/9)))
y = ±sqrt((1 - z^2)/9)
z = t
b)Parametrization for the curve of intersection of x=y_and x2 - y2 =z is
x = t
y = t
z = 0
c)Parametrization for the curve of intersection of x2 + y2 + z = is
x = r cos(t)
y = r sin(t)
z = 1 - r
a) To find the curve of intersection of the two surfaces [tex]9y^2 + z^2 = 1[/tex] and xyz = 1:
We can solve for one variable in terms of the others.
For example, we can solve for y in terms of z and x using the first equation:
[tex]9y^2 + z^2 = 1[/tex]
[tex]9y^2 = 1 - z^2[/tex]
[tex]y^2 = (1 - z^2)/9[/tex]
y = ±sqrt([tex](1 - z^2)/9)[/tex]
Substituting this into the second equation, we get:
x(sqrt((1 - [tex]z^2)/9))z = 1[/tex]
x = 1/(z(sqrt((1 - [tex]z^2)/9)))[/tex]
So, a parametrization for the curve of intersection is:
x = 1/(z(sqrt((1 - [tex]z^2)/9)))[/tex]
y = ±sqrt((1 - z^2)/9)
z = t
This is defined for all t except at z = ±1.
b) To find the curve of intersection of the two surfaces x = y and [tex]x^2 - y^2 = z:[/tex]
We can substitute x = y into the second equation:
[tex]x^2 - y^2 = z[/tex]
[tex]y^2 - y^2 = z[/tex]
z = 0
So the curve of intersection is just the x = y line.
A parametrization for this line is:
x = t
y = t
z = 0
c) To find a parametrization for the surface [tex]x^2 + y^2 + z = 1:[/tex]
We can use cylindrical coordinates:
x = r cos(t)
y = r sin(t)
z = 1 - r
where 0 ≤ r ≤ 1 and 0 ≤ t < 2π.
This parameterization covers the surface of a unit cylinder with its top and bottom caps removed.
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What is the domain of the function y=^3/x-1?
The domain of the function y = (3/x) - 1 is all real numbers except x = 0
The domain of a function consists of all the valid input values for which the function is defined. In the case of the function y = (3/x) - 1, the only restriction on the domain arises from the presence of the variable x in the denominator.
To determine the domain, we need to find the values of x for which the expression 3/x is defined. Division by zero is undefined, so we must exclude any value of x that makes the denominator equal to zero.
In this case, we set the denominator, x, equal to zero and solve for x:
x = 0
Therefore, x cannot be equal to zero. All other real numbers are valid input values for this function. Therefore, the domain of the function y = (3/x) - 1 is all real numbers except x = 0. In interval notation, we can represent the domain as (-∞, 0) ∪ (0, ∞).
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Chris had a collection of 1,000 records at the beginning of the summer. After the summer, Chris had traded some of his records and now he has only 870 records.
What is the percent decrease of his record collection?
Please help worth 50 points if right.
Answer:
Step-by-step explanation:
git
through: (-2, 0) slope = 1
The equation of the line that passes though (-2, 0 and have a slope of 1 is y = x + 2.
How to find the equation of a line?The equation of a line can be represented in slope in intercept form as follows:
y = mx + b
where
m = slope of the lineb = y-interceptTherefore, the slope of a line is the change in the dependent variable with respect to the change in the independent variables.
Hence,
slope = 1 and the line passes through(-2, 0).
Therefore,
y = x + b
let's find b using (-2, 0)
0 = -2 + b
b = 2
Therefore, the equation is y = x + 2.
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larry and julius are playing a game, taking turns throwing a ball at a bottle sitting on a ledge. larry throws first. the winner is the first person to knock the bottle off the ledge. at each turn the probability that a player knocks the bottle off the ledge is 1 2, independently of what has happened before. what is the probability that larry wins the game?(2015 amc 12b
The probability of Larry has a chance of winning the game is equal to 2/3
Let P be the probability that Larry wins the game.
Set up a system of equations based on the probabilities of each player winning on their turn,
P = 1/2 + 1/2 × (1 - P)
First term corresponds to Larry winning on his first turn, with probability 1/2.
The second term corresponds to Julius winning on his first turn, with probability 1/2,
And then Larry winning with probability (1 - P).
Since they are now in the same position as at the start of the game.
Simplifying the equation, we get,
⇒P = 1/2 + 1/2 - P/2
Multiplying both sides by 2, we get,
⇒2P = 1 + 1 - P
Simplifying further, we get,
⇒3P = 2
⇒ p = 2/3.
Therefore, the probability that Larry wins the game is equal to
P = 2/3.
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A sample of 40 foreclosed homes in washington, dc were sold. the average price of these homes was $375,334 and the standard deviation was $220,978. find the upper 99% confidence limit for the average of all foreclosed homes in washington, dc. (do not use $ sign when you enter your answer)
We can be 99% confident that the true average price of all foreclosed homes in Washington, DC is no higher than $460,794.81.
To find the upper 99% confidence limit for the average price of all foreclosed homes in Washington, DC, we can use the formula:
Upper limit = sample mean + (z-score)*(standard error)
First, we need to find the z-score for the 99% confidence level. From a standard normal distribution table, we can find that the z-score for a 99% confidence level is 2.576.
Next, we need to find the standard error, which is the standard deviation of the sample divided by the square root of the sample size:
standard error = standard deviation / √sample size
Plugging in the values given in the problem, we get:
standard error = 220,978 / √40
standard error = 34,955.84
Finally, we can plug in the values for the sample mean, z-score, and standard error into the formula to get the upper limit:
Upper limit = 375,334 + (2.576)*(34,955.84)
Upper limit = 460,794.81
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Help
the high school concert choir has 7 boys and 15 girls. the teacher needs to pick three soloists for the next concert but all of the members are so good she decides to randomly select the three students for the solos.
a) in how many ways can the teacher select the 3 students?
b) what is the probability that all three students selected are girls
c) what is the probability that at least one boy is selected?
a) There are 1540 ways that the teacher can select the three students.
b) The probability that all three students selected are girls is approximately 0.176 or 17.6%.
c) The probability that at least one boy is selected is approximately 0.824 or 82.4%.
a)
To find the number of ways the teacher can select three students out of 22 students (7 boys and 15 girls), we can use the combination formula. The number of ways to select r items from a set of n items is given by:
nCr = n! / (r! * (n-r)!)
where n! represents the factorial of n (i.e., n! = n x (n-1) x (n-2) x ... x 3 x 2 x 1), and r! represents the factorial of r. Applying this formula, we get:
22C3 = 22! / (3! * (22-3)!) = 22! / (3! * 19!) = (22 x 21 x 20) / (3 x 2 x 1) = 1540
Therefore, there are 1540 ways that the teacher can select the three students.
b)
To find the probability that all three students selected are girls, we can use the formula for the probability of an event occurring. Since there are 15 girls and 7 boys, the probability of selecting a girl is 15/22 for the first selection, 14/21 for the second selection (since there are now 14 girls left out of 21 remaining students), and 13/20 for the third selection. Applying the formula, we get:
P(all three are girls) = (15/22) x (14/21) x (13/20) ≈ 0.176
Therefore, the probability that all three students selected are girls is approximately 0.176 or 17.6%.
c)
To find the probability that at least one boy is selected, we can use the complement rule. The complement of selecting at least one boy is selecting all three girls, which we calculated in part (b) to be approximately 0.176. Therefore, the probability of selecting at least one boy is:
P(at least one boy) = 1 - P(all three are girls) ≈ 1 - 0.176 ≈ 0.824
Therefore, the probability that at least one boy is selected is approximately 0.824 or 82.4%.
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Find the volume of the solid enclosed by the paraboloids z = 4 (x² + y²) and z = 50 – 4 (x2 + y²).
The volume of the solid enclosed by the paraboloids z = 4 (x² + y²) and z = 50 – 4 (x² + y²) is approximately 164.93 cubic units.
To find the volume of the solid enclosed by the two paraboloids, we need to first find the intersection of the two surfaces. Setting the equations of the paraboloids equal to each other, we get:
4(x² + y²) = 50 - 4(x² + y²)
Simplifying this equation, we get:
8x² + 8y² = 50
Dividing by 8, we get:
x² + y² = 6.25
This equation represents a circle of radius 2.5 centered at the origin in the xy-plane.
To find the volume of the solid, we can use a double integral in cylindrical coordinates:
V = ∫∫R (50 - 4r²) - 4r² r dr dθ
where R is the region enclosed by the circle x² + y² = 6.25.
Evaluating the integral, we get:
V = ∫0^2π ∫0^2.5 (50 - 8r²) r dr dθ
= 2π [25r² - (4/3)r^4]0^2.5
= 2π [156.25/3]
≈ 164.93 cubic units
Therefore, the volume of the solid enclosed by the paraboloids z = 4 (x² + y²) and z = 50 – 4 (x² + y²) is approximately 164.93 cubic units.
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Which equation has the same solution as x^2-10x-3=5?
Answer:
Step-by-step explanation:
To find the equation that has the same solution as x^2 - 10x - 3 = 5, we can start by simplifying the left side of the equation by adding 8 to both sides:
x^2 - 10x - 3 = 5
x^2 - 10x - 8 = 0
Now we need to find an equation with the same solutions as this simplified equation. We can do this by factoring the quadratic equation into two linear factors:
x^2 - 10x - 8 = 0
(x - 2)(x - 8) = 0
Therefore, the solutions to the equation x^2 - 10x - 3 = 5 are x = 2 and x = 8. We can write two equations that have these solutions:
(x - 2) = 0
(x - 8) = 0
So the two equations that have the same solution as x^2 - 10x - 3 = 5 are x - 2 = 0 and x - 8 = 0. These equations can be simplified as x = 2 and x = 8, which are the same solutions as the original quadratic equation. Therefore, the equations x - 2 = 0 and x - 8 = 0 have the same solution as x^2 - 10x - 3 = 5.
(x - 5)^2 = 33
Step-by-step explanation:Add 3 to both sidesx^2 - 10x - 3 = 5Simplifyx^2 - 10x = 8Calculate the "magic number":b = -10 → b/2 = -5 → (b/2)^2 = 25Add the magic number to both sidesx^2 -10x + 25 = 8 + 25Factor left side(x - 5)(x - 5) = 33Rewrite left side as a perfect square(x - 5)^2 = 33
Solution(x - 5)^2 = 33
Consider the following planes.
-4x † V + 7 = 4
24X - бУ + 42 = 16
Find the angle between the two planes. (Round your answer to two decimal places.)
To find the angle between two planes, we need to find the cosine of the angle between their normal vectors. The normal vector of the first plane is (4, 0, -1) and the normal vector of the second plane is (24, -1, 0).
Using the dot product formula, we have:
cos(theta) = (4, 0, -1) · (24, -1, 0) / ||(4, 0, -1)|| ||(24, -1, 0)||
= (96 + 0 + 0) / (sqrt(16 + 1) * sqrt(576 + 1))
= 96 / sqrt(33217)
Using a calculator, we get:
cos(theta) ≈ 0.00575
Therefore, the angle between the two planes is:
theta ≈ acos(0.00575)
theta ≈ 89.59 degrees
Rounded to two decimal places, the angle between the two planes is approximately 89.59 degrees.
To find the angle between the two given planes, we first need to rewrite the equations in their standard form and find the normal vectors for each plane.
Plane 1: -4x + y + 7 = 4
Standard form: -4x + y + 0z = -3
Normal vector N1: <-4, 1, 0>
Plane 2: 24x - 6y + 42 = 16
Standard form: 24x - 6y + 0z = -26
Normal vector N2: <24, -6, 0>
Now, we can find the angle θ between the two planes by using the formula:
cos(θ) = (N1 • N2) / (||N1|| ||N2||)
First, calculate the dot product (N1 • N2):
N1 • N2 = (-4 * 24) + (1 * -6) + (0 * 0) = -102
Next, calculate the magnitudes of the normal vectors:
||N1|| = sqrt((-4)^2 + 1^2 + 0^2) = sqrt(17)
||N2|| = sqrt(24^2 + (-6)^2 + 0^2) = sqrt(576+36) = sqrt(612)
Now, we can find cos(θ):
cos(θ) = (-102) / (sqrt(17) * sqrt(612))
Finally, calculate the angle θ (in degrees) by taking the inverse cosine:
θ = arccos((-102) / (sqrt(17) * sqrt(612))) = 44.41° (rounded to two decimal places)
So, the angle between the two planes is 44.41°.
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AABC DEF. What sequence of transformations will move AABC onto ADEF?
A. A dilation by a scale factor of 2, centered at the origin, followed by
a reflection over the y-axis
B. The translation (x, y) - (x + 7, y), followed by a dilation by a scale
factor of 2 centered at the origin
C. A dilation by a scale factor of 2, centered at the origin, followed by
the translation
(x, y) - (x + 7, y)
D. A dilation by a scale factor of 2, centered at the origin, followed by
the translation (x, y) - (x + 7, y)
Answer:
D
Step-by-step explanation:
If you dilate the figure with the center at (0,0), the sides of the triangle will be twice as long. Then You translate the figure 7 units to the right.
Helping in the name of Jesus.
The correct statement is,
⇒ A dilation by a scale factor of 2, centered at the origin, followed by
the translation (x, y) → (x + 7, y)
What is Translation?A transformation that occurs when a figure is moved from one location to another location without changing its size or shape is called translation.
Since, Scale Factor is defined as the ratio of the size of the new image to the size of the old image.
If the scale factor is more than 1, then the image stretches.
If the scale factor is between 0 and 1, then the image shrinks.
If the scale factor is 1, then the original image and the image produced are congruent.
And, The only change in the dilation process is that the distance between the points changes.
It means that the length of the sides of the original image and the dilated image may vary.
Here, By dilation with factor 2 to the small triangle, its sides becomes equal as big triangle.
Now, center the small triangle at origin (0,0).
Then, transform the small triangle to (x + 7, y) i.e., it exactly gets the coordinates of the big triangle.
There are same in terms of sides length and coordinates.
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Find and interpret the mean absolute deviation of the data. 46,54,43,57,50,62,78,42
In this case, the mean absolute deviation of 8.5 indicates that, on average, the data points deviate from the mean by about 8.5 units.
What is mean absolute deviation?Mean absolute deviation (MAD) is a statistical measure that represents the average distance between each data point and the mean of the data set. It is calculated by finding the absolute value of the difference between each data point and the mean, and then taking the average of these absolute differences. MAD is a useful measure of the variability or spread of a data set, and is often used as an alternative to the more common measure of standard deviation. Like standard deviation, MAD gives an indication of how spread out the data is, but unlike standard deviation, MAD is less sensitive to extreme values or outliers.
Here,
To find the mean absolute deviation of the data, we first need to calculate the mean (average) of the data:
Mean = (46 + 54 + 43 + 57 + 50 + 62 + 78 + 42) / 8
Mean = 52
The mean of the data is 52.
Next, we need to calculate the absolute deviation of each data point from the mean. The absolute deviation is simply the absolute value of the difference between each data point and the mean:
|46 - 52| = 6
|54 - 52| = 2
|43 - 52| = 9
|57 - 52| = 5
|50 - 52| = 2
|62 - 52| = 10
|78 - 52| = 26
|42 - 52| = 10
Now, we can calculate the mean absolute deviation by taking the average of the absolute deviations:
Mean Absolute Deviation = (6 + 2 + 9 + 5 + 2 + 10 + 26 + 10) / 8
Mean Absolute Deviation = 8.5
The mean absolute deviation of the data is 8.5.
Interpretation: The mean absolute deviation represents the average distance between each data point and the mean of the data. In this case, the mean absolute deviation of 8.5 indicates that, on average, the data points deviate from the mean by about 8.5 units. This means that the data points are relatively spread out, with some points being much higher or lower than the mean.
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The radius of a circle is 15 ft. Find its area in terms of pi
Answer:
A= 225π ft²
Step-by-step explanation:
A = π r²
A= π 15²
A= 225π ft²
Answer:
706.86
Step-by-step explanation:
1. A=πr^2 : The formula to find the area of a circle.
2. A = π15^2 : Substitute the given radius value into the equation.
3. Insert equation into calculator
706.86 (Rounded to the nearest hundredth)
Solve for x: √8x + 4 = 6
The solution to the equation √8x + 4 = 6 is x = 0.5.
What is the value of x?An equation is simply a mathematical formula that expresses the equality of two expressions, using the equals sign as a connection between them.
Given the equation in the question:
√8x + 4 = 6
To solve for x in the equation, isolate the term containing the variable x.
Subtract 4 from both sides of the equation:
√8x + 4 - 4 = 6 - 4
√8x = 6 - 4
√8x = 2
Square both sides of the equation:
( √8x )² = 2²
8x = 4
Divide both sides of the equation by 8:
x = 4/8
x = 1/2
x = 0.5
Therefore, the value of x is 0.5.
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Solve for length of segment c.
In the given diagram, using the intersecting secant theorem, the length of c is 2 cm
Intersecting secant theorem: Calculating the length of cFrom the question, we are to determine the length of segment c
From the intersecting secant theorem, we have that
If two secant segments intersect outside a circle, then the product of the secant segment with its external portion equals the product of the other secant segment with its external portion
Thus,
In the given circle, we can write that
a × b = c × d
Substitute the values
3 × 12 = c × 18
36 = c × 18
Divide both sides by 18
36 / 18 = (c × 18) / 18
2 = c
Therefore,
c = 2
Hence, the length of c is 2 cm
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Aquarium A contains 6 gallons of water. Dan will begin filling Aquarium A at a rate of 2 gallons per minute.
Aquarium B contains 54 gallons of water. Roger will begin filling Aquarium B at a rate of 1 gallon per minute.
After how many minutes will both aquariums contain the same amount of water?
To find the number of minutes it will take for both Aquarium A and Aquarium B to contain the same amount of water, we can set up an equation using the given information.
Aquarium A starts with 6 gallons and is filled at 2 gallons per minute. The equation for Aquarium A will be:
A = 6 + 2t
Aquarium B starts with 54 gallons and is filled at 1 gallon per minute. The equation for Aquarium B will be:
B = 54 + 1t
We want to find the time 't' when the amount of water in both aquariums is equal, so we can set the equations equal to each other:
6 + 2t = 54 + 1t
Now, solve for 't':
2t - 1t = 54 - 6
t = 48
After 48 minutes, both Aquarium A and Aquarium B will contain the same amount of water.
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Find (a) the lateral area and (b) the surface area of the prism.
In this prism, lateral Area = 858.54 m² and surface area = 890.54 m².
Firstly, we will find the lateral area of the prism by applying the formula:
Lateral area = perimeter × height
Perimeter = sum of all the sides of prism
= 4 + 8 + 8.94 = 20.94 m
Lateral Area = 20.94 * 41 = 858.54 m²
Now, we have to find the surface area of the prism.
Surface area = Lateral Area + 2 × ( Base Area)
Base Area = the area of a triangle with sides 4, 8, and 8.94.
Now, we will calculate the area of the triangle
Firstly, we will find s for calculating the area of triangle and then apply the formula.
s = ( 4 + 8 + 8.94)/2 = 10.47 m
Area of triangle = [tex]\sqrt{ (10.47 (10.47 - 4)(10.47 - 8)(10.47 - 8.94))}[/tex]
= [tex]\sqrt{(10.47 (6.47)(2.47)(1.53))}[/tex]
= 16 m²
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Correct question:
Use formulas to find the lateral area and surface area of the given prism. Round your answer to the nearest whole number. The figure is not drawn to scale. The bases are right triangles.
How would you classify this system of equations? 3x + 2y = –2 and
6x + 4y = 15
The system of equations 3x + 2y = –2 and 6x + 4y = 15 can be classified as inconsistent systems.
To classify the given system of equations, we will analyze the coefficients of the variables and constants to determine if the equations are dependent, independent, or inconsistent. The system is:
1) 3x + 2y = -2
2) 6x + 4y = 15
First, let's check if the equations are multiples of each other. If we multiply the first equation by 2, we get:
1') 6x + 4y = -4
Comparing equation 1' with equation 2, we can see that the left-hand sides are equal, but the right-hand sides are different (-4 ≠ 15). Therefore, the equations are not multiples of each other.
Next, we'll examine the coefficients of x and y. In both equations, the ratio of the coefficients of x to y is the same (3/2 and 6/4). This means the lines represented by these equations are parallel.
Since the lines are parallel and not multiples of each other, they do not intersect, meaning there is no common solution for this system of equations. Therefore, we can classify this system as inconsistent system.
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Twice the difference of a number and 3 is at most -24
Answer:
2(x - 3) < -24
x - 3 < -12
x < -9
The inequality that represents the given statement is 2(x-3) ≤ -24, where x is the unknown number.
The given statement can be translated into an inequality as "twice the difference of a number (x) and 3 is at most -24". Mathematically, this can be represented as 2(x-3) ≤ -24. Simplifying this inequality, we get 2x - 6 ≤ -24, or 2x ≤ -18, which gives x ≤ -9. Therefore, any number less than or equal to -9 satisfies the given statement.
For example, x = -10 satisfies 2(-10-3) = -26, which is less than or equal to -24. However, any number greater than -9 does not satisfy the given statement. For example, x = -8 gives 2(-8-3) = -22, which is greater than -24. Therefore, the solution set for the given inequality is x ≤ -9.
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Let f(x)= 3x and g(x)= 3(x+1)^2. Find (fg)(x) and (f/g)(x).
State the domain of each.
Evaluate the following: (fg)(5) and (f/g)(5)
The value of the domains is given as:
(fg)(5) equals 1620 (f/g)(5) is equivalent to 5/36.How to solveIn order to find the results of (fg)(x) and (f/g)(x), we must begin by multiplying and dividing the two functions, respectively:
(fg)(x) = f(x) * g(x) = [tex]3x * 3(x + 1)^2 = 9x(x + 1)^2[/tex]; its domain containing all real numbers.
Similarly, (f/g)(x) = f(x) / g(x) = in a domain that does not [tex]3x / 3(x + 1)^2 = x / (x + 1)^2[/tex]include x = -1 (if g(x) ≠ 0).
Let us now evaluate (fg)(5) and (f/g)(5):
(fg)(5) =[tex]9(5)(5 + 1)^2 = 9(5)*(6)^2[/tex] = 9(5(36)) = 1620 while
(f/g)(5) = [tex]5/(5 + 1)^2 = 5/(6)^2[/tex] = 5/36.
Consequently, (fg)(5) equals 1620 and (f/g)(5) is equivalent to 5/36.
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Quadrilateral ABCD is a parallelogram. Segment BD is a diagonal of the parallelogram.
Which statement and reason correctly complete this proof?
Answer:
(A) alternate interior angles
Step-by-step explanation:
You want the missing statement in the proof that opposite angles of a parallelogram are congruent.
ProofThe proof here shows angles A and C are congruent because they are corresponding parts of congruent triangles. To get there, the triangles must be shown to be congruent.
In statement 5, the triangles area claimed congruent by the ASA theorem, which requires two corresponding pairs of angles and congruent sides.
In statement 4, the relevant sides are shown congruent, so it is left to statement 3 to show two pairs of angles are congruent.
Of the offered answer choices, only one of them deals with two pairs of angles. Answer choice A is the correct one.