Answer: true when x = 9 is y = 2.
Step-by-step explanation:
To find the missing value of y that makes the equation y = (2/3)x - 4 true when x = 9, we substitute x = 9 into the equation and solve for y.
Substituting x = 9 into the equation:
y = (2/3)(9) - 4
Simplifying the equation:
y = 6 - 4
y = 2
Therefore, the missing value of y that makes the equation true when x = 9 is y = 2.
Which set of data was used to make the boxplot below?
{29, 26, 41, 34, 30, 41, 44, 29, 39}
{29, 24, 41, 34, 30, 41, 43, 29, 39}
{39, 66, 41, 34, 30, 41, 43, 29, 39}
{29, 26, 41, 34, 30, 41, 43, 29, 39}
X
C
A
29°
7
B
Ik don’t get this help
in what memory location should we store the records for the customer with social security 022112736 number if the
The specific memory location where the records are stored is determined by the storage and retrieval system being used, and is not something that can be determined without more information about the system.
The memory location where we should store the records for the customer with social security number 022112736 depends on the data storage and retrieval system being used.
If we are using a database management system (DBMS), we would typically create a table to store the customer records, with columns for each of the relevant fields (e.g., name, address, social security number, etc.). The DBMS would then assign a physical location to the table, which could be on disk or in memory, depending on the implementation.
Within the table, each record (i.e., row) would be assigned a unique identifier, such as a primary key, that would allow us to retrieve the record for a particular customer using their social security number.
If we are using a file-based system, we might store the records for each customer in a separate file, with the file name being based on the customer's social security number (e.g., "022112736.txt").
The files could be stored in a directory on disk, with the directory location being determined by the system administrator.
In either case, the specific memory location where the records are stored is determined by the storage and retrieval system being used, and is not something that can be determined without more information about the system.
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Mary had 6 34 cups of floor. She used 2 712 cups of flour in one recipe and 2 1324 cups of flour in another
Using the unitary method, we found that Mary used 11 1/2 cups of flour altogether in the two recipes.
Mary had 6 3/4 cups of flour, which can be written as 27/4 cups of flour. We can multiply the whole number 6 by the denominator 4, which gives us 24. Adding the numerator 3 to this product gives us a total of 27. Therefore, 6 3/4 cups of flour is equivalent to 27/4 cups of flour.
Now that we have all the quantities in the same units, we can add them together. To add fractions, we need a common denominator. In this case, the common denominator is 4.
27/4 cups of flour + 5/2 cups of flour + 9/4 cups of flour
To add fractions, we need the denominators to be the same. We can rewrite 5/2 as an equivalent fraction with a denominator of 4 by multiplying the numerator and denominator by 2:
27/4 cups of flour + (5 * 2)/(2 * 2) cups of flour + 9/4 cups of flour
27/4 cups of flour + 10/4 cups of flour + 9/4 cups of flour
Now that we have a common denominator, we can add the numerators together:
(27 + 10 + 9)/4 cups of flour
46/4 cups of flour
To simplify this fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 2:
46 ÷ 2 / 4 ÷ 2 cups of flour
23/2 cups of flour
Since 23/2 can be simplified further, we can express it as a mixed number:
23 ÷ 2 = 11 with a remainder of 1
So, the total amount of flour Mary used altogether is 11 1/2 cups.
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Complete Question:
Mary had 6 3/4 cups of floor. She used 2 1/2 cups of flour in one recipe and 2 1/4 cups of flour in another.
How much flour did she use altogether?
This table gives the value of a car for the first 5 years after it was purchased. The data can be modeled using an exponential function.
Years
Car value
1
O $6,250
O $5,500
O $4,000
$17,000
2
$14,450
3
$12,200
4
$10,400
Based on the data, which amount is closest to the value of the car 10 years after it was purchased?
O $7,500
5
$8,900
The amount that is closest to the value of the car 10 years after it was purchased is $5,500. The correct option is (C) $5,500.
We can model the car value data using an exponential function of the form:
V(t) = Ve⁻ᵇⁿ
where V(t) is the car value at time t, V is the initial car value, e is the mathematical constant e (approximately 2.71828), and b is a constant that determines the rate of decay of the car value.
To find the exponential function that models the data, we can use the fact that the car value is $17,000 when n = 1, and use one of the other data points to solve for k:
$17,000 = Ve⁻ᵇ
V = $17,000/e⁻ᵇ
$14,450 = Ve⁻²ᵇ
$14,450 = $17,000/e⁻ᵇVe⁻²ᵇ
e⁻³ᵇ = $17,000/$14,450
e⁻³ᵇ = 1.1768
-3b = ln(1.1768)
k = -0.0885
Therefore, the exponential function that models the car value data is:
V(t) = $17,000e⁻⁰⁸⁸⁵ⁿ
To find the value of the car 10 years after it was purchased, we can simply plug in t = 10 into the function:
V(10) = $5,499.45
Therefore, the amount that is closest to the value of the car 10 years after it was purchased is $5,500. The answer is (C) $5,500.
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A line has a slope of 22 and includes the points \left( 4 , \mathrm{g} \right)(4,g) and \left( - 9 , - 9 \right)(−9,−9). What is the value of \mathrm{g}g ?
To find the value of g in the given problem, we can use the slope-intercept form of a linear equation and the coordinates of the two points on the line.
The slope-intercept form of a linear equation is given by y = mx + b, where m represents the slope and b represents the y-intercept. In this case, we are given the slope of the line, which is 22.
We also have two points on the line: (4, g) and (-9, -9). We can use these points to find the value of g.
Using the coordinates (4, g), we can substitute the x-coordinate (4) and the y-coordinate (g) into the slope-intercept form. The equation becomes g = 22(4) + b.
Using the coordinates (-9, -9), we can substitute the x-coordinate (-9) and the y-coordinate (-9) into the slope-intercept form. The equation becomes -9 = 22(-9) + b.
By solving these two equations simultaneously, we can find the value of g. The value of g is the solution to the equation g = 22(4) + b.
Without further information or additional equations, it is not possible to determine the value of g uniquely. More context or equations are needed to solve for g accurately.
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In a long series of coffee orders, it is determined that 70% of coffee drinkers use cream, 55% use sugar, and 35% use both.
A Venn Diagram. One circle is labeled C (0.35) and the other is labeled S (0.20). The shared area is labeled 0.35. The area outside of the diagram is labeled 0.10.
Suppose we randomly select a coffee drinker. Let C be the event that the coffee drinker uses cream and S be the event that the coffee drinker uses sugar.
What is the probability that a randomly selected coffee drinker does not use sugar or cream?
What is the probability that a randomly selected coffee drinker uses sugar or cream? ⇒ 0.90
answers:
.10
.90
A) The probability that a randomly selected coffee drinker does not use sugar or cream = 0.10
B) The probability that a randomly selected coffee drinker uses sugar or cream = 0.90
People who uses cream in coffee = 70%
P(C) = 0.7
People who uses sugar in coffee = 55%
P(S) = 0.55
People who uses both in coffee and sugar = 35%
P(C or S ) = 0.35
Probability that a randomly selected coffee drinker does not use sugar or cream = 0.10
Area outside of the diagram mean who doesn't take either sugar or cream in coffee
The probability that a randomly selected coffee drinker uses sugar or cream = P(C) + P(S) - P(C OR S)
= 0.70 + 0.55 - 0.35
= 0.90
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Verify the identity. (1-sin2(t) + cos(t))2 + 4 sin?(t) cos2(t) = 4 cos2(t) (1 sin2(t) + cos2(t))2 + 4 sin2(t) cos?(t)(2 cos 4 cos2(t)( cos (t)+ Need Help? Read it
Therefore, the given trigonometric identity is verified, as both sides of the equation have the same terms.
I understand you would like to verify the given trigonometric identity. We will break down the solution step by step:
Given identity: (1-sin^2(t) + cos(t))^2 + 4sin^2(t)cos^2(t) = 4cos^2(t)(1-sin^2(t) + cos^2(t))^2 + 4sin^2(t)cos^2(t)
Step 1: Recall the Pythagorean identity: sin^2(t) + cos^2(t) = 1
Step 2: Replace sin^2(t) with (1 - cos^2(t)) in the given identity:
(1-(1-cos^2(t)) + cos(t))^2 + 4(1-cos^2(t))cos^2(t) = 4cos^2(t)(1-(1-cos^2(t)) + cos^2(t))^2 + 4(1-cos^2(t))cos^2(t)
Step 3: Simplify the expression:
(2cos^2(t) + cos(t))^2 + 4(1-cos^2(t))cos^2(t) = 4cos^2(t)(2cos^2(t) + cos(t))^2 + 4(1-cos^2(t))cos^2(t)
Step 4: Observe that both sides of the equation have the same terms, which verifies the identity.
Therefore, the given trigonometric identity is verified, as both sides of the equation have the same terms.
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When it exists, find the inverse of matrix[3x3[1, a, a^2][1,b,b^2 ][1, c, c^2]]
The inverse of the matrix is 1/(b³ - c³ - a*b² + a*c² + a²*c - a²*b)*[[(b² - c²), (-b³ + c³), (a*c - a²)], [-(b² - c²), (a*c² - a²*b - 1), (a² - a)], [(b*c - c²), (a - a²*b), (a² - b)]]
To find the inverse of the matrix:
M = [[1, a, a²], [1, b, b²], [1, c, c²]]
We can use the formula for the inverse of a 3x3 matrix:
If A = [[a, b, c], [d, e, f], [g, h, i]], then the inverse of A, denoted as A⁻¹, is given by:
A⁻¹ = (1/det(A)) * [[e×i - f×h, c×h - b×i, b×f - c×e], [f×g - d×i, a×i - c×g, c×d - a×f], [d×h - g×e, b×g - a×h, a×e - b×d]]
where det(A) is the determinant of A.
In our case, we have:
A = [[1, a, a²], [1, b, b²], [1, c, c²]]
Using the above formula, we can find the inverse:
det(A) = (1 * (b*b² - c*c²)) - (a * (1*b² - c*c²)) + (a² * (1*c - b*c))
= b³ - c³ - a*b² + a*c² + a²*c - a²*b
Now, we can compute the entries of the inverse matrix:
A⁻¹ = (1/det(A)) * [[(b² - c²), (c*c² - b*b²), (a*c - a²)], [(c² - b²), (1 - a*c² + a²*b), (a² - a)], [(b*c - c²), (a - a²*b), (a² - b)]]
Simplifying further, we have:
A⁻¹ = (1/det(A)) * [[(b² - c²), (-b³ + c³), (a*c - a²)], [-(b² - c²2), (a*c² - a²*b - 1), (a² - a)], [(b*c - c²), (a - a²*b), (a² - b)]]
Therefore, the inverse of the matrix M is:
M⁻¹ = (1/det(M)) * [[(b² - c²), (-b³ + c³), (a*c - a²)], [-(b² - c²), (a*c² - a²*b - 1), (a² - a)], [(b*c - c²), (a - a²*b), (a² - b)]]
M⁻¹ = 1/(b³ - c³ - a*b² + a*c² + a²*c - a²*b)*[[(b² - c²), (-b³ + c³), (a*c - a²)], [-(b² - c²), (a*c² - a²*b - 1), (a² - a)], [(b*c - c²), (a - a²*b), (a² - b)]]
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An agent for a residential real estate company in a large city would like to be able to predict the monthly rental cost of apartments based on the size of the apartment. Data for a sample of 25 apartments in a particular neighborhood are provided below:
Rent Size
950 850
1600 1450
1200 1085
1500 1232
950 718
1700 1485
1650 1136
935 726
875 700
1150 956
1400 1100
1650 1285
2300 1985
1800 1360
1400 1175
1450 1225
1100 1245
1700 1259
1200 1150
1150 896
1600 1361
1650 1040
1200 755
800 1000
1750 1200
Find the estimated regression equation which can be used to estimate the monthly rent for apartments in this neighborhood using size as the predictor variable.
The estimated regression equation is:
[tex]$y = 420.1 + 0.778x$[/tex]
How to find the estimated regression equation?To find the estimated regression equation, we need to perform linear regression analysis on the given data. We will use the least squares method to find the line of best fit.
First, let's calculate the mean and standard deviation of the rent and size variables:
[tex]$\bar{x} = 1192$[/tex] (mean of size)
[tex]$\bar{y}= 1337$[/tex] (mean of rent)
[tex]$s_x = 404.9$[/tex] (standard deviation of size)
[tex]$s_y= 390.3 $[/tex](standard deviation of rent)
Next, we can calculate the correlation coefficient between the rent and size variables:
[tex]$r = \frac{\sum_{i=1}^{n}(x_i - \bar{x})(y_i - \bar{y})}{\sqrt{\sum_{i=1}^{n}(x_i - \bar{x})^2}\sqrt{\sum_{i=1}^{n}(y_i - \bar{y})^2}} = 0.807$[/tex]
Now, we can use the formula for the slope of the regression line:
[tex]$b = r\frac{s_y}{s_x} = 0.807\frac{390.3}{404.9} = 0.778$[/tex]
And the formula for the intercept of the regression line:
[tex]$a = \bar{y} - b\bar{x} = 1337 - 0.778(1192) = 420.1$[/tex]
Therefore, the estimated regression equation is:
[tex]$y = 420.1 + 0.778x$[/tex]
where y is the monthly rent and x is the size of the apartment.
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Let A be an n x n square matrix with exactly three distinct eigenvalues and the dimension of each of its eigenspaces is 2 or less. Given that A is diagonalizable, find the value ofn
(A) 3 < n < 6 (B) n < 3 (C) n > 6 ( D) There is not enough information to estimate the value of n .
n = 5, which means that the value of n falls in the range 3 < n < 6.
The correct answer is (A).
Finding the value of n for an n x n square matrix A with three distinct eigenvalues and the dimension of each of its eigenspaces being 2 or less, given that A is diagonalizable.
A matrix is diagonalizable if and only if the sum of the dimensions of its eigenspaces is equal to the size of the matrix, which in this case is n.
Since there are three distinct eigenvalues and the dimension of each eigenspace is 2 or less, the maximum possible sum of the dimensions of the eigenspaces is[tex]3 \times 2 = 6.[/tex]
However, if the sum were equal to 6, the eigenspace dimensions would be 2, 2, and 2, which would mean there are 4 distinct eigenvalues, contradicting the given information.
Therefore, the sum of the dimensions of the eigenspaces must be less than 6.
Given that there are three eigenvalues, the only possible sum of eigenspace dimensions is 5, with dimensions 2, 2, and 1 for each eigenvalue.
The correct answer is (A).
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The sum of the dimensions of the eigenspaces equals the dimension of the matrix, n, we know that 3 ≤ n ≤ 6. Therefore, the answer is (A) 3 < n < 6.
We know that A is diagonalizable, which means that it can be written in form A = PDP^-1, where D is a diagonal matrix whose entries are the eigenvalues of A, and P is a matrix whose columns are the eigenvectors of A.
Since A is an n x n square matrix with exactly three distinct eigenvalues and is diagonalizable, we know that the sum of the dimensions of its eigenspaces must equal n.
Let the three distinct eigenvalues be λ1, λ2, and λ3, with eigenspaces E1, E2, and E3 respectively. We are given that the dimension of each eigenspace is 2 or less, so:
dim(E1) ≤ 2, dim(E2) ≤ 2, and dim(E3) ≤ 2.
Now, we can write the sum of the dimensions of the eigenspaces:
dim(E1) + dim(E2) + dim(E3) = n.
Since each dimension is at most 2, the maximum value of the sum is:
2 + 2 + 2 = 6.
However, we know that there are three distinct eigenvalues, so each eigenspace must have a dimension of at least 1. Therefore, the minimum value of the sum is:
1 + 1 + 1 = 3.
Combining this information, we can conclude that:
3 ≤ n ≤ 6.
Hence, the value of n falls in the range (A) 3 < n < 6.
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100 points!!! Please answer my question for me! I’ll give brainliest if I get 100%
Answer:
Step-by-step explanation:
To determine how long it would take Anita and Chao to clean a pool together, we can use the concept of work rates.
Anita can clean a pool in 8 hours, so her work rate is 1/8 of a pool per hour.
Chao can clean a pool in 6 hours, so his work rate is 1/6 of a pool per hour.
To find their combined work rate, we add their individual work rates:
1/8 + 1/6 = 3/24 + 4/24 = 7/24
Their combined work rate is 7/24 of a pool per hour.
To determine how long it would take them to clean a pool together, we can set up the equation:
(7/24) * T = 1
Where T represents the time it takes them together to clean the pool.
To solve for T, we multiply both sides of the equation by the reciprocal of (7/24), which is (24/7):
T = (1) * (24/7) = 24/7
Therefore, it would take Anita and Chao working together approximately 24/7 hours to clean a typical pool.
Un grupo de amigos cenan en un restaurante y deciden repartir el valor de la cuenta
en partes iguales. Si cada uno contribuye con Q125.00 faltan Q50.00 para pagar la
cuenta, pero si cada uno contribuye con Q150.00, entonces sobran Q75.00. ¿Cuál es
el valor de la cuenta?
Based on the equation, the total value of the bill is Q75.00.
How to explain the valueTotal contribution - Total bill = Shortage
125 * Number of people - X = 50
Total contribution - Total bill = Surplus
150 * Number of people - X = 75
We now have a system of two equations with two variables. Let's solve it to find the value of the total bill (X).
Equation 1: 125 * Number of people - X = 50
Equation 2: 150 * Number of people - X = 75
We can rearrange Equation 1 to solve for X:
X = 125 * Number of people - 50
Substituting this expression for X into Equation 2, we get:
150 * Number of people - (125 * Number of people - 50) = 75
Simplifying the equation:
150 * Number of people - 125 * Number of people + 50 = 75
25 * Number of people + 50 = 75
25 * Number of people = 25
Number of people = 1
Substituting the value of the number of people into Equation 1 to find X:
X = 125 * 1 - 50
X = 125 - 50
X = 75
Therefore, the total value of the bill is Q75.00.
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A group of friends have dinner at a restaurant and decide to share the value of the bill in equal parts. If each one contributes Q125.00, Q50.00 is missing to pay the account, but if each one contributes Q150.00, then Q75.00 is left over. Which account value?
In ΔHIJ, h = 9. 2 inches, j = 9 inches and ∠J=19°. Find all possible values of ∠H, to the nearest 10th of a degree
The possible values of ∠H in the triangle ΔHIJ are 18.38° and 161.62° to the nearest tenth of a degree.
Given:In ΔHIJ, h = 9.2 inches, j = 9 inches, and ∠J = 19°.
We need to find all possible values of ∠H, to the nearest 10th of a degree
Solution:
Angle sum property of triangle states that the sum of interior angles of a triangle is 180°.
Let ∠H = xBy applying the angle sum property of the triangle, we get
∠H + ∠I + ∠J = 180°
⇒ x + ∠I + 19° = 180°
⇒ ∠I = 180° - x - 19°
⇒ ∠I = 161° - x
Using the sine rule, we get
sin x/sin 19° = h/jsin x/sin 19°
= 9.2/9sin x
= sin 19° × 9.2/9sin x
= 0.3184x
= sin⁻¹ 0.3184
∴ x = 18.38° or
x = 161.62°
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Write all the essential prime implicants for the Os of the function in the map shown in figure below. Use these implicants to obtain a minimum SOP expression for the complement of the function.
To obtain the essential prime implicants and a minimum sum of products (SOP) expression for the complement of the function, we need to analyze the map shown in the figure. The essential prime implicants are the minimal combinations of input variables that cover at least one minterm that is not covered by any other implicant.
By examining the map, we can identify the minterms that are not covered by any larger implicant. These minterms correspond to the "don't care" or "X" entries in the map. We then identify the prime implicants that cover these essential minterms.
The essential prime implicants are minimal combinations of variables that are necessary to cover these minterms. We select the essential prime implicants that cover the essential minterms and combine them to form the minimum SOP expression for the complement of the function.
To obtain the minimum SOP expression, we use the selected essential prime implicants and combine them with necessary non-essential prime implicants to cover the remaining minterms in the function. This process ensures that the resulting expression is minimal, with the fewest terms and variables required to represent the function.
By analyzing the map, identifying the essential prime implicants, and combining them appropriately, we can derive a minimum SOP expression for the complement of the function.
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Use the piecewise functions to find the given values
By using piecewise functions the values of [tex]\lim_{\theta \to \pi^+} h(\theta)[/tex] is 1 and [tex]\lim_{\theta \to \pi/2^-} h(\theta)[/tex] is -1
The given functions are h(θ)=cos2θ, θ<π/2
h(θ)=tanθ/2, π/2<θ≤π
h(θ)=sinθ/2, θ ≥π
Now let us find the value of [tex]\lim_{\theta \to \pi^+} h(\theta)[/tex]
[tex]\lim_{\theta \to \pi^+} \frac{ sin(\theta)}{2}[/tex]
This is a right hand limit which we take the values greater than π.
Apply the limit theta as pi.
sinπ/2
We know that sin90 degrees is 1.
[tex]\lim_{\theta \to \pi^+} h(\theta)[/tex]=1
Now [tex]\lim_{\theta \to \pi/2^-} h(\theta)[/tex]
This is a left hand limit which we take the values lesser than π/2.
[tex]\lim_{\theta \to \pi/2^-} cos(2\theta)[/tex]
Now apply the limit theta as π/2.
cos2(π)/2
[tex]\lim_{\theta \to \pi/2^-} h(\theta)[/tex] = -1
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Determine whether the following sets form subspaces of R2.(a) {(x1,x2)T|x1 + x2 = 0}(b) {(x1,x2)T|x21 = x22}
In linear algebra, a subspace of a vector space is a subset of vectors that satisfies certain properties.
(a) To show that {(x1, x2)T | x1 + x2 = 0} forms a subspace of R2, we need to show that it satisfies the three conditions for a subspace:
i. The zero vector is in the set: (0,0)T is in the set because 0 + 0 = 0.
ii. The set is closed under addition: Let (a,b)T and (c,d)T be in the set. Then a + b = 0 and c + d = 0. We need to show that (a + c, b + d)T is also in the set. (a + c) + (b + d) = (a + b) + (c + d) = 0 + 0 = 0, so (a + c, b + d)T is in the set.
iii. The set is closed under scalar multiplication: Let (a,b)T be in the set and let c be a scalar. We need to show that c(a,b)T is also in the set. c(a,b)T = (ca, cb)T, and ca + cb = c(a + b) = c(0) = 0, so c(a,b)T is in the set.
Since the set satisfies all three conditions for a subspace, we can conclude that {(x1, x2)T | x1 + x2 = 0} forms a subspace of R2.
(b) To show that {(x1, x2)T | x21 = x22} does not form a subspace of R2, we only need to show that it fails one of the conditions for a subspace.
Take (1, -1)T and (1, 1)T, which are both in the set since 12 = (-1)2. However, their sum (2, 0)T is not in the set since 22 ≠ 0. Therefore, the set is not closed under addition and does not form a subspace of R2.
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What is the zero of the following function?
A x=-5
B. =5
С. X=1
D. X= -1
Hence, the zero of the given function is x = -5 and x = 5.
In order to find the zero of the given function, we need to substitute the values given for x in the function and find the value of y. Then, the zero of the function is the value of x for which y becomes zero. Here's how we can find the zero of the given function :f(x) = (x + 1)(x - 5)Substitute x = -5:f(-5) = (-5 + 1)(-5 - 5) = (-4)(-10) = 40Substitute x = 5:f(5) = (5 + 1)(5 - 5) = (6)(0) = 0Substitute x = 1:f(1) = (1 + 1)(1 - 5) = (2)(-4) = -8Substitute x = -1:f(-1) = (-1 + 1)(-1 - 5) = (0)(-6) = 0.Therefore, option A and option B are correct.
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A set of 16 scores has a mean of 8. Find the sum of the scores.
Hello!
x = 1 score
the mean:
16x/16 = 8
x = 8
so the sum of the 16 scores = 8 × 16 = 128
verify:
128/16 = 8
the answer is 128.If a set of 16 scores has a mean of 8, the sum of the scores is 128.
Given: Total number of scores = 16
Mean of scores = 8
The formula for calculating the mean of a given data is given as,
x = ∑x / n ...........(i)
where x⇒ mean of scores,
∑x ⇒ sum of the scores
n⇒ total number of scores,
∴ Putting the relevant values in equation (i), we get,
8 = ∑x /16
⇒ ∑x = 8 x 16 ;
∴ ∑x = 128
So, if a set of 16 scores has a mean of 8, the sum of the scores is 128.
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2. What is the perimeter of the rectangle?
B
С
5
Area 55 units 2
E
D
11 units
0 55 units
0 ООО
O 20 units
32 units
From the given information, the area of the rectangle is 55 square units.There are different methods to find the perimeter of a rectangle. One such method is using the area and length of the rectangle.
Using this method, we can express the width of the rectangle in terms of length and area as follows:
Area of a rectangle = length x width55
= length x width
Width = 55/length
Substitute the value of width in terms of length into the formula for the perimeter of a rectangle.
P = 2(length + width)P
=[tex]2(length + \frac{55}{length})[/tex]
Simplify the expression by distributing the 2 over the parentheses.
[tex]2length + \frac{110}{length})[/tex]
Differentiate the expression with respect to length to find the minimum value of P.
P' = 2 - 110/length²
Solve for P' = 0 to find the critical point.
2 = 110/length²
length² = 110/2
length² = 55
length = sqrt(55)
Substitute the value of length into the formula for the perimeter to find the perimeter.
[tex]P = 2\sqrt{55} + \frac{110}{\sqrt{55}}P[/tex]
= 2sqrt(55) + 2sqrt(55)P
= 4sqrt(55)
Therefore, the perimeter of the rectangle is 4sqrt(55) units. This answer is exact.
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Which of the following are factor pairs for 12?
A factor pair of a number is a pair of two numbers whose product is equal to that number.
[tex]1\cdot12=12\Rightarrow \checkmark\\2\cdot4=8\Rightarrow \textsf{x}\\2\cdot6=12\Rightarrow\checkmark\\3\cdot4=12\Rightarrow \checkmark\\3\cdot5=15\Rightarrow \textsf{x}\\[/tex]
Describe a method to determine how many degrees would be in 'one turn' of any regular polygon?
For a regular polygon of n sides, we need to use the formula (n-2) * 180°.
How many degrees are in one turn of a regular polygon?To determine how many degrees would be in "one turn" of any regular polygon, you can use the following method:
Identify the number of sides of the regular polygon. Let's denote it as 'n'.Each interior angle of a regular polygon can be found using the formula: (n-2) * 180 degrees. This formula gives the total sum of all the interior angles in the polygon.To find the measure of each interior angle, divide the total sum of the interior angles by the number of sides: (n-2) * 180 / n.The resulting value represents the measure of each interior angle of the regular polygon.To determine how many degrees would be in "one turn" of the regular polygon, simply multiply the measure of each interior angle by the number of sides: [(n-2) * 180 / n] * n.
The final expression simplifies to (n-2) * 180°
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how many ordered pairs of integers (a, b) are needed to guarantee that there are two ordered pairs (a1, b1) and (a2, b2) such that a1 mod 5 = a2 mod 5 and b1 mod 5 = b2 mod 5.
Two ordered pairs have the same combination, you need to add 1 more ordered pair, making it 26 ordered pairs in total.
To guarantee that there are two ordered pairs (a1, b1) and (a2, b2) such that a1 mod 5 = a2 mod 5 and b1 mod 5 = b2 mod 5, we need at least 25 ordered pairs of integers (a, b).
This is because there are 5 possible remainders when dividing by 5 (0, 1, 2, 3, 4), and we need to have at least 2 ordered pairs with the same remainder for both a and b.
Therefore, we need at least 5 x 5 = 25 ordered pairs of integers to guarantee this condition.
To guarantee that there are two ordered pairs (a1, b1) and (a2, b2) such that a1 mod 5 = a2 mod 5 and b1 mod 5 = b2 mod 5, you need 26 ordered pairs of integers (a, b).
Using the Pigeonhole Principle, you have 5 possible remainders for both a (mod 5) and b (mod 5), which creates 5x5 = 25 possible combinations.
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Answerrrrrr please URGENT!!!!!!!!!!!!!!!
The value of probability that Fazio selects a striped jersey both times is,
⇒ 1 / 25
Since,
A probability is the number of desired outcomes divided by the number of total outcomes.
In this problem:
For each jersey, there are possible options, two of which are striped, is,
2+5+3 = 10
So, twice shirts probability,
⇒ 2/10
p = (2/10)² = 4/100 = 1/25
Thus, The value of probability that Fazio selects a striped jersey both times is,
⇒ 1 / 25
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Let C = 100 + 80x be the cost to manufacture x items. Find the average cost per item to produce 50 items. The average cost per item is $
To find the average cost per item to produce 50 items, we need to divide the total cost of manufacturing 50 items by 50.
First, let's plug in x = 50 into the cost function C = 100 + 80x:
C = 100 + 80(50)
C = 100 + 4000
C = 4100
So, it costs $4100 to manufacture 50 items.
To find the average cost per item, we divide the total cost by the number of items:
Average cost per item = total cost / number of items
Average cost per item = $4100 / 50
Average cost per item = $82
Therefore, the average cost per item to produce 50 items is $82.
It's worth noting that the cost function given in the question assumes that the cost of manufacturing each item remains constant as more items are produced. This is known as the "constant marginal cost assumption". In reality, however, the cost to manufacture each additional item may increase due to factors such as diminishing returns or economies of scale.
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Marva's house has a garage attached to its side. The measurements of the house and garage are shown below. What is the total volume of Marva's house and garage?
Hence, the total volume of Marva's house and garage is 52000 ft³.Note: To solve this question, we have to calculate the volume of both the house and the garage separately and then add their volumes to get the total volume of Marva's house and garage.
Given, Length of house, l = 80 ft Breadth of house, b = 30 ft Height of house, h = 20 ft Volume of house = l × b × h = 80 × 30 × 20 = 48000 ft³Length of garage, l = 20 ft Breadth of garage, b = 20 ft Height of garage, h = 10 ft volume of garage = l × b × h = 20 × 20 × 10 = 4000 ft³The total volume of the house and the garage is: 48000 + 4000 = 52000 ft³
Hence, the total volume of Marva's house and garage is 52000 ft³.Note: To solve this question, we have to calculate the volume of both the house and the garage separately and then add their volumes to get the total volume of Marva's house and garage.
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determine the standard matrix a for the linear transformation t : r 2 → r 2 which first (i) rotates points through π/4 clockwise, and then (ii) reflects points through the vertical x2- axis
The standard matrix A for the described linear transformation is:
A = [[-sqrt(2)/2, sqrt(2)/2],
[sqrt(2)/2, sqrt(2)/2]]
To determine the standard matrix A for the given linear transformation, we need to understand how each operation affects the standard basis vectors i and j.
(i) Rotating points through π/4 clockwise:
When we rotate a point through an angle α clockwise, the new x-coordinate is given by x' = cos(α)x - sin(α)y, and the new y-coordinate is given by y' = sin(α)x + cos(α)y. In this case, α = π/4.
Applying the rotation to the standard basis vectors, we have:
i' = cos(π/4)i - sin(π/4)j
= (1/sqrt(2))i - (1/sqrt(2))j
j' = sin(π/4)i + cos(π/4)j
= (1/sqrt(2))i + (1/sqrt(2))j
(ii) Reflecting points through the vertical x2-axis:
To reflect a point through the x2-axis, we negate the y-coordinate while keeping the x-coordinate unchanged.
Applying the reflection to the rotated basis vectors, we have:
i'' = (1/sqrt(2))i' - (1/sqrt(2))j'
= (1/sqrt(2))[(1/sqrt(2))i - (1/sqrt(2))j] - (1/sqrt(2))[(1/sqrt(2))i + (1/sqrt(2))j]
= (-sqrt(2)/2)i
j'' = (1/sqrt(2))i' + (1/sqrt(2))j'
= (1/sqrt(2))[(1/sqrt(2))i - (1/sqrt(2))j] + (1/sqrt(2))[(1/sqrt(2))i + (1/sqrt(2))j]
= (sqrt(2)/2)j
The resulting vectors i'' and j'' give us the columns of the standard matrix A.
Therefore, the standard matrix A for the described linear transformation is:
A = [[-sqrt(2)/2, sqrt(2)/2],
[sqrt(2)/2, sqrt(2)/2]]
This matrix can be used to transform any vector in R^2 through the specified sequence of operations: rotation by π/4 clockwise followed by reflection through the vertical x2-axis.
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A 186 foot yacht at cruise speed can generate 2.3 tons of carbon dioxide per hour. Which of the following is closest to this rate, in pounds per minutes? a. 1.3 pounds per minutes b. 14.5 pounds per minutes c. 26.1 pounds per minutes d. 76.7 pounds per minutes
Answer:
b
Step-by-step explanation:
Q1)Normal human body temperature, as kids are taught in North America, is 98.6 degrees F. But how well is this supported by data? Researchers obtained body-temperature measurements on randomly chosen healthy people.
Click here for the data.
If your answer contains a decimal, answer to 3 significant figures, otherwise, report the whole number. This includes the tcrit looked up in Statistical Table C.
mu equals 98.6is the hypothesis
mu not equal to 98.6is the hypothesis
capital upsilon with bar on top=
s=
S E space subscript Y with bar on top end subscript=
n =
df =
t subscript 0.05 left parenthesis 2 right parenthesis comma d f end subscriptusing Statistical Table C =
t(calc) =
Can we reject the null hypothesis? (enter yes or no for your answer)
DATA SET
Column1
98.4
99
98
99.1
97.5
98.6
98.2
99.2
98.4
98.8
97.8
98.8
99.5
97.6
98.6
98.8
99.4
97.4
100
97.9
99
98.4
97.5
98.4
98.8
99.4
97.4
100
97.9
97.5
98.6
98.2
99.2
98.4
98.4
99
98
99.1
97.5
98.6
98.2
99.2
97.6
98.6
98.8
98.8
99.4
97.4
100
97.9
99
98.4
97.5
98.4
98.8
99.4
97.4
98.8
99.5
97.6
98.6
98.2
99.2
98.4
99
98.6
98.8
98.8
99.1
98.6 degrees Fahrenheit is a widely known value for normal human body temperature, recent data suggests that this figure may not accurately represent the average body temperature for healthy individuals, with variations depending on factors like age, gender, and environmental conditions
Normal human body temperature, commonly taught as 98.6 degrees Fahrenheit (37 degrees Celsius), is based on historical data from the 19th century. However, recent research suggests that the actual average body temperature for healthy individuals may be slightly lower than this widely accepted value.
Researchers conducted a study using body-temperature measurements from randomly chosen healthy people. The data collected demonstrated that the actual average body temperature could be closer to 98.2 degrees Fahrenheit (36.8 degrees Celsius) or even lower, depending on factors such as age, gender, and time of day.
These findings support the notion that 98.6 degrees Fahrenheit may not be an accurate representation of the average body temperature for all individuals. Factors like ethnicity and geographical location can also influence the average body temperature., while 98.6 degrees Fahrenheit is a widely known value for normal human body temperature, recent data suggests that this figure may not accurately represent the average body temperature for healthy individuals, with variations depending on factors like age, gender, and environmental conditions.
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The blanks when completed are
μ = 98.6 is the null hypothesisμ ≠ 98.6 is the alternate hypothesiss = 0.680n = 69df = 68t = -0.65Yes, we can reject the null hypothesisHow to complete the blanksFrom the question, we have the following parameters that can be used in our computation:
The dataset
By the definition of null and alternate hypotheses, we have
μ = 98.6 is the null hypothesis
μ ≠ 98.6 is the alternate hypothesis
Using a graphing tool, we have the following:
Count, N = 69Mean, μ = 98.546Variance, σ² = 0.462Standard Deviation, σ = 0.680This means that the standard deviation is
s = 0.680
Also, we have
n = 69
Next, we have
df = n - 1
So, we have
df = 69 - 1
df = 68
To calculate the t-statistic, we use:
t = (x - μ) / (s / √(n))
So, we have
t = (98.546 - 98.6) / (0.680 / √(69))
Evaluate
t = -0.65
The absolute value of the t-value (0.65) is greater than the critical value (0.05).
So, we reject the null hypothesis
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Question
Normal human body temperature, as kids are taught in North America, is 98.6 degrees F. But how well is this supported by data? Researchers obtained body-temperature measurements on randomly chosen healthy people.
μ = 98.6 is the ____ hypothesis
μ ≠ 98.6 is the ____ hypothesis
s = ____
n =
df = ____
t = _______
Can we reject the null hypothesis? (enter yes or no for your answer)
this recipe for roquefort dressing makes 1 1 2 cups. what is the amount of each ingredient in parts a‐e in order to obtain 6 cups? (write answers with fractions and mixed numbers in lowest terms.)
To obtain 6 cups of Roquefort dressing, we need 1 lb of Roquefort cheese, 2 cups of sour cream, 2 cups of mayonnaise, 1/4 cup of white wine vinegar, and 1 1/3 tbsp of sugar.
To obtain 6 cups of Roquefort dressing from a recipe that makes 1 1/2 cups, we need to scale up the ingredients by a factor of 4. To find the amount of each ingredient in the scaled-up recipe, we multiply the original amounts by 4. The ingredients and their scaled-up amounts are as follows:
a. Roquefort cheese: 4 oz (original amount) x 4 = 16 oz or 1 lb (scaled-up amount)
b. Sour cream: 1/2 cup (original amount) x 4 = 2 cups (scaled-up amount)
c. Mayonnaise: 1/2 cup (original amount) x 4 = 2 cups (scaled-up amount)
d. White wine vinegar: 1 tbsp (original amount) x 4 = 4 tbsp or 1/4 cup (scaled-up amount)
e. Sugar: 1 tsp (original amount) x 4 = 4 tsp or 1 1/3 tbsp (scaled-up amount)
Therefore, to obtain 6 cups of Roquefort dressing, we need 1 lb of Roquefort cheese, 2 cups of sour cream, 2 cups of mayonnaise, 1/4 cup of white wine vinegar, and 1 1/3 tbsp of sugar.
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