The value of q is 6
How to calculate the value of q?The constant is k
The first step the to calculate the value of the constant which is k
k= qr
Write out the parameters given in the question
The value of q is 2.8
The value of r is 11.25
k= 2.8 × 11.25
= 31.5
The value of q can be calculated by the value of k which is 31.5 and r which is 5.25
k= qr
31.5= q × 5.25
31.5= 5.25q
q= 31.5/5.25
q= 6
Hence the value q is 6
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Reed's number cube numbered (1, 2, 3, 4, 5, 6) is rolled and a spinner with 4 sections (A, B, C, D) is spun. P(1 and A)
The probability of rolling a 1 and spinning section A on the spinner is 1/24.
To find the probability of rolling a 1 and spinning section A on the spinner, we need to first determine the total number of possible outcomes for the experiment. The number cube has 6 possible outcomes, and the spinner has 4 possible outcomes. Therefore, the total number of possible outcomes for the experiment is 6 x 4 = 24.
Next, we need to determine the number of outcomes that meet the criteria of rolling a 1 and spinning section A. Rolling a 1 has a probability of 1/6, and spinning section A has a probability of 1/4.
The probability of both events occurring simultaneously is the product of the two probabilities, which is (1/6) x (1/4) = 1/24.
This means that out of the 24 possible outcomes, only one outcome will result in rolling a 1 and spinning section A on the spinner.
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Complete Question:
A number cube numbered (1, 2, 3, 4, 5, 6) is rolled and a spinner with 4 sections (A, B, C, D) is spun. Find the probability of P(1 and A).
What is the length of the hypotenuse?
Answer:
41
Step-by-step explanation:
a^2+b^2=c^2
So...
40^2+9^2=1681
√1681=41
large retailer wants to estimate the proportion of Hispanic customers in a particular state. First, think about how large a sample size (of the retailer’s customers) would be needed to estimate this proportion to within 0.04 accuracy and with 99% confidence. Assume there is no planning value for p* available. Which of the following statements would be true IF you decided to go for 0.01 accuracy instead of 0.04 accuracy? a. Sample_size for (0.01) = 16*Sample_size for (0.04) b. Sample_size for (0.01) = 4*Sample_size for (0.04) c. Sample_size for (0.01) = (1/16)*Sample_size for (0.04) d. Sample_size for (0.01) = Sample_size for (0.04) as long as the confidence level is the same.
The correct option is b. Sample_size for (0.01) = 4*Sample_size for (0.04).
When answering questions on Brainly, you should always be factually accurate, professional, and friendly. Additionally, you should be concise, provide a step-by-step explanation, and use the following terms in your answer: "estimate," "sample," and "confidence."For the given problem, we need to determine the sample size of the retailer's customers to estimate the proportion of Hispanic customers in a particular state with 0.04 accuracy and 99% confidence since there is no planning value for p*.
Now, we can use the formula for sample size to estimate the number of customers needed for the retailer, which is given by:n= z^2 p q/E^2 Where, z = the critical value from the standard normal distribution at the given confidence level p = the estimate of the proportion q = 1 - p E = the maximum likely difference between the sample and population proportion p = Proportion of Hispanic customers Let's use the values of z and E for the given problem, which isz=2.58 (at 99% confidence level, two-tailed)E=0.04 We need to find the sample size for the retailer's customers, so we can substitute the given values in the sample size formula and solve forn as shown:n = z^2pq/E^2 = (2.58)^2(0.5)(0.5)/(0.04)^2= 664.53 ≈ 665 So, the sample size of 665 customers would be needed to estimate the proportion of Hispanic customers in a particular state with 0.04 accuracy and 99% confidence.Now, we are asked to find the true statement if we decide to go for 0.01 accuracy instead of 0.04 accuracy.
The formula to calculate sample size for 0.01 accuracy can be written asn = (z^2pq)/(0.01)^2 Now, we need to find the relationship between sample size for 0.01 accuracy and 0.04 accuracy, which is given as follows :n1/n2 = (z1/z2)^2 (E1/E2)^2= (2.58/2.33)^2 (0.04/0.01)^2≈ 3.41 × 16n1/n2 = 54.56 Since sample size for 0.01 accuracy is larger than the sample size for 0.04 accuracy, we can say that option b. Sample_size for (0.01) = 4*Sample_size for (0.04) would be true if we decide to go for 0.01 accuracy instead of 0.04 accuracy. Hence, the correct option is b. Sample_size for (0.01) = 4*Sample_size for (0.04).
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I really need help with this math problem
Step-by-step explanation:
The area with the highest inches receives most rainfall 1¼
The area with the lowest inches received lowest rainfall 1/8
1¼ location will have highest frequency using the ⅛line plot. There are 10 of ⅛ in 1¼
Add all the inches
1/8 + 3/8 +1/8 + 1/8 + 3/4+ 3/4 + 1/4 + 1¼ + 1/4 +1
6/8 + 2¼ + 1
6/8 + 3¼
6/8 + 13/4 = 32/8
Total rain = 4inches
A boy owes his grandmother $1000. She paid for his first semester at community college. The conditions of the loan are that he must pay her back the whole amount in one payment using a simple interest rate of %7 per year. She doesn't care in which year he pays her. The table contains input and output values to represent how much money he will owe his grandmother 1, 2, 3, or 4 years from now.
Year --------Amount owed (in $)
1 -------1070
2 ------------1140
3 -----------1210
4 ----------1280
A.
Yes, because the rate of change is a constant $___
nothing per year.
B. No, because the rate of change is $____
nothing per year during the second year and $___
nothing per year during the third year.
A. Yes, because the rate of change is a constant $70 per year. We can observe that the amount owed increases by $70 for every year that passes.
This is due to the simple interest rate of 7% per year, which means that the boy owes an additional 7% of the original amount ($1000) each year. Thus, the the amount owed after one year is $1000 + 0.07($1000) = $1070, after two years it is $1000 + 2(0.07($1000)) = $1140, and so on. $70 is the change rate per year.
B. It will be no due to the change rate is $0 per year in 2nd and 3rd years.
This statement is false because, as we calculated in part A, the rate of change is constant at $70 per year. Therefore, the amount owed will increase by $70 even during the second and third years, as long as the boy has not made any payments towards the loan.
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For the scenario where you roll two standard 6-sided dice, if n(A′)=6, then: P(A)=6/36
n(A′)= number of ways to not roll a 7
P(A′)=30/36
n(A)= number of ways to roll a 7
P(A)=5/6
Option P(A) = 5/6 is correct using the probability concept for the scenario n(A')=6.
The scenario is you roll two standard 6-sided dice if n(A′) = 6.
Here, we need to use the concept of probability to solve the problem.
Probability is the branch of mathematics that deals with the measurement of the chance of occurrence of a particular event. It can be defined as the ratio of the number of favorable outcomes to the number of total possible outcomes.
Given that the two standard 6-sided dice are rolled. Now, we need to find the probability of rolling a 7.
Here, the sum of the numbers on the two dice must be 7. We can obtain this sum in the following ways:
(1,6), (2,5), (3,4), (4,3), (5,2), and (6,1)
Thus, the number of ways to roll a 7 is 6 which is n(A') = 6.
Therefore, P(A') = n(A')/n(S) = 6/36 = 1/6.
Now, we are given that n(A′) = 6, which means that the number of ways to roll a 7 is 6.
Thus, the number of ways to not roll a 7 is 36 - 6 = 30.
Therefore, P(A) = n(A)/n(S) = 30/36 = 5/6.
Hence, the correct option is P(A) = 5/6.
Your question is incomplete, but most probably your full question was
For the scenario where you roll two standard 6-sided dice, if n(A′)=6, then:
P(A)=6/36
n(A′)= number of ways to not roll a 7
P(A′)=30/36
n(A)= number of ways to roll a 7
P(A)=5/6
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Answer the two questions below please
Answer:
Step-by-step explanation:
we can replace 5 with [tex]\sqrt{5}^{2}[/tex]
then.
[tex]\sqrt{5}^{n-1+2}=\sqrt{5}^{n+1}[/tex]
If GH = 4x - 3 and IJ = 3x + 14, find x. Then find the length of GH.
Answer: We are given that GH = 4x - 3 and IJ = 3x + 14.
To find x, we can set GH equal to IJ and solve for x:
4x - 3 = 3x + 14
x = 17
Therefore, x = 17.
To find the length of GH, we can substitute x = 17 into the expression for GH:
GH = 4x - 3
GH = 4(17) - 3
GH = 68 - 3
GH = 65
Therefore, the length of GH is 65.
Step-by-step explanation:
Nrite equations of the lines through the given point parallel to and perpendicular to the given li x+y=3,(-3,2)
Answer:
vfejwbjelkn
Step-by-step explanation:
At which point do the lines y=4x+1 and y=2x-1 intersect
The lines having linear equation y=4x+1 and y=2x-1 intersect at the point (-1, -3).
What is a linear equation, exactly?
A linear equation is an algebraic equation of the first degree that describes a line in a two-dimensional plane. It is an equation of the form y = mx + b, where x and y are variables, m is the slope of the line, and b is the y-intercept. The slope represents the rate of change of y with respect to x, while the y-intercept represents the point at which the line crosses the y-axis
Now,
To find the point of intersection between the lines y=4x+1 and y=2x-1, we can set the two equations equal to each other or we can graph these and find the intersection point.
1.
4x+1 = 2x-1
Simplifying this equation, we get:
2x = -2
x = -1
Now, we can substitute this value of x into either equation to find the corresponding value of y:
y = 4x+1 = 4(-1)+1 = -3
Therefore,
the lines y=4x+1 and y=2x-1 intersect at the point (-1, -3).
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PREVIOUS ANSWER: PYTHAGOREAN THEOREM 28.5 Scavenger Hunt B Find the value of x. 20 15 W 8
The value of x is 25 using Pythagoras theorem.
What are angles?A pοint where twο lines meet prοduces an angle.
The breadth οf the "οpening" between these twο rays is referred tο as a "angle". It is depicted by the figure.
Radians, a unit οf circularity οr rοtatiοn, and degrees are twο cοmmοn units used tο describe angles.
By cοnnecting twο rays at their ends, οne can make an angle in geοmetry. The sides οr limbs οf the angle are what are meant by these rays.
The limbs and the vertex are the twο main parts οf an angle.
The cοmmοn terminal οf the twο beams is the shared vertex.
Pythagοras theοrem,
perpendicular²= hypοtenuse² + base²
Find the hypotenuse of lower triangle
c² = 15² + 9²
c = [tex]\sqrt{15^2 + 8^2}[/tex]
c = 17
Now, c is the base altitude of upper triangle
So
x² = [tex]\sqrt{20^2 + 15^2}[/tex]
x = 25
Thus, the value of x is 25 using Pythagoras theorem.
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Wildgrove is 7 miles due north of the airport, and Yardley is due east of the airport. If the distance between Wildgrove and Yardley is 9 miles, how far is Yardley from the airport? If necessary, round to the nearest tenth.
Please respond soon.
Use the Pythagorean theorem.
Thank you!
Answer:
Yardley is approximately 5.7 miles away from the airport.
Step-by-step explanation:
Let's use the following variables:
x = distance between Yardley and the airport
Using the Pythagorean theorem:
x^2 + 7^2 = 9^2
x^2 + 49 = 81
x^2 = 32
x = sqrt(32)
x ≈ 5.7
Therefore, Yardley is approximately 5.7 miles away from the airport.
Answer:
5.7 miles
Step-by-step explanation:
To find:-
The distance between airport and Yardley.Answer:-
We are given that airport and Wildgrove are 7miles apart and the distance between Yardley and Wildgrove is 9miles . We are interested in finding out tge distance between Yardley and airport.
As you can see from the figure attached, the distance can be calculated using Pythagoras theorem ,
[tex]\rm\implies a^2+b^2 = h^2 \\[/tex]
where ,
h is the longest side of the triangle (hypotenuse).a and b are two other sides .Here the longest side is 9 miles and one other side is 7 miles . On substituting the respective values, we have;
[tex]\rm\implies a^2 + (7)^2 = 9^2 \\[/tex]
[tex]\rm\implies a^2 + 49 = 81 \\[/tex]
[tex]\rm\implies a^2 = 81 - 49 \\[/tex]
[tex]\rm\implies a^2 = 32 \\[/tex]
[tex]\rm\implies a =\sqrt{32} \\[/tex]
[tex]\rm\implies a = 5.65 \\[/tex]
[tex]\rm\implies \red{ a = 5.7 } \\[/tex]
Hence the distance between Yardley and airport is 5.7 miles .
Kohli scored 10 runs less than Rohit in innings. Rahul scored 5 runs more than Rohit. In total they scored 442 runs. What was the score of kohli
Throughout his innings, Kohli scored 432 runs in total.. Rohit scored 422 runs and Rahul scored 427 runs. In total, they scored 442 runs.
Kohli, Rohit and Rahul are three of the greatest batsmen in Indian cricket. In a match, they scored 442 runs in total.Rohit scored the most runs (422 total),. Kohli scored 10 runs less than Rohit, making his total score 432 runs. Rahul was the third highest scorer, with 5 runs more than Rohit, making his total score 427 runs. This shows the great batting prowess of the three batsmen and how they were able to score a combined 442 runs between them. This goes to show the great talent and skill that the three players possess and how they are able to make such a great contribution to their team's total score.
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find the measurements of the angle
The measured angle at position 1 is 63 degree. The angle which is between the two tangents drawn from a outer side point to a circle is supplementary to angle subtended
What is angle ?An angle is a geometric figure formed by two rays, or line segments that share a common endpoint, called the vertex of the angle. Angles are measured in degrees, radians, or other units, and are typically denoted using the symbol θ
What is tangent ?In geometry, the tangent to a circle is a line that intersects the circle at exactly one point, called the point of tangency. The tangent line is perpendicular to the radius of the circle that passes through the point of tangency.
In the given question ,
The angle which is between the two tangents drawn from a outer side point to a circle is supplementary to angle subtended by the line segment joining the points of contact at the center.
From the above theorem we can write
angle at position 1 x= 360 - ((360-243)+90+90)
we get x=63
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Find an integer C that will make the polynomial factorable 32 − 8 + C
HELPPPP I NEED THIS ASAP
We can factor the polynomial as:-32a^2 - 82a + 31 = 32(a - \frac{1}{2})(a - \frac{31}{32})
.To make the polynomial 32a^2 - 82a + C factorable, we need to find an integer value for C such that the quadratic expression can be factored into two binomials.
To do this, we can use the formula for the discriminant: b^2 - 4ac. Since we want the discriminant to be a perfect square, we can set it equal to some integer k^2 and solve for C:
82^2 - 4(32)(C) = k^2
6724 - 128C = k^2
We can try different values of k and solve for C until we find an integer solution. For example, if we let k = 10, we get:
10^2 = 6724 - 128C
C = 31
To verify that this value of C works, we can factor the trinomial using the X formula:
a = 32, b = -82, c = 31
X = (-b ± sqrt(b^2 - 4ac)) / 2a
X = (82 ± sqrt(82^2 - 4(32)(31))) / 2(32)
X = (82 ± 8) / 64
So, the roots of the quadratic are:
a = 32, X1 = 1/2, X2 = 31/32
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A county real estate appraiser wants to develop a statistical model to predict the appraised value of houses in a section of the county called East Meadow. One of the many variables thought to be an important predictor of appraised value is the number of rooms in the house. Consequently, the appraiser decided to fit the simple linear regression model:
E(y) = ?0 + ?1x,
where y = appraised value of the house (in thousands of dollars) and x = number of rooms. Using data collected for a sample of n = 74 houses in East Meadow, the following results were obtained:
? = 74.80 + 19.72x
What are the properties of the least squares line, ? = 74.80 + 19.72x?
For each additional room in the house, we estimate the appraised value to increase $74,800.
We estimate the base appraised value for any house to be $74,800.
For each additional room in the house, we estimate the appraised value to increase $19,720.
There is no practical interpretation, since a house with 0 rooms is nonsensical.
The properties of the least squares line are that the intercept represents the estimated base appraised value for any house in East Meadow, and the slope represents the estimated increase in appraised value for each additional room in the house.
The properties of the least squares line, ? = 74.80 + 19.72x, are as follows:
1. The intercept, ?0, is 74.80. This represents the estimated base appraised value for any house in East Meadow, regardless of the number of rooms. However, there is no practical interpretation for this value, since a house with 0 rooms is nonsensical.
2. The slope, ?1, is 19.72. This represents the estimated increase in appraised value for each additional room in the house. For each additional room in the house, we estimate the appraised value to increase $19,720.
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Write an exponential function in the form y=ab^xy=ab
x
that goes through points (0, 4)(0,4) and (2, 324)(2,324).
According to the question the exponential function that goes through the two points is: [tex]y = 4(9^x).[/tex]
Given,
We must first determine the values of a and b before we can build an exponential function with the form y = abx that passes through the points (0,4) and (2,324).
Using the point (0,4), we have:
4 = ab^0
4 = a(1)
a = 4
Using the point (2,324), we have:
324 = 4b^2
b^2 = 81
b = 9 (since b must be positive)
So the exponential function that goes through the two points is:
y = 4(9^x)
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y=x^2+x-8 quadratic function in vertex form
By simplification the quadratic function [tex]y = x^2 + x - 8[/tex] in vertex form is[tex]y = (x + 1/2)^2 - 33/4[/tex], and its vertex is (-1/2, -33/4).
What is the vertex form of a quadratic equation?
The standard form of a quadratic function is:
[tex]y = ax^2 + bx + c[/tex]
where a, b, and c are constants and x is the variable.
The vertex form of a quadratic function is:
[tex]y = a(x - h)^2 + k[/tex]
where a, h, and k are constants and (h, k) is the vertex of the parabola.
To write the quadratic function [tex]y = x^2 + x - 8[/tex] in vertex form, we need to complete the square. The vertex form of a quadratic function is given by:
[tex]y = a(x - h)^2 + k[/tex]
where (h, k) is the vertex of the parabola.
So, first we need to factor out the coefficient of the x^2 term:
[tex]y = 1(x^2 + x) - 8[/tex]
Now, we need to complete the square for the expression inside the parentheses:
[tex]y = 1(x^2 + x + 1/4 - 1/4) - 8[/tex]
[tex]y = 1[(x + 1/2)^2 - 1/4] - 8[/tex]
Finally, we can simplify and write the function in vertex form:
[tex]y = (x + 1/2)^2 - 33/4[/tex]
Therefore, the quadratic function [tex]y = x^2 + x - 8[/tex] in vertex form is[tex]y = (x + 1/2)^2 - 33/4[/tex], and its vertex is (-1/2, -33/4).
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I tried it two times and got it wrong, please help!
Answer:
[tex]\dfrac{dy}{dx}=-\dfrac{52x\left(3x^{37}y-1\right) }{4x^{39}+9y^8}[/tex]
Step-by-step explanation:
Note: I will provide links with descriptions/steps to each of the rules used in this differential equation at the bottom of this answer.
Given
[tex]-26x^2+4x^{39} y+y^9=-21[/tex]
Find [tex]\dfrac{dy}{dx}[/tex]
Differentiate the left side of the equation.
[tex]\dfrac{d}{dx}\left(-26x^2+4x^{39}y+y^9\right)= \dfrac{d}{dx}\left(-21\right)[/tex]
Focus the left side of the equation. Apply the Sum Rule for derivatives.
[tex]\dfrac{d}{dx} \left[-26x^2\right]+\dfrac{d}{dx} \left[4x^{39}y\right]+\dfrac{d}{dx} \left[y^9\right][/tex]
Lets evaluate each derivative.
1. Evaluate [tex]\frac{d}{dx} \left[-26x^2\right][/tex]
Differentiate using the Power Rule for derivatives.
[tex]\dfrac{d}{dx} \left[-26x^2\right]=2*26x^{2-1}[/tex]
Simplify.
[tex]2*-26x^{2-1}\\-52x^{2-1}\\-52x[/tex]
2. Evaluate [tex]\frac{d}{dx} \left[4x^{39}y \right][/tex]
Differentiate using the Product Rule for derivatives.
[tex]4\left(x^{39}\dfrac{d}{dx}\left[y\right]+y\dfrac{d}{dx}\left[x^{39}\right]\right)[/tex]
Rewrite [tex]\dfrac{d}{dx}\left[y\right][/tex] as [tex]y'[/tex]
[tex]4\left(x^{39}y'+y\dfrac{d}{dx}\left[x^{39}\right]\right)[/tex]
Differentiate using the Power Rule for derivatives.
[tex]4\left(x^{39}y'+y\left(39x^{39-1} \right)\right)[/tex]
Simplify.
[tex]4\left(x^{39}y'+39yx^{38} \right)[/tex]
3. Evaluate [tex]\frac{d}{dx} \left[y^9\right][/tex]
Differentiate using the Chain Rule for derivatives.
[tex]9y^8\dfrac{d}{dx} \left[y\right][/tex]
Rewrite [tex]\dfrac{d}{dx}\left[y\right][/tex] as [tex]y'[/tex]
[tex]9y^8y'[/tex]
Add up all of the derivatives then simplify.
[tex]-52x+4\left(x^{39}y'+39yx^{38} \right)+9y^8y'[/tex]
[tex]-52x+4\left(x^{39}y'\right)+4\left(39yx^{38} \right)+9y^8y'[/tex]
[tex]-52x+4x^{39}y'+156yx^{38}+9y^8y'[/tex]
[tex]4x^{39}y'+156x^{38}y+9y^8y'-52x[/tex]
Focus the right side of the equation.
[tex]\dfrac{d}{dx}\left(-21\right)[/tex]
Since [tex]-21[/tex] is constant with respect to [tex]x[/tex] , the derivative of [tex]-21[/tex] with respect to [tex]x[/tex] is 0 .
Now we have
[tex]4x^{39}y'+156x^{38}y+9y^8y'-52x=0[/tex]
Finally lets solve for [tex]y'[/tex].
Subtract [tex]156x^{38}y[/tex] from both sides of the equation.
[tex]4x^{39}y'+9y^8y'-52x=-156x^{38}y[/tex]
Add [tex]52x[/tex] to both sides of the equation.
[tex]4x^{39}y'+9y^8y'=-156x^{38}y+52x[/tex]
Factor [tex]y'[/tex] out of [tex]4x^{39}y'[/tex]
[tex]y'\left(4x^{39}\right) +9y^8y'=-156x^{38}y+52x[/tex]
Factor [tex]y'[/tex] out of [tex]9y^8y'[/tex]
[tex]y'\left(4x^{39}\right)+y'\left(9y^8\right)=-156x^{38}y+52x[/tex]
Factor [tex]y'[/tex] out of [tex]y'\left(4x^{39}\right)+y'\left(9y^8\right)[/tex]
[tex]y'\left(4x^{39}+9y^8\right)+=-156x^{38}y+52x[/tex]
Divide each term by [tex]4x^{39}+9y^8[/tex]
[tex]\dfrac{y'\left(4x^{39}+9y^8\right)}{4x^{39}+9y^8} =\dfrac{-156x^{38}y}{4x^{39}+9y^8} +\dfrac{52x}{4x^{39}+9y^8}[/tex]
Cancel the common factor of [tex]4x^{39}+9y^8[/tex] on the left side of the equation.
[tex]y'=\dfrac{-156x^{38}y}{4x^{39}+9y^8} +\dfrac{52x}{4x^{39}+9y^8}[/tex]
Combine the numerators over the common denominator.
[tex]y'=\dfrac{-156x^{38}y+52x}{4x^{39}+9y^8}[/tex]
Factor [tex]52x[/tex] out of [tex]-156x^{38}y+52x[/tex] and simplify.
[tex]y'=\dfrac{52x\left(-3x^{37}y\right)+52x}{4x^{39}+9y^8}[/tex]
[tex]y'=\dfrac{52x\left(-3x^{37}y\right)+52x(1)}{4x^{39}+9y^8}[/tex]
[tex]y'=\dfrac{52x\left(-3x^{37}y+1\right) }{4x^{39}+9y^8}[/tex]
[tex]y'=-\dfrac{52x\left(3x^{37}y-1\right) }{4x^{39}+9y^8}[/tex]
Rewrite [tex]y'[/tex] as [tex]\dfrac{dy}{dx}[/tex].
[tex]\dfrac{dy}{dx}=-\dfrac{52x\left(3x^{37}y-1\right) }{4x^{39}+9y^8}[/tex]
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12)a sample of customers from barnsboro national bank shows an average account balance of $315 with a standard deviation of $87. a sample of customers from wellington savings and loan shows an average account balance of $8350 with a standard deviation of $1800. which statement about account balances is correct? a) barnsboro bank has more variation. b) wellington s
A sample of customers from barnsboro national bank shows an average account balance of 315 with a standard deviation of 87. a sample of customers from wellington savings and loan shows an average account balance of 8350 with a standard deviation of 1800. Option A: Barnsboro Bank has more variation.So, the correct option is A) Barnsboro Bank has more variation.
The given data is:
A sample of customers from Barnsboro National Bank shows an average account balance of 315 with a standard deviation of 87.
A sample of customers from Wellington Savings and Loan shows an average account balance of 8350 with a standard deviation of 1800.
To compare the variation in the account balances of both banks, we use the coefficient of variation (CV).
CV = Standard deviation / Mean
CV of Barnsboro National Bank = 87/315 ≈ 0.2762
CV of Wellington Savings and Loan = 1800/8350 ≈ 0.2150
The CV of Barnsboro National Bank is greater than the CV of Wellington Savings and Loan.
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2(-3x+5)+2(x+4) when x=2
Answer:
12
Step-by-step explanation:
p(x) = 2(-3x+5)+2(x+4)
Substitution :
p(2) = 2(-3(2) +5) + 2(2+5)
= 2(-6 + 5) + 2 (7)
= 2(-1) + 2(7)
= -2 + 14
= 12
PLEASE HELPPP Find b.
110°
116
b
68°
70°
Check the picture below.
let's notice the polygon has 6 sides, so
[tex]\underset{in~degrees}{\textit{sum of all interior angles}}\\\\ S = 180(n-2) ~~ \begin{cases} n=\stackrel{number~of}{sides}\\[-0.5em] \hrulefill\\ n=6 \end{cases}\implies S=180(6-2)\implies S=720 \\\\[-0.35em] ~\dotfill\\\\ 2b+110+116+112+110~~ = ~~720 \\\\\\ 2b+448=720\implies 2b=272\implies b=\cfrac{272}{2}\implies b=136[/tex]
1. Before you took this course, you probably heard many stories about Statistics courses. Oftentimes
parents of students have had bad experiences with Statistics courses and pass on their anxieties to their
children. To test whether actually taking AP Statistics decreases students' anxieties about Statistics, an
AP Statistics instructor gave a test to rate student anxiety at the beginning and end of his course.
Anxiety levels were measured on a scale of 0-10. Here are the data for 16 randomly chosen students
from a class of 180 students:
paired
t
SU
Pre-course anxiety level
Post-course anxiety level
Difference (Post - Pre)
7 6 9 5
4 3 7 3
-3 -3 -2 -2
6 7
4 5
-2 -2
5
4
-1
7 6 4
6 5 3
-1 -1 -1
3
2
-1
2 1
2 1
0 0
3
3
0
4
4
0
2
3
1
The assumptions include:
1. The observations are normally distributed.
2 The observertions are independent.
What are the test hypothesis?Test hypotheses include the null hypothesis that the anxiety level is same before after the course and the alternative hypothesis that the anxiety level derveases after taking the course.
The standard deviation is 1.1475. The value of to will be:
= -1.125 / (1.1475 / √16)
= 3.9212
Based on the p value, it should be noted that the null hypothesis is rejected.
In conclusion, the anxiety level decrease after the students take the course.
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Before you took this course, you probably heard many stories about Statistics courses. Oftentimes parents of students have had bad experiences with Statistics courses and pass on their anxieties to their children. To test whether actually taking AP Statistics decreases students' anxieties about Statistics, an AP Statistics instructor gave a test to rate student anxiety at the beginning and end of his course.
Anxiety levels were measured on a scale of 0-10. Here are the data for 16 randomly chosen students from a class of 180 students:
Do the data indicate that anxiety levels about Statistics decreases after students take AP Statistics? Test an appropriate hypothesis and state your conclusion.
Find the equation of the line shown.
y
10
655521 LEO
O
1 2 3 4 5 6 7 8 9 10
X
The equation of the line shown is y = 1x + 9.
What is the equation?An equation is a statement of equality between two expressions. It is typically expressed in mathematical notation, with the left side of the equation equal to the right side. Equations are used to describe how two values are related, and can be used to solve problems or predict outcomes. Equations can be used in any field of study, from physics to economics.
The equation of the line shown can be found by using the slope-intercept form of a linear equation, which is y = mx + b, where m is the slope and b is the y-intercept. In this case, the slope is m = (10 - 9)/(10 - 0) = 1.
The y-intercept is b = 9, as this is the point at which the line crosses the y-axis. Therefore, the equation of the line shown is y = 1x + 9.
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Complete questions as follows-
this is happening do proper format and calculation
Find the equation of the line shown.
y
10
S87654321
9
0 1 2 3 4 5 6 7 8 9 10
X
The amount of aspirin, A, present in the bloodstream x hours after taking a 325 mg pill is represented by the
function A = A,b* where A, and b are constants. After 3 hours, there is about 199. 6 mg of aspirin remaining in
a patient's bloodstream. What is the value of b, and what does it mean in the context of the problem?
The amount of aspirin in the bloodstream will be about 0.838 times what it was before.
The function that represents the amount of aspirin, A, present in the bloodstream x hours after taking a 325 mg pill is:
[tex]A = A_0 \times b^x[/tex]
where A_0 is the initial amount of aspirin in the bloodstream (which is 325 mg), and b is a constant that represents the rate of decay of the aspirin in the bloodstream.
We are told that after 3 hours, there is about 199.6 mg of aspirin remaining in the patient's bloodstream. Using the function above, we can set up an equation based on this information:
[tex]199.6 = 325 \times b^3[/tex]
To solve for b, we can divide both sides by 325 and then take the cube root of both sides:
[tex]b^3[/tex]= 199.6 / 325
b = [tex](199.6 / 325)^{(1/3)[/tex]
b ≈ 0.838
So the value of b is approximately 0.838. In the context of the problem, this means that the amount of aspirin in the bloodstream decreases by a factor of approximately 0.838 every hour. In other words, if we wait one hour, If we wait two hours, it will be about (0.838)^2 times what it was before, and so on. This exponential decay model can be useful in predicting how long it will take for the aspirin to be completely eliminated from the bloodstream.
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The graph is a translation of one of the basic functions , , , . Find the equation that defines the function.
Find the maximum value of the objective function and the values of x and y for which it occurs.
F=5x+2y
x+2y<6. x>0 and y>0
2x+y<6
Answer: o find the maximum value of the objective function F=5x+2y and the values of x and y for which it occurs, we need to graph the constraints and determine the feasible region. Then, we can evaluate the objective function at the vertices of the feasible region to find the maximum value.
First, we will graph the constraints x+2y<6 and 2x+y<6. To do this, we can rewrite the inequalities as equations and graph the corresponding lines:
x+2y=6 (solid line)
2x+y=6 (dashed line)
Next, we need to determine which side of each line satisfies the inequality. To do this, we can choose a point on one side of each line and substitute its coordinates into the inequality. If the inequality is true, then that side of the line satisfies the inequality. If not, then the other side satisfies the inequality.
For example, let's choose the point (0,0) as a test point for the inequality x+2y<6:
0+2(0)<6
This is true, so the side of the line on which (0,0) lies satisfies the inequality. Similarly, we can choose the point (0,0) as a test point for the inequality 2x+y<6:
2(0)+0<6
This is also true, so the side of the line on which (0,0) lies satisfies the inequality.
Now, we can shade in the feasible region, which is the region of the graph that satisfies all of the constraints. It is the region bounded by the two lines and the axes, and it is shown in the figure below:
lua
| .
| .
| .
3 | .
| .
| .
2 | .
|.
----------------
0 1 2 3 4 5 6
The vertices of the feasible region are (0,3), (2,2), and (3,0). To find the maximum value of the objective function, we evaluate it at each vertex:
F(0,3) = 5(0) + 2(3) = 6
F(2,2) = 5(2) + 2(2) = 14
F(3,0) = 5(3) + 2(0) = 15
Therefore, the maximum value of the objective function is 15, and it occurs when x=3 and y=0.
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Tina make 480 sandwiches she only makes tuna sandwiches beef sandwiches and ham sandwiches amd cheese sandwiches 3/8 of the sandwiches are tuna 35% of the sandwiches are beef the ratio of the number of ham sandwhiches to the number of cheese sanwiches is 5:6 work out the number of ham sandwhiches that tina makes
= 5x = 5(12) = 60 sandwiches, the number of ham sandwiches. Tina makes 60 ham sandwiches.
First, we need to find the total number of each type of sandwich that Tina makes:
3/8 of the sandwiches are tuna, so the number of tuna sandwiches
= 3/8 x 480
= 180 sandwiches
35% of the sandwiches are beef, so the number of beef sandwiches
= 35% x 480
= 0.35 x 480
= 168 sandwiches
The remaining sandwiches must be ham and cheese sandwiches. Let's call the number of ham sandwiches "h" and the number of cheese sandwiches "c". We know that h:c = 5:6, which means that h = 5x and c = 6x for some common factor x. The total number of sandwiches is 480, so:
h + c = 480 - 180 - 168
h + c = 132
Substituting h = 5x and c = 6x, we get:
5x + 6x = 132
11x = 132
x = 12
Therefore, the number of ham sandwiches = 5x = 5(12) = 60 sandwiches. Tina makes 60 ham sandwiches.
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Jacobi measured the diagonals of three TV screens
as 5/84 inches, 46 inches and 46. 625 inches.
Which shows the lengths of the diagonals in
ascending order?
Jacobi measured the diagonals of three TV screens as 5/84 inches, 46 inches and 46. 625 inches.
The lengths of the diagonals in ascending order are 5/84 inches, 46 inches, and 46.625 inches.
The diagonals of the three TV displays are 5/84, 46, and 46.625 inches, respectively.
To determine the ascending order of the diagonals, we first convert the fraction 5/84 to a decimal. We may accomplish this by dividing 5 by 84 with a calculator or long division, yielding:
0.05952381
We can now contrast the three diagonal lengths:
0.05952381 inches
46 inches
46.625 inches
Hence, in increasing order, the diagonals are:
0.05952381 inches
46 inches
46.625 inches
As a result, the diagonal lengths in ascending order are 0.05952381 inches, 46 inches, and 46.625 inches.
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Three points A, B and C lie on a level plane. B is 7 km from A on a bearing of 030°. C is 5 km from B on a bearing of 280°. The distance AC is Answer
km. The bearing of A from C is Answer
°. The area of the triangle ABC is Answer
km2
The distance AC is approximately 6.47 km, the bearing of A from C is approximately 313.8°, and the area of triangle ABC is approximately 14.8 km².
To solve this problem, we can use the law of cosines to find the length of AC and the law of sines to find the angle at A.
First, we can use the given information to draw a diagram and label the angles and sides:
C
/ \
/ \
5 / \ 7
/ \
/ \
A /___θ_____\ B
From the given information, we know that:
AB = 7 km
BC = 5 km
∠ABC = 100° (since ∠ABD = 180° - 30° - 70° = 80° and ∠DBC = 180° - 280° = 100°)
Using the law of cosines, we can find the length of AC:
AC^2 = AB^2 + BC^2 - 2ABBCcos(∠ABC)
AC^2 = 7^2 + 5^2 - 2(7)(5)cos(100°)
AC^2 ≈ 41.84
AC ≈ 6.47 km
Next, we can use the law of sines to find the angle at A:
sin(∠CAB)/AC = sin(∠ABC)/AB
sin(∠CAB)/6.47 = sin(100°)/7
sin(∠CAB) ≈ 0.276
∠CAB ≈ 16.2°
To find the bearing of A from C, we can use the fact that the bearing is the angle measured clockwise from north. Since ∠CAB is acute and the bearing of B from A is 30° east of north, the bearing of A from C is:
360° - (30° + ∠CAB) ≈ 313.8°
Finally, to find the area of triangle ABC, we can use the formula:
Area = (1/2)ABBCsin(∠ABC)
Substituting the given values, we get:
Area = (1/2)(7)(5)sin(100°)
Area ≈ 14.8 km²
Therefore, the distance AC is approximately 6.47 km, the bearing of A from C is approximately 313.8°, and the area of triangle ABC is approximately 14.8 km².
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