Answer:
29
Step-by-step explanation:
To solve this we have to add corresponding line segments and make them equal to each other.
We can see XZ is broken into XA and AZ.
We can also see that WY is broken into WA and AY.
We are given:
XA=12
AY=14
WA=3+3x
AZ=4x+1
So, we combine and make them equal to each based on their whole line segments:
[tex]12+4x+1=3+3x+14[/tex]
combine like terms
[tex]13+4x=17+3x[/tex]
subtract 13 from both sides
[tex]4x=4+3x[/tex]
subtract 3x from both sides
x=4
We aren't done yet, because the question is asking us to find XZ which is 12+4x+1:
substitute 4 for x
12+4(4)+1
multiply
12+16+1
=29
So, XZ is 29 units.
Hope this helps! :)
can someone help me please.
A smart phone screen measures 5 inches by 7 inches. It is surrounded by a frame of width w. Write an expression in standard form for the total area of the screen and frame
Answer:
4x² + 24x + 35
Step-by-step explanation:
Total area = (7 + 2x)(5 + 2x)
= 35 + 10x + 14x + 4x²
= 4x² + 24x + 35
Find the most important variable in the problem.
If a company hired an additional 12 employees, and every employee needed a
phone, it would require 8 more phones. How many phones does the company
have available now?
OA. the number of employees hired
OB. the money required to purchase phones
OC. the number of phones available
Mr. Smith claims that 20% of students have at least two cell phones: one phone that works, and one broken phone they use as a decoy for when teachers ask them to hand in their phone because they are spending all of their class time looking at it instead of learning. Mr. Novotny takes a random sample of 500 students and finds that 88 have two or more cell phones. At α = 0. 05, test mr. Smith claim
The proportion of students from a random sample of 500 fail to reject the null hypothesis and can not support Mr. Smith's claim as per the data.
Percent of students claim they have at least two cell phones = 20%
Sample size = 500
Significance level α = 0. 05
This is a hypothesis testing problem with the following hypotheses,
Null hypothesis (H₀),
The proportion of students who have at least two cell phones is 0.20.
Alternative hypothesis (Hₐ),
The proportion of students who have at least two cell phones is greater than 0.20.
Use a one-tailed z-test for proportions to test the null hypothesis at a significance level of α = 0.05.
The test statistic is calculated as,
z = (p₁ - p₀) / √(p₀(1-p₀)/n)
where p₁ is the sample proportion,
p₀ is the null hypothesis proportion,
and n is the sample size.
Using the values in the problem, we get,
p₁ = 88/500
= 0.176
p₀ = 0.20
n = 500
z = (0.176 - 0.20) / √(0.20(1-0.20)/500)
= -1.34
Using a standard normal distribution table,
the p-value for z = -1.34 is approximately 0.0901.
Since the p-value (0.0901) is slightly greater than the significance level (0.05),
Fail to reject the null hypothesis.
Do not have sufficient evidence to conclude that the proportion of students who have at least two cell phones is greater than 0.20.
Therefore, cannot support Mr. Smith's claim based on the given data as fail to reject the null hypothesis.
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A farmer uses a lot of fertilizer to grow his crops. The farmer’s manager thinks fertilizer products from distributor A contain more of the nitrogen that his plants need than distributor B’s fertilizer does. He takes two independent samples of four batches of fertilizer from each distributor and measures the amount of nitrogen in each batch. Fertilizer from distributor A contained 21 pounds per batch and fertilizer from distributor B contained 16 pounds per batch. Suppose the population standard deviation for distributor
Calculated t-value of 6.93 is greater than the critical value, we reject the null hypothesis and conclude that there is strong evidence that the mean amount of nitrogen in distributor A's fertilizer is significantly greater than the mean amount of nitrogen in distributor B's fertilizer.
Since we do not have the population standard deviation, we will need to use the t-distribution for our hypothesis test. We are interested in testing whether the mean amount of nitrogen in distributor A's fertilizer is significantly greater than the mean amount of nitrogen in distributor B's fertilizer.
Let μA be the true mean amount of nitrogen in distributor A's fertilizer and μB be the true mean amount of nitrogen in distributor B's fertilizer. Our null hypothesis is:
H0: μA - μB ≤ 0
The alternative hypothesis is:
Ha: μA - μB > 0
We will use a one-tailed test with a significance level of 0.05. Since we have two independent samples with sample sizes of 4 each, we will use a pooled t-test with the following formula:
t = ([tex]\bar{X1}[/tex] - [tex]\bar{X2}[/tex] - D) / (sP * √(2/n))
where [tex]\bar{X1}[/tex] and [tex]\bar{X2}[/tex] are the sample means, D is the hypothesized difference between the population means, sP is the pooled standard deviation, and n is the sample size.
To calculate the pooled standard deviation, we can use the following formula:
sP = √(((n1-1)*s1² + (n2-1)*s2²) / (n1+n2-2))
where n1 and n2 are the sample sizes, and s1 and s2 are the sample standard deviations.
Plugging in the given values, we get:
[tex]\bar{X1}[/tex] = 21, [tex]\bar{X2}[/tex] = 16
s1 = s2 = 1.5 (since we are assuming the population standard deviation is the same for both distributors)
n1 = n2 = 4
D = 0 (since the null hypothesis is that there is no difference in the means)
sP = √(((4-1)*1.5² + (4-1)*1.5²) / (4+4-2)) = 1.5
Using these values, we get:
t = (21 - 16 - 0) / (1.5 * √(2/4)) = 6.93
Looking at a t-distribution table with 6 degrees of freedom (4+4-2), we find that the critical value for a one-tailed test at a significance level of 0.05 is approximately 1.943. Since our calculated t-value of 6.93 is greater than the critical value, we reject the null hypothesis and conclude that there is strong evidence that the mean amount of nitrogen in distributor A's fertilizer is significantly greater than the mean amount of nitrogen in distributor B's fertilizer.
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Complete Question:
A farmer uses a lot of fertilizer to grow his crops. The farmer's manager thinks fertilizer products from distributor A contain more of the nitrogen that his plants need than distributor B's fertilizer does. He takes two independent samples of four batches of fertilizer from each distributor and measures the amount of nitrogen in each batch. Fertilizer from distributor A contained 23 pounds per batch and fertilizer from distributor B contained 18 pounds per batch. Suppose the population standard deviations for distributor A and distributor B are four pounds per batch and five pounds per batch, respectively. Assume the distribution of nitrogen in fertilizer is normally distributed. Let ?1 and ?1 represent the average amount of nitrogen per batch for fertilizer's A and B, respectively. Calculate the value of the test statistic
the life of light bulbs is distributed normally. the standard deviation of the lifetime is 20 hours and the mean lifetime of a bulb is 580 hours. find the probability of a bulb lasting for at most 624 hours. round your answer to four decimal places.
The probability of a bulb lasting for at most 624 hours is 0.9861, rounded to four decimal places.
The standard deviation of the lifetime is a measure of how spread out the lifetimes are. In other words, it tells us how much the lifetimes of bulbs vary from the mean. In this case, the standard deviation of the lifetime is 20 hours.
Now, let's get to the question at hand. We want to find the probability of a bulb lasting for at most 624 hours. To do this, we need to use the properties of the normal distribution.
First, we need to calculate the z-score, which tells us how many standard deviations a value is from the mean. We can use the formula z = (x - mu) / sigma, where x is the value we are interested in, mu is the mean, and sigma is the standard deviation. In this case, x = 624, mu = 580, and sigma = 20.
Plugging these values into the formula, we get z = (624 - 580) / 20 = 2.2.
Next, we need to find the probability of a bulb lasting for at most 624 hours, which is the same as finding the area under the normal curve to the left of z = 2.2. We can use a standard normal distribution table or a calculator to find this probability.
Using a calculator, we can use the normal cdf function with the values -9999 (a very large negative number) and 2.2 to find the probability. This gives us a probability of 0.9861.
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Kaylie put $900 in a savings account, earning 11% interest for 7 years. she did not make any additional deposits or withdrawals. what is the amount of interest kaylie earned?
Kaylie earned $693 in interest on her savings account.
What was the total amount of money Kaylie had in her savings account after 7 years of depositing $900 and earning 11% interest on it?Kaylie deposited $900 in a savings account and earned 11% interest on it for 7 years. After the 7-year period, Kaylie earned $693 in interest, which was compounded annually.
This brought the total amount of money in her savings account to $1,593. The power of compounding interest in savings accounts can help grow your money significantly over time.
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Find the curve in the xy plane that passes through the point (9,8) and whose slope at each point is 6 sqrt x
The equation of curve passing through the point (9,8) with slope [tex]6\sqrt{x}[/tex] is [tex]y = 4\times x^{(3/2)} -100[/tex] .
Slope of curve is given by [tex]6\sqrt{x}[/tex] and curve is passing through point (9,8) .
A curve can be represented in a graph using the standard form of equations. Equation will represent the slope of curve and point through which the curve is passing.
Equation of curve :
Differentiate the slope equation,
dy/dx = [tex]6\sqrt{x}[/tex]
dy = [tex]6\sqrt{x}[/tex] dx
Integrating both sides,
Integration rule : [tex]\int\ {x^n} \, dx = x^{n+1}/n+1 + c[/tex]
[tex]y = 6 \times (x^{3/2})/(3/2) +c[/tex]
[tex]y = 4 x^{(3/2)} + c[/tex]
Now substitute (9,8) in the equation of y,
[tex]8 = 4\times (9)^{3/2} + c[/tex]
[tex]c = -100[/tex]
Substitute the value to get the equation of curve,
The equation of curve is [tex]y = 4\times x^{(3/2)} -100[/tex] .
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Select the statement that correctly describes the solution to this system of equations. 4x+2y=6
4x+2y=4
A. There is no solutions
B. There are infinitely many solutions
C. There is exactly one solution at (4,2)
D. There is exactly one solution at (6,4)
Answer:
Step-by-step explanation:
The statement that correctly describes the solution to this system of equations 4x+2y=6 and 4x+2y=4 is "There is no solutions". The correct option is A.
The given system of equations is 4x + 2y = 6 and 4x + 2y = 4.
On comparing the two equations, we notice that the left-hand side of both the equations is the same. However, the right-hand side of the two equations is different. This implies that the lines represented by the two equations are parallel to each other, since they have the same slope but different y-intercepts.
If two lines are parallel, they will never intersect. In this case, since the two equations represent two parallel lines, there is no point of intersection between them. Therefore, the system of equations has no solution.
Hence, the correct answer is A. There is no solution to this system of equations.
In summary, the given system of equations cannot be satisfied simultaneously, since the lines represented by the two equations are parallel to each other and hence do not intersect. Therefore, the system of equations has no solution.
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Your current CD matures in a few days. You would like to find an investment with a higher rate of return than the CD. Stocks historically have a rate of return between 10% and 12%, but you do not like the risk involved. You have been looking at bond listings in the newspaper. A friend wants you to look at the following corporate bonds as a possible investment. Bond Cur. Yld. Vol Close Net Chg. 7. 5 128 3 ABC 7-15 104- 2 4 8. 4 17 XYZ 7- 15 100- 2 1 3 1 1 +- 4 4 What price would you pay for each bond if you purchased one of them today? (Remember the face value is $1000) а. ABC: $1047. 50 XYZ. $1,005. 00 b ABC $1104. 75 XYZ: $1100. 50 ABC: $872 XYZ. $983 d. ABC: $750 XYZ: $840 C. â
Note that the price to be paid for each bond if they are purchased today a.
ABC: $1047.50
XYZ: $1005.00 (Option A)
How is this so ?The formula to determine the price to pay for a bond, is ...
Price = (Annual Interest Payment) / (Current Yield)
where Annual Interest Payment = (Coupon Rate / 100) x Face Value, and
Current Yield = (Annual Interest Payment / Price) x 100.
Using the given information, we can calculate the price to pay for each bond
For ABC bond
Annual Interest Payment
= (7.5 / 100) x $1000 = $75
Current Yield
= (Annual Interest Payment / Price) x 100 = (75 / $1042.50) x 100
= 7.2%
Price = (Annual Interest Payment) / (Current Yield)
= $75 / (7.2/100)
= $1041.67
So .... the price to pay for the ABC bond is approximately $1041.67.
For XYZ bond
Annual Interest Payment
= (8.4 / 100) x $1000
= $84
Current Yield
= (Annual Interest Payment / Price) x 100
= (84 / $1003.125) x 100
= 8.37%
Price = (Annual Interest Payment) / (Current Yield)
= $84 / (8.37/100)
= $1003.84
So, the price to pay for the XYZ bond is approximately $1003.84.
So, the closest option to the calculated prices is:
a. ABC: $1047.50
XYZ: $1,005.00
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The desks in a classroom are organized into four rows of four columns. Each day the teacher
randomly assigns you to a desk. You may be assigned to the same desk more than once. Over the
course of seven days, what is the probability that you are assigned to a desk in the front row
exactly four times?
The probability of being assigned to a desk in the front row exactly four times over the course of seven days is approximately 0.008, or 0.8%.
There are a total of 16 desks in the classroom, arranged in 4 rows and 4 columns. The probability of being assigned to a desk in the front row is 4/16 = 1/4, since there are 4 desks in the front row.
To calculate the probability of being assigned to a front-row desk exactly 4 times over the course of 7 days, we can use the binomial probability formula:
P(X = k) = (n choose k) * p^k * (1 - p)^(n-k)
where X is the random variable representing the number of times you are assigned to a front-row desk, n is the number of trials (in this case, 7), k is the number of successes (being assigned to a front-row desk), p is the probability of success on each trial (1/4), and (n choose k) represents the number of ways to choose k successes out of n trials, which is given by the binomial coefficient formula:
(n choose k) = n! / (k! * (n-k)!)
where ! represents the factorial function.
Using this formula, we get:
P(X = 4) = (7 choose 4) * (1/4)^4 * (3/4)^3
P(X = 4) = (35) * (1/256) * (27/64)
P(X = 4) ≈ 0.008
Therefore, the probability of being assigned to a desk in the front row exactly four times over the course of seven days is approximately 0.008, or 0.8%.
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Hurry!!! Find w. (25 points)
4(−4.6 + w) = 22.24
w = 10.16
w = 4.2
w = 1.2
w = −1.2
The value of w in the expression is 10.2
How to calculate the value of w?The expression is given as, we are required to calculate the value of w
4(-4.6 +w)= 22.24
the first step is to open the bracket to calculate the value of x, multiply 4 with the value in the bracket
-18.4 + 4w= 22.24
collect the like terms between both sides by separating the numbers that have alphabets included in it
4w= 22.24 + 18.4
4w= 40.8
Divide by the coefficient of w which is 4
4w/4= 40.8/4
w= 40.8/4
w= 10.2
Hence the value of w in the expression is 10.2
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Use undetermined coefficients to solve the nonhomogeneous equation
y″+11y′+28y=e^(5x)+x+4
a) write the characteristic equation of the associated homogeneous part by using the variable .
b) write the solution the associated homogeneous part, by using arbitrary constants 1 and 2 for 1 and 2. (note that: the order of the solutions are very important. you should write first 1 such that 1(−1/4)= and second 2 such that 2(−1/7)=.)
c) write the form of the any particular solution (we are using ,, etc. for undetermined coefficients for the correspoding functions in in the same order.):
and evaluate its derivatives and then found ″
d) thus evaluate the undetermined coefficients
e) finally write the general solution y=
a) The characteristic equation is r^2 + 11r + 28 = 0.
b) The associated homogeneous equation are y1(x) = c1e^(-4x) and y2(x) = c2e^(-7x).
c) The form of the particular solution is y_p(x) = Ae^(5x) + Bx + C.
d) By solving the system of equations, it gives A = 1/28, B = 1/28, and C = -211/196.
e) The general solution is y(x) = c1e^(-4x) + c2e^(-7x) + (1/28)e^(5x) + (1/28)x - 211/196.
a) The characteristic equation of the associated homogeneous equation is r^2 + 11r + 28 = 0.
b) Factoring the characteristic equation gives (r + 4)(r + 7) = 0, so the solutions to the associated homogeneous equation are y1(x) = c1e^(-4x) and y2(x) = c2e^(-7x).
c) The form of the particular solution is y_p(x) = Ae^(5x) + Bx + C. Taking the first and second derivatives of y_p(x) gives y_p'(x) = 5A + B and y_p''(x) = 0.
d) Substituting y_p(x), y_p'(x), and y_p''(x) into the original nonhomogeneous equation gives:
0 + 11(5A + B) + 28(Ae^(5x) + Bx + C) = e^(5x) + x + 4
Simplifying this equation gives:
(28A)e^(5x) + (28B)x + 11(5A) + 11B + 28C = e^(5x) + x + 4
Comparing coefficients gives the system of equations:
28A = 1
28B = 1
11(5A) + 11B + 28C = 4
Solving this system of equations gives A = 1/28, B = 1/28, and C = -211/196.
e) The general solution to the nonhomogeneous equation is y(x) = y_h(x) + y_p(x), where y_h(x) = c1e^(-4x) + c2e^(-7x) and y_p(x) = (1/28)e^(5x) + (1/28)x - 211/196. Therefore, the general solution is:
y(x) = c1e^(-4x) + c2e^(-7x) + (1/28)e^(5x) + (1/28)x - 211/196.
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A large corporation with monopolistic control in the marketplace has its average daily costs, in dollars, given by 900 + 100x + x2 C = X = 180,000 – 50x dollars. Find the quantity that gives maximum profit
The quantity that gives maximum profit is 1,750 units.
To find the quantity that gives maximum profit, we first need to determine the profit function.
Profit = Total Revenue - Total Cost
Total Revenue is given by the price (p) times the quantity (q):
TR = pq
Since the corporation has monopolistic control, it can set the price to maximize profit. We can use the demand function
to find the price that will maximize profit:
Q = 180,000 - 50p
Solving for p, we get:
p = 3,600 - 0.02Q
Now we can substitute this into the profit equation:
Profit =[tex](3,600 - 0.02Q)Q - (900 + 100Q + Q^2)[/tex]
Simplifying:
Profit = [tex]-Q^2 + 3,500Q - 900[/tex]
To find the quantity that gives maximum profit, we can take the derivative of the profit function with respect to Q and
set it equal to zero:
[tex]d/dQ (-Q^2 + 3,500Q - 900) = 0[/tex]
-2Q + 3,500 = 0
Q = 1,750
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How many of the shapes below are trapeziums?
Answer:
2
Step-by-step explanation:
The K and N are the trapeziums and the two lines opposite to them go in a parallel line
Choosing only among rectangle,rhoumbos,square, name all parallelograms that have the following property
Among rectangles, rhombuses, and squares, all three of these shapes are parallelograms that have specific properties.
A rectangle is a parallelogram with four right angles. Its opposite sides are equal and parallel, and it has diagonals that are equal in length and bisect each other.
A rhombus, on the other hand, is a parallelogram with all four sides being equal in length. Like a rectangle, its opposite sides are parallel, but it does not necessarily have right angles. The diagonals of a rhombus are perpendicular bisectors of each other, meaning they intersect at a 90-degree angle and divide each other into two equal parts.
Finally, a square is a special type of parallelogram that combines the properties of both rectangles and rhombuses. It has four equal sides and four right angles, making it a unique shape. The diagonals of a square are equal in length, bisect each other, and are also perpendicular bisectors.
In conclusion, rectangles, rhombuses, and squares are all parallelograms with distinct properties. Rectangles have right angles and equal opposite sides, rhombuses have equal sides and diagonals that are perpendicular bisectors, and squares possess all the properties of both rectangles and rhombuses.
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what is the value of sin 45 but as a fraction?
The exact value of sin 45° is [tex]\dfrac{\sqrt{2} }{2}[/tex]
Since we have given that
[tex]\text{sin} \ 45^\circ[/tex]
We need to find the exact value of sin 45°.
From the trigonometric table,
[tex]\text{sin} \ 45^\circ=\dfrac{1}{\sqrt{2}}[/tex]
We need to write it as a simplified fraction,
So, for this, we will rationalize the denominator:
[tex]\dfrac{1}{\sqrt{2}}\times\dfrac{\sqrt{2} }{\sqrt{2}}[/tex]
[tex]=\dfrac{\sqrt{2} }{2}[/tex]
Hence, the exact value of sin 45° is [tex]\dfrac{\sqrt{2} }{2}[/tex]
Answer: 1 divided by the square root of 2
Step-by-step explanation:
Let's set up an example, if the angle is forty five degrees, and the opposite length is 1, we can solve this as sin to get to the hypotenuse,
1. sin(45) = 1/hyp
2. sin(45) times hyp = 1
3. hyp = sin(45)/1
If we take any answer and put it over the hypotenuse as sin, we can see that it is going to end up as 1/√2, or 0.707
I did 1 because you are just asking for sin(45).
50 POINTS ASAP Use the image to determine the type of transformation shown.
image of polygon ABCD and a second polygon A prime B prime C prime D prime above it
180° clockwise rotation
Horizontal translation
Reflection across the x-axis
Vertical translation
Since polygon A prime B prime C prime D prime above is above the image of polygon ABCD, the type of transformation shown is: D. vertical translation.
What is a transformation?In Mathematics and Geometry, a transformation can be defined as the movement of a point from its initial position to a new location. This ultimately implies that, when a function or object is transformed, all of its points would also be transformed.
In Mathematics and Geometry, a horizontal translation to the right is modeled by this mathematical equation g(x) = f(x - N) while a vertical translation to the positive y-direction (upward) is modeled by this mathematical equation g(x) = f(x) + N.
Where:
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Answer:
Vertical translation
Step-by-step explanation:
I am in the middle of taking the quiz and belive this is the correct answer!
SHOW YOUR W
(2x - 1)(3x + 4) = 0
Answer:
x = 1/2, -4/3
Step-by-step explanation:
(2x - 1)(3x + 4) = 0
We know any number multiplied by 0 will be equal 0.
2x - 1 = 0
2x = 1
x = 1/2
3x + 4 = 0
3x = -4
x = -4/3
So, x = 1/2, -4/3
[tex]2x(3x + 4) - 1(3x + 4) = 0[/tex]
[tex]6 {x}^{2} + 8x - 3x - 4 = 0[/tex]
[tex]6 {x}^{2} + 5x - 4 = 0[/tex]
[tex]6 {x}^{2} + 5x = 4[/tex]
For the functions f(x)=9x2+8x+2 and g(x)=4x2, find (f+g)(x) and (f+g)(−2)
We know that the function (f+ g)(x) = 13x^2 + 8x + 2 and (f+ g)(-2) = 38.
Hi! I'd be happy to help you with your question.
Given the functions f(x) = 9x^2 + 8x + 2 and g(x) = 4x^2, we need to find (f+ g)(x) and (f+ g)(-2).
To find (f+ g)(x), simply add the functions f(x) and g(x) together:
(f+ g)(x) = f(x) + g(x) = (9x^2 + 8x + 2) + (4x^2) = 13x^2 + 8x + 2
Now, we need to find (f+ g)(-2) by substituting -2 for x in the combined function:
(f+ g)(-2) = 13(-2)^2 + 8(-2) + 2 = 13(4) - 16 + 2 = 52 - 14 = 38
So, (f+ g)(x) = 13x^2 + 8x + 2 and (f+ g)(-2) = 38.
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In this problem you will only find the models. But make sure that you show all work to support
your answers. Use function notation in your final answers.
Suppose two types of wire will be used to form the edges of a rectangle. The wire used
for the width costs $2.50 per foot and the wire used for the height costs $4.25 per foot. Express the total cost of building the rectangle out of wire as a function of the with if the
enclosed area must be 500 square feet.
To start, let's call the width of the rectangle "w" and the height "h". We know that the area must be 500 square feet, so we can write an equation:
w*h = 500
We can solve this equation for h:
h = 500/w
Now we can express the total cost of the wire in terms of w. The cost of the wire for the width is $2.50 per foot, so the cost for that side is:
2.5w
The cost of the wire for the height is $4.25 per foot, so the cost for that side is:
4.25h = 4.25(500/w) = 2125/w
So the total cost of the wire is:
C(w) = 2.5w + 2125/w
This is our final answer expressed in function notation.
Let's denote the width of the rectangle as w and the height as h. We are given that the area of the rectangle must be 500 square feet, so we have:
w * h = 500
Now, we need to find the cost function based on the width. The cost of the wire for the width is $2.50 per foot and for the height is $4.25 per foot. Therefore, the total cost (C) can be expressed as:
C(w) = 2.50 * w + 4.25 * h
We need to express the height (h) in terms of the width (w) using the area equation:
h = 500 / w
Now, we can substitute this expression for h in the cost function:
C(w) = 2.50 * w + 4.25 * (500 / w)
This is the cost function for building the rectangle out of wire as a function of its width, given that the enclosed area must be 500 square feet.
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19. The functions f and g are defined by f(x) = 2x/x-2 and g(x) = x + 4 respectively. Find
gf.
Answer:
gf(x) = g(f(x)) = (x+4)(2x/x-2) = 2x^2 + 8x - 8
On february 6, 1995, in sioux falls, south dakota, the temperature dropped from 48°f to –16°f in a period of 8 hours. what was the average change in temperature per hour?
The average change in temperature per hour during the temperature drop from 48°F to -16°F in Sioux Falls, South Dakota on February 6, 1995, was 8°F per hour.
What was the rate of temperature change per hour during the significant temperature drop in Sioux Falls?On February 6, 1995, the temperature in Sioux Falls, South Dakota dropped dramatically from 48°F to -16°F in just eight hours. To calculate the average change in temperature per hour, we can use the formula:
Average Change in Temperature per Hour = (Change in Temperature) ÷ (Time)
Using this formula, we can calculate the average change in temperature per hour in Sioux Falls as follows:
Average Change in Temperature per Hour = (48°F - (-16°F)) ÷ 8 hours
Average Change in Temperature per Hour = 64°F ÷ 8 hours
Average Change in Temperature per Hour = 8°F per hour
Therefore, the average change in temperature per hour during that eight-hour period in Sioux Falls, South Dakota was 8°F. This rapid and significant change in temperature was likely due to a strong cold front moving through the area.
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Casey bought an 100 pound bag of dog food . He gave his dogs the same amount of dog food each week. the dog food lasted eight weeks. How much dog food did Cassie give his dogs each week? give the answer as a fraction or a mixed number
Laura is currently paying off her four-year car financing. when she purchased her car, it had a list price of $19,858. laura traded in her previous car, a good-condition 2000 honda insight, for 85% of the trade-in value listed below, financing the rest of the cost at 9.5% interest, compounded monthly. she also had to pay 9.27% sales tax, a $988 vehicle registration fee, and a $77 documentation fee. however, because laura wants to pay off her loan more quickly, she makes a total payment of $550 every month. how much extra is she paying monthly? round all dollar values to the nearest cent.
Laura is paying each month:
extra payment = $550 - monthly payment
To calculate how much extra Laura is paying each month, we first need to calculate the total cost of her car financing. Here are the steps:
Calculate the trade-in value of Laura's old car. We don't have the exact value, but we know that she received 85% of the trade-in value listed below, so we can set up an equation:
0.85 * trade-in value = value Laura received
Solving for the trade-in value, we get:
trade-in value = value Laura received / 0.85
Add the trade-in value to the list price of the new car to get the total cost before taxes and fees:
total cost before taxes and fees = $19,858 + trade-in value
Add the sales tax, registration fee, and documentation fee to get the total cost of the car financing:
total cost = (1 + 0.0927) * total cost before taxes and fees + $988 + $77
Calculate the monthly payment using the formula for a loan with monthly compounding:
monthly payment = (principal * monthly interest rate) / (1 - (1 + monthly interest rate)^(-number of months))
We know that Laura is financing the rest of the cost after her trade-in value, so:
principal = total cost - value Laura received
monthly interest rate = 0.095 / 12
number of months = 48 (since it's a four-year financing)
Substituting these values into the formula, we get:
monthly payment = ($19,858 + trade-in value - value Laura received) * 0.007916 / [tex](1 - (1 + 0.007916)^{(-48)})[/tex]
Now that we have the total monthly payment, we can calculate how much extra Laura is paying each month:
extra payment = $550 - monthly payment
Note that this assumes that Laura doesn't have any other fees or interest charges on her car financing, such as late payment fees or penalties for paying off the loan early. If there are any additional fees or charges, the calculation may be different.
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(co 4) market research indicates that a new product has the potential to make the company an additional $3.8 million, with a standard deviation of $1.7 million. if this estimate was based on a sample of 10 customers, what would be the 90% confidence interval?
The 90% confidence interval of the new product has the potential to make the company an additional $3.8 million is (2.81, 4.79), option B.
Confidence intervals quantify how confident or uncertain a sampling technique is. They can take any number of probability thresholds, with a 95% or 99% confidence level being the most popular. The calculation of confidence intervals is done using statistical techniques like the t-test.
[tex]\bar x = $3.8[/tex]
sample standard deviation = s =1.7
sample size = n =10
Degrees of freedom = df = n - 1 = 10 - 1 = 9
At 90% confidence level
[tex]\alpha[/tex] = 1 - 90%
[tex]\alpha[/tex] =1 - 0.90 =0.1
[tex]\alpha/2[/tex] = 0.05
[tex]t\alpha/2[/tex] ,df = t0.05,9 =1.833
At 90% confidence level, the critical value is t = 1.833
The 90% confidence interval is:
[tex]\bar x \pm t*\frac{s}{\sqrt{n} }[/tex]
[tex]=3.8\pm 1.833*\frac{1.7}{\sqrt{10}}\\\\=3.8\pm 0.99[/tex]
=(2.81,4.79).
Therefore, 90% confidence interval estimate of the population mean is, (2.81,4.79).
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Complete question:
Market research indicates that a new product has the potential to make the company an additional $3.8 million, with a standard deviation of $1.7 million. If this estimate was based on a sample of 10 customers, what would be the 90% confidence interval? (2.76, 4.84) O (2.81, 4.79) (2.11, 5.56) (3.06, 4.54)
A magazine listed the number of calories and sodium content (in milligrams) for 13 brands of hot dogs. Examine the association, assuming that the data satisfy the conditions for inference. Complete parts a and b
Option B is correct. The relationship is: H0 = 0 there is no linear association between calories and sodium content H1 ≠ 0 there is a linear association between colones and sodium content
The test statistic is 3.75
How to get the correct optionThe test statistics can be gotten from the data that we already have available in this question
The coefficient is given as 2.235
The Standard error of the coefficient is given as 0.596
The formula used is given as
Such that t = coefficient / Standard error
where the coefficient = 2.235
The standard error = 0.596
Then when we apply the formula we have
2.235 / 0.596
t statistic = 3.75
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Calculate ∑ (-1)^k pi^2k/2k
To calculate ∑ (-1)^k pi^2k/2k, we can use the power series expansion for the cosine function:
cos(x) = ∑ (-1)^n x^(2n) / (2n)!
We can substitute pi^2 for x in this formula to get:
cos(pi^2) = ∑ (-1)^n (pi^2)^(2n) / (2n)!
= ∑ (-1)^n pi^(4n) / (2n)!
Now we can compare this to the original series we want to evaluate:
∑ (-1)^k pi^2k/2k = ∑ (-1)^n pi^(2n) / (2n)
We notice that the powers of pi in the two series match up, but the coefficients are different. However, we can use the identity cos(pi^2) = (-1)^n to rewrite the series we want to evaluate as:
∑ (-1)^n pi^(2n) / (2n) = ∑ (-1)^n pi^(4n) / (2n)! * (2n) / pi^2n
= pi^2 / 2 * ∑ (-1)^n pi^(4n) / (2n)!
Now we can substitute our expression for cos(pi^2) into this equation to get:
∑ (-1)^k pi^2k/2k = pi^2 / 2 * cos(pi^2)
= pi^2 / 2 * (-1)^n
Therefore, the value of the series is (-1)^n * pi^2 / 2.
To calculate the sum ∑ (-1)^k (pi^2k)/(2k), it is important to recognize that this is an alternating series with a general term given by a_k = (-1)^k (pi^2k)/(2k).
However, the question seems incomplete, as there is no specified range for the sum (i.e., the values of k). If you provide the range of k for which this sum is to be calculated, I would be glad to help you further.
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A lean-to is a shelter where the roof slants down to the ground. The length of the roof of one lean-to is 17 feet. The width of the lean-to is 15 feet. How high is the lean-to on its vertical side?
The height of the lean-to on its vertical side is 8 feet.
What is the height of a lean-to on its vertical side?
To find the height of the lean-to on its vertical side, we need to use the Pythagorean theorem, which states that in a right triangle, the square of the length of the hypotenuse (the longest side) is equal to the sum of the squares of the other two sides. In this case, the vertical side is the hypotenuse, and the length and width are the other two sides.
So, we have:
[tex]height^2 = hypotenuse^2 - width^2[/tex]
We know the length of the roof (the hypotenuse) is 17 feet, and the width is 15 feet. So we can plug these values into the equation and solve for the height:
[tex]height^2 = 17^2 - 15^2\\height^2 = 289 - 225\\height^2 = 64\\height = 8[/tex]
Therefore, the height of the lean-to on its vertical side is 8 feet.
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what are the outcomes
A 6 sided number cube is rolled 5 times
Answer:
7776 outcomes
Step-by-step explanation:
To get the total number of outcomes we multiply the total number of possibilities for each roll. Since there are 5 rolls, the total number of outcomes will be:
6 x 6 x 6 x 6 x 6 = 7776 outcomes