The possible rectangles that Wes can make with his 20 feet of fencing are:
L = 3, W = 7
L = 4, W = 6
L = 5, W = 5
L = 6, W = 4
L = 7, W = 3
How to find the possible rectangles?Let L be the length of the rectangular garden and W be the width of the garden. Since the garden is enclosed by four sides, Wes will need 2L+2W feet of fencing to enclose it. We know that he has 20 feet of fencing, so we have the equation:
2L + 2W = 20
We also know that the smallest side of the garden should be 3 feet or longer, so:
L >= 3
W >= 3
To find the possible rectangles Wes can make, we can solve the equation for one variable in terms of the other:
2L + 2W = 20
2L = 20 - 2W
L = 10 - W
Now we can substitute this expression for L into the inequality L >= 3 to get:
10 - W >= 3
W <= 7
Similarly, we can substitute L = 10 - W into the inequality W >= 3 to get:
10 - L >= 3
L <= 7
Therefore, the possible values for L and W are:
3 <= L <= 7
3 <= W <= 7
We can also use the equation 2L + 2W = 20 to find the combinations of L and W that add up to 10, since the total length of fencing is 20 feet:
L = 3, W = 7
L = 4, W = 6
L = 5, W = 5
L = 6, W = 4
L = 7, W = 3
These are the possible rectangles that Wes can make with his 20 feet of fencing, where the smallest side is 3 feet or longer.
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What kind of triangle is this?
The triangle is a right triangle.
What is a right triangle?Any given triangle in which one of its internal angles measures 90^o is said to be a right angle. Thus there is a common relations among the three sides of the triangle which is shown by the Pythagorean theorem.
The Pythagorean theorem states that;
For a right triangle, this relation holds among its three sides;
/Hyp/^2 = /Adj/^2 + /Opp/^2
Considering the given diagram, we have;
/Hyp/^2 = /Adj/^2 + /Opp/^2
= 4^2 + 3^2
= 16 + 9
= 25
so that;
Hyp = 25^1/2
= 5
Therefore the given triangle is a right triangle.
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The combined math and verbal scores for females taking the SAT-I test are normally distributed with a mean of 998 and a standard deviation of 202 (based on date from the College Board). If a college includes a minimum score of 925 among its requirements, what percentage of females do not satisfy that requirement?
The percentage of females who do not satisfy the minimum score requirement of 925 on the SAT-I test is 35.9%.
Calculating the z-score for the minimum score requirement:
z = (X - Mean) / Standard Deviation
z = (925 - 998) / 202
z = -73 / 202 ≈ -0.361
Now, using the z-score to find the percentage of females below the minimum score:
Since the z-score is -0.361, we can use a z-table (or an online calculator) to find the area to the left of this z-score, which represents the percentage of females who scored below 925. The area to the left of -0.361 is approximately 0.359.
3. Convert the area to a percentage:
Percentage = Area * 100
Percentage = 0.359 * 100 ≈ 35.9%
So, approximately 35.9% of females do not satisfy the minimum score requirement of 925 on the SAT-I test.
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Suppose we have n+ positive training examples and n− negative training examples. Let C+ be the center of the positive examples and C− be the center of the negative examples, i.e., C+ = 1 n+ P i: yi=+1 xi and C− = 1 n− P i: yi=−1 xi . Consider a simple classifier called CLOSE that classifies a test example x by assigning it to the class whose center is closest. • Show that the decision boundary of the CLOSE classifier is a linear hyperplane of the form sign(w · x + b). Compute the values of w and b in terms of C+ and C−. • Recall that the weight vector can be written as a linear combination of all the training examples: w = Pn++n− i=1 αi · yi · xi . Compute the dual weights (α’s). How many of the training examples are support vectors?
To show that the decision boundary of the CLOSE classifier is a linear hyperplane, we need to show that it can be represented as sign(w · x + b), where w is the weight vector, b is the bias term, and sign is the sign function that outputs +1 or -1 depending on whether its argument is positive or negative.
Let x be a test example, and let d+ = ||x - C+|| be the distance from x to the center of the positive examples, and d- = ||x - C-|| be the distance from x to the center of the negative examples. The CLOSE classifier assigns x to the positive class if d+ < d-, and to the negative class otherwise. Equivalently, it assigns x to the positive class if
||x - C+[tex]||^2[/tex] - ||x - C-[tex]||^2[/tex] < 0.
Expanding the squares and simplifying, we get
(x · x - 2C+ · x + C+ · C+) - (x · x - 2C- · x + C- · C-) < 0,
which is equivalent to
2(w · x) + (C+ · C+ - C- · C-) - 2(w · (C+ - C-)) < 0,
where w = C+ - C- is the vector pointing from the center of the negative examples to the center of the positive examples. Rearranging, we get
w · x + b < 0,
where b = (C- · C-) - (C+ · C+) is a constant.
Thus, the decision boundary of the CLOSE classifier is a hyperplane defined by the equation w · x + b = 0, and the classifier assigns a test example x to the positive class if w · x + b > 0, and to the negative class otherwise.
To compute the values of w and b in terms of C+ and C-, we can use the definition of w and b above. We have
w = C+ - C-,
b = (C- · C-) - (C+ · C+).
To compute the dual weights α's, we need to solve the dual optimization problem for the support vector machine (SVM) with a linear kernel:
minimize 1/2 ||w||^2 subject to yi(w · xi + b) >= 1 for all i,
where yi is the class label of the i-th training example, and xi is its feature vector. The dual problem is
maximize Σi αi - 1/2 Σi Σj αi αj yi yj xi · xj subject to Σi αi yi = 0 and αi >= 0 for all i,
where αi is the dual weight corresponding to the i-th training example. The number of support vectors is the number of training examples with nonzero dual weights.
In our case, the training examples are the positive and negative centers C+ and C-, so we have n+ + n- = 2 training examples. The feature vectors are simply the centers themselves, so xi = C+ for i = 1 and xi = C- for i = 2. The class labels are yi = +1 for i = 1 (positive example) and yi = -1 for i = 2 (negative example). Plugging these into the dual problem, we get
maximize α1 - α2 - 1/2 α[tex]1^2[/tex] d(C+, C+) - 2α1α2 d(C+, C-) - 1/2 α[tex]2^2[/tex] d(C-, C-) subject to α1 - α2 = 0 and α1,
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Just-in-time (JIT) delivery: Increases physical distribution costs for business customers. Requires that a supplier be able to respond to the customer's production schedule. Usually does not require e-commerce order systems and computer networks. Means that deliveries are larger and less frequent. Shifts greater responsibility for physical distribution activities from the supplier to the business customer
Just-in-time (JIT) delivery is a supply chain management strategy that aims to improve efficiency and reduce inventory costs by having materials and goods delivered exactly when they are needed in the production process.
This approach requires suppliers to be able to respond to the customer's production schedule, ensuring timely deliveries to prevent disruptions. As a result, JIT delivery shifts greater responsibility for physical distribution activities from the supplier to the business customer, who needs to closely monitor inventory levels and maintain efficient communication with suppliers.
However, JIT delivery does not typically lead to larger, less frequent deliveries, nor does it inherently increase physical distribution costs. In fact, it may reduce costs by minimizing inventory storage expenses. Additionally, e-commerce order systems and computer networks are often utilized to facilitate the communication and coordination required for effective JIT delivery.
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anyone who is willing to answer the question in the image sent, i will give you brainiest!
Answer:
Triangles: 4(1/2)(12)(10) = 240 ft^2
Square: 10^2 = 100 ft^2
Total Surface Area: 340 ft^2
Joey is 20 years younger than becky in two years becky will be twice as old as joey what are their present ages
Becky is currently 38 years old and Joey is currently 18 years old.
Let's start by assigning variables to their ages. Let Joey's age be "J" and Becky's age be "B".
From the first piece of information, we know that Joey is 20 years younger than Becky. This can be expressed as:
J = B - 20
Now, let's use the second piece of information. In two years, Becky will be twice as old as Joey. So, we can set up an equation:
B + 2 = 2(J + 2)
We add 2 to Becky's age because in two years she will be that much older. On the right side, we add 2 to Joey's age because he will also be two years older. Then we multiply Joey's age by 2 because Becky will be twice his age.
Now, we can substitute the first equation into the second equation:
B + 2 = 2((B - 20) + 2)
Simplifying the right side:
B + 2 = 2B - 36
Add 36 to both sides:
B + 38 = 2B
Subtract B from both sides:
38 = B
So, Becky is currently 38 years old. Using the first equation, we can find Joey's age:
J = B - 20
J = 38 - 20
J = 18
So, Joey is currently 18 years old.
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2x/3+x/5=13 pls help me solve it I am going to 8th this year
Thank you
Answer:
x = 15
I think thats what u wanted me to do- I hope it helps though. Middle school is hard.
Step-by-step explanation:
2x/3 + x/5 = 13
Here, we have to two different denominators in the LHS. So in order to solve the equation, we need to have like denominators and hence we find the Least Common Multiple (LCM).
The LCM of the denominators 3 and 5 is 15. Hence, we multiply each term to bring the denominator to 15.
5.(2x/3) + 3.(x/5) = 13
Now we combine the fractions with common denominator.
10x/15 + 3x/15 = 13
(10x + 3x)/15 =13
13x/15 = 13
Now, multiply the numbers and solve
13x = 13 . 15
x = 15 (cancelling 13 from both LHS and RHS)
Convert the numeral to a numeral in base ten ABC4 base
16
ABC4 base 16 is equal to 43972 in base ten (decimal).
What is numeral?In order to represent any given number, numerals might be numbers, symbols, figures, or sets of figures.
To convert the number ABC4 base 16 to a numeral in base ten (decimal), we can use the positional notation system. Each digit in the number represents a power of 16, starting from the rightmost digit.
The rightmost digit is 4, which represents 4 x 16⁰ = 4 x 1 = 4.
The next digit is C, which represents 12 (since C is equivalent to the decimal number 12), and it is in the second position from the right. So the value of the second digit is 12 x 16¹ = 12 x 16 = 192.
The next digit is B, which represents 11, and it is in the third position from the right. So the value of the third digit is 11 x 16² = 11 x 256 = 2816.
The leftmost digit is A, which represents 10, and it is in the fourth position from the right. So the value of the fourth digit is 10 x 16³ = 10 x 4096 = 40960.
Now we can add up the values of each digit to get the decimal equivalent of the number:
4 + 192 + 2816 + 40960 = 43972
Therefore, ABC4 base 16 is equal to 43972 in base ten (decimal).
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Start at 7 and count up 2 times by hundreds
Answer:
1,400
Step-by-step explanation:
its the same thing as 7 times 200
Mandy bought a desktop computer system to start her business from home for $4,995. It is expected to depreciate at a rate of 10% per year. How much will her home computer system be worth after 9 years? Round to the nearest hundredth
Mandy's home computer system is expected to be worth $1,576.11.
Mandy's home computer system is expected to depreciate at a rate of 10% per year. After 1 year, the value of the computer system will be 90% of its original value.
After 2 years, it will be worth 90% of that value, or 0.9 × 0.9 = 0.81 times the original value. Continuing in this way, we can write the value of the computer system after n years as [tex]0.9^n[/tex] times its original value. Thus, after 9 years, the computer system will be worth [tex]0.9^n[/tex] times its original value:
Value after 9 years = 4995 × [tex]0.9^n[/tex]
Using a calculator, we find that the value is approximately $1,576.11 when rounded to the nearest hundredth. Therefore, after 9 years, Mandy's home computer system is expected to be worth $1,576.11.
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What is the volume of the regular pyramid to the nearest whole number?
Regular pyramid
1452 cm
594 cm
1188 cm
1029 cm
The volume of the regular pyramid is 1188 cm³.
What is a regular pyramid?A regular pyramid is a pyramid whose base is a regular polygon and whose lateral edges are all equal in length.
To calculate the volume of the regular pyramid, we use the formula below
Formula:
V = bhH/6....................... Equation 1Where:
V = Volume of the pyramidb = Base of of the triangleh = Height of the triangleH = Height of the pyramidFrom the question,
Given:
H = 22 cmb = 18 cmh = 18 cmSubstitute these values into equation 1
V = 18×18×22/6V = 1188 cm³Hence, the right option is C. 1188 cm³
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Work out the size of angle h.
h
125⁰
Answer:
when it's maintain supplimentary , it means that the sum of the angles given is 180° , In this case let one of the angle be x and the other is given as 125° .
therefore
125° + x = 180°
x = 180° - 125° = 55°
the compliment of x is the angle which when added to x givens 90° , Let the angle be y.
therefore
x + y = 90°
y = 90° - x = 90° - 55° = 35°
35° is the answer
what is the area of each student's photo?
The area of students photo with sides 10cm by 8cm is 80cm².
How to calculate the areaOn order to calculate the area of a student's photo, one can use the formula for the area of a rectangle, which is:
Area = length x width. You can simply multiply the two numbers together to get the area of the photo in that unit squared (e.g. square centimeters).
If a student's photo has a length of 10 centimeters and a width of 8 centimeters, the area of the photo would be:
Area = 10 cm x 8 cm = 80 cm²
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What is the area of students photo with sides 10cm by 8cm
Let f(x) = 1 + x + x2 + x3 + x4+ x5 .
i) For the Taylor polynomial of f at x = 0 with degree 3, find T3(x), by using the definition of Taylor polynomials.
ii) Now find the remainder R3(x) = f(x) − T3(x).
iii) Now on the interval |x| ≤ 0.1, find the maximum value of f (4)(x) .
iv) Does Taylor’s inequality hold true for R3(0.1)? Use your result from the previous question and justify.
i) T3(x) = 1 + x + x^2 + x^3/3
ii) R3(x) = x^4/4 + x^5/5
iii) The maximum value of f(4)(x) on the interval |x| ≤ 0.1 is 144.
iv) Yes, Taylor's inequality holds true for R3(0.1) since the maximum value of f(4)(x) on the interval |x| ≤ 0.1 is less than or equal to 144, which is smaller than the upper bound of 625/24.
i) To find T3(x), we start by calculating the derivatives of f(x) up to order 3:
f(x) = 1 + x + x^2 + x^3 + x^4 + x^5
f'(x) = 1 + 2x + 3x^2 + 4x^3 + 5x^4
f''(x) = 2 + 6x + 12x^2 + 20x^3
f'''(x) = 6 + 24x + 60x^2
Then, we evaluate these derivatives at x = 0:
f(0) = 1
f'(0) = 1
f''(0) = 2
f'''(0) = 6
Using these values, we can write the Taylor polynomial of f at x = 0 with degree 3 as:
T3(x) = f(0) + f'(0)x + f''(0)x^2/2 + f'''(0)x^3/6
= 1 + x + x^2 + x^3/3
ii) To find R3(x), we use the remainder formula for Taylor polynomials:
R3(x) = f(x) - T3(x)
Substituting f(x) and T3(x) into this formula and simplifying, we get:
R3(x) = x^4/4 + x^5/5
iii) To find the maximum value of f(4)(x) on the interval |x| ≤ 0.1, we first calculate the fourth derivative of f(x):
f(x) = 1 + x + x^2 + x^3 + x^4 + x^5
f''''(x) = 24 + 120x
Then, we evaluate this derivative at x = ±0.1 and take the absolute value to find the maximum value:
|f(4)(±0.1)| = |24 + 12| = 36
Since 36 is the maximum value of f(4)(x) on the interval |x| ≤ 0.1, we know that the upper bound for the remainder formula is 625/24.
iv) Taylor's inequality states that the absolute value of the remainder Rn(x) for a Taylor polynomial of degree n at a point x is bounded by a constant multiple of the (n+1)th derivative of f evaluated at some point c between 0 and x. Specifically, we have:
|Rn(x)| ≤ M|x-c|^(n+1)/(n+1)!
where M is an upper bound for the (n+1)th derivative of f on the interval containing x.
In this case, we have n = 3, x = 0.1, and c = 0. The (n+1)th derivative of f is f(4)(x) = 24 + 120x.
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100-3(4.25)-13-4(2.99) SOMEONE PLSS HELP MEE THIS IS DIE TMRW!!
Answer:
62.29
Step-by-step explanation:
100 - 3(4.25) - 13 - 4(2.99)
= 100 - 12.75 - 13 - 11.96
= 62.29
explanation in the picture
the answer is
62,29
Find the solution of the following initial value problem. 3x N이 =3 f'(u) = 5( cosu - sin u) and f(u)= Use Newton's method to approximate all the intersection points of the following pair of curves. Some preliminary graphing or analysis may help in choosing good intro y=16/* and y=x+1 The graphs intersect when x (Do not round until the final answer. Then found to six decimal places as needed. Use a comma to separate med
the intersection point is approximately (2.215421, 3.256684). For the first question, the initial value problem is given by the differential equation f'(u) = 5(cost - sinus) with the initial condition f(3xN) = 3.
To solve this problem, we can separate the variables and integrate both sides as follows:
f'(u) = 5(cosu - sinu)
∫ f'(u) du = ∫ 5(cosu - sinu) du
f(u) = 5sinu + 5cosu + C
Using the initial condition f(3xN) = 3, we can solve for the constant C:
f(3xN) = 5sin(3xN) + 5cos(3xN) + C = 3
C = 3 - 5sin(3xN) - 5cos(3xN)
Thus, the solution to the initial value problem is given by:
f(u) = 5sinu + 5cosu + 3 - 5sin(3xN) - 5cos(3xN)
For the second question, we are asked to find the intersection points of the two curves y = 16/* and y = x + 1 using Newton's method. To applyhttps://brainly.com/question/2228446 we need to find the function f(x) that represents the difference between the two curves:
f(x) = 16/x - (x + 1)
The intersection points correspond to the roots of f(x), which can be found using Newton's method:
x_{n+1} = x_n - f(x_n)/f'(x_n)
where x_n is the nth approximation of the root. We start with an initial guess of x_0 and iterate until we reach a desired level of accuracy. For example, if we start with x_0 = 1, the iterations are as follows:
x_1 = 1 - (16/1 - (1 + 1))/(16/1^2 + 1) = 2.5
x_2 = 2.5 - (16/2.5 - (2.5 + 1))/(16/2.5^2 + 1) = 2.267857
x_3 = 2.267857 - (16/2.267857 - (2.267857 + 1))/(16/2.267857^2 + 1) = 2.219208
x_4 = 2.219208 - (16/2.219208 - (2.219208 + 1))/(16/2.219208^2 + 1) = 2.215430
x_5 = 2.215430 - (16/2.215430 - (2.215430 + 1))/(16/2.215430^2 + 1) = 2.215421
Thus, the intersection point is approximately (2.215421, 3.256684).
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Its linear equation world problems please help asap also do them step by step i need the equation also
the three angles of a triangle are
(2x +5) ⃘
(2x +5) ⃘
,
(x −10) ⃘ and 65 ⃘
(x −10) ⃘ and 65 ⃘
calculate the size of each angle.
determine three consecutive odd numbers whose sum is 33.
determine three consecutive even numbers whose sum is 102.
The size of three angles of the triangle are 55 degrees, 55 degrees, and 15 degrees. The three consecutive odd numbers are 9, 11, and 13 and three consecutive even numbers are 32, 34, and 36.
1.To find the size of each angle in the triangle, we know that the sum of all angles in a triangle is 180 degrees. So we can set up an equation:
(2x + 5) + (2x + 5) + (x - 10) + 65 = 180
Simplifying and solving for x, we get:
5x + 55 = 180
5x = 125
x = 25
Now we can substitute x back into the expressions for each angle and simplify:
2x + 5 = 55 degrees
2x + 5 = 55 degrees
x - 10 = 15 degrees
Therefore, the three angles of the triangle are 55 degrees, 55 degrees, and 15 degrees.
2. Let's call the first odd number x. Then the next two consecutive odd numbers would be x + 2 and x + 4. We know that the sum of these three numbers is 33, so we can set up an equation:
x + (x + 2) + (x + 4) = 33
Simplifying and solving for x, we get:
3x + 6 = 33
3x = 27
x = 9
Therefore, the three consecutive odd numbers are 9, 11, and 13.
3. Let's call the first even number x. Then the next two consecutive even numbers would be x + 2 and x + 4. We know that the sum of these three numbers is 102, so we can set up an equation:
x + (x + 2) + (x + 4) = 102
Simplifying and solving for x, we get:
3x + 6 = 102
3x = 96
x = 32
Therefore, the three consecutive even numbers are 32, 34, and 36.
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Rewrite the expression in the form a^na
n
a, start superscript, n, end superscript.
\dfrac{a^{-13}}{a^{-6}}=
a
−6
a
−13
=start fraction, a, start superscript, minus, 13, end superscript, divided by, a, start superscript, minus, 6, end superscript, end fraction, equals
The expression a⁻¹³/a⁻⁶ can be written as a⁻⁷ in aⁿ form.
We have been given the expression
a⁻¹³/a⁻⁶
We know that whenever there is a minus sign in the power, we need to consider a reciprocal of the number
Hence,
a⁻¹³ will become 1/a¹ and a⁻⁶ will become 1/a⁶
Hence the numerator and denominator will interchange to get
a⁶/a¹³
Now, we know that when a number is broght from denominator to the numerator, there is a minus sign added to the power. Hence we will get
a⁶ X a⁻¹³
Since the two numbers have the same base- a, we can add the powers up as there is multiplication sign in between to get
a⁶ ⁺ ⁽⁻¹³⁾
= a⁶ ⁻ ¹³
= a⁻⁷
Hence, the expression a⁻¹³/a⁻⁶ can be written as a⁻⁷ in aⁿ form.
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please answer and explain. show work 100 POINTS
In 2029, there will be an estimated A, 8.66 billion people in the world.
C, t = (ln(N/N₀))/k is the equation rewritten to solve for t.
How to determine exponential growth model?Part A:
Using the given exponential growth model, find the population in 2029 as follows:
N = N₀e^kt
N₀ = 7.95 billion (present population)
k = 1.08% = 0.0108 (rate of increase)
t = 2029 - 2022 = 7 (number of years)
N = 7.95 billion × e^(0.0108×7)
N ≈ 8.66 billion
Therefore, the world's population is expected to be 8.66 billion in 2029. Answer choice A is correct.
Part B:
To solve for t, isolate it on one side of the exponential growth model equation. Taking the natural logarithm of both sides:
ln(N/N₀) = kt
Divide both sides by k:
t = ln(N/N₀)/k
Therefore, the equation rewritten to solve for t is t = (ln(N/N₀))/k. Answer choice C is correct.
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Which shows 71. 38 in word form? O A seventy-one thirty-eighths O B. Seventy-one and thirty eighths O c. Seventy-one and thirty-eight tenths D. Seventy-one and thirty-eight hundredths E seventy-one and thirty-eight thousands
71.38 in word form is Seventy-one and thirty-eight hundredths.
What is the decimal number?
The accepted method for representing both integer and non-integer numbers is the decimal numeral system. Decimal notation is the term used to describe the method of representing numbers in the decimal system.
A number is a numerical unit of measurement and labeling in mathematics. The natural numbers 1, 2, 3, 4, and so on are the first examples. Number words are a linguistic way to express numbers.
To write decimals in word form, you can read the whole number part, write "and," and then read the decimal part according to place value.
For example: 0.25 can be written as "zero and twenty-five hundredths"
Hence, the correct answer is 'D. Seventy-one and thirty-eight hundredths'.
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Algebra 2 question need help.
Answer:
c
Step-by-step explanation:
If a sample of 32 runners is taken from a population of 201 people what if the means of how many runners times
201 could refer to the mean of how many runners' times. The Option C is correct.
Could sample refer to the mean of runner times?The sample of 32 runners, as given, does not refer to the mean of how many runners' times. The sample size refers to the number of individuals selected from the population while population size refers to the total number of individuals in the population.
Data:
The population of 201 people is given.
The sample of 32 runners is taken from the population.
So, the mean of the runners' times would be calculated using all 201 runners in the population, not just the 32 in the sample. Therefore, the Option C is correct.
Full question "If a sample of 32 runners were taken from a population of 201 runners, could refer to the mean of how many runners' times ? A. Both 32 and 201 B. Neither 32 nor 201 C. 201 D. 32"
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The base of a solid is the region in the first quadrant between the graph of y=x2
and the x
-axis for 0≤x≤1
. For the solid, each cross section perpendicular to the x
-axis is a quarter circle with the corresponding circle’s center on the x
-axis and one radius in the xy
-plane. What is the volume of the solid?
A. pi/20
B. 1/5
C. pi/12
D. 1/3
The volume of the solid is π/20,
option (A). is correct.
What is volume?Volume is described as a measure of three-dimensional space. It is often quantified numerically using SI derived units or by various imperial or US customary units.
we have that the limits of integration for x are 0 and 1, because the solid lies in the region between x = 0 and x = 1.
Hence, we can say that the volume of the solid is given by:
V = ∫[0,1] (1/4)πx^4 dx
V = (1/4)π ∫[0,1] x^4 dx
V = (1/4)π (1/5) [x^5]0^1
V = (1/20)π
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I need help. What would be the answer?
Answer:
Step-by-step explanation:
DE/EC.
A circular donut sign has a radius of 3 feet enter the area in square feet of the donut sign round your answer to the nearest 10th
The area of the donut sign with a radius of 3 feet is approximately 84.8 square feet when rounded to the nearest 10th.
The area of a donut sign can be calculated by subtracting the area of the inner circle from the area of the outer circle. The area of the outer circle can be found using the formula A = πr^2, where r is the radius of the circle.
Thus, the area of the outer circle of the donut sign is A1 = π(3)^2 = 9π square feet. Similarly, the area of the inner circle is A2 = π(0.5)^2 = 0.25π square feet, where the radius of the inner circle is 0.5 feet (which is the radius of the circular hole in the donut sign).
Therefore, the area of the donut sign can be calculated as A1 - A2 = 9π - 0.25π = 8.75π square feet. Using the value of π ≈ 3.14, we get the area of the donut sign as approximately 27.43 square feet. Rounding this value to the nearest 10th gives the final answer of approximately 84.8 square feet.
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Find the new coordinates for the image under the given dilation. Rhombus WXYZ with vertices W(1, 0), X (4,-1), Y(5,-4), and Z(2, -3): k = 3. W' (.) x' (,) X' Y'(,) Z' (
the new coordinates of the rhombus W'X'Y'Z' after a dilation with scale factor k=3 are: [tex]W'(3,0), X'(12,-3), Y'(15,-12), Z'(6,-9)[/tex]
What are the coordinates?To find the new coordinates of the image after dilation, we need to multiply the coordinates of each vertex by the scale factor k = 3.
Let's start with vertex W(1,0):
Multiply the x-coordinate by [tex]3: 1 *\times 3 = 3[/tex]
Multiply the y-coordinate by [tex]3: 0 \times 3 = 0[/tex]
So the new coordinates of W' are [tex](3,0).[/tex]
Next, let's look at vertex X(4,-1):
Multiply the x-coordinate by [tex]3: 4 \times 3 = 12[/tex]
Multiply the y-coordinate by [tex]3: -1 \times 3 = -3[/tex]
So the new coordinates of X' are [tex](12,-3).[/tex]
Now for vertex Y(5,-4):
Multiply the x-coordinate by [tex]3: 5 \times 3 = 15[/tex]
Multiply the y-coordinate by [tex]3: -4 \times3 = -12[/tex]
So the new coordinates of Y' are [tex](15,-12).[/tex]
Finally, let's consider vertex Z(2,-3):
Multiply the x-coordinate by [tex]3: 2 \times 3 = 6[/tex]
Multiply the y-coordinate by [tex]3: -3 \times3 = -9[/tex]
So the new coordinates of Z' are [tex](6,-9)[/tex] .
Therefore, the new coordinates of the rhombus [tex]W'X'Y'Z'[/tex] after a dilation with scale factor k=3 are:
[tex]W'(3,0)[/tex]
[tex]X'(12,-3)[/tex]
[tex]Y'(15,-12)[/tex]
[tex]Z'(6,-9)[/tex]
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Please help!!! 10 points
The solution is, Options 1, 3, and, 5 are true.
The statements given are,
1.) The product of reciprocals is 1.
Let the fraction be a/b , and reciprocal be b/a ,
The product of the two will be 1.
Hence, the statement is true.
2.) To divide fractions, multiply the divisor by the reciprocal of the dividend.
Let the fraction be a/b , now,
a/b*1/a = a^2/b,
Hence, the statement is false.
3.) The reciprocal of a whole number is 1 over the number.
Let the number be 3, now,
The reciprocal of number 3 is 1/3 .
Hence, the statement is true.
4.) Reciprocals are used to multiply fractions.
The statement is false, Reciprocals are not used to multiply fractions.
5.) To find the reciprocal of a fraction, switch the numerator and denominator.
Let the fraction be a/b , then the reciprocal will be b/a .
Hence, the statement is true.
Therefore, Options 1, 3, and, 5 are true.
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complete question:
Select all that apply. Determine which of the following statements are true of reciprocals. Select all that apply. The product of reciprocals is 1 To divide fractions, multiply the divisor by the reciprocal of the dividend The reciprocal of a whole number is 1 over the number Reciprocals are used to multiply fractions To find the reciprocal of a fraction, switch the numerator and denominator
A city is planning a circular fountain, the depth of the fountain will be 3 feet in the volume will be 1800 feet to the third power, find the radius of the fountain, using the equation equals pi to the second power hhhh v is a volume in ours the radius and h is the depth round to the nearest whole number
The radius of the circular fountain is approximately 17 feet.
The formula for the volume of a circular fountain is given by V = πr^2h, where V is the volume, r is the radius, and h is the depth. In this case, we are given that the depth of the fountain is 3 feet and the volume is 1800 cubic feet. So we can plug in these values into the formula and solve for r as follows:
1800 = πr^2(3)
Simplifying this equation, we get:
r^2 = 600/π
Taking the square root of both sides, we get:
r = sqrt(600/π)
Using a calculator to approximate the value of sqrt(600/π), we get:
r ≈ 17
Therefore, the radius of the circular fountain is approximately 17 feet when rounded to the nearest whole number.
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2. The zoologists want to investigate whether the current 4 different diets impact their weight gains of 6-month baby elephants. The weights (in lbs) of participating 6-month baby elephants at the Houston Zoo are presented below, Diet Weight 1 655.5 788.3 734.3 721.4 679.1 699.4 2 789.2 772.5 786.9 686.1 732.1 774.8 3 737.1 639.0 696.3 671.7 717.2 727.1 4 535.1 628.7 542.4 559.0 586.9 520.0 Table 1: 6-month baby elephant weights. 3. The amount of circumference growth in mm) of oak trees at three different nurseries are presented below. Investigate whether the nursery locations affect the growths.
For question 2, the zoologists can conduct an analysis of variance (ANOVA) test to investigate whether the four different diets impact the weight gains of the 6-month baby elephants. The ANOVA test will compare the mean weight of each diet group to determine if there is a statistically significant difference between them. If the test shows that there is a significant difference, then the zoologists can conclude that the diets are impacting the weight gains of the baby elephants.
For question 3, the researchers can also conduct an ANOVA test to investigate whether the nursery locations affect the growth of oak trees. The test will compare the mean circumference growth of the oak trees at each nursery location to determine if there is a statistically significant difference between them. If the test shows that there is a significant difference, then the researchers can conclude that the nursery locations are impacting the growth of the oak trees.
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If a doctor prescribes 75 milligrams of a specific drug to her patient, how many milligrams of
the drug will remain in the patient's bloodstream after 6 hours, if the drug decays at a rate of
20 percent per hour? use the function act) = te and round the solution to the nearest
hundredth.
After 6 hours, approximately 19.66 milligrams of the drug will remain in the patient's bloodstream.
To find the remaining amount of the drug in the patient's bloodstream after 6 hours, we'll use the decay function given: A(t) = P(1 - r)^t, where:
- A(t) is the remaining amount after t hours
- P is the initial amount (75 milligrams in this case)
- r is the decay rate per hour (20% or 0.20)
- t is the number of hours (6 hours)
Step 1: Plug in the given values into the formula.
A(t) = 75(1 - 0.20)^6
Step 2: Calculate the expression inside the parentheses.
1 - 0.20 = 0.80
Step 3: Replace the expression in the formula.
A(t) = 75(0.80)^6
Step 4: Raise 0.80 to the power of 6.
0.80^6 ≈ 0.2621
Step 5: Multiply the result by the initial amount.
A(t) = 75 × 0.2621 ≈ 19.66
So, approximately 19.66 milligrams of the drug will remain in the patient's bloodstream after 6 hours, rounded to the nearest hundredth.
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