Find the sum of the tuple (1, 2, -2) and twice the tuple (-2,3,5). O A. (-2, 10,-6) B. 13 C. (-3,5,-3) D. (-3,8,8) O E.(-1,5,-3) 

Answers

Answer 1

The sum of the tuple (1, 2, -2) and twice the tuple (-2, 3, 5) is (-3, 8, 8).

To calculate the sum of two tuples, we need to add the corresponding elements of the tuples. In this case, the tuples are (1, 2, -2) and twice (-2, 3, 5), which gives us (-4, 6, 10) when multiplied by 2. Then, we add the corresponding elements of both tuples: 1 + (-4) = -3 for the first element, 2 + 6 = 8 for the second element, and -2 + 10 = 8 for the third element.

Therefore, the sum of the two tuples is (-3, 8, 8).

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Related Questions

Solve for n using special segments of secants and tangents theoreom​

Answers

Answer:n=sqrt55

Step-by-step explanation:

Help Evaluate function expressions

Answers

Thus,the solution of the expression for the given function f(x) and g(x) is found as: -1.f(-8) - 4.g(4) = -9.

Explain about the function:

A function connects an element x to with an element f(x) in another set, to use the language of set theory. The domain and range of the function are the set of values of f(x) that are produced by the values there in domain of the function, which is the set of values of x.

This indicates that a function f will map an object x to just one object f(x) in a set of potential outputs if the object x is in the set of inputs known as the domain (called the codomain).The symbolism of a function machine, which accepts an object as its input and produces another entity as its output based on that input, makes the concept of a function simple to understand.

given expression:

-1.f(-8) - 4.g(4) =  ?

Get the value of f(-8) and g(4)  from the graph shown.

f(-8) = -4

g(4) = 3

Put the expression:

= -1.*(-4) - 4*3

= 4 - 13

= -9

Thus,the solution of the expression for the given function f(x) and g(x) is found as: -1.f(-8) - 4.g(4) = -9.

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Will give a lot of points

Arturo launches a toy rocket from a platform. The height of the rocket in feet is given
by h(t)=-16t² + 32t + 128 where t represents the time in seconds after launch.
What is the rocket's greatest height?

Answers

Arturo launches a toy rocket from a platform. The height of the rocket in feet is given, so the rocket's greatest height is 144 feet.

The greatest height of the rocket corresponds to the vertex of the parabolic function h(t) = -16t² + 32t + 128, which occurs at the time t = -b/(2a), where a = -16 and b = 32.

So, t = -b/(2a) = -32/(2*(-16)) = 1.

Therefore, the rocket's greatest height occurs after 1 second of launch. We can find the height by substituting t = 1 into the equation for h(t):

h(1) = -16(1)² + 32(1) + 128 = 144.

Therefore, the rocket's greatest height is 144 feet.

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a random variable x is normally distributed with µ = 185 and σ = 14. find the 72th percentile of the distribution. round your answer to the tenths place.

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The 72nd percentile of the normally distributed random variable x is 196.788, rounded to the tenths place.

What is percentile?

Percentile is expressed as a percentage of the group that is equal to or lower than the individual in question.

The 72nd percentile of a normally distributed random variable x is calculated by using the formula z = (x - μ) / σ, where z is the z-score, μ is the mean of the data, and σ is the standard deviation of the data.

In this case, z = (x - 185) / 14.

To find the 72nd percentile, we have to use the z-score table to look up the z-score that corresponds to the desired percentile.

The z-score for the 72nd percentile is 0.842.

Plugging this back into our formula, we get

x = 185 + (0.842 * 14)

= 196.788.

Therefore, the 72nd percentile of the normally distributed random variable x is 196.788, rounded to the tenths place.

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The 72nd percentile of the normally distributed random variable x is 196.788, rounded to the tenths place.

What is percentile?

Percentile is expressed as a percentage of the group that is equal to or lower than the individual in question.

The 72nd percentile of a normally distributed random variable x is calculated by using the formula z = (x - μ) / σ, where z is the z-score, μ is the mean of the data, and σ is the standard deviation of the data.

In this case, z = (x - 185) / 14.

To find the 72nd percentile, we have to use the z-score table to look up the z-score that corresponds to the desired percentile.

The z-score for the 72nd percentile is 0.842.

Plugging this back into our formula, we get

x = 185 + (0.842 * 14)

= 196.788.

Therefore, the 72nd percentile of the normally distributed random variable x is 196.788, rounded to the tenths place.

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find the inflection point of the function. (hint: g ' ' ( 0 ) g′′(0) does not exist.) g ( x ) = 9 x | x |

Answers

The inflection point of g(x) = 9|x| is x = 0.

First, let's find the first derivative of g(x):

g'(x) = 9 |x| + 9x * d/dx(|x|)

g'(x) = 9 |x| + 9x * sign(x)

where sign(x) is the sign function, which equals -1 for x < 0, 0 for x = 0, and 1 for x > 0.

Now, let's find the second derivative of g(x):

g''(x) = 9 * d/dx(|x|) + 9 * sign(x) + 9x * d/dx(sign(x))

g''(x) = 0 + 9 * sign(x) + 9x * d/dx(sign(x))

The derivative of the sign function is not defined at x = 0, but we can use the definition of the derivative to find the left and right limits of g''(x) as x approaches 0:

g''(0-) = lim x→0- [g''(x)]

g''(0-) = lim x→0- [9 * (-1) + 9x * (-∞)]

g''(0-) = -∞

g''(0+) = lim x→0+ [g''(x)]

g''(0+) = lim x→0+ [9 * (1) + 9x * (∞)]

g''(0+) = ∞

Since the left and right limits of g''(x) as x approaches 0 are not equal, g''(0) does not exist, and g(x) does not have an inflection point. Instead, the function changes concavity at x = 0, which is a vertical point of inflection.

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determine the identity to (1 - (sin(x) - cos(x))^2)/(2 cos(x))a. tan (x) b. cos (x)c. sec (a)d. sin(x) e. none of these

Answers

The identity is (d) sin(x).

We can start by expanding the numerator:

(1 - (sin(x) - cos(x))^2) = 1 - (sin^2(x) - 2sin(x)cos(x) + cos^2(x))

= 1 - (1 - sin(2x))

= sin(2x)

Therefore, the expression simplifies to:

sin(2x)/(2cos(x))

Using the double angle formula for sine, sin(2x) = 2sin(x)cos(x), we get:

2sin(x)cos(x)/(2cos(x)) = sin(x)

So the identity is (d) sin(x).

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how many arrangements of mathematics are there in which each consonant is adjacent to a vowel?

Answers

There are 1,152 arrangements of "MATHEMATICS" in which each consonant is adjacent to a vowel.

To find the number of arrangements of the word "MATHEMATICS" in which each consonant is adjacent to a vowel, we can treat the consonants (M, T, H, M, T, C, and S) and vowels (A, E, A, I) as separate groups and arrange them in a way that each group of consonants is next to a group of vowels

We have two groups of vowels (A and E, and A and I) and three groups of consonants (MTHM, TC, and S). We can arrange the two vowel groups in 2! = 2 ways, and then arrange the three consonant groups in 3! = 6 ways. Within each group, the letters can be arranged in a total of 4! = 24 ways for the MTHM group, 2! = 2 ways for the TC group, and 1 way for the S group.

Therefore, the total number of arrangements in which each consonant is adjacent to a vowel is:

2! x 6 x 24 x 2 x 1 = 1,152

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consider all 5 letter "words" made from the letters a through h. (recall, words are just strings of letters,not necessarily actual english words.)(a) how many of these words are there total?

Answers

There are a total of 32768 (8) 5-letter "words" made from the letters a through h when all possible combinations are considered.

Consider all 5-letter "words" made from the letters A through H. There are a total of 8 unique letters, and since repetition is allowed, you can form 8 different possibilities for each of the 5 positions in the word. To calculate the total number of these words, simply multiply the possibilities for each position: 8 * 8 * 8 * 8 * 8 = 32,768. So, there are 32,768 possible 5-letter "words" using the letters A through H.

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Use logarithmic differentiation to find the derivative of the function. y = (x^3 + 2)^2(x^4 + 4)^4

Answers

The derivative of the function y = (x^3 + 2)^2(x^4 + 4)^4 using logarithmic differentiation is: y' = 2(x^3 + 2)(x^4 + 4)^3[3x^2(x^4 + 4) + 8x(x^3 + 2)^2]

To use logarithmic differentiation, we take the natural logarithm of both sides of the equation and then differentiate with respect to x using the rules of logarithmic differentiation.

ln(y) = ln[(x^3 + 2)^2(x^4 + 4)^4]

Now, we use the product rule and chain rule to differentiate ln(y):

d/dx [ln(y)] = d/dx [2ln(x^3 + 2) + 4ln(x^4 + 4)]

Using the chain rule, we get:

d/dx [ln(y)] = 2(1/(x^3 + 2))(3x^2) + 4(1/(x^4 + 4))(4x^3)

Simplifying this expression, we get:

d/dx [ln(y)] = 6x^2/(x^3 + 2) + 16x^3/(x^4 + 4)

Finally, we use the fact that d/dx [ln(y)] = y'/y to solve for y':

y' = y(d/dx [ln(y)])

Substituting in the expression for d/dx [ln(y)], we get:

y' = (x^3 + 2)^2(x^4 + 4)^4 [6x^2/(x^3 + 2) + 16x^3/(x^4 + 4)]

Simplifying this expression, we get:

y' = 2(x^3 + 2)(x^4 + 4)^3[3x^2(x^4 + 4) + 8x(x^3 + 2)^2]

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If A and B are 3 X 3 matrices, det (A) = -5, det (B) = 9, then det (AB) = , det (3A) = , det (A^T) = , det (B^-1) = det (B^4) = .

Answers

The determinants you're looking for are:
det(AB) = -45
det(3A) = -135
det(A^T) = -5
det(B^-1) = 1/9
det(B^4) = 6561

If A and B are 3 X 3 matrices, det (A) = -5, det (B) = 9, then:

- det (AB) = det(A) * det(B) = (-5) * (9) = -45
- det (3A) = 3^3 * det(A) = 27 * (-5) = -135
- det (A^T) = det(A) = -5 (since transpose does not affect determinant)
- det (B^-1) = 1/det(B) = 1/9 (since inverse is reciprocal of determinant)
- det (B^4) = (det(B))^4 = 9^4 = 6561


Given that A and B are both 3x3 matrices with det(A) = -5 and det(B) = 9, we can find the determinants of the different matrix expressions as follows:

1. det(AB): According to the determinant product property, det(AB) = det(A) * det(B) = -5 * 9 = -45.

2. det(3A): For a scalar multiple, det(kA) = k^n * det(A), where n is the matrix size. In this case, det(3A) = 3^3 * (-5) = 27 * (-5) = -135.

3. det(A^T): The determinant of a transpose is equal to the determinant of the original matrix, so det(A^T) = det(A) = -5.

4. det(B^-1): For an inverse matrix, det(B^-1) = 1/det(B). Therefore, det(B^-1) = 1/9.

5. det(B^4): The determinant of a matrix raised to a power is the determinant of the original matrix raised to that power, so det(B^4) = (det(B))^4 = 9^4 = 6561.

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If the shaded region is 1/6 of the perimeter of the circle with 10cm of the radius then find the measure of the angle inscribed in the circle.

Answers

The measure of the inscribed angle is determined as 150⁰.

What is the perimeter of the circle?

The perimeter of the circle is calculated as follows;

P = 2πr

where;

r is the radius of the circle

P = 2π x 10 cm

P = 62.832 cm

The length of the shaded regions calculated as follows;

S = 1/6 x 62.832

S = 10.47 cm

The angle inscribed is calculated as follows;

θ/360 x 2πr = 10.47

2πrθ = 360 x 10.47

θ = ( 360 x 10.47 )/(2π x 10)

θ = 60⁰

angle at center = 360 - 60 = 300

inscribed angle = ¹/₂ x 300 (angle at center is twice angle at circumference)

inscribed angle = 150⁰

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Match the word(s) with the descriptive phrase.
1. a polyhedron with two congruent faces that lie in parallel planes
2. the sum of the areas of the faces of a polyhedron
3. the faces of a prism that are not bases
4. the sum of the areas of the lateral faces
5. a solid with two congruent circular bases that lie in parallel planes
A. lateral area
. B. lateral faces
C. prism
D. surface area
E. cylinder

Answers

Answer:

Step-by-step explanation:

1. B. lateral faces

2. D. surface area

3. B. lateral faces

4. A. lateral area

5. E. cylinder

The figure below shows a rectangle prism. One base of the prism is shaded

Answers

1. The volume of the prism is 144 cubic units

2. The area of the shaded base is 16units²

What is a prism?

A prism is a solid shape that is bound on all its sides by plane faces. A prism can have a rectangular base( rectangular prism) or a triangular base( triangular prism) or a circular base ( cylinder) e.t.c

Generally the volume of a prism is expressed as;

V = base area × height.

base area = l × w

therefore volume = l× w ×h

The base area = l× w

= 8× 2 = 16 square units

therefore the volume of the prism = 16 × 9

= 144 cubic units

Therefore the volume of the prism is 144 cubic units and the shaded base area is 16 units².

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Maria buys a plastic rod that is 5 ½ feet lor
The cost of the plastic rod is $0.35 per foot including tax. Find the total cost of the rod.

Answers

The total amount that she pays for the plastic rod is $1.925

How to find the total cost of the plastic rod?

We know that the cost of the plastic rod is $0.35 per foot, including the tax.

We also know that Maria buys (5 + 1/2) feet of the plastic rood, then to find the total cost we only need to take the product between the cost per foot and the number of feet that she buys.

We will get:

total cost = (5 + 1/2)*$0.35

total cost = 5.5*$0.35

total cost = $1.925

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for each positive integer n, let p(n) be the formula 12 22 ⋯ n2=n(n 1)(2n 1)6. write p(1). is p(1) true?

Answers

The formula for p(n) is not valid for n = 1.

How to find p(1) is true?

For each positive integer n, using the formula given, we can find p(1) by plugging in n = 1:

p(1) = 1(1-1)(2(1)-1)/6 = 0/6 = 0

So, according to the formula, p(1) is equal to 0.

However, we can see that this is not a true statement.

Because the product in the formula is defined as the product of the squares of the odd integers from 1 to n, and when n = 1, there is only one odd integer, which is 1.

Thus, p(1) should be equal to [tex]1^2 = 1.[/tex]

Therefore, the formula for p(n) is not valid for n = 1.

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You make a pudding for a dinner party and put it in the refrigerator at 5 P.M. (t — 0). Your refrigerator maintains a constant temperature Of 400. The pudding will be ready to serve when it cools to 450. When you put the pudding in the refrigerator you measure its temperature to be 1900, and when the first guest arrives at 6 P.M., you measure it again and get a temperature reading of 1000. Based on Newton's Law of Cooling, when is the earliest you can serve the pudding? 

Answers

The earliest time you can serve the pudding is t = (-ln(30)) / k.

Where k is the constant value.

We have,

To find the earliest time you can serve the pudding, we need to determine the time at which the temperature of the pudding reaches 450.

Using Newton's Law of Cooling, the equation for the temperature of the pudding at time t is given by:

[tex]T(t) = T_{ambient} + (T_{initial} - T_{ambient} \times e^{-kt}[/tex]

Where:

T(t) is the temperature of the pudding at time t,

T_ambient is the ambient temperature (400),

T_initial is the initial temperature of the pudding (1900),

k is the cooling constant,

t is the time.

To find the earliest time, we set T(t) equal to 450 and solve for t:

[tex]450 = 400 + (1900 - 400) \times e^{-kt}[/tex]

Simplifying the equation, we get:

[tex]e^{-kt} = (450 - 400) / (1900 - 400)\\e^{-kt} = 50 / 1500\\e^{-kt} = 1 / 30[/tex]

Taking the natural logarithm of both sides:

-ln(30) = -kt

Solving for t, we have:

t = (-ln(30)) / k

Without the specific value of the cooling constant k, we cannot determine the exact value of the earliest time to serve the pudding.

Thus,

The earliest time you can serve the pudding is t = (-ln(30)) / k.

Where k is the constant value.

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Matt bought a collection of 1660 stamps. He needs to choose between an album with large pages and an album with small pages to hold his stamps. The number of stamps per page for both album sizes is shown in the table. How many of each type of page will Matt need to hold all 1660 stamps?

Answers

Answer:Martin has 2212 stamps.

Step-by-step explanation:

Given,

Total number of pages = 48,

Out of which first 20 pages each have 35 stamps in 5 rows,

So, the stamps in first 20 pages = 35 × 20 = 700,

Now, the remaining number of pages = 48 - 20 = 28,

Also, each remaining page has 54 stamps,

So, the total stamps contained by remaining pages = 54 × 28 = 1512,

Hence, total stamps = stamps in 20 pages + stamps in 28 pages

= 700 + 1512

= 2212

Step-by-step explanation:

The answer: Matt will need 69 small pages and 46 large pages

Explanation: just divide 1660 with 24 and with 36.

consider the force exerted by a spring that obeys hooke's law. find u(xf)−u(x0)=−∫xfx0f⃗ s⋅ds⃗ , where f⃗ s=−kxi^,ds⃗ =dxi^ , and the spring constant k is positive.

Answers

Expression for the potential energy difference between the final and initial positions of a spring that obeys Hooke's law is:

U(xf) - U(x0) = -∫(xf to x0) kxi^ dx

The force exerted by a spring that follows Hooke's law can be expressed as the difference between the potential energy at the final position (xf) and the initial position (x0), given by -∫(xf to x0) kxidx, where k is the spring constant, and ds is the differential displacement along the x-axis.

The force exerted by a spring is given by Hooke's law, which states that the force is proportional to the displacement from the equilibrium position. Mathematically, it can be expressed as F = -kx, where F is the force, k is the spring constant, and x is the displacement from the equilibrium position.

The potential energy of a spring is given by the integral of the force with respect to displacement. Since the force is given by -kx, the potential energy can be expressed as the negative of the integral of kx with respect to x, which is -∫kx dx.

Given that fs = -kxi^ (where i^ is the unit vector along the x-axis) and ds = dxi^ (where dx is the differential displacement along the x-axis), we can substitute these values into the potential energy equation to get:

U(xf) - U(x0) = -∫(xf to x0) kx dx

Next, we can rearrange the integral to express it in terms of ds instead of dx, by substituting dx = ds into the integral:

U(xf) - U(x0) = -∫(xf to x0) kx ds

Finally, since ds = dxi^, we can replace ds with dxi^ in the integral:

U(xf) - U(x0) = -∫(xf to x0) kxi^ dx

This is the final expression for the potential energy difference between the final and initial positions of a spring that obeys Hooke's law.

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help me by answering this math question!!! i’ll mark brainliest

Answers

Answer:

30

because 1=3 so each of them are 30

The figure shows the dimensions of the cube-shaped box Amy uses to hold her
rings. What is the surface area of Amy's box?
A 1030.3 square centimeters
B 612.06 square centimeters
C 600 square centimeters
D 408.04 square centimeters

Answers

The surface area of Amy's box which is cube has is 294 square cm.

The surface area of a cube is given by the formula:

SA = 6s²

where s is the length of a side of the cube.

From the given figure, we can see that the length of a side of the cube is 7 cm.

Substituting s = 7 into the formula, we get:

SA = 6(7²)

= 294 square cm

Therefore, the surface area of Amy's box is 294 square cm.

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The side length of cube-shaped box is 7 cm find the surface area?

Automobiles arrive at the drive-through window at the downtown Baton Rouge, Louisiana, post office at the rate of 2 every 10 minutes. The average service time is 2.0 minutes. The Poisson distribution is appropriate for the arrival rate and service times are negative exponentially distributed. a) The average time a car is in the system = 3.36 minutes (round your response to two decimal places). b) The average number of cars in the system = 0.67 cars (round your response to two decimal places). c) The average number of cars waiting to receive service = 0.27 cars (round your response to two decimal places). d) The average time a car is in the queue = 1.34 minutes (round your response to two decimal places). e) The probability that there are no cars at the window = 0.6 (round your response to two decimal places).f) The percentage of the time the postal clerk is busy = 40 % (round your response to the nearest whole number).g) The probability that there are exactly 2 cars in the system = 0.096 (round your response to three decimal places).

Answers

Using Little's Law and formulas for the Poisson and exponential distributions, we calculated the values a. 3.36 minutes, b. 0.67 cars, c. 0.27 cars, d. 1.32 minutes, e. 82%, f. 40%, and g. 0.096.

a) The average time a car is in the system can be found using Little's Law:

L = λW

where L is the average number of cars in the system, λ is the arrival rate, and W is the average time a car spends in the system.

In this case, λ = 2/10 = 0.2 cars/minute and L = Wλ/(1-λW). Solving for W, we get:

W = L/(λ(1-L)) = 3.36 minutes

Therefore, the average time a car is in the system is 3.36 minutes.

b) The average number of cars in the system can be found using Little's Law again:

L = λW

In this case, λ = 0.2 cars/minute and W = 3.36 minutes. Substituting these values, we get:

L = 0.2 × 3.36 = 0.672

Therefore, the average number of cars in the system is 0.67 cars.

c) The average number of cars waiting to receive service can be found using the formula:

Lq = λ[tex]^2[/tex]Wq/(1-λW)

where Lq is the average number of cars waiting to receive service and Wq is the average time a car spends waiting in the queue.

In this case, λ = 0.2 cars/minute and W = 3.36 minutes. The service rate is μ = 1/2 = 0.5 cars/minute. Therefore, the arrival rate is greater than the service rate, and there is a queue.

Using Little's Law, we have:

Lq = λW - L = 0.2 × 3.36 - 0.672 = 0.264

Therefore, the average number of cars waiting to receive service is 0.27 cars.

d) The average time a car spends waiting in the queue can be found using Little's Law again:

Lq = λWq

In this case, λ = 0.2 cars/minute and Lq = 0.264 cars. Substituting these values, we get:

Wq = Lq/λ = 0.264/0.2 = 1.32 minutes

Therefore, the average time a car spends waiting in the queue is 1.32 minutes.

e) The probability that there are no cars at the window can be found using the Poisson distribution:

[tex]P(0) = e^(-λ)λ^0/0! = e^(-0.2) = 0.8187[/tex]

Therefore, the probability that there are no cars at the window is 0.82 or 82%.

f) The percentage of the time the postal clerk is busy can be found using the formula:

ρ = λ/μ

where λ is the arrival rate and μ is the service rate.

In this case, λ = 0.2 cars/minute and μ = 0.5 cars/minute. Substituting these values, we get:

ρ = 0.2/0.5 = 0.4

Therefore, the percentage of the time the postal clerk is busy is 40%.

g) The probability that there are exactly 2 cars in the system can be found using the Poisson distribution:

[tex]P(2) = e^(-λ)λ^2/2! = e^(-0.2) (0.2)^2/2 = 0.0956[/tex]

Therefore, the probability that there are exactly 2 cars in the system is 0.096.

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To warm up, Coach Hadley had his swim team swim twelve 5–meter long laps. It took the team 5 minutes to finish the warm up. How fast did the team swim in centimeters per second?

Answers

The team swam at a speed of 20 centimeters per second during their warm up.

First, let's convert the length of one lap from meters to centimeters:

5 meters = 500 centimeters

So, the team swam 12 laps of 500 centimeters each, for a total distance of:

12 laps × 500 centimeters/lap = 6000 centimeters

Next, let's convert the time from minutes to seconds:

5 minutes = 300 seconds

To find the speed in centimeters per second, we can divide the distance by the time:

speed = distance ÷ time = 6000 centimeters ÷ 300 seconds

simplifying, we get:

speed = 20 centimeters/second

Therefore, the team swam at a speed of 20 centimeters per second during their warm up.

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let x1;x2; : : : are i.i.d. let z be the average z := (x1 + x2 + x3 + x4)=4 assume that the standard deviation of x1 is equal to 2. what is the standard deviation of z?

Answers

let x1;x2; : : : are i.i.d. let z be the average z := (x1 + x2 + x3 + x4)=4 assume that the standard deviation of x1 is equal to 2 then the standard deviation of z is 1.

To find the standard deviation of z, we can use the properties of i.i.d (independent and identically distributed) variables and the given standard deviation of x1.

Given:
Standard deviation of x1 = 2

We know that x1, x2, x3, and x4 are i.i.d, which means they have the same standard deviation. So, the standard deviation of x2, x3, and x4 is also 2.

Now, let's find the variance of z. We have:

z = (x1 + x2 + x3 + x4) / 4

Variance is a measure of dispersion, and for independent variables, it has the property that:

Var(aX + bY) = a^2 * Var(X) + b^2 * Var(Y), where a and b are constants, and X and Y are independent variables.

Using this property for z, we have:

[tex]Var(z) = Var((x1 + x2 + x3 + x4) / 4) = (1/4)^2 * (Var(x1) + Var(x2) + Var(x3) + Var(x4))[/tex]

Since x1, x2, x3, and x4 have the same variance, we can write:

[tex]Var(z) = (1/4)^2 * (4 * Var(x1)) = (1/16) * (4 * (2^2))[/tex]
[tex]Var(z) = (1/16) * (4 * 4) = 1[/tex]

Now, we can find the standard deviation of z, which is the square root of its variance:

Standard deviation of z = √(Var(z)) = √1 = 1

So, the standard deviation of z is 1.

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HELLPPPPP PLEASEEEEEE PLEASEEEE

Answers

-7,-5,-3,-1

for the table

Step-by-step explanation:

Step-by-step explanation:

I will start from X=-1

A

1: If the equation is Y=2x-5

you will have to substitute x with -1 since X=-1

After it will become y=-2-5, which will become y=-7

2: x=0 so u substitute x with 0, so it will become Y=0-5 which become y=-5

3: X=1 so u substitute x with 1, so it will become y=2-5 which become Y=-3

4: X=2 so u substitute x with 2, so it will become y=4-5 which become Y=-1

B I am confused Abt Q3 does it mean question 3 or no

C: I can't really answer it since I don't know what u mean at B

if a is a square matrix there exists a matrix b such that ab equals the identity matrix. T/F

Answers

True. This is a true statement known as the invertible matrix theorem. If a square matrix is invertible, then there exists a matrix b such that ab equals the identity matrix. However, not all square matrices are invertible.

True. If matrix A is a square matrix and has an inverse matrix B, then the product of A and B (AB) equals the identity matrix. In other words, if A is invertible, there exists a matrix B such that AB = BA = I, where I is the identity matrix. This is a true statement known as the invertible matrix theorem. If a square matrix is invertible, then there exists a matrix b such that ab equals the identity matrix. However, not all square matrices are invertible.
True. If matrix A is a square matrix and has an inverse matrix B, then the product of A and B (AB) equals the identity matrix. In other words, if A is invertible, there exists a matrix B such that AB = BA = I, where I is the identity matrix.

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Consider the linear operator T on C2 defined by T(a, b) = (2a + ib, (1-2)a) Compute T (3 i,1 2i)

Answers

The adjoint of the linear operator T on C^2 is T*(x,y) = (2x-2y, ix), and T*(3i,1+2i) = (4i-2, -3).

To compute T*(3 i, 1+2i), we need to first find the adjoint of T, denoted by T*. Recall that T* is the linear operator on C^2 such that for any (x,y) in C^2 and (a,b) in C^2, we have

<T*(x,y),(a,b)> = <(x,y),T(a,b)>

where <,> denotes the inner product on C^2.

To find T*, we need to compute <T*(x,y),(a,b)> for any (x,y) and (a,b) in C^2. We have

<T*(x,y),(a,b)> = <(x,y),T(a,b)>

= <(x,y),(2a+ib,(1-2)a)>

= 2ax + ibx + (1-2)ay

= (2a-2y)x + ibx

Thus, we see that T*(x,y) = (2x-2y, ix) for any (x,y) in C^2.

Now, to compute T*(3i,1+2i), we have

T*(3i,1+2i) = (2(3i)-2(1+2i), i(3i))

= (6i-2-4i, -3)

= (4i-2, -3)

Therefore, T*(3i,1+2i) = (4i-2, -3).

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The given question is incomplete, the complete question is:

Consider the linear operator T on C^2 defined by T(a, b) = (2a + ib, (1-2)a) Compute T*(3 i,1 2i)

The adjoint of the linear operator T on C^2 is T*(x,y) = (2x-2y, ix), and T*(3i,1+2i) = (4i-2, -3).

To compute T*(3 i, 1+2i), we need to first find the adjoint of T, denoted by T*. Recall that T* is the linear operator on C^2 such that for any (x,y) in C^2 and (a,b) in C^2, we have

<T*(x,y),(a,b)> = <(x,y),T(a,b)>

where <,> denotes the inner product on C^2.

To find T*, we need to compute <T*(x,y),(a,b)> for any (x,y) and (a,b) in C^2. We have

<T*(x,y),(a,b)> = <(x,y),T(a,b)>

= <(x,y),(2a+ib,(1-2)a)>

= 2ax + ibx + (1-2)ay

= (2a-2y)x + ibx

Thus, we see that T*(x,y) = (2x-2y, ix) for any (x,y) in C^2.

Now, to compute T*(3i,1+2i), we have

T*(3i,1+2i) = (2(3i)-2(1+2i), i(3i))

= (6i-2-4i, -3)

= (4i-2, -3)

Therefore, T*(3i,1+2i) = (4i-2, -3).

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The given question is incomplete, the complete question is:

Consider the linear operator T on C^2 defined by T(a, b) = (2a + ib, (1-2)a) Compute T*(3 i,1 2i)

suppose the roots of the auxiliary equation are as follows
m1=-1 m2=-1 m3=2
then the general solution for the third-order homogenous Cauchy Euler differential equation is

Answers

The general solution for the third-order homogeneous Cauchy-Euler differential equation with roots m1=-1, m2=-1, and m3=2 is y(x) = [tex]c_{1}x^{-1} + c_{2}x^{-1}ln(x) + c_{3}x^{2}[/tex].

The characteristic equation for the given differential equation is (m + 1)^2(m - 2) = 0. Solving this equation gives us the roots m1=-1, m2=-1, and m3=2. Since we have a repeated root of -1, we need to include an ln(x) term in our general solution.

Therefore, our general solution will have the form y(x) = c1x^m1 + c2x^m2ln(x) + c3x^m3. Substituting the values of the roots, we get y(x) = [tex]c_{1}x^{-1} + c_{2}x^{-1}ln(x) + c_{3}x^{2}[/tex], which is the general solution to the given differential equation.

The constants c1, c2, and c3 can be determined by using initial or boundary conditions if provided.

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a tree grows in height by 21% per
year. it is 2m tall after one year.
After how many more years will the
tree be over 20m tall

Answers

Answer:

12.08 years

Step-by-step explanation:

to overcome this problem we will have to use the exponential growth formula A = P(1+r)^t

where a is the final amount

where p is the initial amount

where r is the rate per year

where t is the number of years

we can say

20= 2(1+0.21)^t

solve the equation for t

20/2 = 2(1.21)^t/2

10 = 1.21^t

take the log of both sides we get that

t = 12.08 years

what is the volume in cubic centimeters of a right rectangular prism with a length of 10 cm, a width of 8 cm, and a height of 6 cm

Answers

Answer:

The formula for the volume of a right rectangular prism is given by:

Volume = Length * Width * Height

Given that the length is 10 cm, the width is 8 cm, and the height is 6 cm, we can substitute these values into the formula:

Volume = 10 cm * 8 cm * 6 cm

Multiplying the values:

Volume = 480 cubic centimeters

So, the volume of the right rectangular prism is 480 cubic centimeters.

According to the question, we were asked What is the volume, in cubic centimeters, of a right rectangular prism that has a length of 10 centimeters, a width of 8 centimeters, and a height of 6 centimeters?

When you hear about a rectangular prism, just know that we are talking about a cuboid and we all know here that the volume of a cuboid is the same as the volume of a rectangular prism which is:

[tex]\text{Length} \times \text{width} \times \text{breadth}[/tex].

And in this case, we have the length as 10 cm, the width as 8 cm and the subsequent height of the prism as 6 cm.

Applying this variables into the given formula for obtaining the volume for a prism,

We have [tex]9\times6\times10 = 480 \ \text{cm}^3[/tex]

Therefore, the volume of the right rectangular prism is 480 cm³.

A couple of two-way radios were purchased from different stores. Two-way radio A can reach 6 miles in any direction. Two-way radio B can reach 12.88 kilometers in any direction.

Part A: How many square miles does two-way radio A cover? Use 3.14 for π and round to the nearest whole number. Show every step of your work. (3 points)

Part B: How many square kilometers does two-way radio B cover? Use 3.14 for π and round to the nearest whole number. Show every step of your work. (3 points)

Part C: If 1 mile = 1.61 kilometers, which two-way radio covers the larger area? Show every step of your work. (3 points)

Part D: Using the radius of each circle, determine the scale factor relationship between the radio coverages. (3 points)

Answers

A. Two-way radio A covers 113 square miles.

B. Rounded to the nearest whole number, two-way radio B covers 523 square kilometers.

C. Comparing the areas, we can see that radio B covers the larger area with 523 square kilometers.

D. The coverage area of radio B is approximately 1.33 times larger than the coverage area of radio A.

What is radius?

Radius is a term used in geometry to describe the distance from the center of a circle or sphere to any point on its circumference or surface, respectively. It is usually denoted by the letter "r" and is measured in units of length, such as inches, centimeters, or meters. The radius of a circle is half of its diameter, while the radius of a sphere is one-half of its diameter.

Part A:

The area covered by two-way radio A can be calculated using the formula for the area of a circle:

Area = π x radius²

Radius of radio A = 6 miles

Area = 3.14 x 6²

Area = 113.04 square miles

Rounded to the nearest whole number, two-way radio A covers 113 square miles.

Part B:

The area covered by two-way radio B can also be calculated using the same formula:

Area = π x radius²

Radius of radio B = 12.88 kilometers

Area = 3.14 x (12.88)²

Area = 523.14 square kilometers

Rounded to the nearest whole number, two-way radio B covers 523 square kilometers.

Part C:

To compare the areas covered by the two-way radios, we need to convert the area covered by radio A from square miles to square kilometers, using the conversion factor given:

1 mile = 1.61 kilometers

Therefore, 1 square mile = (1.61)² square kilometers

Area covered by radio A = 113 square miles

Area covered by radio A in square kilometers = 113 x (1.61)²

Area covered by radio A in square kilometers = 290.22 square kilometers

Comparing the areas, we can see that radio B covers the larger area with 523 square kilometers.

Part D:

To determine the scale factor relationship between the radio coverages, we can divide the radius of radio B by the radius of radio A:

Scale factor = radius of radio B / radius of radio A

Scale factor = 12.88 kilometers / 6 miles

Scale factor = 12.88 kilometers / 9.66 kilometers (since 1 mile = 1.61 kilometers)

Scale factor = 1.33

This means that the coverage area of radio B is approximately 1.33 times larger than the coverage area of radio A.

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