The recursive formula for a geometric sequence is:
[a₁ = 6
an = an-₁ • (2)
What is the 3rd term of this sequence?
O A. 8
OB. 24
OC. 10
OD. 12

Step-by-step explanation:

7x-8y = - 5     arrange to   y = mx+ b  form    m is the slope of this line

8y = 7x+5

y = 7/8 x = 5/8     <======   m, slope = 7/8  

           perpendicular slope =  - 1/m  =  - 8/7

Now use point ( -7,3)   slope (-8/7)  form:

  y-3   = - 8/7 ( x - - 7)     simplify

   y = -8/7 x  + 5          re-arrange ,   add  8/7 x to both sides of the equation

   8/7 x  + y = 5                 multiply through by 7 to get integer values

      8x + 7y =  - 35  

The probability that a student learns more than 11 years is approximately 0.0548 or 5.48%

To find the probability that a student learns more than 11 years, we need to calculate the area under the normal distribution curve to the right of 11.

Given that the mean of the distribution is 7 years and the standard deviation is 2.5 years, we can standardize the value of 11 using the formula:

z = (x - μ)/σ

= (11 - 7)/2.5

= 1.6

We can then use a standard normal distribution table or calculator to find the probability that a standard normal random variable is greater than 1.6. Using a calculator, we get:

P(Z>1.6) = 0.0548

Therefore, the probability that a student learns more than 11 years is approximately 0.0548 or 5.48%

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The stencil patterns per square feet she have when completed are:

[tex]\[ \text{Number of stencil patterns per square foot} = \frac{{13n}}{{160}} \text{ patterns/ft}^2 \][/tex]

To find the number of stencil patterns per square foot, we first need to calculate the total area of the floor in square feet. The floor measures [tex]8[/tex] feet by [tex]20[/tex] feet, so its total area is given by:

[tex]\[ \text{Area of the floor} = \text{Length} \times \text{Width} = 8 \text{ ft} \times 20 \text{ ft} = 160 \text{ ft}^2 \][/tex]

Next, we need to determine the total number of stencil patterns that will be used. The homeowner has [tex]13[/tex] different stencils. However, we don't know how many times each stencil will be repeated, so we'll assume that each stencil is used an equal number of times.

Let's denote the number of times each stencil is used as [tex]n[/tex]. Then the total number of stencil patterns used is given by [tex]\( 13 \times n \)[/tex].

To find the number of stencil patterns per square foot, we divide the total number of stencil patterns by the total area of the floor:

[tex]\[ \text{Number of stencil patterns per square foot} = \frac{{13 \times n}}{{\text{Area of the floor}}} = \frac{{13 \times n}}{{160 \text{ ft}^2}} \][/tex]

Since we don't have a specific value for [tex]n[/tex], we can express the answer in terms of [tex]n[/tex]:

[tex]\[ \text{Number of stencil patterns per square foot} = \frac{{13n}}{{160}} \text{ patterns/ft}^2 \][/tex]

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To find the eigenvalues of matrix a, we can start by finding the characteristic polynomial det(a - λI), where I is the identity matrix and λ is an unknown constant.

Using the cofactor expansion method along the first row, we get:

det(a - λI) = (0.3 - λ)(-1)^(1+1) det(0.1 0.4 0 0.4) + (-1)^(1+2) (0 - λ) det(0 0.4 0.1 0.4) + (0.2)(-1)^(1+3) det(0 0.1 0.4 0.1; 0.4 0 0.4 0; 0 0.4 0.1 0.4; 0.4 0 0 0.1)

Simplifying this expression, we get:

det(a - λI) = (0.3 - λ)[(0.1)(0.4)(0.4) + (0.4)(0.4)(0.1) + (0.4)(0.1)(0.4)] - (0.2)(0.4)(0.1)(0.4) - (0.4)(0.4)(0.1)(0.1)

det(a - λI) = -λ^3 + 1.2λ^2 - 0.4λ

Next, we can solve for the roots of this polynomial by setting it equal to zero:

-λ^3 + 1.2λ^2 - 0.4λ = 0

Factorizing out a λ term, we get:

λ(-λ^2 + 1.2λ - 0.4) = 0

Using the quadratic formula to solve for the roots of -λ^2 + 1.2λ - 0.4, we get:

λ = 0.2, 0.4, 0.6

Therefore, the eigenvalues of matrix a are λ = 0.2, 0.4, and 0.6.

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Answer:

We can solve the simultaneous equation 24n + 9m = 8 and 3n - 2m = 6 by using the elimination method.

First, we need to multiply the second equation by 3 to eliminate n:

24n + 9m = 8

(3n - 2m) × 3 = 6 × 3

9n - 6m = 18

Now we have two equations with the same n coefficient, so we can subtract the second equation from the first to eliminate n:

24n + 9m = 8

-(9n - 6m = 18)

-----------------

15n + 15m = -10

We can simplify this equation by dividing both sides by 5:

3n + 3m = -2

Now we have two equations with the same m coefficient, so we can subtract the second equation from the first to eliminate m:

24n + 9m = 8

-(3n + 3m = -2)

----------------

21n + 6m = 10

We can simplify this equation by dividing both sides by 3:

7n + 2m = 10/3

Now we have two equations with only one variable, so we can solve for one variable and substitute the value into one of the original equations to solve for the other variable:

7n + 2m = 10/3

2m = 10/3 - 7n

m = (10/3 - 7n)/2

Substitute this expression for m into the first equation:

24n + 9m = 8

24n + 9[(10/3 - 7n)/2] = 8

24n + (30/2 - 63n/2)/2 = 8

24n + 15 - 63n/4 = 8

24n - 63n/4 = 8 - 15

(96n - 63n)/4 = -7

33n/4 = -7

n = -28/33

Substitute this value of n into the second equation:

3n - 2m = 6

3(-28/33) - 2m = 6

-28/11 + 2m/11 = 2

2m/11 = 2 + 28/11

2m/11 = 50/11

Answer:

n = 14 / 15
m = -8 / 5

Step-by-step explanation:

24n + 9m = 8   ------- (1)   x 2

3n - 2m = 6  -----------(2)   x 9

48n + 18m = 16    ------- (3)
27n - 18m = 54    --------(4)

Adding two eqn , we get ;
______________

75n = 70
n = 14 / 15

Putting value of n in eqn (2) , we get ;

14 / 5 - 2m = 6
2m = 14 / 5 - 6

2m = -16 / 5

m = -8 / 5

Mr. Adams divides 183 markers equally among the 24 students in his class. To find the least number of extra markers in the box, divide the total markers (183) by the number of students (24). The result is 7 with a remainder of 15. So, the least number of extra markers in the box is 15.

Mr. Adams divides 183 markers equally among the 24 students in his class, which means each student gets 7 markers. However, since 7 does not divide evenly into 183, there will be some markers left over. To determine the least number of extra markers in a box, we need to find the remainder when 183 is divided by 24.
Using long division, we get:

   24 | 183
       -----
         7  6
         -----          
This means that there are 6 markers left over that Mr. Adams puts in a box. Therefore, the least number of extra markers in a box is 6.
Mr. Adams divides 183 markers equally among the 24 students in his class. To find the least number of extra markers in the box, divide the total markers (183) by the number of students (24). The result is 7 with a remainder of 15. So, the least number of extra markers in the box is 15.

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The required given argument is invalid.

The argument states that if a creature is a chimpanzee, then it is a primate. This is true, because all chimpanzees are primates. The argument also states that if a creature is a primate, then it is a mammal. This is also true, because all primates are mammals. The argument then concludes that if a creature is a mammal, then it is a chimpanzee. This is not necessarily true, because not all mammals are chimpanzees. For example, humans are mammals, but we are not chimpanzees.

Here is a truth table that shows the validity of the argument:

Chimpanzee? | Primate? | Mammal? | Conclusion?

------- | -------- | -------- | --------

Yes      | Yes      | Yes      | Yes

Yes      | Yes      | No       | No

No       | Yes      | Yes      | No

No       | No       | Yes      | No

As you can see, the conclusion is true only in the first row of the truth table. In all other rows, the conclusion is false. Therefore, the argument is invalid.

Here is a common form of the argument:

All A are B.

All B are C.

Therefore, all A are C.

Use code with caution. Learn more

This is called a syllogism. The first statement is the major premise, the second statement is the minor premise, and the third statement is the conclusion. The syllogism is valid because the conclusion follows logically from the premises.

In the case of set theory, the argument about Bobo, the major premise is "All chimpanzees are primates." The minor premise is "Bobo is a primate." The conclusion is "Bobo is a chimpanzee." The conclusion does not follow logically from the premises. Therefore, the argument is invalid.

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To find the average value of a function on an interval, we need to integrate the function over that interval and divide the result by the length of the interval. So, to find the average value of the function y=x^2(x^3+1)^(1/2) on the interval [0,2], we need to evaluate the definite integral:

(1/2) * ∫[0,2] x^2(x^3+1)^(1/2) dx

We can use a substitution u = x^3+1 and du = 3x^2 dx to simplify the integral:

(1/6) * ∫[1,9] (u-1)^(1/2) du

Now, we can use the power rule to integrate:

(1/6) * (2/3)*(u-1)^(3/2) |_1^9

= (1/9) * [(9-1)^(3/2) - (1-1)^(3/2)]

= (1/9) * [8^(3/2) - 0]

= 8/9 * sqrt(2)

So, the average value of the function on the interval [0,2] is:

(1/2) * [8/9 * sqrt(2)] / (2-0)

= 4/9 * sqrt(2)

Therefore, the average value of the function y=x^2(x^3+1)^(1/2) on the interval [0,2] is 4/9 * sqrt(2).

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To calculate the overall probability, we multiply the individual probabilities together:

(3/11) * (1/10) * (7/9) = 21/990 ≈ 0.0212

Therefore, the closest option is 0.02.

The value of x in the quadratic equation using quadratic formula to the nearest hundredths place is x = 1.29 and x = 2.71.

The correct answer choice is option B.

2x² - 8x + 7 = 0

[tex]x = \frac{ -b \pm \sqrt{b^2 - 4ac}}{ 2a }[/tex]

[tex]x = \frac{ -(-8) \pm \sqrt{(-8)^2 - 4(2)(7)}}{ 2(2) }[/tex]

[tex]x = \frac{ 8 \pm \sqrt{64 - 56}}{ 4 }[/tex]

[tex]x = \frac{ 8 \pm \sqrt{8}}{ 4 }[/tex]

[tex]x = \frac{ 8 \pm 2\sqrt{2}\, }{ 4 }[/tex]

[tex]x = \frac{ 8 }{ 4 } \pm \frac{2\sqrt{2}\, }{ 4 }[/tex]

[tex]x = 2 \pm \frac{ \sqrt{2}\, }{ 2 }[/tex]

[tex]x = 2.70711[/tex]

or

[tex]x = 1.29289[/tex]

Hence,

Approximately, x = 1.29 or x = 2.71

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The other 28% represents the energy loss or inefficiency of the blender.

This means that only 72% of the input energy is effectively converted into useful work, while the remaining 28% is dissipated in the form of heat or other forms of energy loss. This energy loss is typically attributed to factors such as mechanical friction, heat generation, and

It could be due to factors such as friction, heat generation, or mechanical losses within the blender's components. This energy is not effectively converted into the desired blending action and is instead lost as waste.

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The rate of change of z with respect to time at t = 5 is -16.

Using the chain rule, we can express the total differential of z as dz = fx(3, 2) dx + fy(3, 2) dy. At t = 5, x = g(5) = 3 and y = h(5) = 2, and we know that g′ (5) = 2 and h′ (5) = 4.

Thus, we have dx/dt = g′ (5) = 2 and dy/dt = h′ (5) = 4. Plugging in these values and the given partial derivatives, we have dz/dt = 4(2) + (-6)(4) = -16.

Therefore, the rate of change of z with respect to time at t = 5 is -16.

To explain, we use the chain rule to express the total differential of z as dz = fx(3, 2) dx + fy(3, 2) dy, where fx and fy are the partial derivatives of z with respect to x and y, respectively, evaluated at the point (3, 2).

Then, at t = 5, we use the given information to find the values of x, y, dx/dt, and dy/dt, and we plug these values and the partial derivatives into the total differential to get dz/dt.

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The three numbers that can form a triangle are as follows:

The triangle inequality theorem states that in a triangle the sum of lengths of any two sides is greater than the length of the third side.

Therefore, the triangle inequality theorem can be used to check if the length of the three number can form a triangle.

Hence, if the lengths of a triangle are a, b and c, the triangle inequality theorem states that:

b + c > a

a + c > b

a + b > c

Therefore, the measure that forms a triangle are as follows:

9, 17, 6 can't form a triangle because 9 + 6 < 17.

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So, the first partial derivatives of the function f(x,y)=x^4+6xy^5 is ∂f/∂y = 30xy^4.

To find the first partial derivatives of the function f(x,y)=x^4+6xy^5, we need to take the partial derivative with respect to x and y separately.

Starting with the partial derivative with respect to x, we treat y as a constant and differentiate x^4 to get:
∂f/∂x = 4x^3 + 6y^5

Next, we take the partial derivative with respect to y, treating x as a constant and differentiating 6xy^5 to get:
∂f/∂y = 30xy^4

So the first partial derivatives of the function f(x,y)=x^4+6xy^5 are:
∂f/∂x = 4x^3 + 6y^5
∂f/∂y = 30xy^4

Thus, the  first partial derivatives of the function f(x,y)=x^4+6xy^5 is ∂f/∂y = 30xy^4.

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The required scientific notation is written as the weight of cans = 2.07837 x 10⁹ g.

The weight of one empty can is 0.03417 grams. The number of cans recycled in 2011 was 6.1 x 10¹⁰. To find the total weight of the cans recycled in 2011, we need to multiply these two numbers together.

Weight of cans = number of cans * weight of one can

Weight of cans = 6.1 x 10¹⁰* 0.03417

Weight of cans = 2.07837 x 10⁹ grams

The weight of the cans recycled in 2011 is 2.07837 x 10⁹ grams. In scientific notation, this is written as the weight of cans = 2.07837 x 10⁹ g.

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The solution is:  the total surface area of the cylinder is: 208.92 unit^2.

Here, we have,

we know that,

Area of ends:

Area of Circle = πr²

given,  radius is 3.5 and the height is 6

so, we get,

Area of end = π3.5²=49/4π

There are two ends so we multiply that by 2 to get 49/2π

Area of Rest:

First, we need to find the circumference using the equation: πd

πx7=7π

Then to find the area we just need to multiply 7π by the height

7π x 6 = 42π

Total surface area

we now just need to add them together

49/2π + 42π = 133/2π

                    = 208.92

Hence, The solution is:  the total surface area of the cylinder is: 208.92 unit^2.

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The surface area of the given cylinder is 208.81 square units.

Given that, the radius of a cylinder is 3.5 units and the height is 6 units.

We know that, the total surface area of a cylinder is 2πr(r + h).

Here, surface area = 2×3.14×3.5×(3.5+6)

= 2×3.14×3.5×9.5

= 208.81 square units

Therefore, the surface area of the given cylinder is 208.81 square units.

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Therefore, the exact length of the polar curve r = 3 sin(θ), where 0 ≤ θ ≤ π/3, is π units.

To find the exact length of the polar curve r = 3 sin(θ), where 0 ≤ θ ≤ π/3, we can use the arc length formula for polar curves:

Length = ∫[θ1 to θ2] √(r^2 + (dr/dθ)^2) dθ

In this case, we have:

r = 3 sin(θ)

dr/dθ = 3 cos(θ)

Substituting these values into the arc length formula, we get:

Length = ∫[0 to π/3] √((3 sin(θ))^2 + (3 cos(θ))^2) dθ

Simplifying, we have:

Length = ∫[0 to π/3] √(9 sin^2(θ) + 9 cos^2(θ)) dθ

Length = ∫[0 to π/3] √(9 (sin^2(θ) + cos^2(θ))) dθ

Length = ∫[0 to π/3] √(9) dθ

Length = ∫[0 to π/3] 3 dθ

Length = 3θ |[0 to π/3]

Length = 3(π/3 - 0)

Length = π

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The composition of relations a and b on s×s is a∘b={(1,2),(2,2),(2,3),(3,2)}.

To compute the composition of relations a and b, we need to perform the following steps.

First, we need to write out the ordered pairs that are in both a and b. In this case, the only ordered pair that is in both a and b is (1,3).

Next, we need to find all ordered pairs of the form (x,z) such that there exists a y in s such that (x,y) is in b and (y,z) is in a.

In this case, the only such ordered pair is (1,2), since (1,3) is already accounted for.

Finally, we combine the two sets of ordered pairs to get the composition a∘b={(1,2),(2,2),(2,3),(3,2)}.

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The  probability that a 3 standard deviation event never occurs out of 1000 trials is approximately 2.3 × 10^-6.

Assuming that the probability of a 3 standard deviation event occurring in a single trial is low, we can use the binomial distribution to estimate the probability that such an event never occurs out of n trials.

Let p be the probability of a 3 standard deviation event occurring in a single trial. Since a 3 standard deviation event is defined as an event that is 3 standard deviations away from the mean, we can use the standard normal distribution to calculate this probability. The probability of a standard normal random variable being greater than 3 is approximately 0.0013. Therefore, we can assume that p = 0.0013.

Let X be the number of trials out of n in which a 3 standard deviation event occurs. Then X has a binomial distribution with parameters n and p. The probability that a 3 standard deviation event never occurs out of n trials is given by:

P(X = 0) = (1 - p)^n

Substituting p = 0.0013, we get:

P(X = 0) = (1 - 0.0013)^n

To calculate the probability that a 3 standard deviation event never occurs out of n trials, we need to know the value of n. If n is large, we can use the normal approximation to the binomial distribution. The normal approximation to the binomial distribution states that if n is large and p is not too close to 0 or 1, then X has approximately a normal distribution with mean np and variance np(1-p). In this case, we can use the following formula to estimate the probability that a 3 standard deviation event never occurs out of n trials:

P(X = 0) ≈ Φ((0.5 - np) / sqrt(np(1-p)))

where Φ is the cumulative distribution function of the standard normal distribution.

For example, if we take n = 1000, then np = 1.3 and np(1-p) ≈ 1.2987. Using the above formula, we get:

P(X = 0) ≈ Φ((0.5 - 1.3) / sqrt(1.2987)) ≈ Φ(-4.51) ≈ 2.3 × 10^-6

Therefore, the probability that a 3 standard deviation event never occurs out of 1000 trials is approximately 2.3 × 10^-6.

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An "onto" function, also known as a surjective function, maps every element of the domain to at least one element of the codomain. A "one-to-one" function, or injective function, maps each element of the domain to a unique element in the codomain. If f: x → y is onto but not one-to-one, it means that some elements in x have the same corresponding element in y.

To determine if the inverse relation, f^(-1), is a function, let's recall the definition of a function: for every input, there must be exactly one output. Since f is not one-to-one, multiple elements in x correspond to a single element in y. Thus, when considering the inverse relation f^(-1), a single element in y would correspond to multiple elements in x.

In conclusion, f^(-1) would not be a function because it does not satisfy the requirement of having a unique output for each input.

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Step-by-step explanation:

so, from year 0 to year 1 after arrival the population grows by 5% (= factor 1.05).

as growth means the number of people before plus the additional 5%.

so, we multiply 15,400 by (1 + 0.05) or simply by 1.05.

and in year 2 after arrival we multiply that result again by 1.05.

which is the year 0 number multiplied by 1.05 × 1.05 or simply 1.05².

in year 3 after arrival that result gets multiplied by 1.05. or year 0 multiplied by 1.05×1.05×1.05 or simply 1.05³.

and so on, and so on.

so, we get an exponential function with starting value of 15,400 :

y = 15,400 × (1.05)^x

to calculate the local population x years after the arrival of the large company.

for x = 0 we get the starting value of 15,400.

This means that Jason is in the 92nd percentile. The answer is d. 92nd.

What is mean?

In statistics, the mean (also known as the arithmetic mean or average) is a measure of central tendency that represents the sum of a set of numbers divided by the total number of numbers in the set.

To calculate the mean of a set of numbers, you add up all the values in the set, and then divide the sum by the total number of values.

Assuming a normal distribution, we know that approximately 68% of the data falls within one standard deviation of the mean, 95% falls within two standard deviations, and 99.7% falls within three standard deviations.

Since Jason's exam score is 1.41 standard deviations above the mean, we can say that approximately 92% of the data falls below his score (since 1.41 standard deviations above the mean is approximately the same as the mean plus 1.41 standard deviations). This means that Jason is in the 92nd percentile.

Therefore, the answer is d. 92nd.

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Based on the International Classification of Diseases, 10th Revision (ICD-10), the correct code block to report that a newborn is affected by maternal factors and complications of pregnancy, labor, and delivery is:

b. P00-P04

The code block P00-P04 specifically pertains to Newborn affected by maternal factors and by complications of pregnancy, labor, and delivery. This code block includes various conditions and complications that can arise during the perinatal period related to the maternal factors and the process of pregnancy, labor, and delivery. These codes are used to document and classify specific conditions or complications affecting the newborn that are attributable to maternal factors and the events surrounding childbirth.

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The Laplace transform of f(t) is a function of s, given by 5 / (s² + 100).

To find ℒ{f(t)} for the function f(t) = sin(5t) cos(5t), we can first use the trigonometric identity:
sin(2θ) = 2 sin θ cos θ
We can apply this identity to the product of sin(5t) and cos(5t) in f(t):
sin(5t) cos(5t) = 1/2 sin(2(5t))
Using the Laplace transform property for a scaled and shifted function:
ℒ{sin(at)} = a / (s² + a²)
We can find ℒ{1/2 sin(2(5t))} as:
1/2 ℒ{sin(10t)} = 1/2 × 10 / (s² + 10²) = 5 / (s² + 100)
Therefore, we can write ℒ{f(t)} as:
ℒ{sin(5t) cos(5t)} = ℒ{1/2 sin(2(5t))} = 5 / (s² + 100)
So the Laplace transform of f(t) is a function of s, given by 5 / (s² + 100).

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Answer:116

angles in a triangle is 180.

Answer:

1=116

2=32

Thank You

By translating the graph of y = √x, a function that represents it is [tex]y=\sqrt{x+4}[/tex].

In Mathematics and Geometry, the translation of a graph to the left simply means subtracting a digit from the numerical value on the x-coordinate of the pre-image;

g(x) = f(x + N)

On the other hand, the translation a geometric figure or graph upward simply means adding a digit to the numerical value on the positive y-coordinate (y-axis) of the pre-image; g(x) = f(x) + N.

Based on the information provided, we have the following transformation:

(x, y)                               →                  (x - 4, y)

y = √x

[tex]y=\sqrt{x+4}[/tex].

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The population  scores with a mean of 300 and a standard deviation of 50, approximately 68% of the scores would be expected to fall between 250 and 350.

If a population of scores is normally distributed with a mean of 300 and a standard deviation of 50, we can use the properties of the normal distribution to determine the proportion of scores that would be expected to fall within a certain range.

In this case, we want to find the proportion of scores that fall between 250 and 350.
To do this, we can use the standard normal distribution and the z-score formula.

The z-score is a measure of how many standard deviations a particular score is from the mean. We can calculate the z-scores for 250 and 350 using the formula:
z = (x - μ) / σ
where x is the score we want to find the z-score for, μ is the mean, and σ is the standard deviation.
For 250: z = (250 - 300) / 50 = -1
For 350: z = (350 - 300) / 50 = 1
Once we have the z-scores for 250 and 350, we can use a z-score table or a calculator to find the proportion of scores that fall between these values.

From a standard normal distribution table, we can find that the proportion of scores between -1 and 1 is approximately 0.6827.
Therefore, we would expect to find approximately 68.27% of scores between 250 and 350 in a normally distributed population with a mean of 300 and a standard deviation of 50.

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The interval that is likely to contain the exact percentage of residents in the city who regularly eat organic foods is given as follows:

The interval is from 31.4% to 36.6%.

A confidence interval for a parameter is defined as the estimate of the parameter plus/minus the margin of error.

For this problem, we have that:

Hence the lower bound of the interval is given as follows:

34 - 2.6 = 31.4%.

The upper bound of the interval is given as follows:

34 + 2.6 = 36.6%.

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Answer:

Step-by-step explanation:

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To find the standard form of the complex number, we can use Euler's formula which states that e^(ix) = cos(x) + i sin(x). Using this formula, we can rewrite 5(cos(135°) + i sin(135°)) as 5(e^(i * 135°))

We can then use the fact that e^(ix) = cos(x) + i sin(x) to simplify this expression:
5(cos(135°) + i sin(135°)) = 5(e^(i * 135°)) = 5(cos(135°) + i sin(135°))
So the standard form of the complex number is:
5(cos(135°) + i sin(135°))
To represent this complex number graphically, we can plot the point (5 cos(135°), 5 sin(135°)) in the complex plane. This point has a magnitude of 5 and an angle of 135° (measured counterclockwise from the positive real axis). So the graphical representation of the complex number is a point in the second quadrant of the complex plane, 5 units away from the origin, and making an angle of 135° with the positive real axis.

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Step-by-step explanation:

See image below