Ms. Nash, an executive with a television company, is trying to decide on the subject matter for a new television series for adults. She chooses to conduct a survey to help her make an informed decision. Which of the following sampling techniques should Ms. Nash use in order to obtain the most representative sample of the viewing audience?

Ms. Nash should ask a randomly–chosen, equal number of men and women shopping at a department store.

Ms. Nash should ask the first two hundred men she encounters on the busy street in front of her office.

Ms. Nash should ask five men and five women shopping at a local grocery store.

Ms. Nash should ask men and women from a variety of age ranges who are attending a science fiction movie festival.

there are two ways you can do

[tex]y = 5x + 15 \\ \\ 1. \: y - 15 = 5x \\ 2. \: \frac{y - 15}{5} = x \\ 3. \: x = \frac{y - 15}{5} \\ \\ \\ 1. \: 5x + 15 = y \\ 2. \: 5x + 15 + - 15 = y + - 15 \\ 5x = y - 15 \\ 3. \: \frac{5x}{5} = \frac{y - 15}{5} \\ x = \frac{1}{5} y - 3[/tex]

A solution of the equation y = 5x + 15 represents a specific moment during Kenneth's experiment, where 'x' is the time elapsed since he started adding the blue liquid, and 'y' is the total volume of the liquid mixture in the beaker.

The equation y = 5x + 15 provided is a linear equation, which is a mathematical expression showing a constant rate of change. In this context, Kenneth's experiment in the laboratory, 'x' is the number of minutes since Kenneth began adding drops of blue liquid to the beaker, and 'y' is the total amount of liquid, in milliliters, in the beaker.

A solution to this equation refers to specific values for 'x' and 'y' which make this equation true. For instance, if we choose x = 1 minute, then we can calculate 'y' by substituting 'x' into the equation which gives y = 5*1 + 15 = 20 mL. This means that after 1 minute, Kenneth has 20 mL of liquid in his beaker. Indeed, every solution to this equation reflects a specific moment (x, or number of minutes) in Kenneth's ongoing experiment and the corresponding total volume (y) of the mixture in the beaker.

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Answer:

Step-by-step explanation:

[tex]5(y+1)-7=3(y-1)+2y\qquad\text{use the distributive property:}\ a(b+c)=ab+ac\\\\5y+5-7=3y-3+2y\qquad\text{combine like terms}\\\\5y+(5-7)=(3y+2y)-3\\\\5y-2=5y-3\qquad\text{subtract}\ 5y\ \text{from both sides}\\\\-2=-3\qquad\bold{FALSE}[/tex]

Answer:

-2

Step-by-step explanation:

The output of the function shown is -2 for each of the four inputs.

Answer:

-2

Step-by-step explanation:

-2

Answer: 0.9839

Step-by-step explanation:

X Values

∑ = 15

Mean = 3

∑(X - Mx)2 = SSx = 10

Y Values

∑ = 35

Mean = 7

∑(Y - My)2 = SSy = 50

X and Y Combined

N = 5

∑(X - Mx)(Y - My) = 22

R Calculation

r = ∑((X - My)(Y - Mx)) / √((SSx)(SSy))

r = 22 / √((10)(50)) = 0.9839

Meta Numerics (cross-check)

r = 0.9839

Answer:

Step-by-step explanation:

According to the problem, we have to find [tex]y[/tex] which refers to the mean of y-values.

So, we just have to find the mean:

[tex]y=\frac{3+5+6+9+12}{5}=\frac{35}{5}=7[/tex]

Therefore, the right answer is C.

Remember that the mean is defined as the quotient betwene the sum of all values, and the total number of them. In this case, the sum is 35 and the total number is 5.

ANSWER

Option D is correct

EXPLANATION

We resolve the forces into component forms.

[tex]F_1 = 400 \cos(30) i + 400 \sin(30) j[/tex]

[tex]F_1 = 200 \sqrt{3} i +200j[/tex]

Also the second is resolved to obtain,

[tex]F_2= 280 \cos(135) i + 280 \sin(135) j.[/tex]

[tex]F_2= - 140 \sqrt{2} i + 140 \sqrt{2} j[/tex]

To find the resultant vector, V, We add the corresponding components of the two forces to get:

[tex]V=F_1+F_2 [/tex]

[tex] \implies \: V = (200 \sqrt{3} - 140 \sqrt{2} )i + (200 + 140 \sqrt{2})j[/tex]

The correct answer is D.

A = person is under 20

B = person is over 60

P(A or B) = P(A) + P(B) ... works because A and B are mutually exclusive

P(A or B) = 0.30 + 0.17

P(A or B) = 0.47 = 47%

The probability that a person chosen at random is under 20 or over 60 is 47% , option C is the correct answer.

Probability is a topic in mathematics  where the likeliness of an event is studied.

The range of probability is 0 to 1 .

0 indicates uncertainty to 1 indicating certainty.

It is given in the question that

30% of the U.S. population is under 20 years old

About 17% of the population is over 60

probability that a person chosen at random is under 20 or over 60 = ?

Let P(A) represents person under 20

Let P(B) represents person over 60

As a person is chosen at random and the events cannot happen together so they are mutually exclusive events.

The probability for mutually exclusive event is given by

P(A or B) = P(A) + P(B)

P(A) = 17% = 0.17

P(B) = 30% = 0.3

P(A or B) = 0.30 + 0.17

P(A or B) = 0.47 = 47%

Therefore , the probability that a person chosen at random is under 20 or over 60 is 47% , option C is the correct answer.

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For #11, the answer is C, I’m pretty sure.

For #12, KM = LN, and LM = KN.

I can’t help with the others though, sorry :/

Answer:

[tex]\large\boxed{V=50\pi\ yd^3\approx157\ yd^3}[/tex]

Step-by-step explanation:

The formula of a volume of a cylinder:

[tex]V=\pi r^2H[/tex]

r - radius

H - height

We have the diameter d = 2r = 5yd → r = 2.5yd and the height H = 8yd.

Substitute:

[tex]V=\pi(2.5)^2(8)=\pi(6.25)(8)=50\pi\ yd^3\\\\\pi\approx3.14\to V\approx(50)(3.14)=157\ yd^3[/tex]

Answer:

Second Option

671 m²; 725 m²

Step-by-step explanation:

The lateral area of a triangular prism is:

[tex]A_L = Ph[/tex]

Where P is the perimeter of the triangular base and h is the height of the prism.

In this case, the perimeter of the triangular base is:

[tex]P = 9 + 6+ 10.82\\\\P = 25.82\ m[/tex]

Then the height is 26 m

Then the lateral area of the prism is:

[tex]A_L = 25.82 * (26)\\\\A_L = 671\ m ^ 2[/tex]

Therefore the surface area of the triangular prism is:

[tex]A = 2A_B + A_L[/tex]

Where [tex]A_B[/tex] is the area of the base.

[tex]A_B = \frac{bh}{2}[/tex]

Where b is the base of the triangle and h is the height

In this case:

[tex]b = 9\ m\\\\h = 6\ m\\\\A_B = \frac{9 * 6}{2}\\\\A_B = 27\ m ^ 2[/tex]

Finally

[tex]A = 2 * 27 + 671\\\\A = 54 + 671\\\\A = 725\ m ^ 2[/tex]

The answer is 671 m²  and  725 m²

Answer:

[tex]671m^{2};725m^{2}[/tex]

Step-by-step explanation:

Answer:

C. [tex]f(x)=(x-(7-i))(x-(5+i))(x-(7+i))(x-(5-i))[/tex]

Step-by-step explanation:

We want to find the equation of a polynomial the following properties;

i. Leading coefficient is 1

ii. roots (7 + i) and (5 – i) with multiplicity 1

Recall the complex conjugate properties of the roots of a polynomial.

According to this property, if

[tex]a+bi[/tex] is a root of a polynomial, then the complex conjugate, [tex]a-bi[/tex]  is also a root.

This means that:

(7 - i) and (5 + i) with multiplicity 1 are also roots of this polynomial.

The complete set of roots are:

[tex]x=(7+i),x=(7-i),x=(5-i),x=(5+i)[/tex]

Therefore the polynomial is:

[tex]f(x)=(x-(7-i))(x-(5+i))(x-(7+i))(x-(5-i))[/tex]

The correct choice is C.

Final answer:

The correct polynomial function with roots (7 + i) and (5 – i), each with multiplicity 1 and a leading coefficient of 1, is given by (c) f(x) = (x – (7 + i))(x – (5 – i))(x – (7 - i))(x – (5 + i)).

Explanation:

The question asks which polynomial function has a leading coefficient of 1 and roots (7 + i) and (5 – i) with multiplicity 1. For a polynomial to have these roots, its conjugates, (7 - i) and (5 + i), must also be roots because complex roots always come in conjugate pairs if the polynomial has real coefficients.

This leads us to option (c) as the correct answer. To form a polynomial with these roots, we take each root, turn it into a binomial by subtracting it from x, and then multiply these binomials together.

Doing so for the given roots, we get:

f(x) = (x – (7 + i))(x – (5 – i))(x – (7 - i))(x – (5 + i))

This polynomial matches option (c), confirming it as the correct answer.

Answer:

Answer: x = 32, y = 25

Step-by-step explanation:

You can write 2 equations that meet the criteria:

The sum of two numbers is 57

x + y = 57

The difference is 7

x - y = 7

Solve the second equation for x, and substitute in the first equation to solve for y

- solve the second equation for x.  

Add y to both sides of the equation

x - y + y = 7 + y

x = 7 + y

- substitute x = 7 + y into the first equation

x + y = 57

(7 + y) + y = 57

7 + 2y = 57

Subtract 7 from both sides of the equation

7 - 7 + 2y = 57 - 7

2y = 50

Divide both sides of the equation by 2 to solve for y

y=25

Insert y = 25 into either equation and solve for x

x - y = 7

x - 25 = 7

Add 25 to both sides of the equation

x - 25 + 25 = 7 + 25

x = 32

Answer: x = 32, y = 25

As a check, plug these values into both equations to make sure that it works

You can factor -80 as

[tex]-80 = (-1)\cdot 16 \cdot 5[/tex]

So, we have

[tex]\sqrt{-80} = \sqrt{(-1)\cdot 16 \cdot 5}[/tex]

The square root of a product is the product of the square roots:

[tex]\sqrt{-80} = \sqrt{(-1)}\sqrt{16}\sqrt{5}[/tex]

Since [tex]i^2=-1[/tex] and [tex]4^2=16[/tex], we have

[tex]\sqrt{-80} = 4i\sqrt{5}[/tex]

The equivalent expression of the complex expression √(-80) will be 4i√5. Then the correct option is C.

A complex number is a number that is made up of both real and imaginary numbers. The complex number can be given as a + ib where a is the real part and ib is the imaginary part.

The expression is given below.

⇒ √(-80)

And we know that √(-1) = i

Then the expression can be written as

⇒ √(-1 x 16 x 5)

⇒ 4i√5

More about the complex number link is given below.

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Answer:

3, 7

Step-by-step explanation:

Since we are asked for the known solutions to f(x) = g(x), we need to consider the values of the functions where x's are the same.

If you look at the table, you will see that f(-9) = g(-9) = 3 and f(2) = g(2) = 7.

The value of x where f(x) = g(x) is 3

According to the given question, we are to find the value of x for which the function f(x) is equal to g(x)

From the given table, we need to find the point where the values of f(x) = g(x). The value of x at this point is the solution.

Therefore from the table, the value of x where f(x) = g(x) is 3

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Answer:

A' because it is translated to another position.

Hope this helps

Answer: A'

Step-by-step explanation:

From the given figure , it can be seen that the quadrilateral ABCD is translated to produce A'B'C'D' by some distance in a particular direction.

We can see that the point A' in the image is corresponding to the point A in the pre-image.

Hence, the image of point A is A' .

Answer:

hdndhehhe

Step-by-step explanation:

Your answer would be C.

Step-by-step explanation:

250 dollars. 250-100= 150. 150/20 equls 7.5. 7.5 will round to 8. It iwll be 8 hours hey will have to pay for.

Answer:

See below.

Step-by-step explanation:

Values are excluded if they make the denominator zero, so one rational expression could be:

(x^2 - 9) /  (x + 4)(x + 7)

- when x = -4 or -7 then the denominator is zero so the values of the function is undefined for these values.

Step-by-step explanation:

a1 is the first term.  In this case, 2.

r is the common ratio.  Each term is multiplied by -3 to get the next term, so r = -3.

an = 2 (-3)ⁿ⁻¹

Answer: -70 degrees difference

Step-by-step explanation:

Answer:

-70!!

Step-by-step explanation:hope this helped!

actually box 3 is correct.

because their radiuses are easy to find

but the tangent line is x=-4 or x=4

The option third radius for circle A is 4, the radius for circle B is 3 and the point of intersection is (4,3) and the tangent equation is x = 4 is correct.

It is described as a set of points, where each point is at the same distance from a fixed point (called the center of a circle)

We have two circles in the graph plot:

From the graph plot:

For the circle:A the radius is 4

For the circle:B the radius is 3

The point of intersection point (4, 3)

The tangent line will be:

x = 4

Thus, the option third radius for circle A is 4, the radius for circle B is 3 and the point of intersection is (4,3) and the tangent equation is x = 4 is correct.

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Answer:

98

Step-by-step explanation:

If half the diagonal is 7 yd, then the full diagonal is 14 yd.

If we call the side length s, then using Pythagorean theorem:

c² = a² + b²

(14)² = s² + s²

196 = 2s²

s² = 98

The area of a square is s², so:

A = s²

A = 98

The area is 98 yd².

Answer:

c. $48

Step-by-step explanation:

Answer:

C. Approximately $48

Step-by-step explanation:

Given,

Total amount she have to save this year = $ 580,

The number of months in a year = 12,

So, the amount saved by her in each month

[tex]=\frac{\text{Total amount}}{\text{Number of months}}[/tex]

[tex]=\frac{580}{12}[/tex]

= $ 48.333333..

≈ $ 48

Hence, OPTION C is correct.

Answer:  C)  g(x) = 2ˣ⁻³ + 2

Step-by-step explanation:

The general form of an exponential equation is: g(x) = 2ˣ⁻ᵃ + b   where

The new function is shifted UP 2 units and RIGHT 3 units

--> g(x) = 2ˣ⁻³ + 2

Answer:

  B.  3x -2y = 10

Step-by-step explanation:

The given line rises three units for each two units of run to the right. Hence its slope is 3/2. A parallel line will also have a slope of 3/2.

Of the equations we can see, selection B has a slope of 3/2. It can be rewritten in slope-intercept form as ...

  3x -10 = 2y . . . . . add 2y-10 to isolate the y-term; next divide by 2.

  y = 3/2x -5 . . . . . the coefficient of x is the slope

Answer:

B.  3x -2y = 10

Step-by-step explanation:

The given line rises three units for each two units of run to the right. Hence its slope is 3/2. A parallel line will also have a slope of 3/2.

Of the equations we can see, selection B has a slope of 3/2. It can be rewritten in slope-intercept form as ...

  3x -10 = 2y . . . . . add 2y-10 to isolate the y-term; next divide by 2.

  y = 3/2x -5 . . . . . the coefficient of x is the slope

Answer:

The measure of angle EYH is [tex]25\°[/tex]

Step-by-step explanation:

step 1

Find the measure of arc EH

we know that

[tex]arc\ EV+arc\ VL+arc\ HL+arc\ EH=360\°[/tex] ----> by complete circle

substitute the given values

[tex]130\°+110\°+40\°+arc\ EH=360\°[/tex]

[tex]280\°+arc\ EH=360\°[/tex]

[tex]arc\ EH=360\°-280\°=80\°[/tex]

step 2

Find the measure of angle EYH

we know that

The measurement of the outer angle is the semi-difference of the arcs which comprises

[tex]m<EYH=\frac{1}{2}(arc\ EV-arc\ EH)[/tex]

substitute the values

[tex]m<EYH=\frac{1}{2}(130\°-80\°)=25\°[/tex]

Answer:

0.5

Step-by-step explanation:

because while solving a probability question you divide it by thee full number

Answer:

d.(-2,0)

Step-by-step explanation:

The given parametric equation is:

[tex]x=4t[/tex]

[tex]y=12t^2+4t-1[/tex]

We make t the subject in the first equation;

[tex]t=\frac{x}{4}[/tex]

We substitute into the second equation to get:

[tex]y=12(\frac{x}{4})^2+4(\frac{x}{4})-1[/tex]

[tex]y=\frac{3}{4}x^2+x-1[/tex]

When x=4 , [tex]y=\frac{3}{4}(4)^2+4-1=15[/tex]

When x=-2 , [tex]y=\frac{3}{4}(-2)^2+-2-1=0[/tex]

Therefore the point (-2,0) lies on the given parametric  curve.

Answer:

x ≈ 11.68 ( to 2 dec. places )

Step-by-step explanation:

Given

[tex]6^{(x-8)}[/tex] = 730 ( take log of both sides )

log [tex]6^{(x-8)}[/tex] = log730

(x - 8)log6 = log730 ( divide both sides by log6 )

x - 8 = [tex]\frac{log730}{log6}[/tex] ≈ 3.68 ( add 8 to both sides )

x ≈ 11.68 ( to 2 dec. places )

Answer:

6^ 3.679648309

Step-by-step explanation:

Don't really have one. Went with trial and error. Set calculator to 2 d.p by the way

Answer:

$36.00

Step-by-step explanation:

The cost performance index (CPI) is a measure of the financial effectiveness and efficiency of a project. As a ratio it is calculated by dividing the budgeted cost of work completed, or earned value, by the actual cost of the work performed, that is to say:

CPI = Budgeted cost of work / Actual cost of work

From the statement we know that:

CPI = 1.94

Budgeted cost of work= $69.85

Cost of work in 1983 = Budgeted cost of work / CPI

Cost of work in 1983 = $69.85 / 1.94 = $36.00

Answer:

The answer is C

Step-by-step explanation:

Answer:

Last option

[tex]y = 3cos(\pi(x+2)) + 5[/tex]

Step-by-step explanation:

The general cosine function has the following form  

[tex]y = Acos(b(x-\phi)) + k[/tex]

Where A is the amplitude: half the vertical distance between the highest peak and the lowest peak of the wave.  

[tex]\frac{2\pi}{b}[/tex] is the period: time it takes the wave to complete a cycle.

k is the vertical displacement.

[tex]\phi[/tex] is the shift phase

In this problem :

[tex]A = 3[/tex]

[tex]\frac{2\pi}{b}=2\\\\ b=\frac{2\pi}{2}\\\\ b=\pi[/tex]

[tex]\phi =-2\\\\k = 5[/tex]

So  The function is:

[tex]y = 3cos(\pi(x+2)) + 5[/tex]