Winona has two jobs; one pays $10.00 per hour and the other pays $9.25 per hour plus an average of 70% of the hourly pay in tips and bonuses. Each pay
period, 20% of her total pay goes to taxes.
Part 1 of 2
(a) Write and simplify an equation that describes Winona's total take-home pay, P, in terms of the number of hours, x, worked at the first job and the
number of hours, y, worked at the second.
The total take-home pay from Winona's two jobs can be found using the equation
P=
Part 2 of 2
X
3
(b) If Winona is committed to work 30 hours per week at the first job, how many hours per week would she need to work at the second job if she needs
her biweekly take-home pay to be $800? Round the answer to one decimal place.
In order for her biweekly take-home pay to be $800, Winona needs to work
hours per week at her second job.

Answer:

history Is a good subject

Answer:

The inverse function is:

f(x)=√x−2

Step-by-step explanation:

To find the inverse function of y=f(x) you have to transform the formula to calculate x in terms of y.

y=x2+2

x2=y−2

x=√y−2

Now we can change the letters to follow the convention that x is the independent variable and y is the function's value:

y=√x−2

You have to calculate the domain of the result function.

Here you have the expression under square root sign, so the domain is the set where x−2≥0

x−2≥0⇒x≥2

Answer:

28.21°

Step-by-step explanation:

use the Cosine rule (Cos A = (b² + c² - a²) / 2bc)

let's call our angle A.

then Cos A = (12² + 20² - 11²) / (2 X 12 X 20)

= 141/160.

A = Cos^-1 (141/160)

= 28.21° to nearest hundredth

Option A is correct, the sequence is a geometric and common ratio is 2/3.

To determine whether the given sequence is geometric, we need to check if there is a common ratio between consecutive terms.

Let's examine the given sequence:

1/3, 2/9, 4/27, 8/81, 16/243...

To find the ratio between consecutive terms, we can divide each term by its preceding term:

(2/9)/(1/3) = 2/9 × 3/1 = 2/3

(4/27)/(2/9) = 4/27 × 9/2 = 4/6 = 2/3

(8/81)/(4/27) = 8/81 × 27/4 = 2/3

(16/243)/(8/81) = 16/243 × 81/8 = 2/3

As we can see, there is a common ratio of 2/3 between consecutive terms.

Therefore, the given sequence is indeed geometric.

Hence, the sequence is a geometric and common ration is 2/3, Option A is correct.

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Answer:

(x - 0)² + (y - 9)² = (√87.25)²

Step-by-step explanation:

equation of circle is (x - a)² + (y - b)² = r², where a and b are centre of the circle and r is the circle's radius.

(x - 0)² + (y - 9)² = r²

x² + (y² - 18y + 81) = r²

x² + y² - 18y + 81 = r²

at the point (7.5, 5):

(7.5)² + (5)² - 18(5) + 81

= 87.25

so r² = 87.25.

in standard form:

(x - 0)² + (y - 9)² = (√87.25)²

a. You will find the gallons of gas consumed by the old car in one year when you divide [tex]\frac{18,000}{old\;miles\;per\;gallon}[/tex].

b. The amount of dollars you would save in the first year by switching to the 27 mpg car is $1,150.

c. The amount of dollars you would save after 5 years is $5,750.

d. Yes, the additional savings in gas be worth the extra $3000 over a 5 year loan.

e. The gas mileage your new car would have to be if you saved $800 per year over your 18 mpg current car is 23.4 mpg.

Based on the information provided about the car that would provide maximum savings, the following rational equation models the situation:

[tex]g(x)=3.45(\frac{18,000}{old\;miles\;per\;gallon})-3.45(\frac{18,000}{new\;miles\;per\;gallon})[/tex]

Note: "g(x) is used for calculating the amount of dollar savings for one year for driving a car that gets higher miles per gallon rate."

Part a.

Based on the rational equation, we can logically deduce that the expression [tex]\frac{18,000}{old\;miles\;per\;gallon}[/tex] would help to determine the gallons of gas consumed by the old car in one year.

Part b.

The amount of dollars you would save in the first year by switching to the 27 mpg car can be calculated as follows:

[tex]g(x)=3.45(\frac{18,000}{18})-3.45(\frac{18,000}{27})[/tex]

g(x) = 3,450 - 2,300

g(x) = $1,150.

Part c.

The amount of dollars you would save after five years can be calculated as follows:

f(5) = 5g(x)

f(5) = 5 × $1,150

f(5) = $5,750

Part d.

[tex]g(x)=3.45(\frac{18,000}{27})-3.45(\frac{18,000}{33})[/tex]

g(x) = 2,300 - 1,881.82

g(x) = $418.18.

f(5) = 5g(x)

f(5) = 5 × $418.18

f(5) = $2,090.9

Next, we would subtract the cost in 5 years as follows;

Difference = $5,750 - $2,090.9

Difference = $3,659.1.

Therefore, $3,659.1 is greater than $3,000, so an additional savings is worth it.

Part e.

Lastly, we would determine the gas mileage your new car would have to be if you saved $800 per year over your 18 mpg current car;

[tex]800=3.45(\frac{18,000}{18})-3.45(\frac{18,000}{y})[/tex]

800 = 3,450 - 62,100/y

62,100/y = 3,450 - 800

62,100/y = 2,650

y = 62,100/2,650

y = 23.4 mpg.

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a) The slope of the tangent to the curve is,

⇒ dy/dx = 18x + 9

b)  the instantaneous rate of change of the function at point x = 7 is

⇒ dy/dx = 135

We have to given that;

Function is,

⇒ y = 9x² + 9x + 3

Now, We know that;

The slope of function is defined by derivative of function with respect to x.

Here, Function is,

⇒ y = 9x² + 9x + 3

Hence, the slope of the tangent to the curve is,

⇒ dy/dx = 18x + 9

And, the instantaneous rate of change of the function at point x = 7 is

⇒ dy/dx = 18x + 9

⇒ dy/dx = 18 x 7 + 9

⇒ dy/dx = 126 + 9

⇒ dy/dx = 135

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The solution to all parts is shown below.

First, let's filter out all non-valid responses, such as "IAP" (Inapplicable), "NA" (Not Applicable), or "Blank."

Frequency distribution table for the variable "can trust":

| Response                | Frequency |

| Always trusted        |     x     |

| Usually trusted        |     y     |

| Usually not trusted  |    z    |

| Always not trusted  |     w     |

Relative frequency distribution table for the variable "cantrust":

| Response                | Relative Frequency |

| Always trusted        |         x/n        |

| Usually trusted        |         y/n        |

| Usually not trusted |       z/n       |

| Always not trusted  |         w/n        |

Pie chart with the distribution of responses:

To find the percentage of respondents who say strangers can be "always trusted," we calculate the relative frequency or proportion for the "Always trusted" category.

Percentage of respondents who say strangers can be "always trusted"

= (x/n) x 100%

Now, let's calculate the 95% confidence margin of error for the proportion of Americans who answer strangers can "always be trusted":

Margin of error = (z-score) (standard error)

The z-score depends on the desired confidence level. For a 95% confidence level, the z-score is approximately 1.96.

The standard error can be calculated as:

Standard error = √[(p (1 - p)) / n]

Once we have the margin of error, we can calculate the 95% confidence interval as follows:

Confidence interval = p ± margin of error

The confidence interval provides a range within which the true proportion of Americans who say strangers can be "always trusted" is likely to fall.

By interpreting margin of errors and confidence intervals is essential because survey data is collected from a sample rather than the entire population.

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Answer:

30/.06 =500

Step-by-step explanation:

30÷6/100

==>

30*100/6

=500

Answer:

The remaining Jugs will take us 18 minutes to fill.

Explenation:

14 -2 =

12 jugs remain

2 = 3min /2

1 = 1.5min

12 x 1.5= 18min

The percentages are given as follows:

a) Over 16.8 pounds: 4.85%.

b) Under 13.8 pounds: 73.24%.

c) Between 13.8 and 16.8 pounds: 21.91%.

We first must use the z-score formula, as follows:

[tex]Z = \frac{X - \mu}{\sigma}[/tex]

In which:

The z-score represents how many standard deviations the measure X is above or below the mean of the distribution, and can be positive(above the mean) or negative(below the mean).

The z-score table is used to obtain the p-value of the z-score, and it represents the percentile of the measure represented by X in the distribution.

The mean and the standard deviation for this problem are given as follows:

[tex]\mu = 12, \sigma = 2.9[/tex]

Item a:

The proportion is one subtracted by the p-value of Z when X = 16.8, hence:

Z = (16.8 - 12)/2.9

Z = 1.66.

Z = 1.66 has a p-value of 0.9515.

1 - 0.9515 = 0.0485, hence the percentage is of 4.85%.

Item b:

The proportion is the p-value of Z when X = 13.8, hence:

Z = (13.8 - 12)/2.9

Z = 0.62.

Z = 0.62 has a p-value of 0.7324.

Item c:

The proportion is the subtraction of the p-values, hence:

0.9515 - 0.7324 = 0.2191 = 21.91%.

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Answer:

76b^2

Step-by-step explanation:

Basically you just multiply 4x19 which gives you 76, and the two b's equal b^2 (I'm not great at explaining i know)

Answer:

c=19

Step-by-step explanation:

11=c-8

+8  +8

19=c

11=c-8

move the variable to the left - hand side and change it sign: 11-c= -8

move the constant to the right-hand side and change its sign: -c= -8-11

calculate the difference: -c = -19

change the signs on each side c=19

For the expression  [tex]x^2^/^4x^3^/^6[/tex] the value of exponent of x is 1.

8ab²√5a is the simplified form of the expression 4√20a³b⁴ .

The given expression is [tex]x^2^/^4x^3^/^6[/tex]

x is the variable in the expression.

We know that when bases are same in the product then the powers will be added.

[tex]x^1^/^2^+^1^/^2[/tex]

When 1/2 and 1/2 are added we get 1.

So the value of r is 1.

Now 4√20a³b⁴ is the expression.

4√4×5a².a.b².b²

4.2.ab²√5a

8ab²√5a is the simplified form of the expression.

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The value of x from the given similar triangles is 10 units.

The given triangles are similar.

Here, 3x/(4x+2) = 20/28

3x/(4x+2) = 5/7

7×3x = 5(4x+2)

21x=20x+10

21x-20x=10

x=10 units

Therefore, the value of x from the given similar triangles is 10 units.

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A full circle has [tex]360^{\circ}[/tex].

[tex]\dfrac{4}{9}\cdot 360^{\circ}=160^{\circ}[/tex]

The mark angle is [tex]160^{\circ}[/tex].

The fraction of the cans in George’s pantry which are either soup or vegetables is 11/24.

Fraction of cans in George‘s pantry that are vegetables = 1/8

Fraction of cans in George‘s pantry that are soups = 1/3

Fraction of the cans in George’s pantry which are either soup or vegetables = 1/3 + 1/8

= (8+3) /24

= 11/24

Hence, 11/24 is the fraction of the cans in George’s pantry that are either soup or vegetables.

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The surface area of the sphere is 50.3 yard².

The volume of the rectangular prism is 245 inches³.

The volume of the pyramid is 149.3 m³.

The volume and surface area of the figures can be found as follows:

surface area of the sphere = 4πr²

where

Therefore,

surface area of the sphere = 4 × 3.14 × 2²

surface area of the sphere = 50.3 yard²

Volume of the rectangular prism = lwh

where

Therefore,

Volume of the rectangular prism = 7 × 7 × 5

Volume of the rectangular prism = 245 inches³

Volume of the pyramid = 1 / 3 Bh

where

Therefore,

B = 8² = 64 m²

h = 7 m

Therefore,

Volume of the pyramid = 1 / 3 × 64 × 7

Volume of the pyramid = 149.3 m³

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Answer:

ab(3a + 4b)

Step-by-step explanation:

Here are the steps on how to write the expression

3a^2 b + 4ab^2 as an equivalent algebraic expression:

1. Factor out the greatest common factor, which is ab.

2. The expression becomes ab(3a + 4b).

3. This is an equivalent algebraic expression to 3a^2 b + 4ab^2.

steps:

I hope this helps! Let me know if you have any other questions.

Answer:

Step-by-step explanation:

To simplify the expression 3a^2b + 4ab^2, [ we can factor out the common factor of ab from both terms: Step 1: Take out the common factor of ab. 3a^2b + 4ab^2 = ab(3a + 4b) Now the expression is in its factored form.

The coordinate of point X" after translating segment XY along the vector <-3, 1> and then rotating it 90 degrees is X" (4, 5).

To find the coordinate of point X" after translating segment XY along the vector <-3, 1> and then rotating it 90 degrees, we need to follow these steps:

Translation: Add the components of the translation vector <-3, 1> to the coordinates of point X(-2, 3) to get the new coordinates of X'.

X' = (-2 + (-3), 3 + 1) = (-5, 4)

Now, we have the translated endpoint X'.

Rotation: To rotate the point X' by 90 degrees, we need to swap the x and y coordinates and negate the new x coordinate.

X" = (y-coordinate of X', -x-coordinate of X')

X" = (4, -(-5))

X" = (4, 5)

Therefore, the coordinate of point X" after translating segment XY along the vector <-3, 1> and then rotating it 90 degrees is X" (4, 5).

In summary, we first translate point X(-2, 3) along the vector <-3, 1> to get X' (-5, 4). Then, we rotate X' by 90 degrees to obtain X" (4, 5).

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Answer:

1)  695.3 m²

2)  8 ft

3)  172.0 in²

Step-by-step explanation:

To find the area of a regular polygon, we can use the following formula:

[tex]\boxed{\begin{minipage}{5.5cm}\underline{Area of a regular polygon}\\\\$A=\dfrac{s^2n}{4 \tan\left(\dfrac{180^{\circ}}{n}\right)}$\\\\\\where:\\\phantom{ww}$\bullet$ $n$ is the number of sides.\\ \phantom{ww}$\bullet$ $s$ is the side length.\\\end{minipage}}[/tex]

Given the polygon is an octagon, n = 8.

Given each side measures 12 m, s = 12.

Substitute the values of n and s into the formula for area and solve for A:

[tex]\implies A=\dfrac{(12)^2 \cdot 8}{4 \tan\left(\dfrac{180^{\circ}}{8}\right)}[/tex]

[tex]\implies A=\dfrac{144 \cdot 8}{4 \tan\left(22.5^{\circ}\right)}[/tex]

[tex]\implies A=\dfrac{1152}{4 \tan\left(22.5^{\circ}\right)}[/tex]

[tex]\implies A=\dfrac{288}{\tan\left(22.5^{\circ}\right)}[/tex]

[tex]\implies A=695.29350...[/tex]

Therefore, the area of a regular octagon with side length 12 m is 695.3 m² rounded to the nearest tenth.

[tex]\hrulefill[/tex]

The sum of an interior angle of a regular polygon and its corresponding exterior angle is always 180°.

If the exterior angle of a polygon measures 40°, then its interior angle measures 140°.

To determine the number of sides of the regular polygon given its interior angle, we can use this formula, where n is the number of sides:

[tex]\boxed{\textsf{Interior angle of a regular polygon} = \dfrac{180^{\circ}(n-2)}{n}}[/tex]

Therefore:

[tex]\implies 140^{\circ}=\dfrac{180^{\circ}(n-2)}{n}[/tex]

[tex]\implies 140^{\circ}n=180^{\circ}n - 360^{\circ}[/tex]

[tex]\implies 40^{\circ}n=360^{\circ}[/tex]

[tex]\implies n=\dfrac{360^{\circ}}{40^{\circ}}[/tex]

[tex]\implies n=9[/tex]

Therefore, the regular polygon has 9 sides.

To determine the length of each side, divide the given perimeter by the number of sides:

[tex]\implies \sf Side\;length=\dfrac{Perimeter}{\textsf{$n$}}[/tex]

[tex]\implies \sf Side \;length=\dfrac{72}{9}[/tex]

[tex]\implies \sf Side \;length=8\;ft[/tex]

Therefore, the length of each side of the regular polygon is 8 ft.

[tex]\hrulefill[/tex]

The area of a regular polygon can be calculated using the following formula:

[tex]\boxed{\begin{minipage}{5.5cm}\underline{Area of a regular polygon}\\\\$A=\dfrac{s^2n}{4 \tan\left(\dfrac{180^{\circ}}{n}\right)}$\\\\\\where:\\\phantom{ww}$\bullet$ $n$ is the number of sides.\\ \phantom{ww}$\bullet$ $s$ is the side length.\\\end{minipage}}[/tex]

A regular pentagon has 5 sides, so n = 5.

If its perimeter is 50 inches, then the length of one side is 10 inches, so s = 10.

Substitute the values of s and n into the formula and solve for A:

[tex]\implies A=\dfrac{(10)^2 \cdot 5}{4 \tan\left(\dfrac{180^{\circ}}{5}\right)}[/tex]

[tex]\implies A=\dfrac{100 \cdot 5}{4 \tan\left(36^{\circ}\right)}[/tex]

[tex]\implies A=\dfrac{500}{4 \tan\left(36^{\circ}\right)}[/tex]

[tex]\implies A=\dfrac{125}{\tan\left(36^{\circ}\right)}[/tex]

[tex]\implies A=172.047740...[/tex]

Therefore, the area of a regular pentagon with perimeter 50 inches is 172.0 in² rounded to the nearest tenth.

Answer:

1.695.29 m^2

2.8 feet

3. 172.0477 in^2

Step-by-step explanation:

1. The area of a regular octagon can be found using the formula:

[tex]\boxed{\bold{Area = 2a^2(1 + \sqrt{2})}}[/tex]

where a is the length of one side of the octagon.

In this case, a = 12 m, so the area is:

[tex]\bold{Area = 2(12 m)^2(1 + \sqrt{2}) = 288m^2(1 + \sqrt2)=695.29 m^2}[/tex]

Therefore, the Area of a regular octagon is 695.29 m^2

2.

The formula for the exterior angle of a regular polygon is:

[tex]\boxed{\bold{Exterior \:angle = \frac{360^o}{n}}}[/tex]

where n is the number of sides in the polygon.

In this case, the exterior angle is 40°, so we can set up the following equation:

[tex]\bold{40^o=\frac{ 360^0 }{n}}[/tex]

[tex]n=\frac{360}{40}=9[/tex]

Therefore, the polygon has n=9 sides.

Perimeter=72ft.

We have

[tex]\boxed{\bold{Perimeter = n*s}}[/tex]

where n is the number of sides in the polygon and s is the length of one side.

Substituting Value.

72 feet = 9*s

[tex]\bold{s =\frac{ 72 \:feet }{ 9}}[/tex]

s = 8 feet

Therefore, the length of each side of the polygon is 8 feet.

3.

Solution:

A regular pentagon has five sides of equal length. If the perimeter of the pentagon is 50 in, then each side has a length = [tex]\bold{\frac{perimeter}{n}=\frac{50}{5 }= 10 in.}[/tex]

The area of a regular pentagon can be found using the following formula:

[tex]\boxed{\bold{Area = \frac{1}{4}\sqrt{5(5+2\sqrt{5})} *s^2}}[/tex]

where s is the length of one side of the Pentagon.

In this case, s = 10 in, so the area is:

[tex]\bold{Area= \frac{1}{4}\sqrt{5(5+2\sqrt{5})} *10^2=172.0477 in^2}[/tex]

Drawing: Attachment

The number that belongs in the green box is 57.8 degrees.

We are given that;

The triangle sides 11 12 20

Now,

The interior angles of a triangle always add up to 180 degrees. To find the interior angles of a triangle whose sides are 11 cm, 12 cm and 20 cm, we can use the law of cosines1.

Let’s call the angle opposite the side of length 11 cm as A, the angle opposite the side of length 12 cm as B, and the angle opposite the side of length 20 cm as C. Using the law of cosines, we can find that:

[tex]cos(A) = (b^2 + c^2 - a^2) / (2bc) = (12^2 + 20^2 - 11^2) / (2 * 12 * 20) = 0.55cos(B) = (a^2 + c^2 - b^2) / (2ac) = (11^2 + 20^2 - 12^2) / (2 * 11 * 20) = 0.6cos© = (a^2 + b^2 - c^2) / (2ab) = (11^2 + 12^2 - 20^2) / (2 * 11 * 12) = -0.45[/tex]

We can then use inverse cosine function to find the angles:

[tex]A = cos^-1(0.55) ≈ 57.8 degreesB = cos^-1(0.6) ≈ 53.1 degreesC = cos^-1(-0.45) ≈ 129.1 degrees[/tex]

The interior angles of this triangle are approximately 57.8 degrees, 53.1 degrees, and 129.1 degrees.

Therefore, by the angle answer will be 57.8 degrees.

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Answer:

Step-by-step explanation:

You want to solve the system of equations ...

We can eliminate y by subtracting the first equation from 4 times the second:

  4(3x +y) -(x +4y) = 4(-2) -(25)

  11x = -33

  x = -3

Using the second equation, we have ...

  y = -2 -3x = -2 -3(-3) = 7

The values of x and y that make the equation true are ...

__

Additional comment

The sum of matrices is the sum of corresponding terms. The constant terms on the diagonals are irrelevant to the values of x and y. The off-diagonal sums give the two equations solved here.

<95141404393)

Using unit rate, the number of maters of copper wire produced in a 12 hour work day is 4554 m

Unit rate is the rate at which a unit of a obect is done

if a factor can produce 6.6 M of copper wire a minute. To determine how many meters of copper can the factory produce in 12-hour work day provided the factory stressed out for a half hour lunch​.

Now, we know that the factor produces 6.6 m of copper per minute. So, the unit rate is 6.6 m/min

Now since we have a 12 hour work day and and 1/2 hour lunch, the total time used to produce the copper wire is 12 h - 1/2 h = 12 h - 0.5 h = 11.5 h

We now convert this to minutes 11.5 h = 11.5 × 60 min

= 690 min

So, the number of meters of coppper wire produced in a 12 hour work day A = unit rate × time

= 6.6 m/min × 690 min

= 4554 m

So, the amount is 4554 m

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Answer:

Multiplicative identity for any real number is 1.

Step-by-step explanation:

Answer:

See attachments.

Step-by-step explanation:

The quickest way to sketch the given functions, given that the coordinate plane is restricted to -5 ≤ x ≤ 5, is to substitute the values of x into the functions to find the points for the given interval. Plot these points on the given coordinate plane, and draw a continuous curve through the points.

Given function:

[tex]y=\dfrac{5}{x}-2, \quad x > 0[/tex]

Substitute the values of x = 1, x = 2, x = 3, x = 4 and x = 5 into the function:

[tex]\begin{aligned}x=1 \implies y&=\dfrac{5}{1}-2\\&=5-2\\&=3\end{aligned}[/tex]

[tex]\begin{aligned}x=2 \implies y&=\dfrac{5}{2}-2\\&=2.5-2\\&=0.5\end{aligned}[/tex]

[tex]\begin{aligned}x=3 \implies y&=\dfrac{5}{3}-2\\&=-0.333...\end{aligned}[/tex]

[tex]\begin{aligned}x=4 \implies y&=\dfrac{5}{4}-2\\&=1.25-2\\&=-0.75\end{aligned}[/tex]

[tex]\begin{aligned}x=5 \implies y&=\dfrac{5}{5}-2\\&=1-2\\&=-1\end{aligned}[/tex]

Plot the points (1, 3), (2, 0.5), (3, -0.333...), (4, -0.75) and (5, -1) on the given coordinate plane and draw a continuous curve through them.

End behaviour:

[tex]\hrulefill[/tex]

Given function:

[tex]y=\dfrac{-2}{x+1}+3, \quad x < -1[/tex]

Substitute the values of x = -2, x = -3, x = -4 and x = -5 into the function:

[tex]\begin{aligned}x=-2 \implies y&=\dfrac{-2}{-2+1}+3\\&=2+3\\&=5\end{aligned}[/tex]

[tex]\begin{aligned}x=-3 \implies y&=\dfrac{-2}{-3+1}+3\\&=1+3\\&=4\end{aligned}[/tex]

[tex]\begin{aligned}x=-4 \implies y&=\dfrac{-2}{-4+1}+3\\&=0.666...+3\\&=3.666...\end{aligned}[/tex]

[tex]\begin{aligned}x=-5 \implies y&=\dfrac{-2}{-5+1}+3\\&=0.5+3\\&=3.5\end{aligned}[/tex]

Plot the points (-2, 5), (-3, 4), (-4, 3.666...) and (-5, 3.5) on the given coordinate plane and draw a continuous curve through them.

End behaviour:

If the difference between the same side interior angles of two parallel lines is 50 degrees, we know that those angles must sum up to 180 degrees (because they are opposite each other).are supplementary angles. As a result, each of the four angles is 65 degrees, 115 degrees, 65 degrees, and 115 degrees..

Let's call one of the angles "x". Then, the other angle must be (x+50).

Now, let's look at the angles formed by a transversal intersecting those two parallel lines. There are eight angles in total, but we only need to find four of them since the other four are congruent (due to alternate interior angles being congruent).

The angles we need to find are:

1. x (one of the same side interior angles)

2. (x+50) (the other same side interior angle)

3. the corresponding angle to x (opposite x, on the other side of the transversal)

4. the corresponding angle to (x+50) (opposite (x+50), on the other side of the transversal)

Since corresponding angles are congruent when two parallel lines are intersected by a transversal, we know that angles 3 and 4 are equal to angles 1 and 2, respectively.

To determine all four angles, we just solve for x:

x + (x+50) = 180

2x + 50 = 180

2x = 130

x = 65

Therefore, our four angles are:

1. x = 65 degrees

2. (x+50) = 115 degrees

3. the angle corresponding to x = 65 degrees

4. the corresponding angle to (x+50) = 115 degrees

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The width of the vegetable garden is 8 feet.

To determine the width of the vegetable garden.

Given information:

Flower garden length = 6 feet

Flower garden width = 4 feet

Vegetable garden length = Flower garden length

Area of the flower garden = half the area of the vegetable garden

To find the width of the vegetable garden, we need to find the area of both gardens.

Area of the flower garden = length × width

Area of the flower garden = 6 feet × 4 feet

Area of the flower garden = 24 square feet

Since the area of the flower garden is half the area of the vegetable garden, we can set up the following equation:

24 square feet = (1/2) × Area of the vegetable garden

To solve for the area of the vegetable garden, we multiply both sides of the equation by 2:

2 × 24 square feet = Area of the vegetable garden

48 square feet = Area of the vegetable garden

Now that we know the area of the vegetable garden is 48 square feet, we can find the width.

Area of the vegetable garden = length × width

48 square feet = 6 feet × width

To solve for the width of the vegetable garden, we divide both sides of the equation by 6:

48 square feet / 6 feet = width

8 feet = width

Therefore, the width of the vegetable garden is 8 feet.

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