The percent of working students increased 25.5% to 10.5%, what was the percent prior to the increase? (express your answer rounded correctly to the nearest tenth of a percent!)

Answer:

k(x) = x^2 and j(x) = -x^2

Step-by-step explanation:

The higher the coefficient, the steeper the graph. So the ones that work have to be less than 2.

It can't be 3x^2 because 3 is greater than 2x^2.

It can't be -3x^2 because -3 is the same as 3 except on the other side of the graph, and 3 is greater than 2.

It can't be -2x^2 because it has equal steepness as 2x^2, except it's on the opposite side of the graph.

It is x^2 because 1 is less than 2 in 2x^2, so it's less steep.

It is -x^2 because -1 is the same as 1 except on the other side of the graph, and 1 is less than 2.

Hope this helps!

A function maps a given input to a single output, increasing the values of

the factors increases the output and steepness of the function.

The functions that have graphs that have graphs that are less steep than f(x) = 2·x² are;  k(x) = x², and j(x) = -x²

Reasons:

The steeper the graph, the larger the ratio of the Rise to Run of the graph.

Therefore, increasing the multiple of the input of the graph increases the

Rise to Run ratio and therefore the steepness of the graph as follows;

Between points x = 1, and x = 2, for m(x) = 3·x², we have;

[tex]Slope = \dfrac{m(2) - m(1)}{2 - 1} = \dfrac{3 \times 2^2 -3 \times 1^2 }{2 - 1} = \dfrac{12 - 3}{2 - 1} = 9[/tex]

For k(x) = x², we have;

[tex]Slope = \dfrac{k(2) - k(1)}{2 - 1} = \dfrac{ 2^2 - 1^2 }{2 - 1} = \dfrac{4 - 1}{2 - 1} = 3[/tex]

Therefore;

The graphs of k(x) = x², and j(x) = -x², are less steep than f(x) = 2·x².

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He spent roughly $903

Answer: 903

Step-by-step explanation:

The length of the fabric is 4 cm.

To find the length of the piece of fabric, we need to divide the area by the width. The area of the fabric is given as 20 cm squared and the width is given as 5 cm. So, to find the length, we divide 20 cm squared by 5 cm:

Length = Area / Width

Length = 20 cm2 / 5 cm

Length = 4 cm

Therefore, the length of the piece of fabric is 4 cm.

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30/12=in 1 min you drive 2.5lap

120/48=in 1 min you drive 2.5lap

yes they are equivalant

If they are equivalent, you should be able to cross multiply and get a true statement.

12/30 = 48/120

12(120) = 30(48)

1440 = 1440

This is a true statement, therefore they ARE equivalent.

Answer:

y = 5cos(πx/4) +11

Step-by-step explanation:

The radius is 5 ft, so that will be the multiplier of the trig function.

The car starts at the top of the wheel, so the appropriate trig function is cosine, which is 1 (its maximum value) when its argument is zero.

The period is 8 seconds, so the argument of the cosine function will be 2π(x/8) = πx/4. This changes by 2π when x changes by 8.

The centerline of the wheel is the sum of the minimum and the radius, so is 6+5 = 11 ft. This is the offset of the scaled cosine function.

Putting that all together, you get

... y = 5cos(π/4x) + 11

_____

The answer selections don't seem to consistently identify the argument of the trig function properly. We assume that π/4(x) means (πx/4), where this product is the argument of the trig function.

Answer:

Step-by-step explanation:

You have to start by making a small chart of what  is happening at what time.

x    0        4        8

y    16       6       16

Essentially this is a cosine function.

Now you need to fill in some of the details. The key is what is happening at x = 4 seconds? At that time, you must add a minus amount in the cosine function to the amplitude to get 6. The only way to do that is if you have

y = 5* cos( (x/4)*pi) + 11

y = 5*cos( (4/4)*pi) + 11

y = 5 * cos(pi) + 11

y = 5 * (-1) + 11

y = -5 + 11 = 6

==================

x = 0

y = 5* cos( (pi/4)*0 ) + 11

y = 5 * cos(0) + 11

y = 5 (1) + 11

y = 16

===================

x = 8 seconds

y = 5*cos(8/4)*pi) + 11

y = 5*cos(2*pi) + 11

y = 5 * (1) + 11

y = 16

==================

The question is where did the 11 come from?

The Ferris wheel has a diameter of 10 feet and a radius of 5

The high and low points are 16 and 6.

The center of the Ferris wheel is between 16 and 6. Between in this case means average.

(16 + 6)/2 = 22/2 = 11

ANSWER

The possible rational roots are:

[tex]\pm\frac{1}{2},\pm2,\pm \frac{5}{2}[/tex]

EXPLANATION

According to the rational root theorem, the possible rational roots of the polynomial,

[tex]4x^3+9x^2-x+10=0[/tex]

are all the possible factors of the constant term divided by all the possible factors of the coefficient of the highest degree of the polynomial.

Therefore we examine the numerator and denominator of the options provided to see if they are factors of 10 and 4 respectively.

For

[tex]\pm\frac{1}{2}[/tex], we can see that 1 is a factor of 10 and 2 is a factor of 4, hence it is a possible rational root.

The same thing applies to [tex]\pm2,\pm \frac{5}{2}[/tex] also.

As for

[tex]\pm \frac{2}{5}[/tex], 2 is a factor of 10 but 5 is not a factor of 2, hence it is not a possible rational root.

The values of the possible rational roots of 4x³ + 9x² - x + 10 = 0 among the options are;

±½, ±2, ±5/2

          The rational root theorem states that if a polynomial has any rational roots, then the rational roots must be of the form;

±(factors of the coefficient of the constant term/factors of coefficient of the term with the highest degree)

4x³ + 9x² - x + 10 = 0

Thus, the rational roots could be;

±(½, 2, 5/2, 5)

        Looking at the options, the only correct possible rational roots are;

±½, ±2, ±5/2

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The answer is D because it passes the horizontal line test.  

Answer:

In these functions translation is used.

The transformation means that vertex of function m(s) is translated 18 units downwards.

Step-by-step explanation:

We have been given that average gas mileage m in miles per gallon for a compact car is modeled by  m(s) = - 0.015(s - 47)2 +33 and mileage for an SUV is modeled by my(s) = -0.015(s - 47)2 + 15.

We can see that both functions are parabolic and opens downwards. The vertex of function m(s) is (47,33), while vertex of function my(s) is (47,15). We can describe this change by translation.

This transformation means that function m(s) is translated 18 units downwards and average mileage of SUV is 18 miles/hour lesser than compact car at equal speeds.

The change is a vertical shift, meaning that the SUV's gas mileage drops lower than the compact car's at the same speed, but the rate at which the mileage decreases with speed is identical.

The transformation that describes the change from the compact car's gas mileage model to the SUV's model is a vertical shift. This is because the two equations are identical, except for the constant at the end (33 in the compact car's equation and 15 in the SUV's equation). This constant indicates the vertical position of the parabola described by the equation, so by changing the constant, you're vertically shifting the parabola without changing its shape or orientation.

A vertical shift of the parabola in this context means that the SUV's gas mileage drops lower than the compact car's gas mileage at the same speed. The number being subtracted from the parabola to achieve the shift (-0.015(s - 47)2) remains the same for the SUV and the compact car, meaning the rate at which the mileage changes with speed is the same, but the overall mileage of the SUV is lower due to the difference in constants (33 for the compact car and 15 for the SUV).

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b – 2a – c

9 - 2(-3) - (-6) = ?

9 - 2(-3) - (-6) = 21

Convert the equations to slope/intercept form:-

4x + 4y = 1

4y = -4x + 1

y = -1x + 1/4     The slope of this line is -1

x + y = -8

y = -1x - 8  This also has a slope of -1

So B is true.  The lines are parallel.

Final answer:

The two lines with equations 4x+4y=1 and x+y=-8 are parallel because they both have the same slope of -1. They do not intersect at the point (0,-8), nor do they share the same x-intercept since their x-intercepts are different when y=0.

Explanation:

To determine the relationship between the two lines with equations 4x+4y=1 and x+y=-8, we should first put them in slope-intercept form, which is y = mx + b, where m represents the slope and b the y-intercept.

For the first equation, dividing every term by 4 yields y = -x + 0.25, which has a slope of -1. For the second equation, we can see directly that rearranging it gives y = -x - 8, which also has a slope of -1.

Since both lines have the same slope, they are parallel. To check if they intersect at the point (0,-8), we can substitute x=0 into both equations. The first equation gives y = 0.25, which is not -8, so they do not intersect at (0,-8). For the x-intercepts, we set y=0 in both equations. The first gives x = 0.25, and the second gives x = -8, so they do not share the same x-intercept either.

Therefore, the correct answer is B. The lines are parallel.

I'd like to answer your question but there's not enough information.

Answer:

there needs to be a better explantion

Step-by-step explanation:

<PTS = <RTQ (vertical angles are equal)

11(y - 10) = 4y - 5

11y - 110 = 4y - 5

7y = 105

y = 15

so

<PTS = 11(15 - 10) = 11(5) = 55

Answer

<PTS = 55°

If (3,5) is a point on the graph of the function f, then (-1, 5) must be on the graph of the inverse function f-1.

To find the point that must be on the graph of the inverse function, we need to find the inverse of the given function first. Let's assume the given function is f(x) = y.

To find the inverse of f(x), we swap the x and y variables and solve for y. In this case, we have x = 3 and y = 5, so the inverse function is f-1(x) = (5, 3).

Therefore, the point (-1, 5) must be on the graph of the inverse function f-1.

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To round 4.975 to the nearest tenth, since the hundredths place has a 7, you round up, leading the tenths place (9) to increase by 1, turning into a 0, and the ones place (4) to also increase by 1, resulting in 5.0 as the answer.

When you round 4.975 to the nearest tenth, since there is a '7' in the hundredths place, the number in the tenths place will be affected by rounding rules. According to the standard rules for rounding numbers, if the first dropped digit is 5 or higher, you round up. Since 7 is greater than 5, you add 1 to the tenths place. Therefore, 9 in the tenths place plus 1 equals 10, which means a '0' will go in the tenths place and an additional '1' will be added to the 4 in the ones place, making the rounded number 5.0.

Answer:

y+2 = (-1/2)(x-3)

Step-by-step explanation:

Note that as we move from (-17,8) to (3,-2), x increases by 20 and y decreases by 10.  Thus, the slope of this line is m = -10/20, or m = -1/2.

The standard equation in point-slope form is y - k = m(x - h), where (h, k) is a point on the line and m is the slope of the line.  Then, taking data from the point (3, -2), we have

y+2 = (-1/2)(x-3).

Check:  Does the point (-17,8) satisfy this equation?  Is 8+2 = (-1/2)(-17-3) true?

Is 10 = 10 true?  Yes.

Answer:

y+2 = (-1/2)(x-3)

Step-by-step explanation:

Answer:

Height of cylinder = 2 inches

Explanation:

 If a cylinder has a base radius r and height h, the volume of cylinder is given by the expression, Volume V = πr²h.

Here given that volume of cylinder = 628 cubic inches = 628 inch³

 Radius of base circle = 10 inch.

 Substituting in the volume of cylinder equation

           628 = π x 10² x h

           [tex]h= \frac{628}{\pi *10^2} \\ \\ h=2.00 inches[/tex]

So , height of cylinder = 2 inches

Answer: D) $19.37

Step-by-step explanation: usatestprep approved

Answer:

Option B.

B. 5/2 cups of sugar, 19/6 cups of flour

Step-by-step explanation:

Given that Imogen is baking a cake.

The cake  requires two and one-half cups of sugar and three and one-sixth cups of flour.

Sugar required = 2 1/2

To make it improper fraction, we make the integer as a fraction with denominator 2

i.e. 2 1/2 = 2+1/2 =4/2 +1/2

Now we can add these

= 5/2

So 5/2 cups of sugar is required.

Similarly flour required=3 1/6

To make it improper we convert 3 into a fraction with denominator 6.

3=18/6

3 1/6 = 3+1/6 =18/6+1/6 = 19/6

Hence 19/6 cups of flour required.

I'm confused too and I'm supposed to be an expert.  I'm not entirely sure what frequency density is.  We'll just treat this as a histogram.

Let's assume each five minute interval gives a value equal to or proportional to the number of people that finished in that interval.

From 0 to 50 we have 10 intervals; let's just make this into a table

0-5  0

5-10 40

10-15 40

15-20 30

20-25 30

25-30 25

30-35 25

35-40 25

40-45 25  

45-50 15

From 0 to 40 that adds up to

0+40+40+30+30+25+25+25 = 215

From 0 to 50 that's

215+25+15 = 255

The fraction less than 40 is 215/255 = 43/51 ≈ .843

Answer: 84.3%

Answer:

84.3%

Step-by-step explanation:

Total frequency is the total area:

Add all the areas

To find each area:

Frequency density × class width

Total frequency:

40×10 + 30×10 + 25×20 + 15×5

= 1275

Less than 40:

Bar 1 + Bar 2 + some part of Bar 3

40×10 + 30×10 + 25×15

= 1075

Percentage (<40) = 1075/1275 × 100

= 4300/51

= 84.31372549%

Answer:

He used 12.944... yards of pipe for the repiping job.

Step-by-step explanation:

We know that,  1 yard = 3 feet  and  1 feet = 12 inches.

That means,  1 yard = (3×12) inches = 36 inches.

So, 1 feet = [tex]\frac{1}{3}[/tex] yard and  1 inch = [tex]\frac{1}{36}[/tex] yard.

Thus,  26 yards, 2 feet and 5 inches [tex]=(26+\frac{2}{3}+\frac{5}{36}) yards = 26.805... yards[/tex]

and  13 yards, 2 feet and 7 inches [tex]=(13+\frac{2}{3}+\frac{7}{36}) yards = 13.861... yards[/tex]

So Austin began a repiping job with 26.805... yards of pipe and when he finshed the job, he had 13.861... yards.

So, the length of the pipe he used for the repiping job will be: [tex](26.805...-13.861...) yards = 12.944... yards[/tex]

12 yards, 2 feet, 10 inches

[tex]a_n=2^n\\\\a_1=2^1=2\\\\a_2=2^2=4\\\\a_3=2^3=8\\\\a_4=2^4=16\\\\Answer:\ C.\ \{2,\ 4,\ 8,\ 16\}[/tex]

Plug the x-values from the table into the given equation and solve for y.

y = 5 - x²

First column

replace x with -2

y = 5 - (-2)²

  = 5 - (4)

  = 1

(x, y) = (-2, 1)

Second column

replace x with -1

y = 5 - (-1)²

  = 5 - (1)

  = 4

(x, y) = (-1, 4)

Third column

replace x with 0

y = 5 - (0)²

  = 5 - (0)

  = 5

(x, y) = (0, 5)

Fourth column

replace x with 1

y = 5 - (1)²

  = 5 - (1)

  = 4

(x, y) = (1, 4)

Fifth column

replace x with 2

y = 5 - (2)²

  = 5 - (4)

  = 1

(x, y) = (2, 1)

The correct answer is x=-3.

Given equation:

[tex]\frac{4}{3}x-7 = -11[/tex]  ----- (A)

To solve the above equation, follow these steps:

Step-1:

Add 7 on both sides of equation (A):

(A)=> [tex]\frac{4}{3}x -7 + 7 = -11 + 7 \\ \frac{4}{3}x = -4[/tex]

Step-2:

Multiple 3 on both sides, you will get:

[tex]\frac{4}{3}x * 3 = -4 * 3 \\ 4x = -12 \\ x = -3[/tex]

Hence the correct answer is x=-3.

Answer:

The value of x is -3.

Step-by-step explanation:

Given equation:

4/3 x-7=-11

By adding 7 to both sides of equation:

= 4/3x - 7 + 7 = -11 + 7

= 4/3x = -4

By multiplying 3 on both sides

= 4/3x × 3 = -4 × 3

= 4x = -12

By dividing 4 on both sides of equation:

= 4x/4 = -12/4

= x = -3

Hence by solving equation, the value of x out to be -3.

Answer:

28

Step-by-step explanation:

Answer:

It is the 2 one sweetheart.

Step-by-step explanation:

That's true. If A is a subset of B, it means that every element in A is also an element in B. This means that B has, at least, as many elements as A. Nothing prevents B from having more elements though, which don't belong to A.

Consider this example:

[tex] A = \{1,2,3,4\},\quad B=\{1,2,3,4,5,6\} [/tex]

A is a subset of B, because every element of A (1,2,3,4) is also an element of B (1,2,3,4 are in B as well).

Still, B has two more elements (5,6) which don't belong to A, so a superset can have (and typically does actually) more elements than its subset.

Final answer:

The statement is true; if set A is a subset of set B (A⊂B), it means all elements of A are also in B, but B can have more elements.

Explanation:

The statement If a ⊂ b, b may have more elements than a is true. In set theory, the symbol ⊂ denotes that one set is a subset of another. If we say that set A is a subset of set B (A⊂B), it means that all elements of A are also in B. However, B can have additional elements that are not in A, which would make it larger. To illustrate, if we have A = {1,3} and B = {1,2,3,4}, A is a proper subset of B because all elements of A are in B, but B has more elements (2 and 4) that are not in A. If A and B were identical, then we would say A = B, not A⊂B.